/export/starexec/sandbox2/solver/bin/starexec_run_complexity /export/starexec/sandbox2/benchmark/theBenchmark.koat /export/starexec/sandbox2/output/output_files -------------------------------------------------------------------------------- WORST_CASE(Omega(n^1), ?) proof of /export/starexec/sandbox2/benchmark/theBenchmark.koat # AProVE Commit ID: 794c25de1cacf0d048858bcd21c9a779e1221865 marcel 20200619 unpublished dirty The runtime complexity of the given CpxIntTrs could be proven to be BOUNDS(n^1, INF). (0) CpxIntTrs (1) Loat Proof [FINISHED, 288.6 s] (2) BOUNDS(n^1, INF) ---------------------------------------- (0) Obligation: Complexity Int TRS consisting of the following rules: f271(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f281(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= B + 1 f271(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f281(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: B >= 1 + A f2(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f7(A, B, 0, 0, 0, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: TRUE f7(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f16(A, G + 1, C, 0, 0, F, G, H, 0, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= G && H >= G f16(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f16(A + 1, B, C, D + R1, E, F, G, H, I, R1, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= A f24(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f24(A + 1, B, C, D, E, F, G, H, I + R1 * S1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= A f42(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f45(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= K f45(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f45(A + 1, B, C, D, E, F, G, H, I + R1 * S1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= A f52(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f52(A + 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= A f60(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f60(A + 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= A f7(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f69(A, G + 1, C, 0, 0, F, G, H, 0, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 + H && F >= G f69(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f72(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= G + 1 && H >= G f69(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f72(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 + F && H >= G f72(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f72(A + 1, B, C, D + R1, E, F, G, H, I, J, K, R1, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f80(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f80(A + 1, B, C, D, E, F, G, H, I + R1 * S1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f98(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f98(A + 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f104(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f107(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= K f107(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f107(A + 1, B, C, D, E, F, G, H, I + R1 * S1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f113(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f113(A + 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f121(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f121(A + 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f69(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f130(A, B, C, D, E, F, G, H, I, J, K, L, C, R1, S1, R1 + S1, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 + H f69(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f130(A, B, C, D, E, G, G, H, I, J, K, L, C, R1, S1, R1 + S1, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= F && G >= F && G <= F f130(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f7(A, B, M, D, E, F, G + 1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: M >= 1 + P f130(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f7(A, B, P, D, E, F, G + 1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: P >= M f136(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f141(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= G + 1 && 0 >= E + 1 && G >= 1 f136(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f141(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= G + 1 && E >= 1 && G >= 1 f141(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f141(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= K f147(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f150(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= K f150(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f150(A + 1, B, C, D, E, F, G, H, I + R1 * S1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f156(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f156(A + 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= A f136(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f164(A, B, C, D, 0, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 && F >= G + 1 && E >= 0 && E <= 0 f164(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f164(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, 0, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= K f136(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f136(A, G, C, D, R1, F, G - 1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 && G >= F f177(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f182(A, G + 1, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 f182(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f182(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= K f190(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f193(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= K f193(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f193(A + 1, B, C, D, E, F, G, H, I + R1 * S1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= A f200(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f200(A + 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= A f208(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f208(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= K f215(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f215(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= K f223(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f226(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 f226(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f230(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, 1, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 30 >= R f230(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f241(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= B f230(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f241(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, 0, B - 1, C - R1, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: B >= 1 f230(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f238(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, B - 1, R1, S1, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= R1 + 1 && B >= 1 f230(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f238(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, B - 1, R1, S1, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: R1 >= 1 && B >= 1 f238(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f241(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: TRUE f238(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f230(A, B - 1, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= V + 1 f238(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f230(A, B - 1, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: V >= 1 f241(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f246(A, B, C, D, E, F, G, H, 1, J, K, L, M, N, O, P, Q, R, S, T, U, V, 0, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= S + 1 f241(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f246(A, B, C, D, E, F, G, H, 1, J, K, L, M, N, O, P, Q, R, S, T, U, V, 0, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: S >= 1 f246(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f260(A, B, C, D, R1, F, G, H, -(I) * S1 * U1, J, K, L, M, N, O, P, Q, R, S, T, U, V, A2, I * S1, X1, V1, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 1 >= T1 * U1 && T1 * U1 + U1 >= 2 && A >= G && 0 >= V1 + 1 && 1 >= T1 * W1 && T1 * W1 + W1 >= 2 && X1 >= W1 && 1 >= T1 * Y1 && T1 * Y1 + Y1 >= 2 && Y1 >= X1 && R1 >= R1 * T1 * Z1 && R1 * T1 * Z1 + Z1 >= R1 + 1 && Z1 >= A2 && R1 >= R1 * T1 * B2 && R1 * T1 * B2 + B2 >= R1 + 1 && A2 >= B2 f246(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f260(A, B, C, D, R1, F, G, H, -(I) * S1 * U1, J, K, L, M, N, O, P, Q, R, S, T, U, V, A2, I * S1, X1, V1, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 1 >= T1 * U1 && T1 * U1 + U1 >= 2 && A >= G && V1 >= 1 && 1 >= T1 * W1 && T1 * W1 + W1 >= 2 && X1 >= W1 && 1 >= T1 * Y1 && T1 * Y1 + Y1 >= 2 && Y1 >= X1 && R1 >= R1 * T1 * Z1 && R1 * T1 * Z1 + Z1 >= R1 + 1 && Z1 >= A2 && R1 >= R1 * T1 * B2 && R1 * T1 * B2 + B2 >= R1 + 1 && A2 >= B2 f260(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f260(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, R1, S1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= K f241(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f271(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, 0, T, U, V, W, X, Y, Z, A1, R1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: S >= 0 && S <= 0 f271(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f275(B, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= B1 + 1 && B >= A && B <= A f275(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f275(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= K f281(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f290(A, B, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, A - 1, U, V, W, S1, U1, Z, X1, B1, A2, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 29 >= R f281(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f290(A, B, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, A - 1, U, V, W, S1, U1, Z, X1, B1, A2, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: R >= 31 f281(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f290(A, B, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, 30, S, A - 1, U, V, W, S1, U1, Z, X1, B1, A2, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: R >= 30 && R <= 30 f290(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f299(A, B, C, D, E, F, G, H, 1, J, K, L, M, N, O, P, Q, R, S, T, U, V, 1, R1, Y, Z, A1, B1, C1, S1, S1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: X >= 0 && Y * A1 >= X * Y * U1 + Y * S1 * U1 && X * Y * U1 + Y * S1 * U1 + U1 >= Y * A1 + 1 && C1 * C1 + U1 >= B1 * B1 + Y * Y + C1 * X1 && C1 * X1 + X1 + B1 * B1 + Y * Y >= C1 * C1 + U1 + 1 && X1 >= R1 && Y * A1 >= X * Y * A2 + Y * S1 * A2 && X * Y * A2 + Y * S1 * A2 + A2 >= Y * A1 + 1 && C1 * C1 + A2 >= B1 * B1 + Y * Y + C1 * V1 && C1 * V1 + V1 + B1 * B1 + Y * Y >= C1 * C1 + A2 + 1 && R1 >= V1 f290(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f299(A, B, C, D, E, F, G, H, 1, J, K, L, M, N, O, P, Q, R, S, T, U, V, 1, R1, Y, Z, A1, B1, C1, D1, -(S1), S1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= X + 1 && Y * A1 + Y * S1 * U1 >= X * Y * U1 && X * Y * U1 + U1 >= Y * S1 * U1 + Y * A1 + 1 && C1 * C1 + U1 >= B1 * B1 + Y * Y + C1 * X1 && C1 * X1 + X1 + B1 * B1 + Y * Y >= C1 * C1 + U1 + 1 && X1 >= R1 && Y * A1 + Y * S1 * A2 >= X * Y * A2 && X * Y * A2 + A2 >= Y * S1 * A2 + Y * A1 + 1 && C1 * C1 + A2 >= B1 * B1 + Y * Y + C1 * V1 && C1 * V1 + V1 + B1 * B1 + Y * Y >= C1 * C1 + A2 + 1 && R1 >= V1 f299(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f315(A, B, C, D, W * R1 * S1 - U1, F, K + 1, H, X1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W1, A2 + W * R1 * V1, T1, Z, Y1, Z1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: X >= S1 * Z1 && S1 * Z1 + S1 >= X + 1 && I * C1 * R1 >= C1 * U1 * Z1 && C1 * U1 * Z1 + U1 >= I * C1 * R1 + 1 && X * C1 >= C1 * Z1 * A2 && C1 * Z1 * A2 + A2 >= X * C1 + 1 && I * R1 >= V1 * Z1 && V1 * Z1 + V1 >= I * R1 + 1 && I * R1 >= Z1 * B2 && Z1 * B2 + B2 >= I * R1 + 1 && B2 >= X1 && I * R1 >= Z1 * C2 && Z1 * C2 + C2 >= I * R1 + 1 && X1 >= C2 && I * R1 * D2 >= Z1 * D2 * E2 && Z1 * D2 * E2 + E2 >= I * R1 * D2 + 1 && E2 >= T1 && I * R1 * D2 >= Z1 * D2 * F2 && Z1 * D2 * F2 + F2 >= I * R1 * D2 + 1 && T1 >= F2 && T >= K && X * D2 >= Z1 * D2 * G2 && Z1 * D2 * G2 + G2 >= X * D2 + 1 && G2 >= Y1 && X * D2 >= Z1 * D2 * H2 && Z1 * D2 * H2 + H2 >= X * D2 + 1 && Y1 >= H2 && X >= Z1 * I2 && Z1 * I2 + I2 >= X + 1 && I2 >= W1 && X >= Z1 * J2 && Z1 * J2 + J2 >= X + 1 && W1 >= J2 f315(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f315(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, R1, S1, D1, E1, F1, G1 + 1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: F >= G1 f332(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f332(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, R1, S1, C1, D1, E1, F1, G1 + 1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: H >= G1 f332(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f299(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G1 >= 1 + H f315(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f332(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, E * W + I * A1, Y, Z, A1, 0, W * A1 - E * I, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G1 >= 1 + F f315(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f332(A, B, C, D, E, F, G, H, R1, J, K, L, M, N, O, P, Q, R, S, T, U, V, X1, S1 + U1, Y, Z, A1, A2, V1 - T1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: E * X >= E * X * S1 * W1 && E * X * S1 * W1 + S1 >= E * X + 1 && Y * A1 >= Y * A1 * U1 * W1 && Y * A1 * U1 * W1 + U1 >= Y * A1 + 1 && X * A1 >= X * A1 * V1 * W1 && X * A1 * V1 * W1 + V1 >= X * A1 + 1 && E * Y >= E * Y * T1 * W1 && E * Y * T1 * W1 + T1 >= E * Y + 1 && 0 >= W1 + 1 && G1 >= 1 + F && Y >= Y * W1 * Y1 && Y * W1 * Y1 + Y1 >= Y + 1 && Y1 >= R1 && Y >= Y * W1 * Z1 && Y * W1 * Z1 + Z1 >= Y + 1 && R1 >= Z1 && 1 >= W1 * B2 && W1 * B2 + B2 >= 2 && A2 >= B2 && 1 >= W1 * C2 && W1 * C2 + C2 >= 2 && C2 >= A2 && X >= X * W1 * E2 && X * W1 * E2 + E2 >= X + 1 && E2 >= X1 && X >= X * W1 * D2 && X * W1 * D2 + D2 >= X + 1 && X1 >= D2 f315(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f332(A, B, C, D, E, F, G, H, R1, J, K, L, M, N, O, P, Q, R, S, T, U, V, X1, S1 + U1, Y, Z, A1, A2, V1 - T1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: E * X >= E * X * S1 * W1 && E * X * S1 * W1 + S1 >= E * X + 1 && Y * A1 >= Y * A1 * U1 * W1 && Y * A1 * U1 * W1 + U1 >= Y * A1 + 1 && X * A1 >= X * A1 * V1 * W1 && X * A1 * V1 * W1 + V1 >= X * A1 + 1 && E * Y >= E * Y * T1 * W1 && E * Y * T1 * W1 + T1 >= E * Y + 1 && W1 >= 1 && G1 >= 1 + F && Y >= Y * W1 * Y1 && Y * W1 * Y1 + Y1 >= Y + 1 && Y1 >= R1 && Y >= Y * W1 * Z1 && Y * W1 * Z1 + Z1 >= Y + 1 && R1 >= Z1 && 1 >= W1 * B2 && W1 * B2 + B2 >= 2 && A2 >= B2 && 1 >= W1 * C2 && W1 * C2 + C2 >= 2 && C2 >= A2 && X >= X * W1 * E2 && X * W1 * E2 + E2 >= X + 1 && E2 >= X1 && X >= X * W1 * D2 && X * W1 * D2 + D2 >= X + 1 && X1 >= D2 f299(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f226(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R + 1, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + T f226(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f223(A - 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: R >= 31 f271(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f223(B - 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: B1 >= 0 && B >= A && B <= A f275(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f223(A - 1, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + F f260(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f246(A, B, C, D, E, F, G + 1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + H f246(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f271(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, R1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 + A f246(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f271(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, I * S1, Y, C - R1, A1, U1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= G f223(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f1(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= A f215(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f177(A, B, C, D, E, F, G - 1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + H f208(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f177(A, B, C, D, E, F, G - 1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + H f200(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f190(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + H f193(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f200(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, R1, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: E * I >= E * S1 * U1 && E * S1 * U1 + S1 >= E * I + 1 && S1 >= R1 && E * I >= E * U1 * X1 && E * U1 * X1 + X1 >= E * I + 1 && R1 >= X1 && A >= 1 + H f190(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f208(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + F f182(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f190(A, B, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= E + 1 && 1 >= E * S1 && E * S1 + S1 >= 2 && R1 >= S1 && 1 >= E * U1 && E * U1 + U1 >= 2 && U1 >= R1 && K >= 1 + F f182(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f190(A, B, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: E >= 1 && 1 >= E * S1 && E * S1 + S1 >= 2 && R1 >= S1 && 1 >= E * U1 && E * U1 + U1 >= 2 && U1 >= R1 && K >= 1 + F f182(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f215(A, B, C, D, 0, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + F && E >= 0 && E <= 0 f177(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f223(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= G f164(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f136(A, G, C, D, R1, F, G - 1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + F f156(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f147(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + F f150(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f156(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + F f147(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f164(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + F f141(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f147(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + F f136(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f177(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= G f121(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f130(A, B, C, D, E, F, G, H, I, J, K, L, C, R1, S1, R1 + S1, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + F f113(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f104(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + F f107(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f113(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + F f104(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f121(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + H f98(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f104(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + F f80(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f98(A, B, C, D, -(R1), F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, S1, -(R1) * S1 - I, Z, A1, B1, C1, D1, E1, F1, G1, U1, R1, R1, K1, L1, M1, N1, O1, P1, Q1)) :|: S1 >= 0 && A >= 1 + F f80(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f98(A, B, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, S1, R1 * S1 - I, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, -(R1), U1, R1, M1, N1, O1, P1, Q1)) :|: 0 >= S1 + 1 && A >= 1 + F f72(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f80(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= D + 1 && A >= 1 + F f72(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f80(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: D >= 1 && A >= 1 + F f72(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f130(A, B, C, 0, E, F, G, H, I, J, K, L, C, R1, S1, R1 + S1, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + F && D >= 0 && D <= 0 f60(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f69(A, B, C, 0, 0, F, G, H, 0, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + H f52(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f42(A, B, C, D, E, F, G, H, I, J, K + 1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + H f45(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f52(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, R1, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: I >= Y * S1 && Y * S1 + S1 >= I + 1 && S1 >= R1 && I >= Y * U1 && Y * U1 + U1 >= I + 1 && R1 >= U1 && A >= 1 + H f42(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f60(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: K >= 1 + F f24(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f42(A, B, C, D, -(R1), F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, S1, -(R1) * S1 - I, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, U1, R1, R1, P1, Q1)) :|: S1 >= 0 && A >= 1 + H f24(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f42(A, B, C, D, R1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, S1, R1 * S1 - I, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, -(R1), U1, R1)) :|: 0 >= S1 + 1 && A >= 1 + H f16(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f24(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: 0 >= D + 1 && A >= 1 + H f16(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f24(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: D >= 1 && A >= 1 + H f16(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f69(A, B, C, 0, 0, F, G, H, 0, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: A >= 1 + H && D >= 0 && D <= 0 f7(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1) -> Com_1(f136(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1, B1, C1, D1, E1, F1, G1, H1, I1, J1, K1, L1, M1, N1, O1, P1, Q1)) :|: G >= 1 + F The start-symbols are:[f2_43] ---------------------------------------- (1) Loat Proof (FINISHED) ### Pre-processing the ITS problem ### Initial linear ITS problem Start location: f2 0: f271 -> f281 : [ A>=1+B ], cost: 1 1: f271 -> f281 : [ B>=1+A ], cost: 1 55: f271 -> f275 : A'=B, [ 0>=1+B1 && B==A ], cost: 1 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 3: f7 -> f16 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G ], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 4: f16 -> f16 : A'=1+A, D'=D+free, J'=free, [ H>=A ], cost: 1 108: f16 -> f24 : [ 0>=1+D && A>=1+H ], cost: 1 109: f16 -> f24 : [ D>=1 && A>=1+H ], cost: 1 110: f16 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H && D==0 ], cost: 1 5: f24 -> f24 : A'=1+A, Q'=free_2*free_1+Q, [ H>=A ], cost: 1 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 6: f42 -> f45 : [ F>=K ], cost: 1 105: f42 -> f60 : [ K>=1+F ], cost: 1 7: f45 -> f45 : A'=1+A, Q'=free_3*free_4+Q, [ H>=A ], cost: 1 104: f45 -> f52 : X'=free_154, [ Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 1 8: f52 -> f52 : A'=1+A, [ H>=A ], cost: 1 103: f52 -> f42 : K'=1+K, [ A>=1+H ], cost: 1 9: f60 -> f60 : A'=1+A, [ H>=A ], cost: 1 102: f60 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H ], cost: 1 11: f69 -> f72 : [ F>=1+G && H>=G ], cost: 1 12: f69 -> f72 : [ G>=1+F && H>=G ], cost: 1 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 13: f72 -> f72 : A'=1+A, D'=free_5+D, L'=free_5, [ F>=A ], cost: 1 99: f72 -> f80 : [ 0>=1+D && A>=1+F ], cost: 1 100: f72 -> f80 : [ D>=1 && A>=1+F ], cost: 1 101: f72 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ A>=1+F && D==0 ], cost: 1 14: f80 -> f80 : A'=1+A, Q'=Q+free_6*free_7, [ F>=A ], cost: 1 97: f80 -> f98 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 1 98: f80 -> f98 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 1 15: f98 -> f98 : A'=1+A, [ F>=A ], cost: 1 96: f98 -> f104 : [ A>=1+F ], cost: 1 16: f104 -> f107 : [ H>=K ], cost: 1 95: f104 -> f121 : [ K>=1+H ], cost: 1 17: f107 -> f107 : A'=1+A, Q'=free_8*free_9+Q, [ F>=A ], cost: 1 94: f107 -> f113 : [ A>=1+F ], cost: 1 18: f113 -> f113 : A'=1+A, [ F>=A ], cost: 1 93: f113 -> f104 : K'=1+K, [ A>=1+F ], cost: 1 19: f121 -> f121 : A'=1+A, [ F>=A ], cost: 1 92: f121 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ A>=1+F ], cost: 1 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 24: f136 -> f141 : [ F>=1+G && 0>=1+E && G>=1 ], cost: 1 25: f136 -> f141 : [ F>=1+G && E>=1 && G>=1 ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 32: f136 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1 && G>=F ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 26: f141 -> f141 : K'=1+K, [ F>=K ], cost: 1 90: f141 -> f147 : [ K>=1+F ], cost: 1 27: f147 -> f150 : [ F>=K ], cost: 1 89: f147 -> f164 : [ K>=1+F ], cost: 1 28: f150 -> f150 : A'=1+A, Q'=free_15*free_14+Q, [ F>=A ], cost: 1 88: f150 -> f156 : [ A>=1+F ], cost: 1 29: f156 -> f156 : A'=1+A, [ F>=A ], cost: 1 87: f156 -> f147 : K'=1+K, [ A>=1+F ], cost: 1 31: f164 -> f164 : K'=1+K, Q_1'=0, [ F>=K ], cost: 1 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 33: f177 -> f182 : B'=1+G, E'=free_17, [ G>=1 ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 34: f182 -> f182 : K'=1+K, [ F>=K ], cost: 1 82: f182 -> f190 : E'=free_137, [ 0>=1+E && 1>=E*free_136 && free_136+E*free_136>=2 && free_137>=free_136 && 1>=E*free_138 && E*free_138+free_138>=2 && free_138>=free_137 && K>=1+F ], cost: 1 83: f182 -> f190 : E'=free_140, [ E>=1 && 1>=E*free_139 && free_139+E*free_139>=2 && free_140>=free_139 && 1>=E*free_141 && free_141+E*free_141>=2 && free_141>=free_140 && K>=1+F ], cost: 1 84: f182 -> f215 : E'=0, [ K>=1+F && E==0 ], cost: 1 35: f190 -> f193 : [ F>=K ], cost: 1 81: f190 -> f208 : [ K>=1+F ], cost: 1 36: f193 -> f193 : A'=1+A, Q'=free_18*free_19+Q, [ H>=A ], cost: 1 80: f193 -> f200 : X'=free_134, [ E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 1 37: f200 -> f200 : A'=1+A, [ H>=A ], cost: 1 79: f200 -> f190 : K'=1+K, [ A>=1+H ], cost: 1 38: f208 -> f208 : K'=1+K, [ H>=K ], cost: 1 78: f208 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 39: f215 -> f215 : K'=1+K, [ H>=K ], cost: 1 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 76: f223 -> f1 : A1'=B, A2'=C, B'=D, B1'=E, B2'=F, C'=G, C1'=H, C2'=Q, D'=J, D1'=K, D2'=L, E'=M, E1'=N, E2'=O, F'=P, F1'=Q_1, F2'=R, G'=S, G1'=T, G2'=U, H'=V, H1'=W, H2'=X, Q'=Y, Q1'=Z, Q2'=A1, J'=B1, J1'=C1, J2'=D1, K'=E1, K1'=F1, L'=G1, L1'=H1, M'=Q1, M1'=J1, N'=K1, N1'=L1, O'=M1, O1'=N1, P'=O1, Q_1'=Q1_1, [ 0>=A ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 42: f230 -> f241 : [ 0>=B ], cost: 1 43: f230 -> f241 : S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 1 44: f230 -> f238 : T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 ], cost: 1 45: f230 -> f238 : T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 ], cost: 1 46: f238 -> f241 : [], cost: 1 47: f238 -> f230 : B'=-1+B, [ 0>=1+V ], cost: 1 48: f238 -> f230 : B'=-1+B, [ V>=1 ], cost: 1 49: f241 -> f246 : Q'=1, W'=0, [ 0>=1+S ], cost: 1 50: f241 -> f246 : Q'=1, W'=0, [ S>=1 ], cost: 1 54: f241 -> f271 : B1'=free_49, S'=0, [ S==0 ], cost: 1 51: f246 -> f260 : E'=free_31, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 ], cost: 1 52: f246 -> f260 : E'=free_42, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && 1>=free_40*free_43 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 ], cost: 1 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 53: f260 -> f260 : A1'=free_48, B1'=free_47, K'=1+K, [ H>=K ], cost: 1 73: f260 -> f246 : G'=1+G, [ K>=1+H ], cost: 1 56: f275 -> f275 : K'=1+K, [ F>=K ], cost: 1 72: f275 -> f223 : A'=-1+A, [ K>=1+F ], cost: 1 57: f281 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ 29>=R ], cost: 1 58: f281 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ R>=31 ], cost: 1 59: f281 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ R==30 ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 62: f299 -> f315 : A1'=free_90, B1'=free_82, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 63: f315 -> f315 : B1'=free_97, C1'=free_96, G1'=1+G1, [ F>=G1 ], cost: 1 66: f315 -> f332 : B1'=0, C1'=-E*Q+W*A1, X'=W*E+A1*Q, [ G1>=1+F ], cost: 1 67: f315 -> f332 : B1'=free_102, C1'=-free_104+free_111, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 ], cost: 1 68: f315 -> f332 : B1'=free_116, C1'=-free_118+free_125, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 ], cost: 1 64: f332 -> f332 : A1'=free_99, B1'=free_98, G1'=1+G1, [ H>=G1 ], cost: 1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Checking for constant complexity: The following rule is satisfiable with cost >= 1, yielding constant complexity: 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 Removed unreachable and leaf rules: Start location: f2 0: f271 -> f281 : [ A>=1+B ], cost: 1 1: f271 -> f281 : [ B>=1+A ], cost: 1 55: f271 -> f275 : A'=B, [ 0>=1+B1 && B==A ], cost: 1 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 3: f7 -> f16 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G ], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 4: f16 -> f16 : A'=1+A, D'=D+free, J'=free, [ H>=A ], cost: 1 108: f16 -> f24 : [ 0>=1+D && A>=1+H ], cost: 1 109: f16 -> f24 : [ D>=1 && A>=1+H ], cost: 1 110: f16 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H && D==0 ], cost: 1 5: f24 -> f24 : A'=1+A, Q'=free_2*free_1+Q, [ H>=A ], cost: 1 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 6: f42 -> f45 : [ F>=K ], cost: 1 105: f42 -> f60 : [ K>=1+F ], cost: 1 7: f45 -> f45 : A'=1+A, Q'=free_3*free_4+Q, [ H>=A ], cost: 1 104: f45 -> f52 : X'=free_154, [ Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 1 8: f52 -> f52 : A'=1+A, [ H>=A ], cost: 1 103: f52 -> f42 : K'=1+K, [ A>=1+H ], cost: 1 9: f60 -> f60 : A'=1+A, [ H>=A ], cost: 1 102: f60 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H ], cost: 1 11: f69 -> f72 : [ F>=1+G && H>=G ], cost: 1 12: f69 -> f72 : [ G>=1+F && H>=G ], cost: 1 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 13: f72 -> f72 : A'=1+A, D'=free_5+D, L'=free_5, [ F>=A ], cost: 1 99: f72 -> f80 : [ 0>=1+D && A>=1+F ], cost: 1 100: f72 -> f80 : [ D>=1 && A>=1+F ], cost: 1 101: f72 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ A>=1+F && D==0 ], cost: 1 14: f80 -> f80 : A'=1+A, Q'=Q+free_6*free_7, [ F>=A ], cost: 1 97: f80 -> f98 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 1 98: f80 -> f98 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 1 15: f98 -> f98 : A'=1+A, [ F>=A ], cost: 1 96: f98 -> f104 : [ A>=1+F ], cost: 1 16: f104 -> f107 : [ H>=K ], cost: 1 95: f104 -> f121 : [ K>=1+H ], cost: 1 17: f107 -> f107 : A'=1+A, Q'=free_8*free_9+Q, [ F>=A ], cost: 1 94: f107 -> f113 : [ A>=1+F ], cost: 1 18: f113 -> f113 : A'=1+A, [ F>=A ], cost: 1 93: f113 -> f104 : K'=1+K, [ A>=1+F ], cost: 1 19: f121 -> f121 : A'=1+A, [ F>=A ], cost: 1 92: f121 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ A>=1+F ], cost: 1 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 24: f136 -> f141 : [ F>=1+G && 0>=1+E && G>=1 ], cost: 1 25: f136 -> f141 : [ F>=1+G && E>=1 && G>=1 ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 32: f136 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1 && G>=F ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 26: f141 -> f141 : K'=1+K, [ F>=K ], cost: 1 90: f141 -> f147 : [ K>=1+F ], cost: 1 27: f147 -> f150 : [ F>=K ], cost: 1 89: f147 -> f164 : [ K>=1+F ], cost: 1 28: f150 -> f150 : A'=1+A, Q'=free_15*free_14+Q, [ F>=A ], cost: 1 88: f150 -> f156 : [ A>=1+F ], cost: 1 29: f156 -> f156 : A'=1+A, [ F>=A ], cost: 1 87: f156 -> f147 : K'=1+K, [ A>=1+F ], cost: 1 31: f164 -> f164 : K'=1+K, Q_1'=0, [ F>=K ], cost: 1 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 33: f177 -> f182 : B'=1+G, E'=free_17, [ G>=1 ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 34: f182 -> f182 : K'=1+K, [ F>=K ], cost: 1 82: f182 -> f190 : E'=free_137, [ 0>=1+E && 1>=E*free_136 && free_136+E*free_136>=2 && free_137>=free_136 && 1>=E*free_138 && E*free_138+free_138>=2 && free_138>=free_137 && K>=1+F ], cost: 1 83: f182 -> f190 : E'=free_140, [ E>=1 && 1>=E*free_139 && free_139+E*free_139>=2 && free_140>=free_139 && 1>=E*free_141 && free_141+E*free_141>=2 && free_141>=free_140 && K>=1+F ], cost: 1 84: f182 -> f215 : E'=0, [ K>=1+F && E==0 ], cost: 1 35: f190 -> f193 : [ F>=K ], cost: 1 81: f190 -> f208 : [ K>=1+F ], cost: 1 36: f193 -> f193 : A'=1+A, Q'=free_18*free_19+Q, [ H>=A ], cost: 1 80: f193 -> f200 : X'=free_134, [ E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 1 37: f200 -> f200 : A'=1+A, [ H>=A ], cost: 1 79: f200 -> f190 : K'=1+K, [ A>=1+H ], cost: 1 38: f208 -> f208 : K'=1+K, [ H>=K ], cost: 1 78: f208 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 39: f215 -> f215 : K'=1+K, [ H>=K ], cost: 1 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 42: f230 -> f241 : [ 0>=B ], cost: 1 43: f230 -> f241 : S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 1 44: f230 -> f238 : T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 ], cost: 1 45: f230 -> f238 : T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 ], cost: 1 46: f238 -> f241 : [], cost: 1 47: f238 -> f230 : B'=-1+B, [ 0>=1+V ], cost: 1 48: f238 -> f230 : B'=-1+B, [ V>=1 ], cost: 1 49: f241 -> f246 : Q'=1, W'=0, [ 0>=1+S ], cost: 1 50: f241 -> f246 : Q'=1, W'=0, [ S>=1 ], cost: 1 54: f241 -> f271 : B1'=free_49, S'=0, [ S==0 ], cost: 1 51: f246 -> f260 : E'=free_31, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 ], cost: 1 52: f246 -> f260 : E'=free_42, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && 1>=free_40*free_43 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 ], cost: 1 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 53: f260 -> f260 : A1'=free_48, B1'=free_47, K'=1+K, [ H>=K ], cost: 1 73: f260 -> f246 : G'=1+G, [ K>=1+H ], cost: 1 56: f275 -> f275 : K'=1+K, [ F>=K ], cost: 1 72: f275 -> f223 : A'=-1+A, [ K>=1+F ], cost: 1 57: f281 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ 29>=R ], cost: 1 58: f281 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ R>=31 ], cost: 1 59: f281 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ R==30 ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 62: f299 -> f315 : A1'=free_90, B1'=free_82, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 63: f315 -> f315 : B1'=free_97, C1'=free_96, G1'=1+G1, [ F>=G1 ], cost: 1 66: f315 -> f332 : B1'=0, C1'=-E*Q+W*A1, X'=W*E+A1*Q, [ G1>=1+F ], cost: 1 67: f315 -> f332 : B1'=free_102, C1'=-free_104+free_111, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 ], cost: 1 68: f315 -> f332 : B1'=free_116, C1'=-free_118+free_125, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 ], cost: 1 64: f332 -> f332 : A1'=free_99, B1'=free_98, G1'=1+G1, [ H>=G1 ], cost: 1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Removed rules with unsatisfiable guard: Start location: f2 0: f271 -> f281 : [ A>=1+B ], cost: 1 1: f271 -> f281 : [ B>=1+A ], cost: 1 55: f271 -> f275 : A'=B, [ 0>=1+B1 && B==A ], cost: 1 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 3: f7 -> f16 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G ], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 4: f16 -> f16 : A'=1+A, D'=D+free, J'=free, [ H>=A ], cost: 1 108: f16 -> f24 : [ 0>=1+D && A>=1+H ], cost: 1 109: f16 -> f24 : [ D>=1 && A>=1+H ], cost: 1 110: f16 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H && D==0 ], cost: 1 5: f24 -> f24 : A'=1+A, Q'=free_2*free_1+Q, [ H>=A ], cost: 1 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 6: f42 -> f45 : [ F>=K ], cost: 1 105: f42 -> f60 : [ K>=1+F ], cost: 1 7: f45 -> f45 : A'=1+A, Q'=free_3*free_4+Q, [ H>=A ], cost: 1 104: f45 -> f52 : X'=free_154, [ Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 1 8: f52 -> f52 : A'=1+A, [ H>=A ], cost: 1 103: f52 -> f42 : K'=1+K, [ A>=1+H ], cost: 1 9: f60 -> f60 : A'=1+A, [ H>=A ], cost: 1 102: f60 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H ], cost: 1 11: f69 -> f72 : [ F>=1+G && H>=G ], cost: 1 12: f69 -> f72 : [ G>=1+F && H>=G ], cost: 1 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 13: f72 -> f72 : A'=1+A, D'=free_5+D, L'=free_5, [ F>=A ], cost: 1 99: f72 -> f80 : [ 0>=1+D && A>=1+F ], cost: 1 100: f72 -> f80 : [ D>=1 && A>=1+F ], cost: 1 101: f72 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ A>=1+F && D==0 ], cost: 1 14: f80 -> f80 : A'=1+A, Q'=Q+free_6*free_7, [ F>=A ], cost: 1 97: f80 -> f98 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 1 98: f80 -> f98 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 1 15: f98 -> f98 : A'=1+A, [ F>=A ], cost: 1 96: f98 -> f104 : [ A>=1+F ], cost: 1 16: f104 -> f107 : [ H>=K ], cost: 1 95: f104 -> f121 : [ K>=1+H ], cost: 1 17: f107 -> f107 : A'=1+A, Q'=free_8*free_9+Q, [ F>=A ], cost: 1 94: f107 -> f113 : [ A>=1+F ], cost: 1 18: f113 -> f113 : A'=1+A, [ F>=A ], cost: 1 93: f113 -> f104 : K'=1+K, [ A>=1+F ], cost: 1 19: f121 -> f121 : A'=1+A, [ F>=A ], cost: 1 92: f121 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ A>=1+F ], cost: 1 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 24: f136 -> f141 : [ F>=1+G && 0>=1+E && G>=1 ], cost: 1 25: f136 -> f141 : [ F>=1+G && E>=1 && G>=1 ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 32: f136 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1 && G>=F ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 26: f141 -> f141 : K'=1+K, [ F>=K ], cost: 1 90: f141 -> f147 : [ K>=1+F ], cost: 1 27: f147 -> f150 : [ F>=K ], cost: 1 89: f147 -> f164 : [ K>=1+F ], cost: 1 28: f150 -> f150 : A'=1+A, Q'=free_15*free_14+Q, [ F>=A ], cost: 1 88: f150 -> f156 : [ A>=1+F ], cost: 1 29: f156 -> f156 : A'=1+A, [ F>=A ], cost: 1 87: f156 -> f147 : K'=1+K, [ A>=1+F ], cost: 1 31: f164 -> f164 : K'=1+K, Q_1'=0, [ F>=K ], cost: 1 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 33: f177 -> f182 : B'=1+G, E'=free_17, [ G>=1 ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 34: f182 -> f182 : K'=1+K, [ F>=K ], cost: 1 83: f182 -> f190 : E'=free_140, [ E>=1 && 1>=E*free_139 && free_139+E*free_139>=2 && free_140>=free_139 && 1>=E*free_141 && free_141+E*free_141>=2 && free_141>=free_140 && K>=1+F ], cost: 1 84: f182 -> f215 : E'=0, [ K>=1+F && E==0 ], cost: 1 35: f190 -> f193 : [ F>=K ], cost: 1 81: f190 -> f208 : [ K>=1+F ], cost: 1 36: f193 -> f193 : A'=1+A, Q'=free_18*free_19+Q, [ H>=A ], cost: 1 80: f193 -> f200 : X'=free_134, [ E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 1 37: f200 -> f200 : A'=1+A, [ H>=A ], cost: 1 79: f200 -> f190 : K'=1+K, [ A>=1+H ], cost: 1 38: f208 -> f208 : K'=1+K, [ H>=K ], cost: 1 78: f208 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 39: f215 -> f215 : K'=1+K, [ H>=K ], cost: 1 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 42: f230 -> f241 : [ 0>=B ], cost: 1 43: f230 -> f241 : S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 1 44: f230 -> f238 : T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 ], cost: 1 45: f230 -> f238 : T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 ], cost: 1 46: f238 -> f241 : [], cost: 1 47: f238 -> f230 : B'=-1+B, [ 0>=1+V ], cost: 1 48: f238 -> f230 : B'=-1+B, [ V>=1 ], cost: 1 49: f241 -> f246 : Q'=1, W'=0, [ 0>=1+S ], cost: 1 50: f241 -> f246 : Q'=1, W'=0, [ S>=1 ], cost: 1 54: f241 -> f271 : B1'=free_49, S'=0, [ S==0 ], cost: 1 51: f246 -> f260 : E'=free_31, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 ], cost: 1 52: f246 -> f260 : E'=free_42, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && 1>=free_40*free_43 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 ], cost: 1 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 53: f260 -> f260 : A1'=free_48, B1'=free_47, K'=1+K, [ H>=K ], cost: 1 73: f260 -> f246 : G'=1+G, [ K>=1+H ], cost: 1 56: f275 -> f275 : K'=1+K, [ F>=K ], cost: 1 72: f275 -> f223 : A'=-1+A, [ K>=1+F ], cost: 1 57: f281 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ 29>=R ], cost: 1 58: f281 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ R>=31 ], cost: 1 59: f281 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ R==30 ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 62: f299 -> f315 : A1'=free_90, B1'=free_82, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 63: f315 -> f315 : B1'=free_97, C1'=free_96, G1'=1+G1, [ F>=G1 ], cost: 1 66: f315 -> f332 : B1'=0, C1'=-E*Q+W*A1, X'=W*E+A1*Q, [ G1>=1+F ], cost: 1 67: f315 -> f332 : B1'=free_102, C1'=-free_104+free_111, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 ], cost: 1 68: f315 -> f332 : B1'=free_116, C1'=-free_118+free_125, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 ], cost: 1 64: f332 -> f332 : A1'=free_99, B1'=free_98, G1'=1+G1, [ H>=G1 ], cost: 1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Simplified all rules, resulting in: Start location: f2 0: f271 -> f281 : [ A>=1+B ], cost: 1 1: f271 -> f281 : [ B>=1+A ], cost: 1 55: f271 -> f275 : A'=B, [ 0>=1+B1 && B==A ], cost: 1 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 3: f7 -> f16 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G ], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 4: f16 -> f16 : A'=1+A, D'=D+free, J'=free, [ H>=A ], cost: 1 108: f16 -> f24 : [ 0>=1+D && A>=1+H ], cost: 1 109: f16 -> f24 : [ D>=1 && A>=1+H ], cost: 1 110: f16 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H && D==0 ], cost: 1 5: f24 -> f24 : A'=1+A, Q'=free_2*free_1+Q, [ H>=A ], cost: 1 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 6: f42 -> f45 : [ F>=K ], cost: 1 105: f42 -> f60 : [ K>=1+F ], cost: 1 7: f45 -> f45 : A'=1+A, Q'=free_3*free_4+Q, [ H>=A ], cost: 1 104: f45 -> f52 : X'=free_154, [ Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 1 8: f52 -> f52 : A'=1+A, [ H>=A ], cost: 1 103: f52 -> f42 : K'=1+K, [ A>=1+H ], cost: 1 9: f60 -> f60 : A'=1+A, [ H>=A ], cost: 1 102: f60 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H ], cost: 1 11: f69 -> f72 : [ F>=1+G && H>=G ], cost: 1 12: f69 -> f72 : [ G>=1+F && H>=G ], cost: 1 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 13: f72 -> f72 : A'=1+A, D'=free_5+D, L'=free_5, [ F>=A ], cost: 1 99: f72 -> f80 : [ 0>=1+D && A>=1+F ], cost: 1 100: f72 -> f80 : [ D>=1 && A>=1+F ], cost: 1 101: f72 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ A>=1+F && D==0 ], cost: 1 14: f80 -> f80 : A'=1+A, Q'=Q+free_6*free_7, [ F>=A ], cost: 1 97: f80 -> f98 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 1 98: f80 -> f98 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 1 15: f98 -> f98 : A'=1+A, [ F>=A ], cost: 1 96: f98 -> f104 : [ A>=1+F ], cost: 1 16: f104 -> f107 : [ H>=K ], cost: 1 95: f104 -> f121 : [ K>=1+H ], cost: 1 17: f107 -> f107 : A'=1+A, Q'=free_8*free_9+Q, [ F>=A ], cost: 1 94: f107 -> f113 : [ A>=1+F ], cost: 1 18: f113 -> f113 : A'=1+A, [ F>=A ], cost: 1 93: f113 -> f104 : K'=1+K, [ A>=1+F ], cost: 1 19: f121 -> f121 : A'=1+A, [ F>=A ], cost: 1 92: f121 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ A>=1+F ], cost: 1 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 24: f136 -> f141 : [ F>=1+G && 0>=1+E && G>=1 ], cost: 1 25: f136 -> f141 : [ F>=1+G && E>=1 && G>=1 ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 32: f136 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1 && G>=F ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 26: f141 -> f141 : K'=1+K, [ F>=K ], cost: 1 90: f141 -> f147 : [ K>=1+F ], cost: 1 27: f147 -> f150 : [ F>=K ], cost: 1 89: f147 -> f164 : [ K>=1+F ], cost: 1 28: f150 -> f150 : A'=1+A, Q'=free_15*free_14+Q, [ F>=A ], cost: 1 88: f150 -> f156 : [ A>=1+F ], cost: 1 29: f156 -> f156 : A'=1+A, [ F>=A ], cost: 1 87: f156 -> f147 : K'=1+K, [ A>=1+F ], cost: 1 31: f164 -> f164 : K'=1+K, Q_1'=0, [ F>=K ], cost: 1 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 33: f177 -> f182 : B'=1+G, E'=free_17, [ G>=1 ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 34: f182 -> f182 : K'=1+K, [ F>=K ], cost: 1 83: f182 -> f190 : E'=free_140, [ E>=1 && 1>=E*free_139 && free_139+E*free_139>=2 && free_140>=free_139 && 1>=E*free_141 && free_141+E*free_141>=2 && free_141>=free_140 && K>=1+F ], cost: 1 84: f182 -> f215 : E'=0, [ K>=1+F && E==0 ], cost: 1 35: f190 -> f193 : [ F>=K ], cost: 1 81: f190 -> f208 : [ K>=1+F ], cost: 1 36: f193 -> f193 : A'=1+A, Q'=free_18*free_19+Q, [ H>=A ], cost: 1 80: f193 -> f200 : X'=free_134, [ E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 1 37: f200 -> f200 : A'=1+A, [ H>=A ], cost: 1 79: f200 -> f190 : K'=1+K, [ A>=1+H ], cost: 1 38: f208 -> f208 : K'=1+K, [ H>=K ], cost: 1 78: f208 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 39: f215 -> f215 : K'=1+K, [ H>=K ], cost: 1 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 42: f230 -> f241 : [ 0>=B ], cost: 1 43: f230 -> f241 : S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 1 44: f230 -> f238 : T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 ], cost: 1 45: f230 -> f238 : T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 ], cost: 1 46: f238 -> f241 : [], cost: 1 47: f238 -> f230 : B'=-1+B, [ 0>=1+V ], cost: 1 48: f238 -> f230 : B'=-1+B, [ V>=1 ], cost: 1 49: f241 -> f246 : Q'=1, W'=0, [ 0>=1+S ], cost: 1 50: f241 -> f246 : Q'=1, W'=0, [ S>=1 ], cost: 1 54: f241 -> f271 : B1'=free_49, S'=0, [ S==0 ], cost: 1 51: f246 -> f260 : E'=free_31, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 ], cost: 1 52: f246 -> f260 : E'=free_42, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 ], cost: 1 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 53: f260 -> f260 : A1'=free_48, B1'=free_47, K'=1+K, [ H>=K ], cost: 1 73: f260 -> f246 : G'=1+G, [ K>=1+H ], cost: 1 56: f275 -> f275 : K'=1+K, [ F>=K ], cost: 1 72: f275 -> f223 : A'=-1+A, [ K>=1+F ], cost: 1 57: f281 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ 29>=R ], cost: 1 58: f281 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ R>=31 ], cost: 1 59: f281 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ R==30 ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 62: f299 -> f315 : A1'=free_90, B1'=free_82, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 63: f315 -> f315 : B1'=free_97, C1'=free_96, G1'=1+G1, [ F>=G1 ], cost: 1 66: f315 -> f332 : B1'=0, C1'=-E*Q+W*A1, X'=W*E+A1*Q, [ G1>=1+F ], cost: 1 67: f315 -> f332 : B1'=free_102, C1'=-free_104+free_111, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 ], cost: 1 68: f315 -> f332 : B1'=free_116, C1'=-free_118+free_125, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 ], cost: 1 64: f332 -> f332 : A1'=free_99, B1'=free_98, G1'=1+G1, [ H>=G1 ], cost: 1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 ### Simplification by acceleration and chaining ### Accelerating simple loops of location 3. Accelerating the following rules: 4: f16 -> f16 : A'=1+A, D'=D+free, J'=free, [ H>=A ], cost: 1 Accelerated rule 4 with metering function 1-A+H, yielding the new rule 112. Removing the simple loops: 4. Accelerating simple loops of location 4. Accelerating the following rules: 5: f24 -> f24 : A'=1+A, Q'=free_2*free_1+Q, [ H>=A ], cost: 1 Accelerated rule 5 with metering function 1-A+H, yielding the new rule 113. Removing the simple loops: 5. Accelerating simple loops of location 6. Accelerating the following rules: 7: f45 -> f45 : A'=1+A, Q'=free_3*free_4+Q, [ H>=A ], cost: 1 Accelerated rule 7 with metering function 1-A+H, yielding the new rule 114. Removing the simple loops: 7. Accelerating simple loops of location 7. Accelerating the following rules: 8: f52 -> f52 : A'=1+A, [ H>=A ], cost: 1 Accelerated rule 8 with metering function 1-A+H, yielding the new rule 115. Removing the simple loops: 8. Accelerating simple loops of location 8. Accelerating the following rules: 9: f60 -> f60 : A'=1+A, [ H>=A ], cost: 1 Accelerated rule 9 with metering function 1-A+H, yielding the new rule 116. Removing the simple loops: 9. Accelerating simple loops of location 10. Accelerating the following rules: 13: f72 -> f72 : A'=1+A, D'=free_5+D, L'=free_5, [ F>=A ], cost: 1 Accelerated rule 13 with metering function 1+F-A, yielding the new rule 117. Removing the simple loops: 13. Accelerating simple loops of location 11. Accelerating the following rules: 14: f80 -> f80 : A'=1+A, Q'=Q+free_6*free_7, [ F>=A ], cost: 1 Accelerated rule 14 with metering function 1+F-A, yielding the new rule 118. Removing the simple loops: 14. Accelerating simple loops of location 12. Accelerating the following rules: 15: f98 -> f98 : A'=1+A, [ F>=A ], cost: 1 Accelerated rule 15 with metering function 1+F-A, yielding the new rule 119. Removing the simple loops: 15. Accelerating simple loops of location 14. Accelerating the following rules: 17: f107 -> f107 : A'=1+A, Q'=free_8*free_9+Q, [ F>=A ], cost: 1 Accelerated rule 17 with metering function 1+F-A, yielding the new rule 120. Removing the simple loops: 17. Accelerating simple loops of location 15. Accelerating the following rules: 18: f113 -> f113 : A'=1+A, [ F>=A ], cost: 1 Accelerated rule 18 with metering function 1+F-A, yielding the new rule 121. Removing the simple loops: 18. Accelerating simple loops of location 16. Accelerating the following rules: 19: f121 -> f121 : A'=1+A, [ F>=A ], cost: 1 Accelerated rule 19 with metering function 1+F-A, yielding the new rule 122. Removing the simple loops: 19. Accelerating simple loops of location 18. Accelerating the following rules: 32: f136 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1 && G>=F ], cost: 1 Found no metering function for rule 32. Removing the simple loops:. Accelerating simple loops of location 19. Accelerating the following rules: 26: f141 -> f141 : K'=1+K, [ F>=K ], cost: 1 Accelerated rule 26 with metering function 1+F-K, yielding the new rule 123. Removing the simple loops: 26. Accelerating simple loops of location 21. Accelerating the following rules: 28: f150 -> f150 : A'=1+A, Q'=free_15*free_14+Q, [ F>=A ], cost: 1 Accelerated rule 28 with metering function 1+F-A, yielding the new rule 124. Removing the simple loops: 28. Accelerating simple loops of location 22. Accelerating the following rules: 29: f156 -> f156 : A'=1+A, [ F>=A ], cost: 1 Accelerated rule 29 with metering function 1+F-A, yielding the new rule 125. Removing the simple loops: 29. Accelerating simple loops of location 23. Accelerating the following rules: 31: f164 -> f164 : K'=1+K, Q_1'=0, [ F>=K ], cost: 1 Accelerated rule 31 with metering function 1+F-K, yielding the new rule 126. Removing the simple loops: 31. Accelerating simple loops of location 25. Accelerating the following rules: 34: f182 -> f182 : K'=1+K, [ F>=K ], cost: 1 Accelerated rule 34 with metering function 1+F-K, yielding the new rule 127. Removing the simple loops: 34. Accelerating simple loops of location 27. Accelerating the following rules: 36: f193 -> f193 : A'=1+A, Q'=free_18*free_19+Q, [ H>=A ], cost: 1 Accelerated rule 36 with metering function 1-A+H, yielding the new rule 128. Removing the simple loops: 36. Accelerating simple loops of location 28. Accelerating the following rules: 37: f200 -> f200 : A'=1+A, [ H>=A ], cost: 1 Accelerated rule 37 with metering function 1-A+H, yielding the new rule 129. Removing the simple loops: 37. Accelerating simple loops of location 29. Accelerating the following rules: 38: f208 -> f208 : K'=1+K, [ H>=K ], cost: 1 Accelerated rule 38 with metering function 1-K+H, yielding the new rule 130. Removing the simple loops: 38. Accelerating simple loops of location 30. Accelerating the following rules: 39: f215 -> f215 : K'=1+K, [ H>=K ], cost: 1 Accelerated rule 39 with metering function 1-K+H, yielding the new rule 131. Removing the simple loops: 39. Accelerating simple loops of location 37. Accelerating the following rules: 53: f260 -> f260 : A1'=free_48, B1'=free_47, K'=1+K, [ H>=K ], cost: 1 Accelerated rule 53 with metering function 1-K+H, yielding the new rule 132. Removing the simple loops: 53. Accelerating simple loops of location 38. Accelerating the following rules: 56: f275 -> f275 : K'=1+K, [ F>=K ], cost: 1 Accelerated rule 56 with metering function 1+F-K, yielding the new rule 133. Removing the simple loops: 56. Accelerating simple loops of location 42. Accelerating the following rules: 63: f315 -> f315 : B1'=free_97, C1'=free_96, G1'=1+G1, [ F>=G1 ], cost: 1 Accelerated rule 63 with metering function 1+F-G1, yielding the new rule 134. Removing the simple loops: 63. Accelerating simple loops of location 43. Accelerating the following rules: 64: f332 -> f332 : A1'=free_99, B1'=free_98, G1'=1+G1, [ H>=G1 ], cost: 1 Accelerated rule 64 with metering function 1-G1+H, yielding the new rule 135. Removing the simple loops: 64. Accelerated all simple loops using metering functions (where possible): Start location: f2 0: f271 -> f281 : [ A>=1+B ], cost: 1 1: f271 -> f281 : [ B>=1+A ], cost: 1 55: f271 -> f275 : A'=B, [ 0>=1+B1 && B==A ], cost: 1 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 3: f7 -> f16 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G ], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 108: f16 -> f24 : [ 0>=1+D && A>=1+H ], cost: 1 109: f16 -> f24 : [ D>=1 && A>=1+H ], cost: 1 110: f16 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H && D==0 ], cost: 1 112: f16 -> f16 : A'=1+H, D'=D-(-1+A-H)*free, J'=free, [ H>=A ], cost: 1-A+H 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 113: f24 -> f24 : A'=1+H, Q'=-(-1+A-H)*free_2*free_1+Q, [ H>=A ], cost: 1-A+H 6: f42 -> f45 : [ F>=K ], cost: 1 105: f42 -> f60 : [ K>=1+F ], cost: 1 104: f45 -> f52 : X'=free_154, [ Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 1 114: f45 -> f45 : A'=1+H, Q'=-(-1+A-H)*free_3*free_4+Q, [ H>=A ], cost: 1-A+H 103: f52 -> f42 : K'=1+K, [ A>=1+H ], cost: 1 115: f52 -> f52 : A'=1+H, [ H>=A ], cost: 1-A+H 102: f60 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H ], cost: 1 116: f60 -> f60 : A'=1+H, [ H>=A ], cost: 1-A+H 11: f69 -> f72 : [ F>=1+G && H>=G ], cost: 1 12: f69 -> f72 : [ G>=1+F && H>=G ], cost: 1 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 99: f72 -> f80 : [ 0>=1+D && A>=1+F ], cost: 1 100: f72 -> f80 : [ D>=1 && A>=1+F ], cost: 1 101: f72 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ A>=1+F && D==0 ], cost: 1 117: f72 -> f72 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=A ], cost: 1+F-A 97: f80 -> f98 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 1 98: f80 -> f98 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 1 118: f80 -> f80 : A'=1+F, Q'=free_6*(1+F-A)*free_7+Q, [ F>=A ], cost: 1+F-A 96: f98 -> f104 : [ A>=1+F ], cost: 1 119: f98 -> f98 : A'=1+F, [ F>=A ], cost: 1+F-A 16: f104 -> f107 : [ H>=K ], cost: 1 95: f104 -> f121 : [ K>=1+H ], cost: 1 94: f107 -> f113 : [ A>=1+F ], cost: 1 120: f107 -> f107 : A'=1+F, Q'=free_8*free_9*(1+F-A)+Q, [ F>=A ], cost: 1+F-A 93: f113 -> f104 : K'=1+K, [ A>=1+F ], cost: 1 121: f113 -> f113 : A'=1+F, [ F>=A ], cost: 1+F-A 92: f121 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ A>=1+F ], cost: 1 122: f121 -> f121 : A'=1+F, [ F>=A ], cost: 1+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 24: f136 -> f141 : [ F>=1+G && 0>=1+E && G>=1 ], cost: 1 25: f136 -> f141 : [ F>=1+G && E>=1 && G>=1 ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 32: f136 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1 && G>=F ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 90: f141 -> f147 : [ K>=1+F ], cost: 1 123: f141 -> f141 : K'=1+F, [ F>=K ], cost: 1+F-K 27: f147 -> f150 : [ F>=K ], cost: 1 89: f147 -> f164 : [ K>=1+F ], cost: 1 88: f150 -> f156 : [ A>=1+F ], cost: 1 124: f150 -> f150 : A'=1+F, Q'=free_15*(1+F-A)*free_14+Q, [ F>=A ], cost: 1+F-A 87: f156 -> f147 : K'=1+K, [ A>=1+F ], cost: 1 125: f156 -> f156 : A'=1+F, [ F>=A ], cost: 1+F-A 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 126: f164 -> f164 : K'=1+F, Q_1'=0, [ F>=K ], cost: 1+F-K 33: f177 -> f182 : B'=1+G, E'=free_17, [ G>=1 ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 83: f182 -> f190 : E'=free_140, [ E>=1 && 1>=E*free_139 && free_139+E*free_139>=2 && free_140>=free_139 && 1>=E*free_141 && free_141+E*free_141>=2 && free_141>=free_140 && K>=1+F ], cost: 1 84: f182 -> f215 : E'=0, [ K>=1+F && E==0 ], cost: 1 127: f182 -> f182 : K'=1+F, [ F>=K ], cost: 1+F-K 35: f190 -> f193 : [ F>=K ], cost: 1 81: f190 -> f208 : [ K>=1+F ], cost: 1 80: f193 -> f200 : X'=free_134, [ E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 1 128: f193 -> f193 : A'=1+H, Q'=-free_18*(-1+A-H)*free_19+Q, [ H>=A ], cost: 1-A+H 79: f200 -> f190 : K'=1+K, [ A>=1+H ], cost: 1 129: f200 -> f200 : A'=1+H, [ H>=A ], cost: 1-A+H 78: f208 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 130: f208 -> f208 : K'=1+H, [ H>=K ], cost: 1-K+H 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 131: f215 -> f215 : K'=1+H, [ H>=K ], cost: 1-K+H 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 42: f230 -> f241 : [ 0>=B ], cost: 1 43: f230 -> f241 : S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 1 44: f230 -> f238 : T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 ], cost: 1 45: f230 -> f238 : T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 ], cost: 1 46: f238 -> f241 : [], cost: 1 47: f238 -> f230 : B'=-1+B, [ 0>=1+V ], cost: 1 48: f238 -> f230 : B'=-1+B, [ V>=1 ], cost: 1 49: f241 -> f246 : Q'=1, W'=0, [ 0>=1+S ], cost: 1 50: f241 -> f246 : Q'=1, W'=0, [ S>=1 ], cost: 1 54: f241 -> f271 : B1'=free_49, S'=0, [ S==0 ], cost: 1 51: f246 -> f260 : E'=free_31, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 ], cost: 1 52: f246 -> f260 : E'=free_42, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 ], cost: 1 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 73: f260 -> f246 : G'=1+G, [ K>=1+H ], cost: 1 132: f260 -> f260 : A1'=free_48, B1'=free_47, K'=1+H, [ H>=K ], cost: 1-K+H 72: f275 -> f223 : A'=-1+A, [ K>=1+F ], cost: 1 133: f275 -> f275 : K'=1+F, [ F>=K ], cost: 1+F-K 57: f281 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ 29>=R ], cost: 1 58: f281 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ R>=31 ], cost: 1 59: f281 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ R==30 ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 62: f299 -> f315 : A1'=free_90, B1'=free_82, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 66: f315 -> f332 : B1'=0, C1'=-E*Q+W*A1, X'=W*E+A1*Q, [ G1>=1+F ], cost: 1 67: f315 -> f332 : B1'=free_102, C1'=-free_104+free_111, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 ], cost: 1 68: f315 -> f332 : B1'=free_116, C1'=-free_118+free_125, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 ], cost: 1 134: f315 -> f315 : B1'=free_97, C1'=free_96, G1'=1+F, [ F>=G1 ], cost: 1+F-G1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 135: f332 -> f332 : A1'=free_99, B1'=free_98, G1'=1+H, [ H>=G1 ], cost: 1-G1+H Chained accelerated rules (with incoming rules): Start location: f2 0: f271 -> f281 : [ A>=1+B ], cost: 1 1: f271 -> f281 : [ B>=1+A ], cost: 1 55: f271 -> f275 : A'=B, [ 0>=1+B1 && B==A ], cost: 1 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 155: f271 -> f275 : A'=B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 2+F-K 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 3: f7 -> f16 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G ], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 136: f7 -> f16 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A ], cost: 2-A+H 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 108: f16 -> f24 : [ 0>=1+D && A>=1+H ], cost: 1 109: f16 -> f24 : [ D>=1 && A>=1+H ], cost: 1 110: f16 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H && D==0 ], cost: 1 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 6: f42 -> f45 : [ F>=K ], cost: 1 105: f42 -> f60 : [ K>=1+F ], cost: 1 137: f42 -> f45 : A'=1+H, Q'=-(-1+A-H)*free_3*free_4+Q, [ F>=K && H>=A ], cost: 2-A+H 138: f42 -> f60 : A'=1+H, [ K>=1+F && H>=A ], cost: 2-A+H 104: f45 -> f52 : X'=free_154, [ Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 1 103: f52 -> f42 : K'=1+K, [ A>=1+H ], cost: 1 102: f60 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H ], cost: 1 11: f69 -> f72 : [ F>=1+G && H>=G ], cost: 1 12: f69 -> f72 : [ G>=1+F && H>=G ], cost: 1 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 139: f69 -> f72 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A ], cost: 2+F-A 140: f69 -> f72 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A ], cost: 2+F-A 99: f72 -> f80 : [ 0>=1+D && A>=1+F ], cost: 1 100: f72 -> f80 : [ D>=1 && A>=1+F ], cost: 1 101: f72 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ A>=1+F && D==0 ], cost: 1 97: f80 -> f98 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 1 98: f80 -> f98 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 1 96: f98 -> f104 : [ A>=1+F ], cost: 1 16: f104 -> f107 : [ H>=K ], cost: 1 95: f104 -> f121 : [ K>=1+H ], cost: 1 141: f104 -> f107 : A'=1+F, Q'=free_8*free_9*(1+F-A)+Q, [ H>=K && F>=A ], cost: 2+F-A 142: f104 -> f121 : A'=1+F, [ K>=1+H && F>=A ], cost: 2+F-A 94: f107 -> f113 : [ A>=1+F ], cost: 1 93: f113 -> f104 : K'=1+K, [ A>=1+F ], cost: 1 92: f121 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ A>=1+F ], cost: 1 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 24: f136 -> f141 : [ F>=1+G && 0>=1+E && G>=1 ], cost: 1 25: f136 -> f141 : [ F>=1+G && E>=1 && G>=1 ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 145: f136 -> f141 : K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 2+F-K 146: f136 -> f141 : K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 2+F-K 148: f136 -> f164 : E'=0, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 90: f141 -> f147 : [ K>=1+F ], cost: 1 27: f147 -> f150 : [ F>=K ], cost: 1 89: f147 -> f164 : [ K>=1+F ], cost: 1 147: f147 -> f150 : A'=1+F, Q'=free_15*(1+F-A)*free_14+Q, [ F>=K && F>=A ], cost: 2+F-A 88: f150 -> f156 : [ A>=1+F ], cost: 1 87: f156 -> f147 : K'=1+K, [ A>=1+F ], cost: 1 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 143: f164 -> f136 : B'=-1+G, E'=free_16, G'=-2+G, [ K>=1+F && -1+G>=1 && -1+G>=F ], cost: 2 33: f177 -> f182 : B'=1+G, E'=free_17, [ G>=1 ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 149: f177 -> f182 : B'=1+G, E'=free_17, K'=1+F, [ G>=1 && F>=K ], cost: 2+F-K 83: f182 -> f190 : E'=free_140, [ E>=1 && 1>=E*free_139 && free_139+E*free_139>=2 && free_140>=free_139 && 1>=E*free_141 && free_141+E*free_141>=2 && free_141>=free_140 && K>=1+F ], cost: 1 84: f182 -> f215 : E'=0, [ K>=1+F && E==0 ], cost: 1 152: f182 -> f215 : E'=0, K'=1+H, [ K>=1+F && E==0 && H>=K ], cost: 2-K+H 35: f190 -> f193 : [ F>=K ], cost: 1 81: f190 -> f208 : [ K>=1+F ], cost: 1 150: f190 -> f193 : A'=1+H, Q'=-free_18*(-1+A-H)*free_19+Q, [ F>=K && H>=A ], cost: 2-A+H 151: f190 -> f208 : K'=1+H, [ K>=1+F && H>=K ], cost: 2-K+H 80: f193 -> f200 : X'=free_134, [ E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 1 79: f200 -> f190 : K'=1+K, [ A>=1+H ], cost: 1 78: f208 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 42: f230 -> f241 : [ 0>=B ], cost: 1 43: f230 -> f241 : S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 1 44: f230 -> f238 : T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 ], cost: 1 45: f230 -> f238 : T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 ], cost: 1 46: f238 -> f241 : [], cost: 1 47: f238 -> f230 : B'=-1+B, [ 0>=1+V ], cost: 1 48: f238 -> f230 : B'=-1+B, [ V>=1 ], cost: 1 49: f241 -> f246 : Q'=1, W'=0, [ 0>=1+S ], cost: 1 50: f241 -> f246 : Q'=1, W'=0, [ S>=1 ], cost: 1 54: f241 -> f271 : B1'=free_49, S'=0, [ S==0 ], cost: 1 51: f246 -> f260 : E'=free_31, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 ], cost: 1 52: f246 -> f260 : E'=free_42, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 ], cost: 1 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 153: f246 -> f260 : A1'=free_48, B1'=free_47, E'=free_31, Q'=-free_25*free_33*Q, K'=1+H, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 2-K+H 154: f246 -> f260 : A1'=free_48, B1'=free_47, E'=free_42, Q'=-free_44*free_36*Q, K'=1+H, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 2-K+H 73: f260 -> f246 : G'=1+G, [ K>=1+H ], cost: 1 72: f275 -> f223 : A'=-1+A, [ K>=1+F ], cost: 1 57: f281 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ 29>=R ], cost: 1 58: f281 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ R>=31 ], cost: 1 59: f281 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ R==30 ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 62: f299 -> f315 : A1'=free_90, B1'=free_82, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 156: f299 -> f315 : A1'=free_90, B1'=free_97, C1'=free_96, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 ], cost: 2+F-G1 66: f315 -> f332 : B1'=0, C1'=-E*Q+W*A1, X'=W*E+A1*Q, [ G1>=1+F ], cost: 1 67: f315 -> f332 : B1'=free_102, C1'=-free_104+free_111, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 ], cost: 1 68: f315 -> f332 : B1'=free_116, C1'=-free_118+free_125, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 ], cost: 1 157: f315 -> f332 : A1'=free_99, B1'=free_98, C1'=-E*Q+W*A1, G1'=1+H, X'=W*E+A1*Q, [ G1>=1+F && H>=G1 ], cost: 2-G1+H 158: f315 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_104+free_111, G1'=1+H, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 && H>=G1 && free_101<=free_113 ], cost: 2-G1+H 159: f315 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, G1'=1+H, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 2-G1+H 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Eliminated locations (on linear paths): Start location: f2 0: f271 -> f281 : [ A>=1+B ], cost: 1 1: f271 -> f281 : [ B>=1+A ], cost: 1 55: f271 -> f275 : A'=B, [ 0>=1+B1 && B==A ], cost: 1 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 155: f271 -> f275 : A'=B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 2+F-K 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 3: f7 -> f16 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G ], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 136: f7 -> f16 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A ], cost: 2-A+H 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 108: f16 -> f24 : [ 0>=1+D && A>=1+H ], cost: 1 109: f16 -> f24 : [ D>=1 && A>=1+H ], cost: 1 110: f16 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H && D==0 ], cost: 1 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 6: f42 -> f45 : [ F>=K ], cost: 1 105: f42 -> f60 : [ K>=1+F ], cost: 1 137: f42 -> f45 : A'=1+H, Q'=-(-1+A-H)*free_3*free_4+Q, [ F>=K && H>=A ], cost: 2-A+H 138: f42 -> f60 : A'=1+H, [ K>=1+F && H>=A ], cost: 2-A+H 160: f45 -> f42 : K'=1+K, X'=free_154, [ Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 2 102: f60 -> f69 : D'=0, E'=0, Q'=0, [ A>=1+H ], cost: 1 11: f69 -> f72 : [ F>=1+G && H>=G ], cost: 1 12: f69 -> f72 : [ G>=1+F && H>=G ], cost: 1 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 139: f69 -> f72 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A ], cost: 2+F-A 140: f69 -> f72 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A ], cost: 2+F-A 99: f72 -> f80 : [ 0>=1+D && A>=1+F ], cost: 1 100: f72 -> f80 : [ D>=1 && A>=1+F ], cost: 1 101: f72 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ A>=1+F && D==0 ], cost: 1 97: f80 -> f98 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 1 98: f80 -> f98 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 1 96: f98 -> f104 : [ A>=1+F ], cost: 1 16: f104 -> f107 : [ H>=K ], cost: 1 95: f104 -> f121 : [ K>=1+H ], cost: 1 141: f104 -> f107 : A'=1+F, Q'=free_8*free_9*(1+F-A)+Q, [ H>=K && F>=A ], cost: 2+F-A 142: f104 -> f121 : A'=1+F, [ K>=1+H && F>=A ], cost: 2+F-A 161: f107 -> f104 : K'=1+K, [ A>=1+F ], cost: 2 92: f121 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ A>=1+F ], cost: 1 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 24: f136 -> f141 : [ F>=1+G && 0>=1+E && G>=1 ], cost: 1 25: f136 -> f141 : [ F>=1+G && E>=1 && G>=1 ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 145: f136 -> f141 : K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 2+F-K 146: f136 -> f141 : K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 2+F-K 148: f136 -> f164 : E'=0, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 90: f141 -> f147 : [ K>=1+F ], cost: 1 27: f147 -> f150 : [ F>=K ], cost: 1 89: f147 -> f164 : [ K>=1+F ], cost: 1 147: f147 -> f150 : A'=1+F, Q'=free_15*(1+F-A)*free_14+Q, [ F>=K && F>=A ], cost: 2+F-A 162: f150 -> f147 : K'=1+K, [ A>=1+F ], cost: 2 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 143: f164 -> f136 : B'=-1+G, E'=free_16, G'=-2+G, [ K>=1+F && -1+G>=1 && -1+G>=F ], cost: 2 33: f177 -> f182 : B'=1+G, E'=free_17, [ G>=1 ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 149: f177 -> f182 : B'=1+G, E'=free_17, K'=1+F, [ G>=1 && F>=K ], cost: 2+F-K 83: f182 -> f190 : E'=free_140, [ E>=1 && 1>=E*free_139 && free_139+E*free_139>=2 && free_140>=free_139 && 1>=E*free_141 && free_141+E*free_141>=2 && free_141>=free_140 && K>=1+F ], cost: 1 84: f182 -> f215 : E'=0, [ K>=1+F && E==0 ], cost: 1 152: f182 -> f215 : E'=0, K'=1+H, [ K>=1+F && E==0 && H>=K ], cost: 2-K+H 35: f190 -> f193 : [ F>=K ], cost: 1 81: f190 -> f208 : [ K>=1+F ], cost: 1 150: f190 -> f193 : A'=1+H, Q'=-free_18*(-1+A-H)*free_19+Q, [ F>=K && H>=A ], cost: 2-A+H 151: f190 -> f208 : K'=1+H, [ K>=1+F && H>=K ], cost: 2-K+H 163: f193 -> f190 : K'=1+K, X'=free_134, [ E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 2 78: f208 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 42: f230 -> f241 : [ 0>=B ], cost: 1 43: f230 -> f241 : S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 1 44: f230 -> f238 : T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 ], cost: 1 45: f230 -> f238 : T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 ], cost: 1 46: f238 -> f241 : [], cost: 1 47: f238 -> f230 : B'=-1+B, [ 0>=1+V ], cost: 1 48: f238 -> f230 : B'=-1+B, [ V>=1 ], cost: 1 49: f241 -> f246 : Q'=1, W'=0, [ 0>=1+S ], cost: 1 50: f241 -> f246 : Q'=1, W'=0, [ S>=1 ], cost: 1 54: f241 -> f271 : B1'=free_49, S'=0, [ S==0 ], cost: 1 51: f246 -> f260 : E'=free_31, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 ], cost: 1 52: f246 -> f260 : E'=free_42, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 ], cost: 1 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 153: f246 -> f260 : A1'=free_48, B1'=free_47, E'=free_31, Q'=-free_25*free_33*Q, K'=1+H, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 2-K+H 154: f246 -> f260 : A1'=free_48, B1'=free_47, E'=free_42, Q'=-free_44*free_36*Q, K'=1+H, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 2-K+H 73: f260 -> f246 : G'=1+G, [ K>=1+H ], cost: 1 72: f275 -> f223 : A'=-1+A, [ K>=1+F ], cost: 1 57: f281 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ 29>=R ], cost: 1 58: f281 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ R>=31 ], cost: 1 59: f281 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ R==30 ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 62: f299 -> f315 : A1'=free_90, B1'=free_82, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 156: f299 -> f315 : A1'=free_90, B1'=free_97, C1'=free_96, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, W'=free_79, X'=free_93+W*free_83*free_81, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 ], cost: 2+F-G1 66: f315 -> f332 : B1'=0, C1'=-E*Q+W*A1, X'=W*E+A1*Q, [ G1>=1+F ], cost: 1 67: f315 -> f332 : B1'=free_102, C1'=-free_104+free_111, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 ], cost: 1 68: f315 -> f332 : B1'=free_116, C1'=-free_118+free_125, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 ], cost: 1 157: f315 -> f332 : A1'=free_99, B1'=free_98, C1'=-E*Q+W*A1, G1'=1+H, X'=W*E+A1*Q, [ G1>=1+F && H>=G1 ], cost: 2-G1+H 158: f315 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_104+free_111, G1'=1+H, Q'=free_106, W'=free_100, X'=free_108+free_103, [ E*X>=free_108*E*free_107*X && free_108+free_108*E*free_107*X>=1+E*X && Y*A1>=Y*free_103*free_107*A1 && Y*free_103*free_107*A1+free_103>=1+Y*A1 && X*A1>=free_107*X*A1*free_111 && free_107*X*A1*free_111+free_111>=1+X*A1 && E*Y>=E*Y*free_107*free_104 && E*Y*free_107*free_104+free_104>=1+E*Y && 0>=1+free_107 && G1>=1+F && Y>=free_109*Y*free_107 && free_109+free_109*Y*free_107>=1+Y && free_109>=free_106 && Y>=free_105*Y*free_107 && free_105+free_105*Y*free_107>=1+Y && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && X>=free_112*free_107*X && free_112+free_112*free_107*X>=1+X && free_112>=free_100 && X>=free_110*free_107*X && free_110+free_110*free_107*X>=1+X && free_100>=free_110 && H>=G1 && free_101<=free_113 ], cost: 2-G1+H 159: f315 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, G1'=1+H, Q'=free_120, W'=free_114, X'=free_122+free_117, [ E*X>=free_121*E*free_122*X && free_122+free_121*E*free_122*X>=1+E*X && Y*A1>=free_121*Y*A1*free_117 && free_121*Y*A1*free_117+free_117>=1+Y*A1 && X*A1>=free_121*free_125*X*A1 && free_125+free_121*free_125*X*A1>=1+X*A1 && E*Y>=free_121*free_118*E*Y && free_118+free_121*free_118*E*Y>=1+E*Y && free_121>=1 && G1>=1+F && Y>=free_121*Y*free_123 && free_121*Y*free_123+free_123>=1+Y && free_123>=free_120 && Y>=free_121*Y*free_119 && free_119+free_121*Y*free_119>=1+Y && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && X>=free_121*free_126*X && free_121*free_126*X+free_126>=1+X && free_126>=free_114 && X>=free_121*X*free_124 && free_121*X*free_124+free_124>=1+X && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 2-G1+H 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Eliminated locations (on tree-shaped paths): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 224: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ A>=1+B && 29>=R ], cost: 2 225: f271 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ A>=1+B && R>=31 ], cost: 2 226: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ A>=1+B && R==30 ], cost: 2 227: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ B>=1+A && 29>=R ], cost: 2 228: f271 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ B>=1+A && R>=31 ], cost: 2 229: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ B>=1+A && R==30 ], cost: 2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 165: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free ], cost: 3-A+H 166: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 ], cost: 3-A+H 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 168: f42 -> f42 : K'=1+K, X'=free_154, [ F>=K && Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 3 169: f42 -> f42 : A'=1+H, Q'=-(-1+A-H)*free_3*free_4+Q, K'=1+K, X'=free_154, [ F>=K && H>=A && -(-1+A-H)*free_3*free_4+Q>=Y*free_153 && Y*free_153+free_153>=1-(-1+A-H)*free_3*free_4+Q && free_153>=free_154 && -(-1+A-H)*free_3*free_4+Q>=Y*free_155 && free_155+Y*free_155>=1-(-1+A-H)*free_3*free_4+Q && free_154>=free_155 ], cost: 4-A+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 20: f69 -> f130 : M'=C, N'=free_11, O'=free_10, P'=free_11+free_10, [ G>=1+H ], cost: 1 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 172: f69 -> f80 : [ F>=1+G && H>=G && 0>=1+D && A>=1+F ], cost: 2 173: f69 -> f80 : [ F>=1+G && H>=G && D>=1 && A>=1+F ], cost: 2 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 175: f69 -> f80 : [ G>=1+F && H>=G && 0>=1+D && A>=1+F ], cost: 2 176: f69 -> f80 : [ G>=1+F && H>=G && D>=1 && A>=1+F ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 178: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 179: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 181: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 182: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 184: f80 -> f104 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 2 185: f80 -> f104 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 2 186: f104 -> f104 : K'=1+K, [ H>=K && A>=1+F ], cost: 3 187: f104 -> f104 : A'=1+F, Q'=free_8*free_9*(1+F-A)+Q, K'=1+K, [ H>=K && F>=A ], cost: 4+F-A 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 148: f136 -> f164 : E'=0, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 190: f136 -> f147 : [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 2 191: f136 -> f147 : [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 2 192: f136 -> f147 : K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 3+F-K 193: f136 -> f147 : K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 3+F-K 89: f147 -> f164 : [ K>=1+F ], cost: 1 194: f147 -> f147 : K'=1+K, [ F>=K && A>=1+F ], cost: 3 195: f147 -> f147 : A'=1+F, Q'=free_15*(1+F-A)*free_14+Q, K'=1+K, [ F>=K && F>=A ], cost: 4+F-A 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 143: f164 -> f136 : B'=-1+G, E'=free_16, G'=-2+G, [ K>=1+F && -1+G>=1 && -1+G>=F ], cost: 2 85: f177 -> f223 : [ 0>=G ], cost: 1 196: f177 -> f190 : B'=1+G, E'=free_140, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F ], cost: 2 197: f177 -> f215 : B'=1+G, E'=0, [ G>=1 && K>=1+F && free_17==0 ], cost: 2 198: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && K>=1+F && free_17==0 && H>=K ], cost: 3-K+H 199: f177 -> f190 : B'=1+G, E'=free_140, K'=1+F, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 ], cost: 3+F-K 200: f177 -> f215 : B'=1+G, E'=0, K'=1+F, [ G>=1 && F>=K && free_17==0 ], cost: 3+F-K 201: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && F>=K && free_17==0 && H>=1+F ], cost: 3-K+H 202: f190 -> f190 : K'=1+K, X'=free_134, [ F>=K && E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 3 203: f190 -> f190 : A'=1+H, Q'=-free_18*(-1+A-H)*free_19+Q, K'=1+K, X'=free_134, [ F>=K && H>=A && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_132 && free_132+E*free_135*free_132>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_132>=free_134 && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_133 && free_133+E*free_135*free_133>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_134>=free_133 ], cost: 4-A+H 204: f190 -> f177 : G'=-1+G, [ K>=1+F && K>=1+H ], cost: 2 205: f190 -> f177 : G'=-1+G, K'=1+H, [ K>=1+F && H>=K ], cost: 3-K+H 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 207: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2 208: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2 210: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2 211: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && free_23>=1 ], cost: 2 212: f230 -> f246 : Q'=1, W'=0, [ 0>=B && 0>=1+S ], cost: 2 213: f230 -> f246 : Q'=1, W'=0, [ 0>=B && S>=1 ], cost: 2 214: f230 -> f271 : B1'=free_49, S'=0, [ 0>=B && S==0 ], cost: 2 215: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 2 216: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && 0>=1+S ], cost: 3 217: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && S>=1 ], cost: 3 218: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && S==0 ], cost: 3 219: f230 -> f246 : Q'=1, T'=-1+B, U'=free_24, V'=free_23, W'=0, [ free_24>=1 && B>=1 && 0>=1+S ], cost: 3 220: f230 -> f246 : Q'=1, T'=-1+B, U'=free_24, V'=free_23, W'=0, [ free_24>=1 && B>=1 && S>=1 ], cost: 3 221: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && S==0 ], cost: 3 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 242: f246 -> f246 : E'=free_31, G'=1+G, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 2 243: f246 -> f246 : E'=free_42, G'=1+G, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 2 244: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33*Q, K'=1+H, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 3-K+H 245: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36*Q, K'=1+H, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 3-K+H 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 230: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F ], cost: 2 231: f299 -> f332 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_106, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 ], cost: 2 232: f299 -> f332 : A1'=free_90, B1'=free_116, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_120, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 ], cost: 2 233: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 3-G1+H 234: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_106, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 && H>=G1 && free_101<=free_113 ], cost: 3-G1+H 235: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 3-G1+H 236: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 ], cost: 3+F-G1 237: f299 -> f332 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_106, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 ], cost: 3+F-G1 238: f299 -> f332 : A1'=free_90, B1'=free_116, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_120, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && free_116>=free_115 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_127>=free_116 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 ], cost: 3+F-G1 239: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && H>=1+F ], cost: 3-G1+H 240: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_106, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 && H>=1+F && free_101<=free_113 ], cost: 3-G1+H 241: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=1+F && free_115<=free_127 ], cost: 3-G1+H 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Applied pruning (of leafs and parallel rules): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 224: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ A>=1+B && 29>=R ], cost: 2 225: f271 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ A>=1+B && R>=31 ], cost: 2 226: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ A>=1+B && R==30 ], cost: 2 227: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ B>=1+A && 29>=R ], cost: 2 229: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ B>=1+A && R==30 ], cost: 2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 165: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free ], cost: 3-A+H 166: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 ], cost: 3-A+H 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 168: f42 -> f42 : K'=1+K, X'=free_154, [ F>=K && Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 3 169: f42 -> f42 : A'=1+H, Q'=-(-1+A-H)*free_3*free_4+Q, K'=1+K, X'=free_154, [ F>=K && H>=A && -(-1+A-H)*free_3*free_4+Q>=Y*free_153 && Y*free_153+free_153>=1-(-1+A-H)*free_3*free_4+Q && free_153>=free_154 && -(-1+A-H)*free_3*free_4+Q>=Y*free_155 && free_155+Y*free_155>=1-(-1+A-H)*free_3*free_4+Q && free_154>=free_155 ], cost: 4-A+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 176: f69 -> f80 : [ G>=1+F && H>=G && D>=1 && A>=1+F ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 178: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 179: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 181: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 182: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 184: f80 -> f104 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 2 185: f80 -> f104 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 2 186: f104 -> f104 : K'=1+K, [ H>=K && A>=1+F ], cost: 3 187: f104 -> f104 : A'=1+F, Q'=free_8*free_9*(1+F-A)+Q, K'=1+K, [ H>=K && F>=A ], cost: 4+F-A 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 148: f136 -> f164 : E'=0, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 190: f136 -> f147 : [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 2 191: f136 -> f147 : [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 2 192: f136 -> f147 : K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 3+F-K 193: f136 -> f147 : K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 3+F-K 89: f147 -> f164 : [ K>=1+F ], cost: 1 194: f147 -> f147 : K'=1+K, [ F>=K && A>=1+F ], cost: 3 195: f147 -> f147 : A'=1+F, Q'=free_15*(1+F-A)*free_14+Q, K'=1+K, [ F>=K && F>=A ], cost: 4+F-A 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 143: f164 -> f136 : B'=-1+G, E'=free_16, G'=-2+G, [ K>=1+F && -1+G>=1 && -1+G>=F ], cost: 2 85: f177 -> f223 : [ 0>=G ], cost: 1 196: f177 -> f190 : B'=1+G, E'=free_140, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F ], cost: 2 197: f177 -> f215 : B'=1+G, E'=0, [ G>=1 && K>=1+F && free_17==0 ], cost: 2 198: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && K>=1+F && free_17==0 && H>=K ], cost: 3-K+H 199: f177 -> f190 : B'=1+G, E'=free_140, K'=1+F, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 ], cost: 3+F-K 200: f177 -> f215 : B'=1+G, E'=0, K'=1+F, [ G>=1 && F>=K && free_17==0 ], cost: 3+F-K 201: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && F>=K && free_17==0 && H>=1+F ], cost: 3-K+H 202: f190 -> f190 : K'=1+K, X'=free_134, [ F>=K && E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 3 203: f190 -> f190 : A'=1+H, Q'=-free_18*(-1+A-H)*free_19+Q, K'=1+K, X'=free_134, [ F>=K && H>=A && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_132 && free_132+E*free_135*free_132>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_132>=free_134 && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_133 && free_133+E*free_135*free_133>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_134>=free_133 ], cost: 4-A+H 204: f190 -> f177 : G'=-1+G, [ K>=1+F && K>=1+H ], cost: 2 205: f190 -> f177 : G'=-1+G, K'=1+H, [ K>=1+F && H>=K ], cost: 3-K+H 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 207: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2 208: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2 210: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2 211: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && free_23>=1 ], cost: 2 212: f230 -> f246 : Q'=1, W'=0, [ 0>=B && 0>=1+S ], cost: 2 213: f230 -> f246 : Q'=1, W'=0, [ 0>=B && S>=1 ], cost: 2 214: f230 -> f271 : B1'=free_49, S'=0, [ 0>=B && S==0 ], cost: 2 215: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 2 216: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && 0>=1+S ], cost: 3 217: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && S>=1 ], cost: 3 218: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && S==0 ], cost: 3 220: f230 -> f246 : Q'=1, T'=-1+B, U'=free_24, V'=free_23, W'=0, [ free_24>=1 && B>=1 && S>=1 ], cost: 3 221: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && S==0 ], cost: 3 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 242: f246 -> f246 : E'=free_31, G'=1+G, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 2 243: f246 -> f246 : E'=free_42, G'=1+G, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 2 244: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33*Q, K'=1+H, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 3-K+H 245: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36*Q, K'=1+H, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 3-K+H 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 230: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F ], cost: 2 231: f299 -> f332 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_106, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 ], cost: 2 233: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 3-G1+H 235: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 3-G1+H 236: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 ], cost: 3+F-G1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Accelerating simple loops of location 5. Accelerating the following rules: 168: f42 -> f42 : K'=1+K, X'=free_154, [ F>=K && Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 3 169: f42 -> f42 : A'=1+H, Q'=-(-1+A-H)*free_3*free_4+Q, K'=1+K, X'=free_154, [ F>=K && H>=A && -(-1+A-H)*free_3*free_4+Q>=Y*free_153 && Y*free_153+free_153>=1-(-1+A-H)*free_3*free_4+Q && free_153>=free_154 && -(-1+A-H)*free_3*free_4+Q>=Y*free_155 && free_155+Y*free_155>=1-(-1+A-H)*free_3*free_4+Q && free_154>=free_155 ], cost: 4-A+H Accelerated rule 168 with metering function 1+F-K, yielding the new rule 246. Found no metering function for rule 169 (rule is too complicated). Removing the simple loops: 168. Accelerating simple loops of location 13. Accelerating the following rules: 186: f104 -> f104 : K'=1+K, [ H>=K && A>=1+F ], cost: 3 187: f104 -> f104 : A'=1+F, Q'=free_8*free_9*(1+F-A)+Q, K'=1+K, [ H>=K && F>=A ], cost: 4+F-A Accelerated rule 186 with metering function 1-K+H, yielding the new rule 247. Found no metering function for rule 187. Removing the simple loops: 186. Accelerating simple loops of location 20. Accelerating the following rules: 194: f147 -> f147 : K'=1+K, [ F>=K && A>=1+F ], cost: 3 195: f147 -> f147 : A'=1+F, Q'=free_15*(1+F-A)*free_14+Q, K'=1+K, [ F>=K && F>=A ], cost: 4+F-A Accelerated rule 194 with metering function 1+F-K, yielding the new rule 248. Found no metering function for rule 195. Removing the simple loops: 194. Accelerating simple loops of location 26. Accelerating the following rules: 202: f190 -> f190 : K'=1+K, X'=free_134, [ F>=K && E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 3 203: f190 -> f190 : A'=1+H, Q'=-free_18*(-1+A-H)*free_19+Q, K'=1+K, X'=free_134, [ F>=K && H>=A && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_132 && free_132+E*free_135*free_132>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_132>=free_134 && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_133 && free_133+E*free_135*free_133>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_134>=free_133 ], cost: 4-A+H Accelerated rule 202 with metering function 1+F-K, yielding the new rule 249. Found no metering function for rule 203 (rule is too complicated). Removing the simple loops: 202. Accelerating simple loops of location 33. Accelerating the following rules: 207: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2 208: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2 210: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2 211: f230 -> f230 : B'=-1+B, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && free_23>=1 ], cost: 2 Accelerated rule 207 with metering function B, yielding the new rule 250. Accelerated rule 208 with metering function B, yielding the new rule 251. Accelerated rule 210 with metering function B, yielding the new rule 252. Accelerated rule 211 with metering function B, yielding the new rule 253. Removing the simple loops: 207 208 210 211. Accelerating simple loops of location 36. Accelerating the following rules: 242: f246 -> f246 : E'=free_31, G'=1+G, Q'=-free_25*free_33*Q, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 2 243: f246 -> f246 : E'=free_42, G'=1+G, Q'=-free_44*free_36*Q, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 2 244: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33*Q, K'=1+H, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 3-K+H 245: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36*Q, K'=1+H, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 3-K+H Accelerated rule 242 with metering function 1-G+A, yielding the new rule 254. Accelerated rule 243 with metering function 1-G+A, yielding the new rule 255. Found no metering function for rule 244. Found no metering function for rule 245. Removing the simple loops: 242 243. Accelerated all simple loops using metering functions (where possible): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 224: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ A>=1+B && 29>=R ], cost: 2 225: f271 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ A>=1+B && R>=31 ], cost: 2 226: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ A>=1+B && R==30 ], cost: 2 227: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ B>=1+A && 29>=R ], cost: 2 229: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ B>=1+A && R==30 ], cost: 2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 165: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free ], cost: 3-A+H 166: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 ], cost: 3-A+H 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 169: f42 -> f42 : A'=1+H, Q'=-(-1+A-H)*free_3*free_4+Q, K'=1+K, X'=free_154, [ F>=K && H>=A && -(-1+A-H)*free_3*free_4+Q>=Y*free_153 && Y*free_153+free_153>=1-(-1+A-H)*free_3*free_4+Q && free_153>=free_154 && -(-1+A-H)*free_3*free_4+Q>=Y*free_155 && free_155+Y*free_155>=1-(-1+A-H)*free_3*free_4+Q && free_154>=free_155 ], cost: 4-A+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 246: f42 -> f42 : K'=1+F, X'=free_154, [ F>=K && Q>=Y*free_153 && Y*free_153+free_153>=1+Q && free_153>=free_154 && Q>=Y*free_155 && free_155+Y*free_155>=1+Q && free_154>=free_155 && A>=1+H ], cost: 3+3*F-3*K 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 176: f69 -> f80 : [ G>=1+F && H>=G && D>=1 && A>=1+F ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 178: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 179: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 181: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 182: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 184: f80 -> f104 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 2 185: f80 -> f104 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 2 187: f104 -> f104 : A'=1+F, Q'=free_8*free_9*(1+F-A)+Q, K'=1+K, [ H>=K && F>=A ], cost: 4+F-A 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 247: f104 -> f104 : K'=1+H, [ H>=K && A>=1+F ], cost: 3-3*K+3*H 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 148: f136 -> f164 : E'=0, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 190: f136 -> f147 : [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 2 191: f136 -> f147 : [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 2 192: f136 -> f147 : K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 3+F-K 193: f136 -> f147 : K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 3+F-K 89: f147 -> f164 : [ K>=1+F ], cost: 1 195: f147 -> f147 : A'=1+F, Q'=free_15*(1+F-A)*free_14+Q, K'=1+K, [ F>=K && F>=A ], cost: 4+F-A 248: f147 -> f147 : K'=1+F, [ F>=K && A>=1+F ], cost: 3+3*F-3*K 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 143: f164 -> f136 : B'=-1+G, E'=free_16, G'=-2+G, [ K>=1+F && -1+G>=1 && -1+G>=F ], cost: 2 85: f177 -> f223 : [ 0>=G ], cost: 1 196: f177 -> f190 : B'=1+G, E'=free_140, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F ], cost: 2 197: f177 -> f215 : B'=1+G, E'=0, [ G>=1 && K>=1+F && free_17==0 ], cost: 2 198: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && K>=1+F && free_17==0 && H>=K ], cost: 3-K+H 199: f177 -> f190 : B'=1+G, E'=free_140, K'=1+F, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 ], cost: 3+F-K 200: f177 -> f215 : B'=1+G, E'=0, K'=1+F, [ G>=1 && F>=K && free_17==0 ], cost: 3+F-K 201: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && F>=K && free_17==0 && H>=1+F ], cost: 3-K+H 203: f190 -> f190 : A'=1+H, Q'=-free_18*(-1+A-H)*free_19+Q, K'=1+K, X'=free_134, [ F>=K && H>=A && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_132 && free_132+E*free_135*free_132>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_132>=free_134 && -E*(free_18*(-1+A-H)*free_19-Q)>=E*free_135*free_133 && free_133+E*free_135*free_133>=1-E*(free_18*(-1+A-H)*free_19-Q) && free_134>=free_133 ], cost: 4-A+H 204: f190 -> f177 : G'=-1+G, [ K>=1+F && K>=1+H ], cost: 2 205: f190 -> f177 : G'=-1+G, K'=1+H, [ K>=1+F && H>=K ], cost: 3-K+H 249: f190 -> f190 : K'=1+F, X'=free_134, [ F>=K && E*Q>=E*free_135*free_132 && free_132+E*free_135*free_132>=1+E*Q && free_132>=free_134 && E*Q>=E*free_135*free_133 && free_133+E*free_135*free_133>=1+E*Q && free_134>=free_133 && A>=1+H ], cost: 3+3*F-3*K 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 212: f230 -> f246 : Q'=1, W'=0, [ 0>=B && 0>=1+S ], cost: 2 213: f230 -> f246 : Q'=1, W'=0, [ 0>=B && S>=1 ], cost: 2 214: f230 -> f271 : B1'=free_49, S'=0, [ 0>=B && S==0 ], cost: 2 215: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 2 216: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && 0>=1+S ], cost: 3 217: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && S>=1 ], cost: 3 218: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && S==0 ], cost: 3 220: f230 -> f246 : Q'=1, T'=-1+B, U'=free_24, V'=free_23, W'=0, [ free_24>=1 && B>=1 && S>=1 ], cost: 3 221: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && S==0 ], cost: 3 250: f230 -> f230 : B'=0, T'=0, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2*B 251: f230 -> f230 : B'=0, T'=0, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2*B 252: f230 -> f230 : B'=0, T'=0, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2*B 253: f230 -> f230 : B'=0, T'=0, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && free_23>=1 ], cost: 2*B 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 244: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33*Q, K'=1+H, W'=free_28, X'=free_25*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 3-K+H 245: f246 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36*Q, K'=1+H, W'=free_39, X'=free_36*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 3-K+H 254: f246 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A)*Q, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1)*Q, Y'=free_27, Z'=free_35, [ 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 2-2*G+2*A 255: f246 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A)*Q, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A)*Q, Y'=free_38, Z'=free_46, [ 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 2-2*G+2*A 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 230: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F ], cost: 2 231: f299 -> f332 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_106, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 ], cost: 2 233: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 3-G1+H 235: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 3-G1+H 236: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 ], cost: 3+F-G1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Chained accelerated rules (with incoming rules): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 224: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ A>=1+B && 29>=R ], cost: 2 225: f271 -> f290 : A1'=free_57, C1'=free_56, E'=free_58, T'=-1+A, X'=free_55, Y'=free_59, [ A>=1+B && R>=31 ], cost: 2 226: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ A>=1+B && R==30 ], cost: 2 227: f271 -> f290 : A1'=free_52, C1'=free_51, E'=free_53, T'=-1+A, X'=free_50, Y'=free_54, [ B>=1+A && 29>=R ], cost: 2 229: f271 -> f290 : A1'=free_62, C1'=free_61, E'=free_63, R'=30, T'=-1+A, X'=free_60, Y'=free_64, [ B>=1+A && R==30 ], cost: 2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 165: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free ], cost: 3-A+H 166: f7 -> f24 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 ], cost: 3-A+H 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 106: f24 -> f42 : E'=-free_157, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H ], cost: 1 107: f24 -> f42 : E'=free_160, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H ], cost: 1 256: f24 -> f42 : E'=-free_157, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156-Q, [ free_156>=0 && A>=1+H && F>=K && Q>=-(free_157*free_156+Q)*free_153 && -(free_157*free_156+Q)*free_153+free_153>=1+Q && free_153>=free_154 && Q>=-free_155*(free_157*free_156+Q) && free_155-free_155*(free_157*free_156+Q)>=1+Q && free_154>=free_155 ], cost: 4+3*F-3*K 257: f24 -> f42 : E'=free_160, K'=1+F, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159-Q, [ 0>=1+free_159 && A>=1+H && F>=K && Q>=(free_160*free_159-Q)*free_153 && (free_160*free_159-Q)*free_153+free_153>=1+Q && free_153>=free_154 && Q>=free_155*(free_160*free_159-Q) && free_155*(free_160*free_159-Q)+free_155>=1+Q && free_154>=free_155 ], cost: 4+3*F-3*K 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 176: f69 -> f80 : [ G>=1+F && H>=G && D>=1 && A>=1+F ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 178: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 179: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 181: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) ], cost: 3+F-A 182: f69 -> f80 : A'=1+F, D'=D+free_5*(1+F-A), L'=free_5, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 184: f80 -> f104 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F ], cost: 2 185: f80 -> f104 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F ], cost: 2 258: f80 -> f104 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, X'=free_145, Y'=-free_145*free_146-Q, [ free_145>=0 && A>=1+F && H>=K ], cost: 5-3*K+3*H 259: f80 -> f104 : E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ 0>=1+free_148 && A>=1+F && H>=K ], cost: 5-3*K+3*H 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 30: f136 -> f164 : E'=0, [ G>=1 && F>=1+G && E==0 ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 148: f136 -> f164 : E'=0, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 190: f136 -> f147 : [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 2 191: f136 -> f147 : [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 2 192: f136 -> f147 : K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 3+F-K 193: f136 -> f147 : K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 3+F-K 89: f147 -> f164 : [ K>=1+F ], cost: 1 86: f164 -> f136 : B'=G, E'=free_142, G'=-1+G, [ K>=1+F ], cost: 1 143: f164 -> f136 : B'=-1+G, E'=free_16, G'=-2+G, [ K>=1+F && -1+G>=1 && -1+G>=F ], cost: 2 85: f177 -> f223 : [ 0>=G ], cost: 1 196: f177 -> f190 : B'=1+G, E'=free_140, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F ], cost: 2 197: f177 -> f215 : B'=1+G, E'=0, [ G>=1 && K>=1+F && free_17==0 ], cost: 2 198: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && K>=1+F && free_17==0 && H>=K ], cost: 3-K+H 199: f177 -> f190 : B'=1+G, E'=free_140, K'=1+F, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 ], cost: 3+F-K 200: f177 -> f215 : B'=1+G, E'=0, K'=1+F, [ G>=1 && F>=K && free_17==0 ], cost: 3+F-K 201: f177 -> f215 : B'=1+G, E'=0, K'=1+H, [ G>=1 && F>=K && free_17==0 && H>=1+F ], cost: 3-K+H 260: f177 -> f190 : A'=1+H, B'=1+G, E'=free_140, Q'=-free_18*(-1+A-H)*free_19+Q, K'=1+K, X'=free_134, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 204: f190 -> f177 : G'=-1+G, [ K>=1+F && K>=1+H ], cost: 2 205: f190 -> f177 : G'=-1+G, K'=1+H, [ K>=1+F && H>=K ], cost: 3-K+H 77: f215 -> f177 : G'=-1+G, [ K>=1+H ], cost: 1 40: f223 -> f226 : [ A>=1 ], cost: 1 41: f226 -> f230 : S'=1, [ 30>=R ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 261: f226 -> f230 : B'=0, S'=1, T'=0, U'=free_22, V'=free_21, [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 262: f226 -> f230 : B'=0, S'=1, T'=0, U'=free_22, V'=free_21, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 263: f226 -> f230 : B'=0, S'=1, T'=0, U'=free_24, V'=free_23, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 264: f226 -> f230 : B'=0, S'=1, T'=0, U'=free_24, V'=free_23, [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 212: f230 -> f246 : Q'=1, W'=0, [ 0>=B && 0>=1+S ], cost: 2 213: f230 -> f246 : Q'=1, W'=0, [ 0>=B && S>=1 ], cost: 2 214: f230 -> f271 : B1'=free_49, S'=0, [ 0>=B && S==0 ], cost: 2 215: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ B>=1 ], cost: 2 216: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && 0>=1+S ], cost: 3 217: f230 -> f246 : Q'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 0>=1+free_22 && B>=1 && S>=1 ], cost: 3 218: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_22, V'=free_21, [ 0>=1+free_22 && B>=1 && S==0 ], cost: 3 220: f230 -> f246 : Q'=1, T'=-1+B, U'=free_24, V'=free_23, W'=0, [ free_24>=1 && B>=1 && S>=1 ], cost: 3 221: f230 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=free_24, V'=free_23, [ free_24>=1 && B>=1 && S==0 ], cost: 3 265: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 0>=B && 0>=1+S && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 5-K+H 266: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 0>=B && S>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 5-K+H 267: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 0>=1+free_22 && B>=1 && 0>=1+S && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6-K+H 268: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 0>=1+free_22 && B>=1 && S>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6-K+H 269: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, T'=-1+B, U'=free_24, V'=free_23, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ free_24>=1 && B>=1 && S>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6-K+H 270: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 0>=B && 0>=1+S && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 5-K+H 271: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 0>=B && S>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 5-K+H 272: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, T'=-1+B, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 0>=1+free_22 && B>=1 && 0>=1+S && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 273: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, T'=-1+B, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 0>=1+free_22 && B>=1 && S>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 274: f230 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, T'=-1+B, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ free_24>=1 && B>=1 && S>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 275: f230 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 0>=B && 0>=1+S && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 4-2*G+2*A 276: f230 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 0>=B && S>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 4-2*G+2*A 277: f230 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 0>=1+free_22 && B>=1 && 0>=1+S && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*A 278: f230 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 0>=1+free_22 && B>=1 && S>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*A 279: f230 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), T'=-1+B, U'=free_24, V'=free_23, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ free_24>=1 && B>=1 && S>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*A 280: f230 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 0>=B && 0>=1+S && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 4-2*G+2*A 281: f230 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 0>=B && S>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 4-2*G+2*A 282: f230 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), T'=-1+B, U'=free_22, V'=free_21, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 0>=1+free_22 && B>=1 && 0>=1+S && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 283: f230 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), T'=-1+B, U'=free_22, V'=free_21, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 0>=1+free_22 && B>=1 && S>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 284: f230 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), T'=-1+B, U'=free_24, V'=free_23, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ free_24>=1 && B>=1 && S>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 60: f290 -> f299 : D1'=free_65, E1'=free_65, Q'=1, W'=1, X'=free_68, [ X>=0 && Y*A1>=Y*X*free_69+Y*free_65*free_69 && Y*X*free_69+Y*free_65*free_69+free_69>=1+Y*A1 && C1^2+free_69>=B1^2+free_67*C1+Y^2 && B1^2+free_67+free_67*C1+Y^2>=1+C1^2+free_69 && free_67>=free_68 && Y*A1>=free_66*Y*free_65+free_66*Y*X && free_66+free_66*Y*free_65+free_66*Y*X>=1+Y*A1 && free_66+C1^2>=B1^2+free_70*C1+Y^2 && B1^2+free_70*C1+free_70+Y^2>=1+free_66+C1^2 && free_68>=free_70 ], cost: 1 61: f290 -> f299 : E1'=-free_71, F1'=free_71, Q'=1, W'=1, X'=free_74, [ 0>=1+X && Y*free_71*free_75+Y*A1>=Y*X*free_75 && Y*X*free_75+free_75>=1+Y*free_71*free_75+Y*A1 && C1^2+free_75>=B1^2+Y^2+free_73*C1 && B1^2+free_73+Y^2+free_73*C1>=1+C1^2+free_75 && free_73>=free_74 && Y*free_71*free_72+Y*A1>=Y*X*free_72 && Y*X*free_72+free_72>=1+Y*free_71*free_72+Y*A1 && C1^2+free_72>=B1^2+free_76*C1+Y^2 && B1^2+free_76+free_76*C1+Y^2>=1+C1^2+free_72 && free_74>=free_76 ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 230: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F ], cost: 2 231: f299 -> f332 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_106, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 ], cost: 2 233: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 3-G1+H 235: f299 -> f332 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 3-G1+H 236: f299 -> f332 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 ], cost: 3+F-G1 65: f332 -> f299 : K'=1+K, [ G1>=1+H ], cost: 1 Eliminated locations (on tree-shaped paths): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 376: f271 -> f299 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 ], cost: 3 377: f271 -> f299 : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 ], cost: 3 378: f271 -> f299 : A1'=free_57, C1'=free_56, D1'=free_65, E'=free_58, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_59, [ A>=1+B && R>=31 && free_55>=0 && free_57*free_59>=free_65*free_59*free_69+free_55*free_59*free_69 && free_65*free_59*free_69+free_55*free_59*free_69+free_69>=1+free_57*free_59 && free_56^2+free_69>=B1^2+free_59^2+free_67*free_56 && B1^2+free_67+free_59^2+free_67*free_56>=1+free_56^2+free_69 && free_67>=free_68 && free_57*free_59>=free_66*free_55*free_59+free_66*free_65*free_59 && free_66+free_66*free_55*free_59+free_66*free_65*free_59>=1+free_57*free_59 && free_66+free_56^2>=B1^2+free_70*free_56+free_59^2 && B1^2+free_70+free_70*free_56+free_59^2>=1+free_66+free_56^2 && free_68>=free_70 ], cost: 3 379: f271 -> f299 : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 ], cost: 3 380: f271 -> f299 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 ], cost: 3 381: f271 -> f299 : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 ], cost: 3 382: f271 -> f299 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ B>=1+A && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 ], cost: 3 383: f271 -> f299 : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ B>=1+A && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 ], cost: 3 384: f271 -> f299 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ B>=1+A && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 ], cost: 3 385: f271 -> f299 : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ B>=1+A && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 ], cost: 3 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 285: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 ], cost: 4-A+H 286: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 287: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 288: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, K'=1+F, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 289: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_156, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 ], cost: 4-A+H 290: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 291: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 292: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, K'=1+F, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 293: f69 -> f104 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && D>=1 && A>=1+F && free_145>=0 ], cost: 4 294: f69 -> f104 : E'=free_149, J1'=-free_149, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && D>=1 && A>=1+F && 0>=1+free_148 ], cost: 4 295: f69 -> f104 : E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && D>=1 && A>=1+F && free_145>=0 && H>=K ], cost: 7-3*K+3*H 296: f69 -> f104 : E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && D>=1 && A>=1+F && 0>=1+free_148 && H>=K ], cost: 7-3*K+3*H 297: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 ], cost: 5+F-A 298: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && 0>=1+free_148 ], cost: 5+F-A 299: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 300: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 301: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 ], cost: 5+F-A 302: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 ], cost: 5+F-A 303: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 304: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 305: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 ], cost: 5+F-A 306: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && 0>=1+free_148 ], cost: 5+F-A 307: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 308: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 309: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 ], cost: 5+F-A 310: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 ], cost: 5+F-A 311: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 312: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 317: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ G>=1 && F>=1+G && E==0 && K>=1+F ], cost: 2 318: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 3+F-K 319: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 4 320: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 4 321: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 5+F-K 322: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 5+F-K 323: f136 -> [76] : [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 324: f136 -> [76] : [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 4+F-K 325: f136 -> [76] : [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 4+F-K 85: f177 -> f223 : [ 0>=G ], cost: 1 326: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && K>=1+H ], cost: 4 327: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && H>=K ], cost: 5-K+H 328: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+F, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && 1+F>=1+H ], cost: 5+F-K 329: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && H>=1+F ], cost: 5-K+H 330: f177 -> f177 : A'=1+H, B'=1+G, E'=free_140, G'=-1+G, Q'=-free_18*(-1+A-H)*free_19+Q, K'=1+K, X'=free_134, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 && 1+K>=1+H ], cost: 8-A+H 331: f177 -> [77] : [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 332: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, [ G>=1 && K>=1+F && free_17==0 && K>=1+H ], cost: 3 333: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && K>=1+F && free_17==0 && H>=K ], cost: 4-K+H 334: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+F, [ G>=1 && F>=K && free_17==0 && 1+F>=1+H ], cost: 4+F-K 335: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && F>=K && free_17==0 && H>=1+F ], cost: 4-K+H 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 336: f226 -> f246 : Q'=1, S'=1, W'=0, [ 30>=R && 0>=B ], cost: 3 337: f226 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ 30>=R && B>=1 ], cost: 3 338: f226 -> f246 : Q'=1, S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=0, [ 30>=R && 0>=1+free_22 && B>=1 ], cost: 4 339: f226 -> f246 : Q'=1, S'=1, T'=-1+B, U'=free_24, V'=free_23, W'=0, [ 30>=R && free_24>=1 && B>=1 ], cost: 4 340: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, S'=1, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 30>=R && 0>=B && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6-K+H 341: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 7-K+H 342: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, S'=1, T'=-1+B, U'=free_24, V'=free_23, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 30>=R && free_24>=1 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 7-K+H 343: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 344: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 7-K+H 345: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=-1+B, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 7-K+H 346: f226 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=B && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*A 347: f226 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 348: f226 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_24, V'=free_23, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && free_24>=1 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 349: f226 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 350: f226 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 6-2*G+2*A 351: f226 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, T'=-1+B, U'=free_24, V'=free_23, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 6-2*G+2*A 352: f226 -> f246 : B'=0, Q'=1, S'=1, T'=0, U'=free_22, V'=free_21, W'=0, [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 3+2*B 353: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6+2*B-K+H 354: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 355: f226 -> f246 : B'=0, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=0, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*B+2*A 356: f226 -> f246 : B'=0, E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*B+2*A 357: f226 -> f246 : B'=0, Q'=1, S'=1, T'=0, U'=free_22, V'=free_21, W'=0, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 3+2*B 358: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6+2*B-K+H 359: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 360: f226 -> f246 : B'=0, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=0, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*B+2*A 361: f226 -> f246 : B'=0, E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*B+2*A 362: f226 -> f246 : B'=0, Q'=1, S'=1, T'=0, U'=free_24, V'=free_23, W'=0, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 3+2*B 363: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6+2*B-K+H 364: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 365: f226 -> f246 : B'=0, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=0, U'=free_24, V'=free_23, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*B+2*A 366: f226 -> f246 : B'=0, E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*B+2*A 367: f226 -> f246 : B'=0, Q'=1, S'=1, T'=0, U'=free_24, V'=free_23, W'=0, [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 3+2*B 368: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_31, G'=1+G, Q'=-free_25*free_33, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_28, X'=free_25, Y'=free_27, Z'=free_35, [ 30>=R && free_24>=1 && B>=1 && free_23>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && H>=K ], cost: 6+2*B-K+H 369: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && free_23>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 370: f226 -> f246 : B'=0, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=0, U'=free_24, V'=free_23, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && free_24>=1 && B>=1 && free_23>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 5-2*G+2*B+2*A 371: f226 -> f246 : B'=0, E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && free_23>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*B+2*A 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 386: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 3 387: f299 -> f299 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_106, K'=1+K, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 && G1>=1+H ], cost: 3 388: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 4-G1+H 389: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 4-G1+H 390: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 4+F-G1 Applied pruning (of leafs and parallel rules): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 376: f271 -> f299 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 ], cost: 3 377: f271 -> f299 : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 ], cost: 3 379: f271 -> f299 : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 ], cost: 3 380: f271 -> f299 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 ], cost: 3 381: f271 -> f299 : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 ], cost: 3 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 286: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 287: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 288: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, K'=1+F, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 290: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 291: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 299: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 302: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 ], cost: 5+F-A 303: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 305: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 ], cost: 5+F-A 312: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 318: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 3+F-K 319: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 4 320: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 4 321: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 5+F-K 322: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 5+F-K 323: f136 -> [76] : [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 324: f136 -> [76] : [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 4+F-K 325: f136 -> [76] : [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 4+F-K 85: f177 -> f223 : [ 0>=G ], cost: 1 327: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && H>=K ], cost: 5-K+H 329: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && H>=1+F ], cost: 5-K+H 331: f177 -> [77] : [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 333: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && K>=1+F && free_17==0 && H>=K ], cost: 4-K+H 334: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+F, [ G>=1 && F>=K && free_17==0 && 1+F>=1+H ], cost: 4+F-K 335: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && F>=K && free_17==0 && H>=1+F ], cost: 4-K+H 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 337: f226 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ 30>=R && B>=1 ], cost: 3 343: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 347: f226 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 349: f226 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 359: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 364: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 386: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 3 387: f299 -> f299 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_106, K'=1+K, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 && G1>=1+H ], cost: 3 388: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 4-G1+H 389: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 ], cost: 4-G1+H 390: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 4+F-G1 Accelerating simple loops of location 18. Accelerating the following rules: 318: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 3+F-K 319: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 4 320: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 4 321: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 5+F-K 322: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 5+F-K Found no metering function for rule 318. Accelerated rule 319 with metering function G (after strengthening guard), yielding the new rule 391. Accelerated rule 320 with metering function G (after strengthening guard), yielding the new rule 392. Found no metering function for rule 321. Found no metering function for rule 322. During metering: Instantiating temporary variables by {free_142==-1} During metering: Instantiating temporary variables by {free_142==1} Removing the simple loops:. Accelerating simple loops of location 24. Simplified some of the simple loops (and removed duplicate rules). Accelerating the following rules: 327: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && H>=K ], cost: 5-K+H 329: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && H>=1+F ], cost: 5-K+H 333: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && K>=1+F && H>=K ], cost: 4-K+H 334: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+F, [ G>=1 && F>=K && 1+F>=1+H ], cost: 4+F-K 335: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && F>=K && H>=1+F ], cost: 4-K+H Found no metering function for rule 327. Accelerated rule 329 with NONTERM (after strengthening guard), yielding the new rule 393. Found no metering function for rule 333. Found no metering function for rule 334. Accelerated rule 335 with NONTERM (after strengthening guard), yielding the new rule 394. Removing the simple loops:. Accelerating simple loops of location 41. Simplified some of the simple loops (and removed duplicate rules). Accelerating the following rules: 386: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 3 387: f299 -> f299 : A1'=free_90, B1'=free_102, C1'=-free_104+free_111, E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_106, K'=1+K, W'=free_100, X'=free_108+free_103, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 && G1>=1+H && free_84<=free_86 && free_95<=free_78 ], cost: 3 388: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 4-G1+H 389: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 4-G1+H 390: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 4+F-G1 Found no metering function for rule 386 (rule is too complicated). Accelerated rule 387 with NONTERM, yielding the new rule 395. Found no metering function for rule 388 (rule is too complicated). Found no metering function for rule 389 (rule is too complicated). Found no metering function for rule 390 (rule is too complicated). Removing the simple loops: 387. Accelerated all simple loops using metering functions (where possible): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 376: f271 -> f299 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 ], cost: 3 377: f271 -> f299 : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 ], cost: 3 379: f271 -> f299 : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 ], cost: 3 380: f271 -> f299 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 ], cost: 3 381: f271 -> f299 : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 ], cost: 3 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 286: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 287: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 288: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, K'=1+F, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 290: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 291: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 299: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 302: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 ], cost: 5+F-A 303: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 305: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 ], cost: 5+F-A 312: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 318: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, Q_1'=0, [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 3+F-K 319: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && 0>=1+E && G>=1 && K>=1+F ], cost: 4 320: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, [ F>=1+G && E>=1 && G>=1 && K>=1+F ], cost: 4 321: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 5+F-K 322: f136 -> f136 : B'=G, E'=free_142, G'=-1+G, K'=1+F, [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 5+F-K 323: f136 -> [76] : [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 324: f136 -> [76] : [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 4+F-K 325: f136 -> [76] : [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 4+F-K 391: f136 -> f136 : B'=1, E'=free_142, G'=0, [ F>=1+G && 0>=1+E && G>=1 && K>=1+F && 0>=1+free_142 ], cost: 4*G 392: f136 -> f136 : B'=1, E'=free_142, G'=0, [ F>=1+G && E>=1 && G>=1 && K>=1+F && free_142>=1 ], cost: 4*G 85: f177 -> f223 : [ 0>=G ], cost: 1 327: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && H>=K ], cost: 5-K+H 329: f177 -> f177 : B'=1+G, E'=free_140, G'=-1+G, K'=1+H, [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && H>=1+F ], cost: 5-K+H 331: f177 -> [77] : [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 333: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && K>=1+F && H>=K ], cost: 4-K+H 334: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+F, [ G>=1 && F>=K && 1+F>=1+H ], cost: 4+F-K 335: f177 -> f177 : B'=1+G, E'=0, G'=-1+G, K'=1+H, [ G>=1 && F>=K && H>=1+F ], cost: 4-K+H 393: f177 -> [80] : [ G>=1 && F>=K && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && H>=1+F && F>=1+H && 5-K+H>=1 ], cost: NONTERM 394: f177 -> [80] : [ G>=1 && F>=K && H>=1+F && F>=1+H && 4-K+H>=1 ], cost: NONTERM 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 337: f226 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ 30>=R && B>=1 ], cost: 3 343: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 347: f226 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 349: f226 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 359: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 364: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 386: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 3 388: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 4-G1+H 389: f299 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, W'=free_114, X'=free_122+free_117, Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_122+free_121*free_122*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_121*free_125*free_90*(free_93+W*free_83*free_81) && free_125+free_121*free_125*free_90*(free_93+W*free_83*free_81)>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=free_121*free_118*(W*free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(W*free_83*free_77-free_88)*free_85>=1+(W*free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_93+W*free_83*free_81>=free_121*free_126*(free_93+W*free_83*free_81) && free_126+free_121*free_126*(free_93+W*free_83*free_81)>=1+free_93+W*free_83*free_81 && free_126>=free_114 && free_93+W*free_83*free_81>=free_121*(free_93+W*free_83*free_81)*free_124 && free_121*(free_93+W*free_83*free_81)*free_124+free_124>=1+free_93+W*free_83*free_81 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 4-G1+H 390: f299 -> f299 : A1'=free_90, B1'=0, C1'=free_79*free_90-free_80*(W*free_83*free_77-free_88), E'=W*free_83*free_77-free_88, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, W'=free_79, X'=free_80*free_90+free_79*(W*free_83*free_77-free_88), Y'=free_85, [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_78>=free_80 && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_80>=free_95 && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && free_86>=free_79 && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 4+F-G1 395: f299 -> [81] : [ X>=free_77*free_82 && free_77*free_82+free_77>=1+X && free_83*C1*Q>=C1*free_88*free_82 && C1*free_88*free_82+free_88>=1+free_83*C1*Q && C1*X>=free_93*C1*free_82 && free_93+free_93*C1*free_82>=1+C1*X && free_83*Q>=free_81*free_82 && free_81*free_82+free_81>=1+free_83*Q && free_83*Q>=free_78*free_82 && free_78*free_82+free_78>=1+free_83*Q && free_83*Q>=free_95*free_82 && free_95+free_95*free_82>=1+free_83*Q && free_83*free_94*Q>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94*Q && free_92>=free_85 && free_83*free_94*Q>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94*Q && free_85>=free_91 && T>=K && free_94*X>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_94*X && free_89>=free_90 && free_94*X>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_94*X && free_90>=free_87 && X>=free_86*free_82 && free_86+free_86*free_82>=1+X && X>=free_84*free_82 && free_84+free_84*free_82>=1+X && (W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)>=free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107 && free_108+free_108*(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81)*free_107>=1+(W*free_83*free_77-free_88)*(free_93+W*free_83*free_81) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && free_90*(free_93+W*free_83*free_81)>=free_90*(free_93+W*free_83*free_81)*free_107*free_111 && free_90*(free_93+W*free_83*free_81)*free_107*free_111+free_111>=1+free_90*(free_93+W*free_83*free_81) && (W*free_83*free_77-free_88)*free_85>=(W*free_83*free_77-free_88)*free_107*free_104*free_85 && (W*free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(W*free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_109>=free_106 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && free_106>=free_105 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && free_102>=free_101 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_113>=free_102 && free_93+W*free_83*free_81>=free_112*(free_93+W*free_83*free_81)*free_107 && free_112+free_112*(free_93+W*free_83*free_81)*free_107>=1+free_93+W*free_83*free_81 && free_112>=free_100 && free_93+W*free_83*free_81>=free_110*(free_93+W*free_83*free_81)*free_107 && free_110*(free_93+W*free_83*free_81)*free_107+free_110>=1+free_93+W*free_83*free_81 && free_100>=free_110 && G1>=1+H && free_84<=free_86 && free_95<=free_78 ], cost: NONTERM Chained accelerated rules (with incoming rules): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 376: f271 -> f299 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 ], cost: 3 377: f271 -> f299 : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 ], cost: 3 379: f271 -> f299 : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 ], cost: 3 380: f271 -> f299 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 ], cost: 3 381: f271 -> f299 : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 ], cost: 3 396: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 397: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 398: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 399: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 400: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 401: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 402: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 403: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 404: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 405: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 406: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 407: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 408: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 409: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=30, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 410: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=30, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 411: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 412: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 413: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 414: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 415: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 416: f271 -> [81] : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 417: f271 -> [81] : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 418: f271 -> [81] : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 419: f271 -> [81] : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 420: f271 -> [81] : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 286: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 287: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 288: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, K'=1+F, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 290: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 291: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 299: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 302: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 ], cost: 5+F-A 303: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 305: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 ], cost: 5+F-A 312: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 323: f136 -> [76] : [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 324: f136 -> [76] : [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 4+F-K 325: f136 -> [76] : [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 4+F-K 85: f177 -> f223 : [ 0>=G ], cost: 1 331: f177 -> [77] : [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 337: f226 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ 30>=R && B>=1 ], cost: 3 343: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 347: f226 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 349: f226 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 359: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 364: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 Removed unreachable locations (and leaf rules with constant cost): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 376: f271 -> f299 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 ], cost: 3 377: f271 -> f299 : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 ], cost: 3 379: f271 -> f299 : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 ], cost: 3 380: f271 -> f299 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 ], cost: 3 381: f271 -> f299 : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 ], cost: 3 396: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 397: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 398: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 399: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 400: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H ], cost: 6 401: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 402: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 403: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 404: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 405: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 ], cost: 7-G1+H 406: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 407: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 408: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 409: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=30, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 410: f271 -> f299 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=30, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 ], cost: 7-G1+H 411: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 412: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 413: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 414: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 415: f271 -> f299 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=30, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H ], cost: 7+F-G1 416: f271 -> [81] : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 417: f271 -> [81] : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 418: f271 -> [81] : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 419: f271 -> [81] : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 420: f271 -> [81] : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 10: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ G>=1+H && F>=G ], cost: 1 111: f7 -> f136 : [ G>=1+F ], cost: 1 144: f7 -> f136 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 ], cost: 2 164: f7 -> f69 : B'=1+G, D'=0, E'=0, Q'=0, [ F>=G && H>=G && A>=1+H ], cost: 2 167: f7 -> f69 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 286: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 287: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 288: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, K'=1+F, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 290: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=free_160, Q'=0, J'=free, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 291: f7 -> f42 : A'=1+H, B'=1+G, D'=-(-1+A-H)*free, E'=-free_157, Q'=0, J'=free, K'=1+F, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 170: f42 -> f69 : D'=0, E'=0, Q'=0, [ K>=1+F && A>=1+H ], cost: 2 171: f42 -> f69 : A'=1+H, D'=0, E'=0, Q'=0, [ K>=1+F && H>=A ], cost: 3-A+H 21: f69 -> f130 : F'=G, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=F && G==F ], cost: 1 174: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && A>=1+F && D==0 ], cost: 2 177: f69 -> f130 : D'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && A>=1+F && D==0 ], cost: 2 180: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 183: f69 -> f130 : A'=1+F, D'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)==0 ], cost: 3+F-A 299: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 302: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 ], cost: 5+F-A 303: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ F>=1+G && H>=G && F>=A && D+free_5*(1+F-A)>=1 && free_145>=0 && H>=K ], cost: 8+F-A-3*K+3*H 305: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=-free_146, H1'=free_147, Q1'=free_146, J1'=free_146, L'=free_5, X'=free_145, Y'=-free_145*free_146-Q, [ G>=1+F && H>=G && F>=A && 0>=1+D+free_5*(1+F-A) && free_145>=0 ], cost: 5+F-A 312: f69 -> f104 : A'=1+F, D'=D+free_5*(1+F-A), E'=free_149, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149-Q, [ G>=1+F && H>=G && F>=A && D+free_5*(1+F-A)>=1 && 0>=1+free_148 && H>=K ], cost: 8+F-A-3*K+3*H 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 91: f136 -> f177 : [ 0>=G ], cost: 1 323: f136 -> [76] : [ G>=1 && F>=1+G && E==0 && F>=K ], cost: 2+F-K 324: f136 -> [76] : [ F>=1+G && 0>=1+E && G>=1 && F>=K ], cost: 4+F-K 325: f136 -> [76] : [ F>=1+G && E>=1 && G>=1 && F>=K ], cost: 4+F-K 85: f177 -> f223 : [ 0>=G ], cost: 1 331: f177 -> [77] : [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 337: f226 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ 30>=R && B>=1 ], cost: 3 343: f226 -> f246 : A1'=free_48, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6-K+H 347: f226 -> f246 : E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 349: f226 -> f246 : E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 359: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 364: f226 -> f246 : A1'=free_48, B'=0, B1'=free_47, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K ], cost: 6+2*B-K+H 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 74: f246 -> f271 : B1'=free_128, [ G>=1+A ], cost: 1 75: f246 -> f271 : B1'=free_131, X'=free_130*Q, Z'=C-free_129, [ A>=G ], cost: 1 69: f299 -> f226 : R'=1+R, [ K>=1+T ], cost: 1 Eliminated locations (on tree-shaped paths): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 416: f271 -> [81] : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 417: f271 -> [81] : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 418: f271 -> [81] : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 419: f271 -> [81] : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 420: f271 -> [81] : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 494: f271 -> f226 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, R'=1+R, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A ], cost: 4 495: f271 -> f226 : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, R'=1+R, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && K>=A ], cost: 4 496: f271 -> f226 : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, R'=1+R, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && K>=A ], cost: 4 497: f271 -> f226 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=31, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && K>=A ], cost: 4 498: f271 -> f226 : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=31, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && K>=A ], cost: 4 499: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && G1>=1+H && 1+K>=A ], cost: 7 500: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H && 1+K>=A ], cost: 7 501: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H && 1+K>=A ], cost: 7 502: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, Q'=free_80, K'=1+K, R'=31, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && G1>=1+H && 1+K>=A ], cost: 7 503: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, R'=31, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H && 1+K>=A ], cost: 7 504: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && H>=G1 && 1+K>=A ], cost: 8-G1+H 505: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 && 1+K>=A ], cost: 8-G1+H 506: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 && 1+K>=A ], cost: 8-G1+H 507: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=31, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && G1>=1+F && H>=G1 && 1+K>=A ], cost: 8-G1+H 508: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=31, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 && 1+K>=A ], cost: 8-G1+H 509: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=1+R, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 1+K>=A ], cost: 8-G1+H 510: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=1+R, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 1+K>=A ], cost: 8-G1+H 511: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=1+R, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 1+K>=A ], cost: 8-G1+H 512: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=31, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 1+K>=A ], cost: 8-G1+H 513: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=31, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 1+K>=A ], cost: 8-G1+H 514: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && F>=G1 && 1+F>=1+H && 1+K>=A ], cost: 8+F-G1 515: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H && 1+K>=A ], cost: 8+F-G1 516: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H && 1+K>=A ], cost: 8+F-G1 517: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, D1'=free_65, E'=free_83*free_77-free_88, E1'=free_65, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=31, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_86>=free_79 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && free_79>=free_84 && F>=G1 && 1+F>=1+H && 1+K>=A ], cost: 8+F-G1 518: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+F, Q'=free_80, K'=1+K, R'=31, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && F>=G1 && 1+F>=1+H && 1+K>=A ], cost: 8+F-G1 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 426: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 427: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 428: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 429: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 430: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 431: f7 -> f130 : B'=1+G, D'=0, E'=0, F'=G, Q'=0, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=G && A>=1+H && H>=F && G==F ], cost: 3 432: f7 -> f130 : B'=1+G, D'=0, E'=0, Q'=0, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ H>=G && A>=1+H && F>=1+G && A>=1+F ], cost: 4 433: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ H>=G && A>=1+H && F>=1+G && F>=A && free_5*(1+F-A)==0 ], cost: 5+F-A 434: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(1+F-A), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 435: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(1+F-A), E'=free_149, Q'=0, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149, [ H>=G && A>=1+H && F>=1+G && F>=A && free_5*(1+F-A)>=1 && 0>=1+free_148 ], cost: 7+F-A 436: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(1+F-A), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146, [ H>=G && A>=1+H && F>=1+G && F>=A && free_5*(1+F-A)>=1 && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 437: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, F'=G, Q'=0, J'=free, M'=C, N'=free_13, O'=free_12, P'=free_12+free_13, [ H>=G && H>=A && -(-1+A-H)*free==0 && H>=F && G==F ], cost: 4-A+H 438: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ H>=G && H>=A && -(-1+A-H)*free==0 && F>=1+G && 1+H>=1+F ], cost: 5-A+H 439: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, L'=free_5, M'=C, N'=free_152, O'=free_151, P'=free_151+free_152, [ H>=G && H>=A && -(-1+A-H)*free==0 && F>=1+G && F>=1+H && free_5*(F-H)==0 ], cost: 5+F-A 440: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146, [ H>=G && H>=A && -(-1+A-H)*free==0 && F>=1+G && F>=1+H && 0>=1+free_5*(F-H) && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 441: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free==0 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 7+F-A 442: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146, [ H>=G && H>=A && -(-1+A-H)*free==0 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 443: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, F'=G, Q'=0, J'=free, M'=C, N'=free_13, O'=free_12, O1'=-free_160, P'=free_12+free_13, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && H>=F && G==F ], cost: 7-A+H 444: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F ], cost: 8-A+H 445: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, L'=free_5, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)==0 ], cost: 8+F-A 446: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 447: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, F'=G, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_13, N1'=free_157, O'=free_12, O1'=free_157, P'=free_12+free_13, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && H>=F && G==F ], cost: 10+3*F-A-3*K+H 448: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F ], cost: 11+3*F-A-3*K+H 449: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && G>=1+F && 1+H>=1+F ], cost: 11+3*F-A-3*K+H 450: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 ], cost: 11+4*F-A-3*K 451: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && G>=1+F && F>=1+H && free_5*(F-H)==0 ], cost: 11+4*F-A-3*K 452: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+H, L'=free_5, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_145, Y'=-free_145*free_146, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && 0>=1+free_5*(F-H) && free_145>=0 && H>=1+F ], cost: 13+F-A-3*K+3*H 453: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 454: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+H, L'=free_5, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_145, Y'=-free_145*free_146, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && free_145>=0 && H>=1+F ], cost: 13+F-A-3*K+3*H 455: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_148, Y'=free_148*free_149, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && G>=1+F && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && H>=1+F ], cost: 13+F-A-3*K+3*H 456: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, F'=G, Q'=0, J'=free, K'=1+F, M'=C, N'=free_13, O'=free_12, O1'=-free_160, P'=free_12+free_13, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && H>=F && G==F ], cost: 10+3*F-A-3*K+H 457: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F ], cost: 11+3*F-A-3*K+H 458: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && G>=1+F && 1+H>=1+F ], cost: 11+3*F-A-3*K+H 459: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_154, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 ], cost: 11+4*F-A-3*K 460: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+H, L'=free_5, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_145, Y'=-free_145*free_146, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && 0>=1+free_5*(F-H) && free_145>=0 && H>=1+F ], cost: 13+F-A-3*K+3*H 461: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 462: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+H, L'=free_5, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_145, Y'=-free_145*free_146, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && free_145>=0 && H>=1+F ], cost: 13+F-A-3*K+3*H 463: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+F, L'=free_5, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_145, Y'=-free_145*free_146, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && G>=1+F && F>=1+H && 0>=1+free_5*(F-H) && free_145>=0 ], cost: 13+4*F-A-3*K 464: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, F'=G, Q'=0, J'=free, M'=C, N'=free_13, O'=free_12, O1'=-free_160, P'=free_12+free_13, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && H>=F && G==F ], cost: 7-A+H 465: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F ], cost: 8-A+H 466: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, L'=free_5, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)==0 ], cost: 8+F-A 467: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 468: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, F'=G, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_13, N1'=free_157, O'=free_12, O1'=free_157, P'=free_12+free_13, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && H>=F && G==F ], cost: 10+3*F-A-3*K+H 469: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F ], cost: 11+3*F-A-3*K+H 470: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 ], cost: 11+4*F-A-3*K 471: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && G>=1+F && F>=1+H && free_5*(F-H)==0 ], cost: 11+4*F-A-3*K 472: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+H, L'=free_5, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_145, Y'=-free_145*free_146, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && 0>=1+free_5*(F-H) && free_145>=0 && H>=1+F ], cost: 13+F-A-3*K+3*H 473: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 474: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J'=free, J1'=free_146, K'=1+F, L'=free_5, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_145, Y'=-free_145*free_146, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && G>=1+F && F>=1+H && 0>=1+free_5*(F-H) && free_145>=0 ], cost: 13+4*F-A-3*K 475: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_148, Y'=free_148*free_149, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && G>=1+F && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && H>=1+F ], cost: 13+F-A-3*K+3*H 476: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 477: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 478: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 479: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 480: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 481: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 482: f7 -> f177 : [ G>=1+F && 0>=G ], cost: 2 483: f7 -> f177 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 3 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 331: f177 -> [77] : [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 337: f226 -> f271 : B1'=free_49, S'=0, T'=-1+B, U'=C-free_20, [ 30>=R && B>=1 ], cost: 3 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 484: f226 -> f271 : A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7-K+H 485: f226 -> f271 : A1'=free_48, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7-K+H 486: f226 -> f271 : B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 487: f226 -> f271 : B1'=free_128, E'=free_42, G'=1+A, Q'=(-free_44*free_36)^(1-G+A), S'=1, W'=free_39, X'=-free_44^(-1)*(-free_44*free_36)^(1-G+A), Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 6-2*G+2*A 488: f226 -> f271 : A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7+2*B-K+H 489: f226 -> f271 : A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 490: f226 -> f271 : A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7+2*B-K+H 491: f226 -> f271 : A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 492: f226 -> [84] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 493: f226 -> [84] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A Applied pruning (of leafs and parallel rules): Start location: f2 71: f271 -> f223 : A'=-1+B, [ B1>=0 && B==A ], cost: 1 222: f271 -> f223 : A'=-1+B, [ 0>=1+B1 && B==A && K>=1+F ], cost: 2 223: f271 -> f223 : A'=-1+B, K'=1+F, [ 0>=1+B1 && B==A && F>=K ], cost: 3+F-K 416: f271 -> [81] : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 417: f271 -> [81] : A1'=free_52, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, [ A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=B1^2+free_73*free_51+free_54^2 && B1^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+B1^2+free_54^2 && free_76*free_51+B1^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 418: f271 -> [81] : A1'=free_57, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, Q'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 419: f271 -> [81] : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 420: f271 -> [81] : A1'=free_62, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, Q'=1, R'=30, T'=-1+A, W'=1, X'=free_74, Y'=free_64, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 494: f271 -> f226 : A1'=free_52, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, Q'=1, R'=1+R, T'=-1+A, W'=1, X'=free_68, Y'=free_54, [ A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=B1^2+free_54^2+free_67*free_51 && B1^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=B1^2+free_70*free_51+free_54^2 && B1^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A ], cost: 4 497: f271 -> f226 : A1'=free_62, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, Q'=1, R'=31, T'=-1+A, W'=1, X'=free_68, Y'=free_64, [ A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=B1^2+free_67*free_61+free_64^2 && B1^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=B1^2+free_70*free_61+free_64^2 && B1^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && K>=A ], cost: 4 501: f271 -> f226 : A1'=free_90, B1'=0, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && G1>=1+H && 1+K>=A ], cost: 7 506: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_80*(free_83*free_77-free_88)+free_79*free_90, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_80, K'=1+K, R'=1+R, T'=-1+A, W'=free_79, X'=free_80*free_90+free_79*(free_83*free_77-free_88), Y'=free_85, [ A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=B1^2+free_73*free_56+free_59^2 && B1^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=B1^2+free_76*free_56+free_59^2 && B1^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_78>=free_80 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_80>=free_95 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_86>=free_79 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && free_79>=free_84 && G1>=1+F && H>=G1 && 1+K>=A ], cost: 8-G1+H 513: f271 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=31, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, [ A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=B1^2+free_73*free_61+free_64^2 && B1^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=B1^2+free_64^2+free_76*free_61 && B1^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 1+K>=A ], cost: 8-G1+H 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 426: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 427: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 428: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 429: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 430: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 434: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(1+F-A), E'=-free_146, H1'=free_147, Q'=0, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, X'=free_145, Y'=-free_145*free_146, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 444: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F ], cost: 8-A+H 446: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 461: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 464: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, F'=G, Q'=0, J'=free, M'=C, N'=free_13, O'=free_12, O1'=-free_160, P'=free_12+free_13, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && H>=F && G==F ], cost: 7-A+H 465: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F ], cost: 8-A+H 467: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, O1'=-free_160, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 469: f7 -> f130 : A'=1+H, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F ], cost: 11+3*F-A-3*K+H 470: f7 -> f130 : A'=1+F, B'=1+G, D'=0, E'=0, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 ], cost: 11+4*F-A-3*K 473: f7 -> f104 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M1'=free_158, N1'=free_157, O1'=free_157, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 476: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 477: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 478: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 480: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 481: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 482: f7 -> f177 : [ G>=1+F && 0>=G ], cost: 2 483: f7 -> f177 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 3 188: f104 -> f130 : M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && A>=1+F ], cost: 2 189: f104 -> f130 : A'=1+F, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, [ K>=1+H && F>=A ], cost: 3+F-A 22: f130 -> f7 : C'=M, G'=1+G, [ M>=1+P ], cost: 1 23: f130 -> f7 : C'=P, G'=1+G, [ P>=M ], cost: 1 85: f177 -> f223 : [ 0>=G ], cost: 1 331: f177 -> [77] : [ G>=1 && free_17>=1 && 1>=free_139*free_17 && free_139+free_139*free_17>=2 && free_140>=free_139 && 1>=free_141*free_17 && free_141+free_141*free_17>=2 && free_141>=free_140 && K>=1+F && F>=K && H>=A && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_132*free_140 && free_132+free_135*free_132*free_140>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_132>=free_134 && -(free_18*(-1+A-H)*free_19-Q)*free_140>=free_135*free_133*free_140 && free_135*free_133*free_140+free_133>=1-(free_18*(-1+A-H)*free_19-Q)*free_140 && free_134>=free_133 ], cost: 6-A+H 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 484: f226 -> f271 : A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7-K+H 486: f226 -> f271 : B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 488: f226 -> f271 : A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7+2*B-K+H 489: f226 -> f271 : A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 491: f226 -> f271 : A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 492: f226 -> [84] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 493: f226 -> [84] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A Eliminated locations (on tree-shaped paths): Start location: f2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 426: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 427: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 428: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 429: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 430: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 476: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 477: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 478: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 480: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 481: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 524: f7 -> [85] : [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 525: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 526: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 527: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 528: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 529: f7 -> f7 : A'=1+H, B'=1+G, C'=C, D'=0, E'=0, G'=1+G, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F && C>=1+free_151+free_152 ], cost: 9-A+H 530: f7 -> f7 : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F && free_151+free_152>=C ], cost: 9-A+H 531: f7 -> f7 : A'=1+H, B'=1+G, C'=C, D'=0, E'=0, F'=G, G'=1+G, Q'=0, J'=free, M'=C, N'=free_13, O'=free_12, O1'=-free_160, P'=free_12+free_13, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && H>=F && G==F && C>=1+free_12+free_13 ], cost: 8-A+H 532: f7 -> f7 : A'=1+H, B'=1+G, C'=free_12+free_13, D'=0, E'=0, F'=G, G'=1+G, Q'=0, J'=free, M'=C, N'=free_13, O'=free_12, O1'=-free_160, P'=free_12+free_13, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && H>=F && G==F && free_12+free_13>=C ], cost: 8-A+H 533: f7 -> f7 : A'=1+H, B'=1+G, C'=C, D'=0, E'=0, G'=1+G, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F && C>=1+free_151+free_152 ], cost: 9-A+H 534: f7 -> f7 : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, M'=C, N'=free_152, O'=free_151, O1'=-free_160, P'=free_151+free_152, P1'=free_161, Q1_1'=free_160, X'=free_159, Y'=free_160*free_159, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && 1+H>=1+F && free_151+free_152>=C ], cost: 9-A+H 535: f7 -> f7 : A'=1+H, B'=1+G, C'=C, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && C>=1+free_151+free_152 ], cost: 12+3*F-A-3*K+H 536: f7 -> f7 : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=C ], cost: 12+3*F-A-3*K+H 537: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && C>=1+free_151+free_152 ], cost: 12+4*F-A-3*K 538: f7 -> f7 : A'=1+F, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && free_151+free_152>=C ], cost: 12+4*F-A-3*K 539: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(1+F-A), E'=-free_146, G'=1+G, H1'=free_147, Q'=0, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, X'=free_145, Y'=-free_145*free_146, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K && C>=1+free_144+free_143 ], cost: 13+F-A-3*K+3*H 540: f7 -> f7 : A'=1+F, B'=1+G, C'=free_144+free_143, D'=free_5*(1+F-A), E'=-free_146, G'=1+G, H1'=free_147, Q'=0, Q1'=free_146, J1'=free_146, K'=1+H, L'=free_5, M'=C, N'=free_144, O'=free_143, P'=free_144+free_143, X'=free_145, Y'=-free_145*free_146, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K && free_144+free_143>=C ], cost: 13+F-A-3*K+3*H 541: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && C>=1+free_144+free_143 ], cost: 13+F-A 542: f7 -> f7 : A'=1+F, B'=1+G, C'=free_144+free_143, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && free_144+free_143>=C ], cost: 13+F-A 543: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 ], cost: 16+4*F-A-3*K 544: f7 -> f7 : A'=1+F, B'=1+G, C'=free_144+free_143, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && free_144+free_143>=C ], cost: 16+4*F-A-3*K 545: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && C>=1+free_144+free_143 ], cost: 13+F-A 546: f7 -> f7 : A'=1+F, B'=1+G, C'=free_144+free_143, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && free_144+free_143>=C ], cost: 13+F-A 547: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 ], cost: 16+4*F-A-3*K 548: f7 -> f7 : A'=1+F, B'=1+G, C'=free_144+free_143, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && free_144+free_143>=C ], cost: 16+4*F-A-3*K 549: f7 -> f223 : [ G>=1+F && 0>=G ], cost: 3 550: f7 -> f223 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 4 40: f223 -> f226 : [ A>=1 ], cost: 1 70: f226 -> f223 : A'=-1+A, [ R>=31 ], cost: 1 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 492: f226 -> [84] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 493: f226 -> [84] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 551: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && B==A ], cost: 8-K+H 552: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && B==A && 1+H>=1+F ], cost: 9-K+H 553: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+F, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && B==A && F>=1+H ], cost: 9+F-K 554: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 555: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 556: f226 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 557: f226 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 558: f226 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_64, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 559: f226 -> f226 : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A ], cost: 11-K+H 560: f226 -> f226 : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=31, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && 1+H>=A ], cost: 11-K+H 561: f226 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=2+H, G1'=1+H, Q'=free_120, K'=2+H, R'=31, S'=1, T'=-1+A, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 2+H>=A ], cost: 15-G1-K+2*H 562: f226 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A ], cost: 8-2*G+2*A 563: f226 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && 0>=1+free_128 && B==A && K>=1+F ], cost: 9-2*G+2*A 564: f226 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), K'=1+F, S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && 0>=1+free_128 && B==A && F>=K ], cost: 10-2*G+F+2*A-K 565: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 566: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_54, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 567: f226 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 568: f226 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+A, Q'=1, R'=30, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 569: f226 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, R'=30, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_64, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 570: f226 -> f226 : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A ], cost: 11-2*G+2*A 571: f226 -> f226 : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+A, Q'=1, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && K>=A ], cost: 11-2*G+2*A 572: f226 -> f226 : A1'=free_99, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=1+K, G1'=1+H, Q'=free_120, K'=1+K, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 1+K>=A ], cost: 15-2*G-G1+2*A+H 573: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && 0==A ], cost: 8+2*B-K+H 574: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && 0==A && 1+H>=1+F ], cost: 9+2*B-K+H 575: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+F, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && 0==A && F>=1+H ], cost: 9+F+2*B-K 576: f226 -> [81] : A1'=free_52, B'=0, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 577: f226 -> [81] : A1'=free_52, B'=0, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 578: f226 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 579: f226 -> [81] : A1'=free_62, B'=0, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 580: f226 -> [81] : A1'=free_62, B'=0, B1'=free_128, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_64, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 581: f226 -> f226 : A1'=free_52, B'=0, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 582: f226 -> f226 : A1'=free_62, B'=0, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 583: f226 -> f226 : A1'=free_99, B'=0, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=2+H, G1'=1+H, Q'=free_120, K'=2+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 2+H>=A ], cost: 15-G1+2*B-K+2*H 584: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && free_131>=0 && 0==A ], cost: 8+2*B-K+H 585: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && 0>=1+free_131 && 0==A && 1+H>=1+F ], cost: 9+2*B-K+H 586: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+F, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && 0>=1+free_131 && 0==A && F>=1+H ], cost: 9+F+2*B-K 587: f226 -> [81] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 588: f226 -> [81] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_54, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_131^2+free_73*free_51+free_54^2 && free_73+free_131^2+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_131^2+free_54^2 && free_76*free_51+free_76+free_131^2+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 589: f226 -> [81] : A1'=free_57, B'=0, B1'=free_131, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=C-free_129, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_131^2+free_73*free_56+free_59^2 && free_73+free_131^2+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_76*free_56+free_131^2+free_59^2 && free_76+free_76*free_56+free_131^2+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 590: f226 -> [81] : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_67*free_61+free_131^2+free_64^2 && free_67*free_61+free_131^2+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_131^2+free_70*free_61+free_64^2 && free_131^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 591: f226 -> [81] : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_64, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_131^2+free_73*free_61+free_64^2 && free_73+free_131^2+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_131^2+free_64^2+free_76*free_61 && free_76+free_131^2+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 592: f226 -> f226 : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 593: f226 -> f226 : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_67*free_61+free_131^2+free_64^2 && free_67*free_61+free_131^2+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_131^2+free_70*free_61+free_64^2 && free_131^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 594: f226 -> f226 : A1'=free_99, B'=0, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=2+H, G1'=1+H, Q'=free_120, K'=2+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_131^2+free_73*free_61+free_64^2 && free_73+free_131^2+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_131^2+free_64^2+free_76*free_61 && free_76+free_131^2+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 2+H>=A ], cost: 15-G1+2*B-K+2*H 595: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && free_131>=0 && 0==A ], cost: 8+2*B-K+H 596: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && 0>=1+free_131 && 0==A && 1+H>=1+F ], cost: 9+2*B-K+H 597: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_131, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+F, S'=1, T'=0, U'=free_24, V'=free_23, W'=free_39, X'=-free_44*free_36*free_130, Y'=free_38, Z'=C-free_129, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && 0>=1+free_131 && 0==A && F>=1+H ], cost: 9+F+2*B-K 598: f226 -> [81] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 599: f226 -> [81] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=1, X'=free_74, Y'=free_54, Z'=C-free_129, [ free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_131^2+free_73*free_51+free_54^2 && free_73+free_131^2+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_131^2+free_54^2 && free_76*free_51+free_76+free_131^2+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 600: f226 -> [81] : A1'=free_57, B'=0, B1'=free_131, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=1, X'=free_74, Y'=free_59, Z'=C-free_129, [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_131^2+free_73*free_56+free_59^2 && free_73+free_131^2+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_76*free_56+free_131^2+free_59^2 && free_76+free_76*free_56+free_131^2+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 601: f226 -> [81] : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=1, X'=free_68, Y'=free_64, Z'=C-free_129, [ free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_67*free_61+free_131^2+free_64^2 && free_67*free_61+free_131^2+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_131^2+free_70*free_61+free_64^2 && free_131^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 602: f226 -> [81] : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, E'=free_63, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=1, X'=free_74, Y'=free_64, Z'=C-free_129, [ free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_131^2+free_73*free_61+free_64^2 && free_73+free_131^2+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_131^2+free_64^2+free_76*free_61 && free_76+free_131^2+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 603: f226 -> f226 : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 604: f226 -> f226 : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=31, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=1, X'=free_68, Y'=free_64, Z'=C-free_129, [ free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_67*free_61+free_131^2+free_64^2 && free_67*free_61+free_131^2+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_131^2+free_70*free_61+free_64^2 && free_131^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 605: f226 -> f226 : A1'=free_99, B'=0, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=2+H, G1'=1+H, Q'=free_120, K'=2+H, R'=31, S'=1, T'=-1+A, U'=free_24, V'=free_23, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=C-free_129, [ free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_131^2+free_73*free_61+free_64^2 && free_73+free_131^2+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_131^2+free_64^2+free_76*free_61 && free_76+free_131^2+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 2+H>=A ], cost: 15-G1+2*B-K+2*H 606: f226 -> [86] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7-K+H 607: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 608: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7+2*B-K+H 609: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 610: f226 -> [86] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H Applied pruning (of leafs and parallel rules): Start location: f2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 426: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 427: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 428: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 429: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 430: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 476: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 477: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 478: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 480: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 481: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 524: f7 -> [85] : [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 525: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 526: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 527: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 528: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 536: f7 -> f7 : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=C ], cost: 12+3*F-A-3*K+H 537: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && C>=1+free_151+free_152 ], cost: 12+4*F-A-3*K 543: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 ], cost: 16+4*F-A-3*K 545: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && C>=1+free_144+free_143 ], cost: 13+F-A 547: f7 -> f7 : A'=1+F, B'=1+G, C'=C, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 ], cost: 16+4*F-A-3*K 549: f7 -> f223 : [ G>=1+F && 0>=G ], cost: 3 550: f7 -> f223 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 4 40: f223 -> f226 : [ A>=1 ], cost: 1 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 492: f226 -> [84] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 493: f226 -> [84] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 551: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && B==A ], cost: 8-K+H 552: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && B==A && 1+H>=1+F ], cost: 9-K+H 554: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 555: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 557: f226 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 562: f226 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A ], cost: 8-2*G+2*A 567: f226 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 570: f226 -> f226 : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A ], cost: 11-2*G+2*A 573: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && 0==A ], cost: 8+2*B-K+H 574: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && 0==A && 1+H>=1+F ], cost: 9+2*B-K+H 578: f226 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 581: f226 -> f226 : A1'=free_52, B'=0, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 583: f226 -> f226 : A1'=free_99, B'=0, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=2+H, G1'=1+H, Q'=free_120, K'=2+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && 2+H>=A ], cost: 15-G1+2*B-K+2*H 592: f226 -> f226 : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 593: f226 -> f226 : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_67*free_61+free_131^2+free_64^2 && free_67*free_61+free_131^2+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_131^2+free_70*free_61+free_64^2 && free_131^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && 1+H>=A ], cost: 11+2*B-K+H 606: f226 -> [86] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7-K+H 607: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 608: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7+2*B-K+H 609: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 610: f226 -> [86] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H Accelerating simple loops of location 2. Simplified some of the simple loops (and removed duplicate rules). Accelerating the following rules: 536: f7 -> f7 : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=C ], cost: 12+3*F-A-3*K+H 537: f7 -> f7 : A'=1+F, B'=1+G, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && C>=1+free_151+free_152 ], cost: 12+4*F-A-3*K 543: f7 -> f7 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 && free_155<=free_153 ], cost: 16+4*F-A-3*K 545: f7 -> f7 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && C>=1+free_144+free_143 ], cost: 13+F-A 547: f7 -> f7 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 && free_155<=free_153 ], cost: 16+4*F-A-3*K Found no metering function for rule 536 (rule is too complicated). Found no metering function for rule 537 (rule is too complicated). Found no metering function for rule 543 (rule is too complicated). Found no metering function for rule 545 (rule is too complicated). Found no metering function for rule 547 (rule is too complicated). Removing the simple loops:. Accelerating simple loops of location 32. Simplified some of the simple loops (and removed duplicate rules). Accelerating the following rules: 570: f226 -> f226 : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 11-2*G+2*A 581: f226 -> f226 : A1'=free_52, B'=0, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && G-A==0 && free_46>=1 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 11+2*B-K+H 583: f226 -> f226 : A1'=free_99, B'=0, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=2+H, G1'=1+H, Q'=free_120, K'=2+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && G-A==0 && free_46>=1 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && 2-A+H==0 && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && free_43<=free_45 && free_37<=free_41 ], cost: 15-G1+2*B-K+2*H 592: f226 -> f226 : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 11+2*B-K+H 593: f226 -> f226 : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_67*free_61+free_131^2+free_64^2 && free_67*free_61+free_131^2+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_131^2+free_70*free_61+free_64^2 && free_131^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 11+2*B-K+H Found no metering function for rule 570. Accelerated rule 581 with metering function -G+A, yielding the new rule 611. Accelerated rule 583 with metering function 30-R, yielding the new rule 612. Found no metering function for rule 592. Accelerated rule 593 with metering function 30-R, yielding the new rule 613. Removing the simple loops: 581 583 593. Accelerated all simple loops using metering functions (where possible): Start location: f2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 426: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 427: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 428: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 429: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 430: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 476: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 477: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 478: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 480: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 481: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 524: f7 -> [85] : [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 525: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 526: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 527: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 528: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 536: f7 -> f7 : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=C ], cost: 12+3*F-A-3*K+H 537: f7 -> f7 : A'=1+F, B'=1+G, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=C, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && C>=1+free_151+free_152 ], cost: 12+4*F-A-3*K 543: f7 -> f7 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 && free_155<=free_153 ], cost: 16+4*F-A-3*K 545: f7 -> f7 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=C, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && C>=1+free_144+free_143 ], cost: 13+F-A 547: f7 -> f7 : A'=1+F, B'=1+G, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=C, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && C>=1+free_144+free_143 && free_155<=free_153 ], cost: 16+4*F-A-3*K 549: f7 -> f223 : [ G>=1+F && 0>=G ], cost: 3 550: f7 -> f223 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 4 40: f223 -> f226 : [ A>=1 ], cost: 1 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 492: f226 -> [84] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 493: f226 -> [84] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 551: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && B==A ], cost: 8-K+H 552: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && B==A && 1+H>=1+F ], cost: 9-K+H 554: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 555: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 557: f226 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 562: f226 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A ], cost: 8-2*G+2*A 567: f226 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 570: f226 -> f226 : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 11-2*G+2*A 573: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && 0==A ], cost: 8+2*B-K+H 574: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && 0==A && 1+H>=1+F ], cost: 9+2*B-K+H 578: f226 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 592: f226 -> f226 : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 11+2*B-K+H 606: f226 -> [86] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7-K+H 607: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 608: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7+2*B-K+H 609: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 610: f226 -> [86] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 611: f226 -> f226 : A1'=free_52, B'=0, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=A, Q'=1, K'=1+H, R'=-G+R+A, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && G-A==0 && free_46>=1 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1 && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && -G+A>=1 ], cost: -10*G+10*A 612: f226 -> f226 : A1'=free_99, B'=0, B1'=free_98, C1'=-free_118+free_125, E'=free_83*free_77-free_88, E1'=-free_71, F1'=free_71, G'=2+H, G1'=1+H, Q'=free_120, K'=2+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=free_114, X'=free_122+free_117, Y'=free_85, Z'=free_46, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && G-A==0 && free_46>=1 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1 && R==30 && 0>=1+free_60 && free_64*free_71*free_75+free_64*free_62>=free_60*free_64*free_75 && free_60*free_64*free_75+free_75>=1+free_64*free_71*free_75+free_64*free_62 && free_61^2+free_75>=free_128^2+free_73*free_61+free_64^2 && free_128^2+free_73+free_73*free_61+free_64^2>=1+free_61^2+free_75 && free_73>=free_74 && free_64*free_62+free_64*free_71*free_72>=free_60*free_64*free_72 && free_60*free_64*free_72+free_72>=1+free_64*free_62+free_64*free_71*free_72 && free_61^2+free_72>=free_128^2+free_64^2+free_76*free_61 && free_128^2+free_76+free_64^2+free_76*free_61>=1+free_61^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_74>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && 2-A+H==0 && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88) && free_122+free_121*(free_83*free_81+free_93)*free_122*(free_83*free_77-free_88)>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_121*free_90*free_117*free_85 && free_117+free_121*free_90*free_117*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=free_121*(free_83*free_81+free_93)*free_125*free_90 && free_125+free_121*(free_83*free_81+free_93)*free_125*free_90>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=free_121*free_118*(free_83*free_77-free_88)*free_85 && free_118+free_121*free_118*(free_83*free_77-free_88)*free_85>=1+(free_83*free_77-free_88)*free_85 && free_121>=1 && G1>=1+F && free_85>=free_121*free_123*free_85 && free_123+free_121*free_123*free_85>=1+free_85 && free_123>=free_120 && free_85>=free_121*free_119*free_85 && free_119+free_121*free_119*free_85>=1+free_85 && free_120>=free_119 && 1>=free_121*free_115 && free_121*free_115+free_115>=2 && 1>=free_121*free_127 && free_121*free_127+free_127>=2 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_126 && free_121*(free_83*free_81+free_93)*free_126+free_126>=1+free_83*free_81+free_93 && free_126>=free_114 && free_83*free_81+free_93>=free_121*(free_83*free_81+free_93)*free_124 && free_121*(free_83*free_81+free_93)*free_124+free_124>=1+free_83*free_81+free_93 && free_114>=free_124 && H>=G1 && free_115<=free_127 && free_84<=free_86 && free_95<=free_78 && free_43<=free_45 && free_37<=free_41 && 30-R>=1 ], cost: 360-12*R 613: f226 -> f226 : A1'=free_62, B'=0, B1'=free_131, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=30+G-R, Q'=1, K'=1+H, R'=31, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_64, Z'=C-free_129, [ 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && A>=1 && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_67*free_61+free_131^2+free_64^2 && free_67*free_61+free_131^2+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_131^2+free_70*free_61+free_64^2 && free_131^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && 30-R>=1 ], cost: 300-10*R Chained accelerated rules (with incoming rules): Start location: f2 2: f2 -> f7 : C'=0, D'=0, E'=0, [], cost: 1 614: f2 -> f7 : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 615: f2 -> f7 : A'=1+F, B'=1+G, C'=0, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 616: f2 -> f7 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 617: f2 -> f7 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 618: f2 -> f7 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 426: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 4-A+H 427: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 428: f7 -> [82] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 429: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 4-A+H 430: f7 -> [82] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 7+3*F-A-3*K+H 476: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 3-A+H 477: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 478: f7 -> [83] : [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 480: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 6-A+H 481: f7 -> [83] : [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 9+3*F-A-3*K+H 524: f7 -> [85] : [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 10+F-A-3*K+3*H 525: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 526: f7 -> [85] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 527: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 10+F-A 528: f7 -> [85] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 13+4*F-A-3*K 549: f7 -> f223 : [ G>=1+F && 0>=G ], cost: 3 550: f7 -> f223 : B'=G, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 4 40: f223 -> f226 : [ A>=1 ], cost: 1 619: f223 -> f226 : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 12-2*G+2*A 620: f223 -> f226 : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 12+2*B-K+H 372: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 1+2*B 373: f226 -> [78] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 1+2*B 374: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 1+2*B 375: f226 -> [78] : [ 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 1+2*B 492: f226 -> [84] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 6-2*G+2*A 493: f226 -> [84] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 5-2*G+2*A 551: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && B==A ], cost: 8-K+H 552: f226 -> f223 : A'=-1+B, A1'=free_48, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && B==A && 1+H>=1+F ], cost: 9-K+H 554: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 555: f226 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 557: f226 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 562: f226 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A ], cost: 8-2*G+2*A 567: f226 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 573: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && free_128>=0 && 0==A ], cost: 8+2*B-K+H 574: f226 -> f223 : A'=-1, A1'=free_48, B'=0, B1'=free_128, E'=free_42, G'=1+G, Q'=-free_44*free_36, K'=1+H, S'=1, T'=0, U'=free_22, V'=free_21, W'=free_39, X'=free_36, Y'=free_38, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && 0>=1+free_128 && 0==A && 1+H>=1+F ], cost: 9+2*B-K+H 578: f226 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1 && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 606: f226 -> [86] : [ 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7-K+H 607: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 608: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 7+2*B-K+H 609: f226 -> [86] : [ 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H 610: f226 -> [86] : [ 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 7+2*B-K+H Eliminated locations (on tree-shaped paths): Start location: f2 621: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 5-A+H 622: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 623: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 624: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 5-A+H 625: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 626: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 4-A+H 627: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 628: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 629: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 630: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 631: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 11+F-A-3*K+3*H 632: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 633: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 634: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 635: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 636: f2 -> f223 : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G ], cost: 4 637: f2 -> f223 : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 5 638: f2 -> [85] : A'=1+H, B'=1+G, C'=free_151+free_152, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && free_151+free_152>=0 && H>=1+G && F>=2+G && F>=1+H && 0>=1+free_5*(F-H) && free_145>=0 && H>=1+F ], cost: 19+F-A-3*K+3*H 639: f2 -> [82] : A'=1+F, B'=1+G, C'=0, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 && H>=1+G && H>=1+F && 0>=1-(F-H)*free && 0>=1+free_159 ], cost: 16+3*F-A-3*K+H 640: f2 -> [82] : A'=1+F, B'=1+G, C'=0, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 && H>=1+G && H>=1+F && -(F-H)*free>=1 && 0>=1+free_159 ], cost: 16+3*F-A-3*K+H 641: f2 -> [83] : A'=1+F, B'=1+G, C'=0, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 && H>=1+G && H>=1+F && -(F-H)*free==0 ], cost: 15+3*F-A-3*K+H 642: f2 -> [83] : A'=1+F, B'=1+G, C'=0, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 && H>=1+G && H>=1+F && 0>=1-(F-H)*free && 0>=1+free_159 ], cost: 18+3*F-A-3*K+H 643: f2 -> [83] : A'=1+F, B'=1+G, C'=0, D'=0, E'=0, G'=1+G, Q'=0, J'=free, K'=1+F, L'=free_5, M'=0, M1'=free_158, N'=free_152, N1'=free_157, O'=free_151, O1'=free_157, P'=free_151+free_152, X'=free_154, Y'=-free_157*free_156, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 && H>=1+G && H>=1+F && -(F-H)*free>=1 && 0>=1+free_159 ], cost: 18+3*F-A-3*K+H 644: f2 -> [82] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && H>=1+G && H>=1+F && 0>=1-(F-H)*free ], cost: 20+3*F-A-3*K+H 645: f2 -> [83] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && H>=1+G && H>=1+F && 0>=1-(F-H)*free ], cost: 22+3*F-A-3*K+H 646: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 647: f2 -> [82] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 && H>=1+G && H>=1+F && 0>=1-(F-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 20+3*F-A-3*K+H 648: f2 -> [82] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 && H>=1+G && H>=1+F && -(F-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 20+3*F-A-3*K+H 649: f2 -> [83] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 && H>=1+G && H>=1+F && -(F-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 22+3*F-A-3*K+H 650: f2 -> [85] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 && H>=1+G && H>=1+F && 0>=1-(F-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=2+G ], cost: 26+4*F-A-3*K 651: f2 -> [85] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 && H>=1+G && H>=1+F && -(F-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=2+G ], cost: 26+4*F-A-3*K 652: f2 -> [82] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && H>=1+G && H>=1+F && -(F-H)*free>=1 && 0>=1+free_159 ], cost: 20+3*F-A-3*K+H 653: f2 -> [83] : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && H>=1+G && H>=1+F && -(F-H)*free>=1 && 0>=1+free_159 ], cost: 22+3*F-A-3*K+H 654: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 655: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 656: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 657: f2 -> [89] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 658: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 659: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 660: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2+2*B 661: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2+2*B 662: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2+2*B 663: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 2+2*B 664: f223 -> [84] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 665: f223 -> [84] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 6-2*G+2*A 666: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 667: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 668: f223 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 669: f223 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A ], cost: 9-2*G+2*A 670: f223 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 671: f223 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 672: f223 -> [86] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8-K+H 673: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 8-2*G+2*A 674: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8+2*B-K+H 675: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 676: f223 -> [86] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 677: f223 -> [78] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && 0>=1+free_21 ], cost: 13-2*G+2*B+2*A 678: f223 -> [78] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 13-2*G+2*B+2*A 679: f223 -> [78] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_24>=1 && 0>=1+free_23 ], cost: 13-2*G+2*B+2*A 680: f223 -> [78] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_24>=1 && free_23>=1 ], cost: 13-2*G+2*B+2*A 681: f223 -> [84] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 15-2*G+2*B+2*A-K+H 682: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 12-2*G+2*A 683: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 12+2*B-K+H Applied pruning (of leafs and parallel rules): Start location: f2 621: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 5-A+H 622: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 623: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 624: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 5-A+H 625: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 626: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 4-A+H 627: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 628: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 629: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 630: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 631: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 11+F-A-3*K+3*H 632: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 633: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 634: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 635: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 636: f2 -> f223 : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G ], cost: 4 637: f2 -> f223 : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 5 646: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 654: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 655: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 656: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 657: f2 -> [89] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 658: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 659: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 660: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2+2*B 661: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2+2*B 662: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2+2*B 663: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 2+2*B 664: f223 -> [84] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 665: f223 -> [84] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 6-2*G+2*A 666: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 667: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 668: f223 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 669: f223 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A ], cost: 9-2*G+2*A 670: f223 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 671: f223 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 672: f223 -> [86] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8-K+H 673: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 8-2*G+2*A 674: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8+2*B-K+H 675: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 676: f223 -> [86] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 678: f223 -> [78] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 13-2*G+2*B+2*A 681: f223 -> [84] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 15-2*G+2*B+2*A-K+H 682: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 12-2*G+2*A 683: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 12+2*B-K+H Accelerating simple loops of location 31. Accelerating the following rules: 669: f223 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=1+A, Q'=(-free_25*free_33)^(1-G+A), S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-(-free_25*free_33)^(1-G+A)*free_33^(-1), Y'=free_27, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A ], cost: 9-2*G+2*A Accelerated rule 669 with metering function -B+A, yielding the new rule 684. Removing the simple loops: 669. Accelerated all simple loops using metering functions (where possible): Start location: f2 621: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 5-A+H 622: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 623: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 624: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 5-A+H 625: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 626: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 4-A+H 627: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 628: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 629: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 630: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 631: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 11+F-A-3*K+3*H 632: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 633: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 634: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 635: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 636: f2 -> f223 : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G ], cost: 4 637: f2 -> f223 : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 5 646: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 654: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 655: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 656: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 657: f2 -> [89] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 658: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 659: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 660: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2+2*B 661: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2+2*B 662: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2+2*B 663: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 2+2*B 664: f223 -> [84] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 665: f223 -> [84] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 6-2*G+2*A 666: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 667: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 668: f223 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 670: f223 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 671: f223 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 672: f223 -> [86] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8-K+H 673: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 8-2*G+2*A 674: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8+2*B-K+H 675: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 676: f223 -> [86] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 678: f223 -> [78] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 13-2*G+2*B+2*A 681: f223 -> [84] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 15-2*G+2*B+2*A-K+H 682: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 12-2*G+2*A 683: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 12+2*B-K+H 684: f223 -> f223 : A'=-1+B, B1'=free_128, E'=free_31, G'=B, Q'=1, S'=1, T'=-1+B, U'=free_22, V'=free_21, W'=free_28, X'=-free_33^(-1), Y'=free_27, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && free_128>=0 && B==A && -B+A>=1 ], cost: -7*B+7*A Chained accelerated rules (with incoming rules): Start location: f2 621: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 5-A+H 622: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 623: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 624: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 5-A+H 625: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 626: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 4-A+H 627: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 628: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 629: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 630: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 631: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 11+F-A-3*K+3*H 632: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 633: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 634: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 635: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 636: f2 -> f223 : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G ], cost: 4 637: f2 -> f223 : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G ], cost: 5 646: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 654: f2 -> f223 : A'=1+F, B'=1+G, C'=0, D'=free_5*(F-H), E'=free_149, G'=1+G, Q'=0, J'=free, J1'=-free_149, K'=1+F, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, X'=free_148, Y'=free_148*free_149, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 655: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 656: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 657: f2 -> [89] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 658: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 659: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 660: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 2+2*B 661: f223 -> [78] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 2+2*B 662: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 2+2*B 663: f223 -> [78] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 2+2*B 664: f223 -> [84] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 7-2*G+2*A 665: f223 -> [84] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 6-2*G+2*A 666: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 667: f223 -> [81] : A1'=free_52, B1'=free_128, C1'=free_51, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 668: f223 -> [81] : A1'=free_62, B1'=free_128, C1'=free_61, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 670: f223 -> [81] : A1'=free_57, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 671: f223 -> [81] : A1'=free_57, B'=0, B1'=free_128, C1'=free_56, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 672: f223 -> [86] : [ A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8-K+H 673: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 8-2*G+2*A 674: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: 8+2*B-K+H 675: f223 -> [86] : [ A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 676: f223 -> [86] : [ A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 8+2*B-K+H 678: f223 -> [78] : A1'=free_52, B1'=free_128, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 13-2*G+2*B+2*A 681: f223 -> [84] : A1'=free_52, B'=0, B1'=free_131, C1'=free_51, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=C-free_129, [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 15-2*G+2*B+2*A-K+H 682: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 12-2*G+2*A 683: f223 -> [90] : [ A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 12+2*B-K+H Eliminated locations (on tree-shaped paths): Start location: f2 621: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 5-A+H 622: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 623: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 624: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 5-A+H 625: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 626: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 4-A+H 627: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 628: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 629: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 630: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 631: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 11+F-A-3*K+3*H 632: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 633: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 634: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 635: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 655: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 656: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 657: f2 -> [89] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 658: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 659: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 685: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 6+2*B 686: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 6+2*B 687: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 6+2*B 688: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 6+2*B 689: f2 -> [84] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 11-2*G+2*A 690: f2 -> [84] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 10-2*G+2*A 691: f2 -> [81] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 692: f2 -> [81] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 693: f2 -> [81] : A1'=free_62, B1'=free_128, C'=0, C1'=free_61, D'=0, D1'=free_65, E'=free_63, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=30, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 694: f2 -> [81] : A1'=free_57, B1'=free_128, C'=0, C1'=free_56, D'=0, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 695: f2 -> [81] : A1'=free_57, B'=0, B1'=free_128, C'=0, C1'=free_56, D'=0, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 696: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 12-2*G+2*A 697: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 12+2*B-K+H 698: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 12+2*B-K+H 699: f2 -> [78] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 17-2*G+2*B+2*A 700: f2 -> [84] : A1'=free_52, B'=0, B1'=free_131, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=-free_129, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 19-2*G+2*B+2*A-K+H 701: f2 -> [90] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 16-2*G+2*A 702: f2 -> [90] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 16+2*B-K+H 703: f2 -> [78] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 0>=1+free_21 ], cost: 7+2*G 704: f2 -> [78] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && free_21>=1 ], cost: 7+2*G 705: f2 -> [78] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && free_24>=1 && 0>=1+free_23 ], cost: 7+2*G 706: f2 -> [78] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && free_24>=1 && free_23>=1 ], cost: 7+2*G 707: f2 -> [84] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=-1+G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 14-2*G+2*A 708: f2 -> [81] : A1'=free_57, B'=G, B1'=free_128, C'=0, C1'=free_56, D'=0, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+G && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 709: f2 -> [86] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=-1+G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 15-2*G+2*A 710: f2 -> [86] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=G ], cost: 13+2*G-K+H 711: f2 -> [86] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && free_24>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=G ], cost: 13+2*G-K+H 712: f2 -> [78] : A1'=free_52, B'=G, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 20+2*A 713: f2 -> [84] : A1'=free_52, B'=0, B1'=free_131, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=-free_129, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 22+2*A-K+H 714: f2 -> [90] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 19-2*G+2*A 715: f2 -> [90] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 17+2*G-K+H 716: f2 -> [81] : A'=1+F, A1'=free_52, B'=1+G, B1'=free_128, C'=0, C1'=free_51, D'=free_5*(F-H), D1'=free_65, E'=free_53, E1'=free_65, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, S'=1, T'=F, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 717: f2 -> [81] : A'=1+F, A1'=free_52, B'=1+G, B1'=free_128, C'=0, C1'=free_51, D'=free_5*(F-H), E'=free_53, E1'=-free_71, F1'=free_71, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, S'=1, T'=F, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 718: f2 -> [81] : A'=1+F, A1'=free_62, B'=1+G, B1'=free_128, C'=0, C1'=free_61, D'=free_5*(F-H), D1'=free_65, E'=free_63, E1'=free_65, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, R'=30, S'=1, T'=F, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 719: f2 -> [81] : A'=1+F, A1'=free_52, B'=1+G, B1'=free_128, C'=0, C1'=free_51, D'=free_5*(F-H), D1'=free_65, E'=free_53, E1'=free_65, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, S'=1, T'=F, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 720: f2 -> [81] : A'=1+F, A1'=free_52, B'=1+G, B1'=free_128, C'=0, C1'=free_51, D'=free_5*(F-H), E'=free_53, E1'=-free_71, F1'=free_71, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, S'=1, T'=F, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 721: f2 -> [81] : A'=1+F, A1'=free_62, B'=1+G, B1'=free_128, C'=0, C1'=free_61, D'=free_5*(F-H), D1'=free_65, E'=free_63, E1'=free_65, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, M1'=free_158, N'=free_144, N1'=free_157, O'=free_143, O1'=free_157, P'=free_144+free_143, R'=30, S'=1, T'=F, W'=1, X'=free_68, Y'=free_64, Z'=free_46, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && R==30 && free_60>=0 && free_64*free_62>=free_60*free_64*free_69+free_64*free_65*free_69 && free_60*free_64*free_69+free_64*free_65*free_69+free_69>=1+free_64*free_62 && free_61^2+free_69>=free_128^2+free_67*free_61+free_64^2 && free_128^2+free_67*free_61+free_67+free_64^2>=1+free_61^2+free_69 && free_67>=free_68 && free_64*free_62>=free_66*free_64*free_65+free_66*free_60*free_64 && free_66+free_66*free_64*free_65+free_66*free_60*free_64>=1+free_64*free_62 && free_66+free_61^2>=free_128^2+free_70*free_61+free_64^2 && free_128^2+free_70+free_70*free_61+free_64^2>=1+free_66+free_61^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_61>=free_61*free_88*free_82 && free_61*free_88*free_82+free_88>=1+free_83*free_61 && free_61*free_68>=free_93*free_61*free_82 && free_93*free_61*free_82+free_93>=1+free_61*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 722: f2 -> [92] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 723: f2 -> [92] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K Applied pruning (of leafs and parallel rules): Start location: f2 621: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 5-A+H 622: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 623: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 624: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 5-A+H 625: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 626: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 4-A+H 627: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 628: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 629: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 630: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 631: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 11+F-A-3*K+3*H 632: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 633: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 634: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 635: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 655: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 656: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 657: f2 -> [89] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 658: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 659: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 685: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 6+2*B 686: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 6+2*B 687: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 6+2*B 688: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 6+2*B 689: f2 -> [84] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 11-2*G+2*A 690: f2 -> [84] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 10-2*G+2*A 691: f2 -> [81] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 692: f2 -> [81] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 694: f2 -> [81] : A1'=free_57, B1'=free_128, C'=0, C1'=free_56, D'=0, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 696: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 12-2*G+2*A 697: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 12+2*B-K+H 698: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 12+2*B-K+H 699: f2 -> [78] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 17-2*G+2*B+2*A 700: f2 -> [84] : A1'=free_52, B'=0, B1'=free_131, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=-free_129, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 19-2*G+2*B+2*A-K+H 701: f2 -> [90] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 16-2*G+2*A 702: f2 -> [90] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 16+2*B-K+H 707: f2 -> [84] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=-1+G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 14-2*G+2*A 708: f2 -> [81] : A1'=free_57, B'=G, B1'=free_128, C'=0, C1'=free_56, D'=0, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+G && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 709: f2 -> [86] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=-1+G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 15-2*G+2*A 711: f2 -> [86] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && free_24>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=G ], cost: 13+2*G-K+H 713: f2 -> [84] : A1'=free_52, B'=0, B1'=free_131, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=-free_129, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 22+2*A-K+H 714: f2 -> [90] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 19-2*G+2*A 715: f2 -> [90] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 17+2*G-K+H 716: f2 -> [81] : A'=1+F, A1'=free_52, B'=1+G, B1'=free_128, C'=0, C1'=free_51, D'=free_5*(F-H), D1'=free_65, E'=free_53, E1'=free_65, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, S'=1, T'=F, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 722: f2 -> [92] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 723: f2 -> [92] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K ### Computing asymptotic complexity ### Fully simplified ITS problem Start location: f2 621: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ], cost: 5-A+H 623: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 ], cost: 8+3*F-A-3*K+H 624: f2 -> [82] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 ], cost: 5-A+H 626: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free==0 ], cost: 4-A+H 627: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 628: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 629: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F ], cost: 7-A+H 630: f2 -> [83] : C'=0, D'=0, E'=0, [ F>=G && H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 ], cost: 10+3*F-A-3*K+H 631: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && A>=1+H && F>=1+G && F>=A && 0>=1+free_5*(1+F-A) && free_145>=0 && H>=K ], cost: 11+F-A-3*K+3*H 632: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 633: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && free_153>=free_154 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 634: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && 0>=1+free_159 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 11+F-A 635: f2 -> [85] : C'=0, D'=0, E'=0, [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 ], cost: 14+4*F-A-3*K 655: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && 1+H>=1+F && free_151+free_152>=0 ], cost: 13+3*F-A-3*K+H 656: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && free_153>=free_154 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && free_154>=free_155 && F>=1+G && F>=1+H && free_5*(F-H)==0 && 0>=1+free_151+free_152 ], cost: 13+4*F-A-3*K 657: f2 -> [89] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 658: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && K>=1+F && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && K>=1+H && 0>=1+free_144+free_143 ], cost: 14+F-A 659: f2 -> [89] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 ], cost: 17+4*F-A-3*K 685: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 0>=1+free_21 ], cost: 6+2*B 686: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 ], cost: 6+2*B 687: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 ], cost: 6+2*B 688: f2 -> [78] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && free_23>=1 ], cost: 6+2*B 690: f2 -> [84] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && K>=1+H ], cost: 10-2*G+2*A 691: f2 -> [81] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 692: f2 -> [81] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, E'=free_53, E1'=-free_71, F1'=free_71, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_74, Y'=free_54, Z'=free_46, [ G>=1+F && 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && A>=G && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A && A>=1+B && 29>=R && 0>=1+free_50 && free_54*free_52+free_54*free_71*free_75>=free_50*free_54*free_75 && free_50*free_54*free_75+free_75>=1+free_54*free_52+free_54*free_71*free_75 && free_51^2+free_75>=free_128^2+free_73*free_51+free_54^2 && free_128^2+free_73+free_73*free_51+free_54^2>=1+free_51^2+free_75 && free_73>=free_74 && free_54*free_52+free_54*free_71*free_72>=free_50*free_54*free_72 && free_50*free_54*free_72+free_72>=1+free_54*free_52+free_54*free_71*free_72 && free_51^2+free_72>=free_76*free_51+free_128^2+free_54^2 && free_76*free_51+free_128^2+free_76+free_54^2>=1+free_51^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_74>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_74 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=1+H && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 694: f2 -> [81] : A1'=free_57, B1'=free_128, C'=0, C1'=free_56, D'=0, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+B && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 696: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 12-2*G+2*A 697: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 12+2*B-K+H 698: f2 -> [86] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 30>=R && free_24>=1 && B>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=1+G ], cost: 12+2*B-K+H 699: f2 -> [78] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+A, Q'=1, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=free_35, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 && free_21>=1 ], cost: 17-2*G+2*B+2*A 700: f2 -> [84] : A1'=free_52, B'=0, B1'=free_131, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=-free_129, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 19-2*G+2*B+2*A-K+H 701: f2 -> [90] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+B && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 16-2*G+2*A 702: f2 -> [90] : C'=0, D'=0, E'=0, [ G>=1+F && 0>=G && A>=1 && 0>=1+free_22 && B>=1 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 16+2*B-K+H 708: f2 -> [81] : A1'=free_57, B'=G, B1'=free_128, C'=0, C1'=free_56, D'=0, E'=free_58, E1'=-free_71, F1'=free_71, G'=1+A, Q'=1, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_74, Y'=free_59, Z'=free_35, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H && A>=1+G && R>=31 && 0>=1+free_55 && free_57*free_59+free_71*free_75*free_59>=free_55*free_75*free_59 && free_55*free_75*free_59+free_75>=1+free_57*free_59+free_71*free_75*free_59 && free_56^2+free_75>=free_128^2+free_73*free_56+free_59^2 && free_128^2+free_73+free_73*free_56+free_59^2>=1+free_56^2+free_75 && free_73>=free_74 && free_71*free_59*free_72+free_57*free_59>=free_55*free_59*free_72 && free_55*free_59*free_72+free_72>=1+free_71*free_59*free_72+free_57*free_59 && free_56^2+free_72>=free_128^2+free_76*free_56+free_59^2 && free_128^2+free_76+free_76*free_56+free_59^2>=1+free_56^2+free_72 && free_74>=free_76 && free_74>=free_77*free_82 && free_77*free_82+free_77>=1+free_74 && free_83*free_56>=free_88*free_56*free_82 && free_88*free_56*free_82+free_88>=1+free_83*free_56 && free_74*free_56>=free_93*free_56*free_82 && free_93+free_93*free_56*free_82>=1+free_74*free_56 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && -1+A>=K && free_74*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_74*free_94 && free_89>=free_90 && free_74*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_74*free_94 && free_90>=free_87 && free_74>=free_86*free_82 && free_86+free_86*free_82>=1+free_74 && free_74>=free_84*free_82 && free_84+free_84*free_82>=1+free_74 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 709: f2 -> [86] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && A>=-1+G && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && free_27>=free_32 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_34>=free_27 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_30>=free_28 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && free_28>=free_26 && K>=1+H ], cost: 15-2*G+2*A 711: f2 -> [86] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 30>=R && free_24>=1 && 0>=1+free_23 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && A>=G ], cost: 13+2*G-K+H 713: f2 -> [84] : A1'=free_52, B'=0, B1'=free_131, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=G, Q'=1, K'=1+H, R'=1+R, S'=1, T'=-1+A, U'=free_22, V'=free_21, W'=1, X'=free_68, Y'=free_54, Z'=-free_129, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 && free_46>=1 && free_38>=free_43 && free_45>=free_38 && free_41>=free_39 && free_39>=free_37 ], cost: 22+2*A-K+H 714: f2 -> [90] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && 1>=free_29*free_33 && free_29*free_33+free_33>=2 && 0>=1+free_35 && 1>=free_32*free_29 && free_32*free_29+free_32>=2 && 1>=free_34*free_29 && free_34+free_34*free_29>=2 && free_31>=free_31*free_29*free_30 && free_31*free_29*free_30+free_30>=1+free_31 && free_31>=free_31*free_29*free_26 && free_31*free_29*free_26+free_26>=1+free_31 && K>=1+H && A>=1+G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && K>=A && free_26<=free_30 && free_32<=free_34 ], cost: 19-2*G+2*A 715: f2 -> [90] : B'=G, C'=0, D'=0, E'=free_16, G'=-1+G, [ G>=1+F && G>=1 && 0>=-1+G && A>=1 && 0>=1+free_22 && free_21>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_40*free_43+free_43>=2 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && H>=K && A>=G && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_131^2+free_54^2+free_67*free_51 && free_131^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_131^2+free_70*free_51+free_54^2 && free_131^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && 1+H>=A && free_43<=free_45 && free_37<=free_41 ], cost: 17+2*G-K+H 716: f2 -> [81] : A'=1+F, A1'=free_52, B'=1+G, B1'=free_128, C'=0, C1'=free_51, D'=free_5*(F-H), D1'=free_65, E'=free_53, E1'=free_65, G'=2+G, Q'=1, J'=free, J1'=-free_149, K'=1+H, K1'=free_150, L'=free_5, L1'=free_149, M'=0, N'=free_144, O'=free_143, O1'=-free_160, P'=free_144+free_143, P1'=free_161, Q1_1'=free_160, S'=1, T'=F, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G && 1+F>=1 && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=1+F && 29>=R && free_50>=0 && free_54*free_52>=free_54*free_65*free_69+free_50*free_54*free_69 && free_54*free_65*free_69+free_50*free_54*free_69+free_69>=1+free_54*free_52 && free_51^2+free_69>=free_128^2+free_54^2+free_67*free_51 && free_128^2+free_67+free_54^2+free_67*free_51>=1+free_51^2+free_69 && free_67>=free_68 && free_54*free_52>=free_66*free_50*free_54+free_66*free_54*free_65 && free_66+free_66*free_50*free_54+free_66*free_54*free_65>=1+free_54*free_52 && free_66+free_51^2>=free_128^2+free_70*free_51+free_54^2 && free_128^2+free_70+free_70*free_51+free_54^2>=1+free_66+free_51^2 && free_68>=free_70 && free_68>=free_77*free_82 && free_77*free_82+free_77>=1+free_68 && free_83*free_51>=free_51*free_88*free_82 && free_51*free_88*free_82+free_88>=1+free_83*free_51 && free_51*free_68>=free_93*free_51*free_82 && free_93+free_93*free_51*free_82>=1+free_51*free_68 && free_83>=free_81*free_82 && free_81*free_82+free_81>=1+free_83 && free_83>=free_78*free_82 && free_78*free_82+free_78>=1+free_83 && free_83>=free_95*free_82 && free_95+free_95*free_82>=1+free_83 && free_83*free_94>=free_92*free_94*free_82 && free_92*free_94*free_82+free_92>=1+free_83*free_94 && free_92>=free_85 && free_83*free_94>=free_94*free_91*free_82 && free_91+free_94*free_91*free_82>=1+free_83*free_94 && free_85>=free_91 && free_68*free_94>=free_89*free_94*free_82 && free_89+free_89*free_94*free_82>=1+free_68*free_94 && free_89>=free_90 && free_68*free_94>=free_87*free_94*free_82 && free_87+free_87*free_94*free_82>=1+free_68*free_94 && free_90>=free_87 && free_68>=free_86*free_82 && free_86+free_86*free_82>=1+free_68 && free_68>=free_84*free_82 && free_84+free_84*free_82>=1+free_68 && (free_83*free_81+free_93)*(free_83*free_77-free_88)>=free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107 && free_108+free_108*(free_83*free_81+free_93)*(free_83*free_77-free_88)*free_107>=1+(free_83*free_81+free_93)*(free_83*free_77-free_88) && free_90*free_85>=free_90*free_103*free_107*free_85 && free_103+free_90*free_103*free_107*free_85>=1+free_90*free_85 && (free_83*free_81+free_93)*free_90>=(free_83*free_81+free_93)*free_90*free_107*free_111 && free_111+(free_83*free_81+free_93)*free_90*free_107*free_111>=1+(free_83*free_81+free_93)*free_90 && (free_83*free_77-free_88)*free_85>=(free_83*free_77-free_88)*free_107*free_104*free_85 && (free_83*free_77-free_88)*free_107*free_104*free_85+free_104>=1+(free_83*free_77-free_88)*free_85 && 0>=1+free_107 && G1>=1+F && free_85>=free_109*free_107*free_85 && free_109*free_107*free_85+free_109>=1+free_85 && free_85>=free_105*free_107*free_85 && free_105+free_105*free_107*free_85>=1+free_85 && 1>=free_107*free_101 && free_107*free_101+free_101>=2 && 1>=free_113*free_107 && free_113*free_107+free_113>=2 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_112*free_107 && free_112+(free_83*free_81+free_93)*free_112*free_107>=1+free_83*free_81+free_93 && free_83*free_81+free_93>=(free_83*free_81+free_93)*free_110*free_107 && free_110+(free_83*free_81+free_93)*free_110*free_107>=1+free_83*free_81+free_93 && G1>=1+H && free_84<=free_86 && free_95<=free_78 && free_101<=free_113 && free_105<=free_109 && free_110<=free_112 ], cost: NONTERM 722: f2 -> [92] : [ H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 && F>=K && 0>=free_160*free_159*free_153 && free_160*free_159*free_153+free_153>=1 && 0>=free_160*free_155*free_159 && free_155+free_160*free_155*free_159>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K 723: f2 -> [92] : [ H>=G && H>=A && -(-1+A-H)*free>=1 && free_156>=0 && F>=K && 0>=-free_157*free_156*free_153 && -free_157*free_156*free_153+free_153>=1 && 0>=-free_157*free_155*free_156 && -free_157*free_155*free_156+free_155>=1 && F>=1+G && F>=1+H && free_5*(F-H)>=1 && 0>=1+free_148 && 0>=1+free_144+free_143 && free_155<=free_153 && 1+G>=1+F && 0>=1+G ], cost: 20+4*F-A-3*K Computing asymptotic complexity for rule 621 Solved the limit problem by the following transformations: Created initial limit problem: 5-A+H (+), -free_159 (+/+!), 1-G+H (+/+!), 1-A+H (+/+!), 1-G+F (+/+!), (-1+A-H)*free (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {G==0,F==0,A==1-n,free==-1,free_159==-n,H==0} resulting limit problem: [solved] Solution: G / 0 F / 0 A / 1-n free / -1 free_159 / -n H / 0 Resulting cost 4+n has complexity: Poly(n^1) Found new complexity Poly(n^1). Computing asymptotic complexity for rule 691 Simplified the guard: 691: f2 -> [81] : A1'=free_52, B1'=free_128, C'=0, C1'=free_51, D'=0, D1'=free_65, E'=free_53, E1'=free_65, G'=1+G, Q'=1, K'=1+H, S'=1, T'=-1+A, W'=1, X'=free_68, Y'=free_54, Z'=free_46, [ 0>=G && A>=1 && 0>=B && 1>=free_40*free_44 && free_44+free_40*free_44>=2 && free_46>=1 && free_40*free_43+free_43>=2 && free_38>=free_43 && 1>=free_40*free_45 && free_40*free_45+free_45>=2 && free_45>=free_38 && free_42>=free_40*free_41*free_42 && free_41+free_40*free_41*free_42>=1+free_42 && free_41>=free_39 && free_42>=free_40*free_37*free_42 && free_37+free_40*free_37*free_42>=1+free_42 && free_39>=free_37 && H>=K && 1+G>=1+A ], cost: NONTERM Could not solve the limit problem. Resulting cost 0 has complexity: Unknown Obtained the following overall complexity (w.r.t. the length of the input n): Complexity: Poly(n^1) Cpx degree: 1 Solved cost: 4+n Rule cost: 5-A+H Rule guard: [ F>=G && H>=G && H>=A && 0>=1-(-1+A-H)*free && 0>=1+free_159 ] WORST_CASE(Omega(n^1),?) ---------------------------------------- (2) BOUNDS(n^1, INF)