89.32/74.76 WORST_CASE(Omega(n^1), O(n^1)) 89.32/74.78 proof of /export/starexec/sandbox/benchmark/theBenchmark.koat 89.32/74.78 # AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty 89.32/74.78 89.32/74.78 89.32/74.78 The runtime complexity of the given CpxIntTrs could be proven to be BOUNDS(n^1, nat(1 + Arg_0 + -1 * Arg_2) + max(6, 7 + Arg_0 + -1 * Arg_2) + nat(1 + Arg_0 + -1 * Arg_3)). 89.32/74.78 89.32/74.78 (0) CpxIntTrs 89.32/74.78 (1) Koat2 Proof [FINISHED, 6792 ms] 89.32/74.78 (2) BOUNDS(1, nat(1 + Arg_0 + -1 * Arg_2) + max(6, 7 + Arg_0 + -1 * Arg_2) + nat(1 + Arg_0 + -1 * Arg_3)) 89.32/74.78 (3) Loat Proof [FINISHED, 72.8 s] 89.32/74.78 (4) BOUNDS(n^1, INF) 89.32/74.78 89.32/74.78 89.32/74.78 ---------------------------------------- 89.32/74.78 89.32/74.78 (0) 89.32/74.78 Obligation: 89.32/74.78 Complexity Int TRS consisting of the following rules: 89.32/74.78 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) -> Com_1(f5(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)) :|: TRUE 89.32/74.78 f5(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) -> Com_1(f8(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)) :|: A >= B 89.32/74.78 f8(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) -> Com_1(f8(A, B, C + 1, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: A >= C 89.32/74.78 f17(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) -> Com_1(f17(A, B + 1, C, B1, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: A >= B 89.32/74.78 f27(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) -> Com_1(f31(A, B, C, D, E, 0, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: 50 >= E 89.32/74.78 f31(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) -> Com_1(f34(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)) :|: A >= 1 + B 89.32/74.78 f34(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) -> Com_1(f34(A, B, C + 1, D, E, F + B1, B1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: A >= C 89.32/74.78 f46(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) -> Com_1(f50(A, B, C, D, E, F, G, B1, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: 3 >= E 89.32/74.78 f46(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) -> Com_1(f50(A, B, C, D, E, F, G, 0, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: E >= 4 89.32/74.78 f50(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) -> Com_1(f53(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)) :|: A >= 1 + B 89.32/74.78 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) -> Com_1(f53(A, B, C + 1, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: H >= I 89.32/74.78 f53(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) -> Com_1(f53(A, B, C + 1, D, E, F, G, H, I, B1, 100 * B1, C1, C1 + 100 * B1, D1, D1 + 100 * B1, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: A >= C && E >= 5 89.32/74.78 f53(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) -> Com_1(f69(A, B, C, D, E, F, G, H, C1, B1, 100 * B1, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: A >= C && 4 >= E 89.32/74.78 f53(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) -> Com_1(f69(A, B, C, D, E, F, G, H, F1, B1, 100 * B1, C1, C1 + 100 * B1, D1, E1, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: E >= 5 && A >= C && E1 >= D1 + 100 * B1 + 1 89.32/74.78 f53(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) -> Com_1(f69(A, B, C, D, E, F, G, H, F1, B1, 100 * B1, C1, C1 + 100 * B1, D1, E1, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: E >= 5 && A >= C && D1 + 100 * B1 >= 1 + E1 89.32/74.78 f53(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) -> Com_1(f69(A, B, C, D, E, F, G, H, E1, B1, 100 * B1, C1, D1, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: E >= 5 && A >= C && D1 >= C1 + 100 * B1 + 1 89.32/74.78 f53(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) -> Com_1(f69(A, B, C, D, E, F, G, H, E1, B1, 100 * B1, C1, D1, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: E >= 5 && A >= C && C1 + 100 * B1 >= 1 + D1 89.32/74.78 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) -> Com_1(f80(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, B1 - C1, D1, E1, F1, K1, G1, I1, W, X, Y, Z, A1)) :|: E1 >= D1 + K + 1 && 1 >= G1 * H1 + H1 * I1 && G1 * H1 + H1 * I1 + H1 >= 2 && F1 >= H1 && 1 >= G1 * J1 + I1 * J1 && G1 * J1 + I1 * J1 + J1 >= 2 && J1 >= F1 && I >= 1 + H 89.32/74.78 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) -> Com_1(f80(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, B1 - C1, D1, E1, F1, K1, G1, I1, W, X, Y, Z, A1)) :|: D1 + K >= 1 + E1 && 1 >= G1 * H1 + H1 * I1 && G1 * H1 + H1 * I1 + H1 >= 2 && F1 >= H1 && 1 >= G1 * J1 + I1 * J1 && G1 * J1 + I1 * J1 + J1 >= 2 && J1 >= F1 && I >= 1 + H 89.32/74.78 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) -> Com_1(f92(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, S * B1, Q, R, S, T, U, V, C1, D1, E1, F1, A1)) :|: T >= 0 && S >= S * C1 * K1 && S * C1 * K1 + K1 >= S + 1 && K1 >= E1 && S >= S * C1 * G1 && S * C1 * G1 + G1 >= S + 1 && E1 >= G1 && 1 >= C1 * I1 && C1 * I1 + I1 >= 2 && D1 >= I1 && 1 >= C1 * H1 && C1 * H1 + H1 >= 2 && H1 >= D1 && S >= S * C1 * J1 && S * C1 * J1 + J1 >= S + 1 && 1 >= C1 * L1 && C1 * L1 + L1 >= 2 && J1 >= M1 + L1 * M1 && 2 * M1 + L1 * M1 >= J1 + 1 && M1 >= F1 && S >= S * C1 * N1 && S * C1 * N1 + N1 >= S + 1 && 1 >= C1 * O1 && C1 * O1 + O1 >= 2 && N1 >= P1 + O1 * P1 && 2 * P1 + O1 * P1 >= N1 + 1 && F1 >= P1 89.32/74.78 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) -> Com_1(f92(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, B1, C1, C1 + K, D1, T, U, V, E1, F1, K1, G1, A1)) :|: H1 >= E1 * H1 * I1 && E1 * H1 * I1 + I1 >= H1 + 1 && L1 >= E1 * J1 * L1 && E1 * J1 * L1 + J1 >= L1 + 1 && N1 >= E1 * M1 * N1 && E1 * M1 * N1 + M1 >= N1 + 1 && I1 + M1 * O1 >= J1 * O1 && J1 * O1 + O1 >= M1 * O1 + I1 + 1 && O1 >= K1 && H1 >= E1 * H1 * P1 && E1 * H1 * P1 + P1 >= H1 + 1 && L1 >= E1 * L1 * Q1 && E1 * L1 * Q1 + Q1 >= L1 + 1 && N1 >= E1 * N1 * R1 && E1 * N1 * R1 + R1 >= N1 + 1 && P1 + R1 * S1 >= Q1 * S1 && Q1 * S1 + S1 >= R1 * S1 + P1 + 1 && K1 >= S1 && H1 >= E1 * H1 * T1 && E1 * H1 * T1 + T1 >= H1 + 1 && L1 >= E1 * L1 * U1 && E1 * L1 * U1 + U1 >= L1 + 1 && N1 >= E1 * N1 * V1 && E1 * N1 * V1 + V1 >= N1 + 1 && T1 + V1 * W1 >= U1 * W1 && U1 * W1 + W1 >= V1 * W1 + T1 + 1 && 1 >= E1 * X1 && E1 * X1 + X1 >= 2 && W1 >= Y1 + X1 * Y1 && 2 * Y1 + X1 * Y1 >= W1 + 1 && Y1 >= G1 && H1 >= E1 * H1 * Z1 && E1 * H1 * Z1 + Z1 >= H1 + 1 && L1 >= E1 * L1 * A2 && E1 * L1 * A2 + A2 >= L1 + 1 && N1 >= E1 * N1 * B2 && E1 * N1 * B2 + B2 >= N1 + 1 && Z1 + B2 * C2 >= A2 * C2 && A2 * C2 + C2 >= B2 * C2 + Z1 + 1 && 1 >= E1 * D2 && E1 * D2 + D2 >= 2 && C2 >= E2 + D2 * E2 && 2 * E2 + D2 * E2 >= C2 + 1 && G1 >= E2 && H1 + N1 * F2 >= L1 * F2 && L1 * F2 + F2 >= N1 * F2 + H1 + 1 && F2 >= D1 && H1 + N1 * G2 >= L1 * G2 && L1 * G2 + G2 >= N1 * G2 + H1 + 1 && D1 >= G2 && H1 * H2 + N1 * H2 * I2 >= L1 * H2 * I2 && L1 * H2 * I2 + I2 >= N1 * H2 * I2 + H1 * H2 + 1 && I2 >= B1 && H1 * H2 + N1 * H2 * J2 >= L1 * H2 * J2 && L1 * H2 * J2 + J2 >= N1 * H2 * J2 + H1 * H2 + 1 && B1 >= J2 && 1 >= E1 * K2 && E1 * K2 + K2 >= 2 && F1 >= K2 && 1 >= E1 * L2 && E1 * L2 + L2 >= 2 && L2 >= F1 && I >= 1 + H 89.32/74.78 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) -> Com_1(f92(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, -(S) * B1, Q, R, -(S), T, U, V, C1, D1, -(S) * E1, F1, A1)) :|: 1 >= C1 * E1 && C1 * E1 + E1 >= 2 && 0 >= T + 1 && 1 >= C1 * K1 && C1 * K1 + K1 >= 2 && D1 >= K1 && 1 >= C1 * G1 && C1 * G1 + G1 >= 2 && G1 >= D1 && 1 >= C1 * I1 && C1 * I1 + I1 >= 2 && 1 >= C1 * H1 && C1 * H1 + H1 >= 2 && 0 >= S * I1 + J1 + H1 * J1 && 2 * J1 + H1 * J1 + S * I1 >= 1 && F1 >= J1 && 1 >= C1 * L1 && C1 * L1 + L1 >= 2 && 1 >= C1 * M1 && C1 * M1 + M1 >= 2 && 0 >= S * L1 + N1 + M1 * N1 && 2 * N1 + M1 * N1 + S * L1 >= 1 && N1 >= F1 89.32/74.78 f92(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) -> Com_1(f92(A, B, C, D, E, F, G, H, I, J, B1, L, M, N, O, C1, Q, R, S, T, U, V, W, X, Y, Z, A1 + 1)) :|: B >= 1 + A1 89.32/74.78 f101(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) -> Com_1(f101(A, B, C, D, E, F, G, H, I, J, B1, L, M, N, O, C1, Q, R, S, T, U, V, W, X, Y, Z, A1 + 1)) :|: C >= 1 + A1 89.32/74.78 f110(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) -> Com_1(f110(A, B, C, D, E, F, G, H, I, J, B1, L, M, N, O, C1, Q, R, S, T, U, V, W, X, Y, Z, A1 + 1)) :|: A >= A1 89.32/74.78 f119(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) -> Com_1(f119(A, B, C, D, E, F, G, H, I, J, B1, L, M, N, O, C1, Q, R, S, T, U, V, W, X, Y, Z, A1 + 1)) :|: A >= A1 89.32/74.78 f132(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) -> Com_1(f132(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)) :|: A >= B 89.32/74.78 f132(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) -> Com_1(f27(A, B, C, D, E + 1, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: B >= 1 + A 89.32/74.78 f119(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) -> Com_1(f53(A, B, C + 1, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: A1 >= 1 + A 89.32/74.78 f110(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) -> Com_1(f119(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)) :|: A1 >= 1 + A 89.32/74.78 f101(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) -> Com_1(f110(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)) :|: A1 >= C 89.32/74.78 f92(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) -> Com_1(f101(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)) :|: A1 >= B 89.32/74.78 f53(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) -> Com_1(f50(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)) :|: C >= 1 + A 89.32/74.78 f50(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) -> Com_1(f132(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)) :|: B >= A 89.32/74.78 f34(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) -> Com_1(f31(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)) :|: C >= 1 + A 89.32/74.78 f31(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) -> Com_1(f46(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)) :|: B >= A && 0 >= F + 1 89.32/74.78 f31(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) -> Com_1(f46(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)) :|: B >= A && F >= 1 89.32/74.78 f31(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) -> Com_1(f1(A, B, C, D, E, 0, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: B >= A && F >= 0 && F <= 0 89.32/74.78 f27(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) -> 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)) :|: E >= 51 89.32/74.78 f17(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) -> Com_1(f27(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)) :|: B >= 1 + A 89.32/74.78 f8(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) -> Com_1(f5(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)) :|: C >= 1 + A 89.32/74.78 f5(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) -> Com_1(f17(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)) :|: B >= 1 + A 89.32/74.78 89.32/74.78 The start-symbols are:[f2_27] 89.32/74.78 89.32/74.78 89.32/74.78 ---------------------------------------- 89.32/74.78 89.32/74.78 (1) Koat2 Proof (FINISHED) 89.32/74.78 YES( ?, max([0, 1+Arg_0-Arg_2])+max([6, 7+Arg_0-Arg_2])+max([0, 1+Arg_0-Arg_3]) {O(n)}) 89.32/74.78 89.32/74.78 89.32/74.78 89.32/74.78 Initial Complexity Problem: 89.32/74.78 89.32/74.78 Start: f2 89.32/74.78 89.32/74.78 Program_Vars: Arg_0, Arg_1, Arg_2, Arg_3, Arg_4, Arg_5, Arg_6, Arg_7, Arg_8, Arg_9, Arg_10, Arg_11, Arg_12, Arg_13, Arg_14, Arg_15, Arg_16, Arg_17, Arg_18, Arg_19, Arg_20, Arg_21, Arg_22, Arg_23, Arg_24, Arg_25, Arg_26 89.32/74.78 89.32/74.78 Temp_Vars: 89.32/74.78 89.32/74.78 Locations: f1, f17, f2, f27, f31, f5, f8 89.32/74.78 89.32/74.78 Transitions: 89.32/74.78 89.32/74.78 f17(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:1+Arg_0 <= Arg_2 && 1+Arg_0 <= Arg_2 89.32/74.78 89.32/74.78 f2(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f5(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|: 89.32/74.78 89.32/74.78 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f1(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:1+Arg_0 <= Arg_2 && 51 <= Arg_5 89.32/74.78 89.32/74.78 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f31(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,0,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:1+Arg_0 <= Arg_2 && Arg_5 <= 50 89.32/74.78 89.32/74.78 f31(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f1(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,0,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:Arg_6 <= 0 && Arg_5+Arg_6 <= 50 && 0 <= Arg_6 && Arg_5 <= 50+Arg_6 && Arg_5 <= 50 && 1+Arg_0 <= Arg_2 && Arg_0 <= Arg_2 && Arg_6 <= 0 && 0 <= Arg_6 89.32/74.78 89.32/74.78 f5(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f17(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:1+Arg_0 <= Arg_2 89.32/74.78 89.32/74.78 f5(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f8(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:Arg_2 <= Arg_0 89.32/74.78 89.32/74.78 f8(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f5(Arg_0,Arg_1,Arg_2+1,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:Arg_2 <= Arg_0 && 1+Arg_0 <= Arg_3 89.32/74.78 89.32/74.78 f8(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26) -> f8(Arg_0,Arg_1,Arg_2,Arg_3+1,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22,Arg_23,Arg_24,Arg_25,Arg_26):|:Arg_2 <= Arg_0 && Arg_3 <= Arg_0 89.32/74.78 89.32/74.78 89.32/74.78 89.32/74.78 Timebounds: 89.32/74.78 89.32/74.78 Overall timebound: max([0, 1+Arg_0-Arg_2])+max([6, 7+Arg_0-Arg_2])+max([0, 1+Arg_0-Arg_3]) {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27: 1 {O(1)} 89.32/74.78 89.32/74.78 0: f2->f5: 1 {O(1)} 89.32/74.78 89.32/74.78 4: f27->f31: 1 {O(1)} 89.32/74.78 89.32/74.78 38: f27->f1: 1 {O(1)} 89.32/74.78 89.32/74.78 37: f31->f1: 1 {O(1)} 89.32/74.78 89.32/74.78 1: f5->f8: max([0, 1+Arg_0-Arg_2]) {O(n)} 89.32/74.78 89.32/74.78 41: f5->f17: 1 {O(1)} 89.32/74.78 89.32/74.78 2: f8->f8: max([0, 1+Arg_0-Arg_3]) {O(n)} 89.32/74.78 89.32/74.78 40: f8->f5: max([0, 1+Arg_0-Arg_2]) {O(n)} 89.32/74.78 89.32/74.78 89.32/74.78 89.32/74.78 Costbounds: 89.32/74.78 89.32/74.78 Overall costbound: max([0, 1+Arg_0-Arg_2])+max([6, 7+Arg_0-Arg_2])+max([0, 1+Arg_0-Arg_3]) {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27: 1 {O(1)} 89.32/74.78 89.32/74.78 0: f2->f5: 1 {O(1)} 89.32/74.78 89.32/74.78 4: f27->f31: 1 {O(1)} 89.32/74.78 89.32/74.78 38: f27->f1: 1 {O(1)} 89.32/74.78 89.32/74.78 37: f31->f1: 1 {O(1)} 89.32/74.78 89.32/74.78 1: f5->f8: max([0, 1+Arg_0-Arg_2]) {O(n)} 89.32/74.78 89.32/74.78 41: f5->f17: 1 {O(1)} 89.32/74.78 89.32/74.78 2: f8->f8: max([0, 1+Arg_0-Arg_3]) {O(n)} 89.32/74.78 89.32/74.78 40: f8->f5: max([0, 1+Arg_0-Arg_2]) {O(n)} 89.32/74.78 89.32/74.78 89.32/74.78 89.32/74.78 Sizebounds: 89.32/74.78 89.32/74.78 `Lower: 89.32/74.78 89.32/74.78 39: f17->f27, Arg_0: Arg_0 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_1: Arg_1 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_2: Arg_2 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_3: Arg_3 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_4: Arg_4 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_5: Arg_5 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_6: Arg_6 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_7: Arg_7 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_8: Arg_8 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_9: Arg_9 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_10: Arg_10 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_11: Arg_11 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_12: Arg_12 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_13: Arg_13 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_14: Arg_14 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_15: Arg_15 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_16: Arg_16 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_17: Arg_17 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_18: Arg_18 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_19: Arg_19 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_20: Arg_20 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_21: Arg_21 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_22: Arg_22 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_23: Arg_23 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_24: Arg_24 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_25: Arg_25 {O(n)} 89.32/74.78 89.32/74.78 39: f17->f27, Arg_26: Arg_26 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_0: Arg_0 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_1: Arg_1 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_2: Arg_2 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_3: Arg_3 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_4: Arg_4 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_5: Arg_5 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_6: Arg_6 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_7: Arg_7 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_8: Arg_8 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_9: Arg_9 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_10: Arg_10 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_11: Arg_11 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_12: Arg_12 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_13: Arg_13 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_14: Arg_14 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_15: Arg_15 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_16: Arg_16 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_17: Arg_17 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_18: Arg_18 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_19: Arg_19 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_20: Arg_20 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_21: Arg_21 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_22: Arg_22 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_23: Arg_23 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_24: Arg_24 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_25: Arg_25 {O(n)} 89.32/74.78 89.32/74.78 0: f2->f5, Arg_26: Arg_26 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_0: Arg_0 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_1: Arg_1 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_2: Arg_2 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_3: Arg_3 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_4: Arg_4 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_5: Arg_5 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_6: 0 {O(1)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_7: Arg_7 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_8: Arg_8 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_9: Arg_9 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_10: Arg_10 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_11: Arg_11 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_12: Arg_12 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_13: Arg_13 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_14: Arg_14 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_15: Arg_15 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_16: Arg_16 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_17: Arg_17 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_18: Arg_18 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_19: Arg_19 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_20: Arg_20 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_21: Arg_21 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_22: Arg_22 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_23: Arg_23 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_24: Arg_24 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_25: Arg_25 {O(n)} 89.32/74.78 89.32/74.78 4: f27->f31, Arg_26: Arg_26 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_0: Arg_0 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_1: Arg_1 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_2: Arg_2 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_3: Arg_3 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_4: Arg_4 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_5: 51 {O(1)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_6: Arg_6 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_7: Arg_7 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_8: Arg_8 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_9: Arg_9 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_10: Arg_10 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_11: Arg_11 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_12: Arg_12 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_13: Arg_13 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_14: Arg_14 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_15: Arg_15 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_16: Arg_16 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_17: Arg_17 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_18: Arg_18 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_19: Arg_19 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_20: Arg_20 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_21: Arg_21 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_22: Arg_22 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_23: Arg_23 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_24: Arg_24 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_25: Arg_25 {O(n)} 89.32/74.78 89.32/74.78 38: f27->f1, Arg_26: Arg_26 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_0: Arg_0 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_1: Arg_1 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_2: Arg_2 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_3: Arg_3 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_4: Arg_4 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_5: Arg_5 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_6: 0 {O(1)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_7: Arg_7 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_8: Arg_8 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_9: Arg_9 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_10: Arg_10 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_11: Arg_11 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_12: Arg_12 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_13: Arg_13 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_14: Arg_14 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_15: Arg_15 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_16: Arg_16 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_17: Arg_17 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_18: Arg_18 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_19: Arg_19 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_20: Arg_20 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_21: Arg_21 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_22: Arg_22 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_23: Arg_23 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_24: Arg_24 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_25: Arg_25 {O(n)} 89.32/74.78 89.32/74.78 37: f31->f1, Arg_26: Arg_26 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_0: Arg_0 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_1: Arg_1 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_2: Arg_2 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_3: Arg_3 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_4: Arg_4 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_5: Arg_5 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_6: Arg_6 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_7: Arg_7 {O(n)} 89.32/74.78 89.32/74.78 1: f5->f8, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_2: Arg_2 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_3: Arg_3 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_2: Arg_2 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_3: Arg_3 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_2: Arg_2 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_3: Arg_3 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 `Upper: 89.32/74.79 89.32/74.79 39: f17->f27, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_2: max([Arg_2, Arg_2+max([0, 1+Arg_0-Arg_2])]) {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_3: max([Arg_3, Arg_3+max([0, 1+Arg_0-Arg_3])]) {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 39: f17->f27, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_2: Arg_2 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_3: Arg_3 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 0: f2->f5, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_2: max([Arg_2, Arg_2+max([0, 1+Arg_0-Arg_2])]) {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_3: max([Arg_3, Arg_3+max([0, 1+Arg_0-Arg_3])]) {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_5: 50 {O(1)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_6: 0 {O(1)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 4: f27->f31, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_2: max([Arg_2, Arg_2+max([0, 1+Arg_0-Arg_2])]) {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_3: max([Arg_3, Arg_3+max([0, 1+Arg_0-Arg_3])]) {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 38: f27->f1, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_2: max([Arg_2, Arg_2+max([0, 1+Arg_0-Arg_2])]) {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_3: max([Arg_3, Arg_3+max([0, 1+Arg_0-Arg_3])]) {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_5: 50 {O(1)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_6: 0 {O(1)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 37: f31->f1, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_2: Arg_2+max([0, 1+Arg_0-Arg_2]) {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_3: Arg_3+max([0, 1+Arg_0-Arg_3]) {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 1: f5->f8, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_2: max([Arg_2, Arg_2+max([0, 1+Arg_0-Arg_2])]) {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_3: max([Arg_3, Arg_3+max([0, 1+Arg_0-Arg_3])]) {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 41: f5->f17, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_2: Arg_2+max([0, 1+Arg_0-Arg_2]) {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_3: Arg_3+max([0, 1+Arg_0-Arg_3]) {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 2: f8->f8, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_0: Arg_0 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_1: Arg_1 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_2: Arg_2+max([0, 1+Arg_0-Arg_2]) {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_3: Arg_3+max([0, 1+Arg_0-Arg_3]) {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_4: Arg_4 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_5: Arg_5 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_6: Arg_6 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_7: Arg_7 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_8: Arg_8 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_9: Arg_9 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_10: Arg_10 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_11: Arg_11 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_12: Arg_12 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_13: Arg_13 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_14: Arg_14 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_15: Arg_15 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_16: Arg_16 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_17: Arg_17 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_18: Arg_18 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_19: Arg_19 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_20: Arg_20 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_21: Arg_21 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_22: Arg_22 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_23: Arg_23 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_24: Arg_24 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_25: Arg_25 {O(n)} 89.32/74.79 89.32/74.79 40: f8->f5, Arg_26: Arg_26 {O(n)} 89.32/74.79 89.32/74.79 89.32/74.79 ---------------------------------------- 89.32/74.79 89.32/74.79 (2) 89.32/74.79 BOUNDS(1, nat(1 + Arg_0 + -1 * Arg_2) + max(6, 7 + Arg_0 + -1 * Arg_2) + nat(1 + Arg_0 + -1 * Arg_3)) 89.32/74.79 89.32/74.79 ---------------------------------------- 89.32/74.79 89.32/74.79 (3) Loat Proof (FINISHED) 89.32/74.79 89.32/74.79 89.32/74.79 ### Pre-processing the ITS problem ### 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Initial linear ITS problem 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 1: f5 -> f8 : [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 41: f5 -> f17 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 39: f17 -> f27 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 38: f27 -> 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, [ E>=51 ], cost: 1 89.32/74.79 89.32/74.79 5: f31 -> f34 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1 89.32/74.79 89.32/74.79 36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1 89.32/74.79 89.32/74.79 37: f31 -> f1 : A1'=B, A2'=C, B'=D, B1'=E, B2'=0, 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, [ B>=A && F==0 ], cost: 1 89.32/74.79 89.32/74.79 6: f34 -> f34 : C'=1+C, F'=free_1+F, G'=free_1, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1 89.32/74.79 89.32/74.79 8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 33: f50 -> f132 : [ B>=A ], cost: 1 89.32/74.79 89.32/74.79 10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1 89.32/74.79 89.32/74.79 17: f69 -> f80 : P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ free_31>=1+K+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ K+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 20: f69 -> f92 : P'=free_93, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && 1>=free_80*free_87 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 11: f53 -> f53 : C'=1+C, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=C && E>=5 ], cost: 1 89.32/74.79 89.32/74.79 12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1 89.32/74.79 89.32/74.79 13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1 89.32/74.79 89.32/74.79 14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1 89.32/74.79 89.32/74.79 15: f53 -> f69 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 ], cost: 1 89.32/74.79 89.32/74.79 16: f53 -> f69 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 ], cost: 1 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 31: f92 -> f101 : [ A1>=B ], cost: 1 89.32/74.79 89.32/74.79 23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 30: f101 -> f110 : [ A1>=C ], cost: 1 89.32/74.79 89.32/74.79 24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 29: f110 -> f119 : [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Removed unreachable and leaf rules: 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 1: f5 -> f8 : [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 41: f5 -> f17 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 39: f17 -> f27 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 5: f31 -> f34 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1 89.32/74.79 89.32/74.79 36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1 89.32/74.79 89.32/74.79 6: f34 -> f34 : C'=1+C, F'=free_1+F, G'=free_1, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1 89.32/74.79 89.32/74.79 8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 33: f50 -> f132 : [ B>=A ], cost: 1 89.32/74.79 89.32/74.79 10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1 89.32/74.79 89.32/74.79 17: f69 -> f80 : P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ free_31>=1+K+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ K+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 20: f69 -> f92 : P'=free_93, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && 1>=free_80*free_87 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 11: f53 -> f53 : C'=1+C, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=C && E>=5 ], cost: 1 89.32/74.79 89.32/74.79 12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1 89.32/74.79 89.32/74.79 13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1 89.32/74.79 89.32/74.79 14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1 89.32/74.79 89.32/74.79 15: f53 -> f69 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 ], cost: 1 89.32/74.79 89.32/74.79 16: f53 -> f69 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 ], cost: 1 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 31: f92 -> f101 : [ A1>=B ], cost: 1 89.32/74.79 89.32/74.79 23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 30: f101 -> f110 : [ A1>=C ], cost: 1 89.32/74.79 89.32/74.79 24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 29: f110 -> f119 : [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Simplified all rules, resulting in: 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 1: f5 -> f8 : [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 41: f5 -> f17 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 39: f17 -> f27 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 5: f31 -> f34 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1 89.32/74.79 89.32/74.79 36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1 89.32/74.79 89.32/74.79 6: f34 -> f34 : C'=1+C, F'=free_1+F, G'=free_1, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1 89.32/74.79 89.32/74.79 8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 33: f50 -> f132 : [ B>=A ], cost: 1 89.32/74.79 89.32/74.79 10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1 89.32/74.79 89.32/74.79 17: f69 -> f80 : P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ free_31>=1+K+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ K+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 20: f69 -> f92 : P'=free_93, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 11: f53 -> f53 : C'=1+C, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=C && E>=5 ], cost: 1 89.32/74.79 89.32/74.79 12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1 89.32/74.79 89.32/74.79 13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1 89.32/74.79 89.32/74.79 14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1 89.32/74.79 89.32/74.79 15: f53 -> f69 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 ], cost: 1 89.32/74.79 89.32/74.79 16: f53 -> f69 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 ], cost: 1 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 31: f92 -> f101 : [ A1>=B ], cost: 1 89.32/74.79 89.32/74.79 23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 30: f101 -> f110 : [ A1>=C ], cost: 1 89.32/74.79 89.32/74.79 24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 29: f110 -> f119 : [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 ### Simplification by acceleration and chaining ### 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 2. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 2 with metering function 1-C+A, yielding the new rule 42. 89.32/74.79 89.32/74.79 Removing the simple loops: 2. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 3. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 3 with metering function 1-B+A, yielding the new rule 43. 89.32/74.79 89.32/74.79 Removing the simple loops: 3. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 6. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 6: f34 -> f34 : C'=1+C, F'=free_1+F, G'=free_1, [ A>=C ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 6 with metering function 1-C+A, yielding the new rule 44. 89.32/74.79 89.32/74.79 Removing the simple loops: 6. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 10. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 11: f53 -> f53 : C'=1+C, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=C && E>=5 ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 11 with metering function 1-C+A, yielding the new rule 45. 89.32/74.79 89.32/74.79 Removing the simple loops: 11. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 12. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 22 with metering function B-A1, yielding the new rule 46. 89.32/74.79 89.32/74.79 Removing the simple loops: 22. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 13. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 23 with metering function C-A1, yielding the new rule 47. 89.32/74.79 89.32/74.79 Removing the simple loops: 23. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 14. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 24 with metering function 1+A-A1, yielding the new rule 48. 89.32/74.79 89.32/74.79 Removing the simple loops: 24. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 15. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 25 with metering function 1+A-A1, yielding the new rule 49. 89.32/74.79 89.32/74.79 Removing the simple loops: 25. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 16. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 26 with metering function 1-B+A, yielding the new rule 50. 89.32/74.79 89.32/74.79 Removing the simple loops: 26. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated all simple loops using metering functions (where possible): 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 1: f5 -> f8 : [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 41: f5 -> f17 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 42: f8 -> f8 : C'=1+A, [ A>=C ], cost: 1-C+A 89.32/74.79 89.32/74.79 39: f17 -> f27 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 43: f17 -> f17 : B'=1+A, D'=free, [ A>=B ], cost: 1-B+A 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 5: f31 -> f34 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1 89.32/74.79 89.32/74.79 36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1 89.32/74.79 89.32/74.79 34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 44: f34 -> f34 : C'=1+A, F'=-free_1*(-1+C-A)+F, G'=free_1, [ A>=C ], cost: 1-C+A 89.32/74.79 89.32/74.79 7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1 89.32/74.79 89.32/74.79 8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 33: f50 -> f132 : [ B>=A ], cost: 1 89.32/74.79 89.32/74.79 10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1 89.32/74.79 89.32/74.79 17: f69 -> f80 : P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ free_31>=1+K+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ K+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 20: f69 -> f92 : P'=free_93, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1 89.32/74.79 89.32/74.79 13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1 89.32/74.79 89.32/74.79 14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1 89.32/74.79 89.32/74.79 15: f53 -> f69 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 ], cost: 1 89.32/74.79 89.32/74.79 16: f53 -> f69 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 ], cost: 1 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 45: f53 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=C && E>=5 ], cost: 1-C+A 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 31: f92 -> f101 : [ A1>=B ], cost: 1 89.32/74.79 89.32/74.79 46: f92 -> f92 : A1'=B, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: B-A1 89.32/74.79 89.32/74.79 30: f101 -> f110 : [ A1>=C ], cost: 1 89.32/74.79 89.32/74.79 47: f101 -> f101 : A1'=C, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: C-A1 89.32/74.79 89.32/74.79 29: f110 -> f119 : [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 48: f110 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1+A-A1 89.32/74.79 89.32/74.79 28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 49: f119 -> f119 : A1'=1+A, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1+A-A1 89.32/74.79 89.32/74.79 27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 50: f132 -> f132 : B'=1+A, [ A>=B ], cost: 1-B+A 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Chained accelerated rules (with incoming rules): 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 1: f5 -> f8 : [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 41: f5 -> f17 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 51: f5 -> f8 : C'=1+A, [ A>=B && A>=C ], cost: 2-C+A 89.32/74.79 89.32/74.79 40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 39: f17 -> f27 : [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 5: f31 -> f34 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1 89.32/74.79 89.32/74.79 36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1 89.32/74.79 89.32/74.79 52: f31 -> f34 : C'=1+A, F'=-free_1*(-1+C-A)+F, G'=free_1, [ A>=1+B && A>=C ], cost: 2-C+A 89.32/74.79 89.32/74.79 34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1 89.32/74.79 89.32/74.79 8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 33: f50 -> f132 : [ B>=A ], cost: 1 89.32/74.79 89.32/74.79 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 61: f50 -> f132 : B'=1+A, [ -B+A==0 ], cost: 2-B+A 89.32/74.79 89.32/74.79 10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1 89.32/74.79 89.32/74.79 17: f69 -> f80 : P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ free_31>=1+K+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ K+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 20: f69 -> f92 : P'=free_93, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 54: f69 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ H>=Q && A>=1+C && E>=5 ], cost: 1-C+A 89.32/74.79 89.32/74.79 57: f69 -> f92 : A1'=B, K'=free_112, P'=free_111, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1 89.32/74.79 89.32/74.79 13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1 89.32/74.79 89.32/74.79 14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1 89.32/74.79 89.32/74.79 15: f53 -> f69 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 ], cost: 1 89.32/74.79 89.32/74.79 16: f53 -> f69 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 ], cost: 1 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 31: f92 -> f101 : [ A1>=B ], cost: 1 89.32/74.79 89.32/74.79 59: f92 -> f101 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 1+C-A1 89.32/74.79 89.32/74.79 30: f101 -> f110 : [ A1>=C ], cost: 1 89.32/74.79 89.32/74.79 60: f101 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=C && A>=A1 ], cost: 2+A-A1 89.32/74.79 89.32/74.79 29: f110 -> f119 : [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 55: f119 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 1-C+A 89.32/74.79 89.32/74.79 27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Eliminated locations (on linear paths): 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 1: f5 -> f8 : [ A>=B ], cost: 1 89.32/74.79 89.32/74.79 51: f5 -> f8 : C'=1+A, [ A>=B && A>=C ], cost: 2-C+A 89.32/74.79 89.32/74.79 62: f5 -> f27 : [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 5: f31 -> f34 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1 89.32/74.79 89.32/74.79 36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1 89.32/74.79 89.32/74.79 52: f31 -> f34 : C'=1+A, F'=-free_1*(-1+C-A)+F, G'=free_1, [ A>=1+B && A>=C ], cost: 2-C+A 89.32/74.79 89.32/74.79 34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1 89.32/74.79 89.32/74.79 8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 33: f50 -> f132 : [ B>=A ], cost: 1 89.32/74.79 89.32/74.79 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 61: f50 -> f132 : B'=1+A, [ -B+A==0 ], cost: 2-B+A 89.32/74.79 89.32/74.79 10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1 89.32/74.79 89.32/74.79 17: f69 -> f80 : P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ free_31>=1+K+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ K+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 20: f69 -> f92 : P'=free_93, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H ], cost: 1 89.32/74.79 89.32/74.79 54: f69 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ H>=Q && A>=1+C && E>=5 ], cost: 1-C+A 89.32/74.79 89.32/74.79 57: f69 -> f92 : A1'=B, K'=free_112, P'=free_111, Q_1'=free_89, R'=K+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && Q>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1 89.32/74.79 89.32/74.79 13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1 89.32/74.79 89.32/74.79 14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1 89.32/74.79 89.32/74.79 15: f53 -> f69 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 ], cost: 1 89.32/74.79 89.32/74.79 16: f53 -> f69 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 ], cost: 1 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 31: f92 -> f101 : [ A1>=B ], cost: 1 89.32/74.79 89.32/74.79 59: f92 -> f101 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 1+C-A1 89.32/74.79 89.32/74.79 30: f101 -> f110 : [ A1>=C ], cost: 1 89.32/74.79 89.32/74.79 60: f101 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=C && A>=A1 ], cost: 2+A-A1 89.32/74.79 89.32/74.79 29: f110 -> f119 : [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1 89.32/74.79 89.32/74.79 55: f119 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 1-C+A 89.32/74.79 89.32/74.79 27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Eliminated locations (on tree-shaped paths): 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 62: f5 -> f27 : [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 63: f5 -> f5 : B'=1+B, [ A>=B && C>=1+A ], cost: 2 89.32/74.79 89.32/74.79 64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 65: f31 -> f31 : B'=1+B, [ A>=1+B && C>=1+A ], cost: 2 89.32/74.79 89.32/74.79 66: f31 -> f31 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A)+F, G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 73: f53 -> f53 : C'=1+C, Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E && H>=free_7 ], cost: 2 89.32/74.79 89.32/74.79 74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 75: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_93, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 78: f53 -> f53 : C'=1+C, Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && H>=free_12 ], cost: 2 89.32/74.79 89.32/74.79 79: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_31>=1+100*free_11+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_12>=1+H ], cost: 2 89.32/74.79 89.32/74.79 80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H ], cost: 2 89.32/74.79 89.32/74.79 81: f53 -> f92 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_93, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H ], cost: 2 89.32/74.79 89.32/74.79 82: f53 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && free_9>=1+100*free_11+free_8 && H>=free_12 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 84: f53 -> f53 : C'=1+C, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2 89.32/74.79 89.32/74.79 85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_93, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 88: f53 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && 100*free_16+free_13>=1+free_14 && H>=free_17 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 90: f53 -> f53 : C'=1+C, Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 && H>=free_21 ], cost: 2 89.32/74.79 89.32/74.79 91: f53 -> f80 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 && free_31>=1+100*free_20+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_21>=1+H ], cost: 2 89.32/74.79 89.32/74.79 92: f53 -> f80 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 && 100*free_20+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_21>=1+H ], cost: 2 89.32/74.79 89.32/74.79 93: f53 -> f92 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, P'=free_93, Q_1'=free_89, R'=100*free_20+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_21>=1+H ], cost: 2 89.32/74.79 89.32/74.79 94: f53 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && free_18>=1+100*free_20+free_19 && H>=free_21 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 95: f53 -> f92 : A1'=B, Q'=free_21, J'=free_20, K'=free_112, L'=free_19, M'=free_18, P'=free_111, Q_1'=free_89, R'=100*free_20+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_18>=1+100*free_20+free_19 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_21>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 96: f53 -> f53 : C'=1+C, Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && H>=free_25 ], cost: 2 89.32/74.79 89.32/74.79 97: f53 -> f80 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && free_31>=1+100*free_24+free_33 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_25>=1+H ], cost: 2 89.32/74.79 89.32/74.79 98: f53 -> f80 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && 100*free_24+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_25>=1+H ], cost: 2 89.32/74.79 89.32/74.79 99: f53 -> f92 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, P'=free_93, Q_1'=free_89, R'=100*free_24+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_25>=1+H ], cost: 2 89.32/74.79 89.32/74.79 100: f53 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && free_23+100*free_24>=1+free_22 && H>=free_25 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 101: f53 -> f92 : A1'=B, Q'=free_25, J'=free_24, K'=free_112, L'=free_23, M'=free_22, P'=free_111, Q_1'=free_89, R'=100*free_24+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_25>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2 89.32/74.79 89.32/74.79 103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1 89.32/74.79 89.32/74.79 104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1 89.32/74.79 89.32/74.79 105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1 89.32/74.79 89.32/74.79 106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2 89.32/74.79 89.32/74.79 107: f110 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Applied pruning (of leafs and parallel rules): 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 62: f5 -> f27 : [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 63: f5 -> f5 : B'=1+B, [ A>=B && C>=1+A ], cost: 2 89.32/74.79 89.32/74.79 64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 65: f31 -> f31 : B'=1+B, [ A>=1+B && C>=1+A ], cost: 2 89.32/74.79 89.32/74.79 66: f31 -> f31 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A)+F, G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 75: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_93, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H ], cost: 2 89.32/74.79 89.32/74.79 82: f53 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && free_9>=1+100*free_11+free_8 && H>=free_12 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 84: f53 -> f53 : C'=1+C, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2 89.32/74.79 89.32/74.79 85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_93, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 88: f53 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && 100*free_16+free_13>=1+free_14 && H>=free_17 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 94: f53 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && free_18>=1+100*free_20+free_19 && H>=free_21 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 100: f53 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && free_23+100*free_24>=1+free_22 && H>=free_25 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2 89.32/74.79 89.32/74.79 103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1 89.32/74.79 89.32/74.79 104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1 89.32/74.79 89.32/74.79 105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1 89.32/74.79 89.32/74.79 106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2 89.32/74.79 89.32/74.79 107: f110 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 1. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 63: f5 -> f5 : B'=1+B, [ A>=B && C>=1+A ], cost: 2 89.32/74.79 89.32/74.79 64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 63 with metering function 1-B+A, yielding the new rule 108. 89.32/74.79 89.32/74.79 Found no metering function for rule 64. 89.32/74.79 89.32/74.79 Removing the simple loops: 63. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 5. 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 65: f31 -> f31 : B'=1+B, [ A>=1+B && C>=1+A ], cost: 2 89.32/74.79 89.32/74.79 66: f31 -> f31 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A)+F, G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated rule 65 with metering function -B+A, yielding the new rule 109. 89.32/74.79 89.32/74.79 Found no metering function for rule 66. 89.32/74.79 89.32/74.79 Removing the simple loops: 65. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerating simple loops of location 10. 89.32/74.79 89.32/74.79 Simplified some of the simple loops (and removed duplicate rules). 89.32/74.79 89.32/74.79 Accelerating the following rules: 89.32/74.79 89.32/74.79 82: f53 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_12 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 84: f53 -> f53 : C'=1+C, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2 89.32/74.79 89.32/74.79 88: f53 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_17 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 94: f53 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_21 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 100: f53 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_25 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Found no metering function for rule 82. 89.32/74.79 89.32/74.79 Accelerated rule 84 with metering function 1-C+A, yielding the new rule 110. 89.32/74.79 89.32/74.79 Found no metering function for rule 88. 89.32/74.79 89.32/74.79 Found no metering function for rule 94. 89.32/74.79 89.32/74.79 Found no metering function for rule 100. 89.32/74.79 89.32/74.79 Removing the simple loops: 84. 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Accelerated all simple loops using metering functions (where possible): 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 62: f5 -> f27 : [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 108: f5 -> f5 : B'=1+A, [ A>=B && C>=1+A ], cost: 2-2*B+2*A 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 66: f31 -> f31 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A)+F, G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A 89.32/74.79 89.32/74.79 67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 109: f31 -> f31 : B'=A, [ A>=1+B && C>=1+A ], cost: -2*B+2*A 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 75: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_93, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H ], cost: 2 89.32/74.79 89.32/74.79 82: f53 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_12 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_93, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H ], cost: 2 89.32/74.79 89.32/74.79 88: f53 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_17 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 94: f53 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_21 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 100: f53 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ E>=5 && H>=free_25 && A>=1+C ], cost: 2-C+A 89.32/74.79 89.32/74.79 110: f53 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2-2*C+2*A 89.32/74.79 89.32/74.79 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.79 89.32/74.79 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.79 89.32/74.79 56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 && B>=1+A1 ], cost: 1+B-A1 89.32/74.79 89.32/74.79 102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2 89.32/74.79 89.32/74.79 103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1 89.32/74.79 89.32/74.79 104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1 89.32/74.79 89.32/74.79 105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1 89.32/74.79 89.32/74.79 106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2 89.32/74.79 89.32/74.79 107: f110 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 89.32/74.79 89.32/74.79 Chained accelerated rules (with incoming rules): 89.32/74.79 89.32/74.79 Start location: f2 89.32/74.79 89.32/74.79 0: f2 -> f5 : [], cost: 1 89.32/74.79 89.32/74.79 111: f2 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 4-C+A 89.32/74.79 89.32/74.79 112: f2 -> f5 : B'=1+A, [ A>=B && C>=1+A ], cost: 3-2*B+2*A 89.32/74.79 89.32/74.79 62: f5 -> f27 : [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1 89.32/74.79 89.32/74.79 113: f27 -> f31 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, [ 50>=E && A>=1+B && A>=C ], cost: 4-C+A 89.32/74.79 89.32/74.79 114: f27 -> f31 : B'=A, F'=0, [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.32/74.79 89.32/74.79 67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2 89.32/74.79 89.32/74.79 70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2 89.32/74.79 89.32/74.79 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.79 89.32/74.79 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.32/74.79 89.32/74.79 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.32/74.79 89.32/74.79 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.32/74.79 89.32/74.79 115: f50 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.32/74.79 89.32/74.79 117: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.32/74.79 89.32/74.79 119: f50 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.32/74.79 89.32/74.79 121: f50 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_25 && A>=1+C ], cost: 3-C+A 89.32/74.79 89.32/74.79 123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.32/74.79 89.32/74.79 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.79 89.32/74.79 74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 75: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_93, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H ], cost: 2 89.32/74.79 89.32/74.79 77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.79 89.32/74.79 80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H ], cost: 2 89.32/74.80 89.32/74.80 83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.80 89.32/74.80 85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=-free_34+free_35, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H ], cost: 2 89.32/74.80 89.32/74.80 86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H ], cost: 2 89.32/74.80 89.32/74.80 87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_93, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H ], cost: 2 89.32/74.80 89.32/74.80 89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && B>=1+A1 && free_91<=free_83 ], cost: 2+B-A1 89.32/74.80 89.32/74.80 19: f80 -> f92 : P'=free_59*S, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 ], cost: 1 89.32/74.80 89.32/74.80 21: f80 -> f92 : P'=-free_109*S, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 ], cost: 1 89.32/74.80 89.32/74.80 56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ T>=0 && S>=free_58*free_52*S && free_52+free_58*free_52*S>=1+S && free_52>=free_55 && S>=free_58*S*free_51 && free_58*S*free_51+free_51>=1+S && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && S>=free_58*free_47*S && free_58*free_47*S+free_47>=1+S && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && S>=free_58*free_60*S && free_60+free_58*free_60*S>=1+S && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 ], cost: 1+B-A1 89.32/74.80 89.32/74.80 58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-free_105*S, Z'=free_106, [ 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+T && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_100*S+free_98+free_104*free_98 && free_100*S+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_110+S*free_101 && free_99*free_110+2*free_110+S*free_101>=1 && free_110>=free_106 && B>=1+A1 ], cost: 1+B-A1 89.32/74.80 89.32/74.80 102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2 89.32/74.80 89.32/74.80 103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1 89.32/74.80 89.32/74.80 104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1 89.32/74.80 89.32/74.80 105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1 89.32/74.80 89.32/74.80 106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2 89.32/74.80 89.32/74.80 107: f110 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A 89.32/74.80 89.32/74.80 116: f110 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_12 && A>=2+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 118: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_17 && A>=2+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 120: f110 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_21 && A>=2+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 122: f110 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_25 && A>=2+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 124: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A1>=1+A && E>=5 && A>=1+C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2-2*C+2*A 89.32/74.80 89.32/74.80 89.32/74.80 89.32/74.80 Eliminated locations (on tree-shaped paths): 89.32/74.80 89.32/74.80 Start location: f2 89.32/74.80 89.32/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.32/74.80 89.32/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.32/74.80 89.32/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.32/74.80 89.32/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.32/74.80 89.32/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.32/74.80 89.32/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.32/74.80 89.32/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.32/74.80 89.32/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.32/74.80 89.32/74.80 9: f50 -> f53 : [ A>=1+B ], cost: 1 89.32/74.80 89.32/74.80 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.32/74.80 89.32/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.32/74.80 89.32/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.32/74.80 89.32/74.80 115: f50 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 117: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 119: f50 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 121: f50 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_25 && A>=1+C ], cost: 3-C+A 89.32/74.80 89.32/74.80 123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.32/74.80 89.32/74.80 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.32/74.80 89.32/74.80 153: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_93, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && A1>=C ], cost: 4 89.32/74.80 89.32/74.80 154: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1 89.32/74.80 89.32/74.80 155: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 4+C-A1 89.32/74.80 89.32/74.80 156: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1 89.32/74.80 89.32/74.80 157: f53 -> f110 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && 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&& free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 5+A-A1 89.32/74.80 89.32/74.80 161: f53 -> f110 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && 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N'=free_8, O'=free_9, P'=free_115, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && 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free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H && B>=1+A1 && free_91<=free_83 && B>=C && A>=B ], cost: 5+A-A1 89.32/74.80 89.32/74.80 163: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 4+C-A1 89.32/74.80 89.32/74.80 164: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_89, R'=100*free_11+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_12>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 5+A-A1 89.32/74.80 89.32/74.80 165: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_93, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && A1>=C ], cost: 4 89.32/74.80 89.32/74.80 166: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1 89.32/74.80 89.32/74.80 167: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && C>=1+A1 ], cost: 4+C-A1 89.32/74.80 89.32/74.80 168: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && 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B>=1+A1 && free_91<=free_83 && B>=C && A>=B ], cost: 5+A-A1 89.32/74.80 89.32/74.80 171: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && 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free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 5+A-A1 89.32/74.80 89.32/74.80 173: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_32*free_59, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C ], cost: 5 89.32/74.80 89.32/74.80 174: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 175: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.32/74.80 89.32/74.80 176: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 177: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=-free_32*free_109, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C ], cost: 5 89.32/74.80 89.32/74.80 178: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 179: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.32/74.80 89.32/74.80 180: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 181: f53 -> f110 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.32/74.80 89.32/74.80 182: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.32/74.80 89.32/74.80 183: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.32/74.80 89.32/74.80 184: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.32/74.80 89.32/74.80 185: f53 -> f110 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.32/74.80 89.32/74.80 186: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.32/74.80 89.32/74.80 187: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.32/74.80 89.32/74.80 188: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ A>=C && 4>=E && free_31>=1+free_33+100*free_6 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.32/74.80 89.32/74.80 189: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_42*free_59, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C ], cost: 5 89.32/74.80 89.32/74.80 190: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 191: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.32/74.80 89.32/74.80 192: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 193: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=-free_42*free_109, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C ], cost: 5 89.32/74.80 89.32/74.80 194: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 195: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.32/74.80 89.32/74.80 196: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.32/74.80 89.32/74.80 197: f53 -> f110 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 198: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 199: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 200: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 201: f53 -> f110 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 202: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 203: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 204: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ A>=C && 4>=E && free_43+100*free_6>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_7>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 205: f53 -> f110 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_42*free_59, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C ], cost: 5 89.46/74.80 89.46/74.80 206: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 207: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.46/74.80 89.46/74.80 208: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 209: f53 -> f110 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=-free_42*free_109, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C ], cost: 5 89.46/74.80 89.46/74.80 210: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 211: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.46/74.80 89.46/74.80 212: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 213: f53 -> f110 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 214: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 215: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 216: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 217: f53 -> f110 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 218: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 219: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 220: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=100*free_11+free_10, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && 100*free_11+free_43>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_12>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 221: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_32*free_59, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C ], cost: 5 89.46/74.80 89.46/74.80 222: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 223: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.46/74.80 89.46/74.80 224: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 225: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=-free_32*free_109, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C ], cost: 5 89.46/74.80 89.46/74.80 226: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 227: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.46/74.80 89.46/74.80 228: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 229: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 230: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 231: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 232: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && free_29>=0 && free_32>=free_32*free_58*free_52 && free_52+free_32*free_58*free_52>=1+free_32 && free_52>=free_55 && free_32>=free_32*free_58*free_51 && free_32*free_58*free_51+free_51>=1+free_32 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_32>=free_32*free_58*free_47 && free_32*free_58*free_47+free_47>=1+free_32 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_32>=free_32*free_58*free_60 && free_32*free_58*free_60+free_60>=1+free_32 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 233: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 234: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 235: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 236: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_29, U'=free_28, V'=free_27, W'=free_108, X'=free_107, Y'=-free_32*free_105, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+free_33+100*free_16 && 1>=free_30*free_28+free_27*free_30 && free_30*free_28+free_30+free_27*free_30>=2 && free_32>=free_30 && 1>=free_28*free_26+free_27*free_26 && free_28*free_26+free_27*free_26+free_26>=2 && free_26>=free_32 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_29 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_32*free_100+free_98+free_104*free_98 && free_32*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_32*free_101+free_99*free_110+free_110 && free_32*free_101+free_99*free_110+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 237: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_42*free_59, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C ], cost: 5 89.46/74.80 89.46/74.80 238: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 239: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.46/74.80 89.46/74.80 240: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 241: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=-free_42*free_109, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C ], cost: 5 89.46/74.80 89.46/74.80 242: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 243: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 5+C-A1 89.46/74.80 89.46/74.80 244: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && A1>=B && C>=1+A1 ], cost: 6+A-A1 89.46/74.80 89.46/74.80 245: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 246: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 247: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 248: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_58, X'=free_57, Y'=free_55, Z'=free_56, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && free_39>=0 && free_42>=free_58*free_42*free_52 && free_52+free_58*free_42*free_52>=1+free_42 && free_52>=free_55 && free_42>=free_58*free_42*free_51 && free_58*free_42*free_51+free_51>=1+free_42 && free_55>=free_51 && 1>=free_58*free_49 && free_58*free_49+free_49>=2 && free_57>=free_49 && 1>=free_58*free_53 && free_58*free_53+free_53>=2 && free_53>=free_57 && free_42>=free_58*free_42*free_47 && free_58*free_42*free_47+free_47>=1+free_42 && 1>=free_58*free_50 && free_58*free_50+free_50>=2 && free_47>=free_50*free_48+free_48 && free_50*free_48+2*free_48>=1+free_47 && free_48>=free_56 && free_42>=free_58*free_42*free_60 && free_58*free_42*free_60+free_60>=1+free_42 && 1>=free_58*free_54 && free_58*free_54+free_54>=2 && free_60>=free_46*free_54+free_46 && free_46*free_54+2*free_46>=1+free_60 && free_56>=free_46 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 249: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C ], cost: 5+B-A1 89.46/74.80 89.46/74.80 250: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 251: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 5+C-A1 89.46/74.80 89.46/74.80 252: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_39, U'=free_38, V'=free_37, W'=free_108, X'=free_107, Y'=-free_105*free_42, Z'=free_106, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_43+100*free_16>=1+free_41 && 1>=free_40*free_37+free_40*free_38 && free_40+free_40*free_37+free_40*free_38>=2 && free_42>=free_40 && 1>=free_36*free_37+free_36*free_38 && free_36+free_36*free_37+free_36*free_38>=2 && free_36>=free_42 && free_17>=1+H && 1>=free_105*free_108 && free_105+free_105*free_108>=2 && 0>=1+free_39 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && free_107>=free_103 && 1>=free_102*free_108 && free_102*free_108+free_102>=2 && free_102>=free_107 && 1>=free_100*free_108 && free_100+free_100*free_108>=2 && 1>=free_104*free_108 && free_104*free_108+free_104>=2 && 0>=free_42*free_100+free_98+free_104*free_98 && free_42*free_100+2*free_98+free_104*free_98>=1 && free_106>=free_98 && 1>=free_101*free_108 && free_101*free_108+free_101>=2 && 1>=free_99*free_108 && free_99+free_99*free_108>=2 && 0>=free_99*free_110+free_42*free_101+free_110 && free_99*free_110+free_42*free_101+2*free_110>=1 && free_110>=free_106 && B>=1+A1 && C>=1+B ], cost: 6+A-A1 89.46/74.80 89.46/74.80 106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2 89.46/74.80 89.46/74.80 107: f110 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 116: f110 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_12 && A>=2+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 118: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_17 && A>=2+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 120: f110 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_21 && A>=2+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 122: f110 -> f53 : C'=1+A, Q'=free_25, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_25 && A>=2+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 124: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A1>=1+A && E>=5 && A>=1+C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2-2*C+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Applied pruning (of leafs and parallel rules): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 115: f50 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 117: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 119: f50 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.46/74.80 89.46/74.80 153: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_93, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && A1>=C ], cost: 4 89.46/74.80 89.46/74.80 154: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1 89.46/74.80 89.46/74.80 156: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1 89.46/74.80 89.46/74.80 160: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_89, R'=100*free_6+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 5+A-A1 89.46/74.80 89.46/74.80 168: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1 89.46/74.80 89.46/74.80 107: f110 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 116: f110 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_12 && A>=2+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 118: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_17 && A>=2+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 120: f110 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A1>=1+A && E>=5 && H>=free_21 && A>=2+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 124: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A1>=1+A && E>=5 && A>=1+C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2-2*C+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Eliminated locations (on tree-shaped paths): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 115: f50 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 117: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 119: f50 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.46/74.80 89.46/74.80 253: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C ], cost: 7-C+2*A-A1 89.46/74.80 89.46/74.80 254: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && 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free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1 89.46/74.80 89.46/74.80 260: f53 -> [31] : [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && 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1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 5+A-A1 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Accelerating simple loops of location 10. 89.46/74.80 89.46/74.80 Simplified some of the simple loops (and removed duplicate rules). 89.46/74.80 89.46/74.80 Accelerating the following rules: 89.46/74.80 89.46/74.80 253: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && 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free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && free_91<=free_83 ], cost: 7-C+2*A-A1 89.46/74.80 89.46/74.80 254: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && A1>=B && C>=1+A1 && H>=free_12 && A>=2+C && free_91<=free_83 ], cost: 8-C+2*A-A1 89.46/74.80 89.46/74.80 255: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && 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1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && C>=1+A1 && H>=free_17 && A>=2+C && free_91<=free_83 ], cost: 8-C+2*A-A1 89.46/74.80 89.46/74.80 256: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && A1>=B && C>=1+A1 && H>=free_21 && A>=2+C && free_91<=free_83 ], cost: 8-C+2*A-A1 89.46/74.80 89.46/74.80 257: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && H>=free_17 && free_91<=free_83 ], cost: 7-2*C+3*A-A1 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Found no metering function for rule 253. 89.46/74.80 89.46/74.80 Found no metering function for rule 254. 89.46/74.80 89.46/74.80 Accelerated rule 255 with NONTERM, yielding the new rule 261. 89.46/74.80 89.46/74.80 Found no metering function for rule 256. 89.46/74.80 89.46/74.80 Accelerated rule 257 with NONTERM, yielding the new rule 262. 89.46/74.80 89.46/74.80 Removing the simple loops: 255 257. 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Accelerated all simple loops using metering functions (where possible): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 115: f50 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 117: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 119: f50 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.46/74.80 89.46/74.80 253: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && free_91<=free_83 ], cost: 7-C+2*A-A1 89.46/74.80 89.46/74.80 254: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && A1>=B && C>=1+A1 && H>=free_12 && A>=2+C && free_91<=free_83 ], cost: 8-C+2*A-A1 89.46/74.80 89.46/74.80 256: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, P'=free_115, Q_1'=free_89, R'=100*free_16+free_89, S'=free_85, W'=free_80, X'=free_82, Y'=free_75, Z'=free_74, [ E>=5 && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && A1>=B && C>=1+A1 && H>=free_21 && A>=2+C && free_91<=free_83 ], cost: 8-C+2*A-A1 89.46/74.80 89.46/74.80 258: f53 -> [31] : [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && 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&& free_91<=free_83 && 7-2*C+3*A-A1>=1 ], cost: INF 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Chained accelerated rules (with incoming rules): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 115: f50 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 117: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 119: f50 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.46/74.80 89.46/74.80 258: f53 -> [31] : [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && 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free_84>=free_82 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1 89.46/74.80 89.46/74.80 259: f53 -> [31] : [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && 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free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1 89.46/74.80 89.46/74.80 260: f53 -> [31] : [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && 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free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 5+A-A1 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Removed unreachable locations (and leaf rules with constant cost): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 53: f50 -> f53 : C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 115: f50 -> f53 : C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 117: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 119: f50 -> f53 : C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1 89.46/74.80 89.46/74.80 258: f53 -> [31] : [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && 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free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_83>=free_93 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_93>=free_91 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1 89.46/74.80 89.46/74.80 260: f53 -> [31] : [ A>=C && 4>=E && free_71>=free_80*free_77*free_71 && free_77+free_80*free_77*free_71>=1+free_71 && free_69>=free_80*free_72*free_69 && free_80*free_72*free_69+free_72>=1+free_69 && free_70>=free_80*free_95*free_70 && free_80*free_95*free_70+free_95>=1+free_70 && free_77+free_78*free_95>=free_78*free_72 && free_78*free_72+free_78>=1+free_77+free_78*free_95 && free_78>=free_75 && free_71>=free_80*free_71*free_65 && free_65+free_80*free_71*free_65>=1+free_71 && free_69>=free_80*free_88*free_69 && free_80*free_88*free_69+free_88>=1+free_69 && free_70>=free_80*free_73*free_70 && free_80*free_73*free_70+free_73>=1+free_70 && free_65+free_61*free_73>=free_61*free_88 && free_61+free_61*free_88>=1+free_65+free_61*free_73 && free_75>=free_61 && free_71>=free_80*free_71*free_81 && free_81+free_80*free_71*free_81>=1+free_71 && free_69>=free_67*free_80*free_69 && free_67+free_67*free_80*free_69>=1+free_69 && free_70>=free_80*free_92*free_70 && free_80*free_92*free_70+free_92>=1+free_70 && free_92*free_76+free_81>=free_67*free_76 && free_67*free_76+free_76>=1+free_92*free_76+free_81 && 1>=free_80*free_63 && free_80*free_63+free_63>=2 && free_76>=free_96+free_96*free_63 && 2*free_96+free_96*free_63>=1+free_76 && free_96>=free_74 && free_71>=free_80*free_71*free_79 && free_79+free_80*free_71*free_79>=1+free_71 && free_69>=free_80*free_68*free_69 && free_68+free_80*free_68*free_69>=1+free_69 && free_70>=free_80*free_66*free_70 && free_80*free_66*free_70+free_66>=1+free_70 && free_64*free_66+free_79>=free_64*free_68 && free_64+free_64*free_68>=1+free_64*free_66+free_79 && 1>=free_80*free_62 && free_80*free_62+free_62>=2 && free_64>=free_62*free_97+free_97 && free_62*free_97+2*free_97>=1+free_64 && free_74>=free_97 && free_94*free_70+free_71>=free_94*free_69 && free_94+free_94*free_69>=1+free_94*free_70+free_71 && free_94>=free_85 && free_71+free_90*free_70>=free_90*free_69 && free_90+free_90*free_69>=1+free_71+free_90*free_70 && free_85>=free_90 && free_71*free_86+free_86*free_70*free_83>=free_69*free_86*free_83 && free_69*free_86*free_83+free_83>=1+free_71*free_86+free_86*free_70*free_83 && free_71*free_86+free_91*free_86*free_70>=free_91*free_69*free_86 && free_91+free_91*free_69*free_86>=1+free_71*free_86+free_91*free_86*free_70 && free_87+free_80*free_87>=2 && free_82>=free_87 && 1>=free_80*free_84 && free_80*free_84+free_84>=2 && free_84>=free_82 && free_7>=1+H && B>=1+A1 && free_91<=free_83 && C>=1+B ], cost: 5+A-A1 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Eliminated locations (on tree-shaped paths): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 263: f50 -> f50 : B'=1+B, C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A 89.46/74.80 89.46/74.80 264: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 265: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 266: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 4-2*C+2*A 89.46/74.80 89.46/74.80 268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 272: f50 -> [33] : [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Applied pruning (of leafs and parallel rules): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 263: f50 -> f50 : B'=1+B, C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A 89.46/74.80 89.46/74.80 264: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 265: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 266: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 4-2*C+2*A 89.46/74.80 89.46/74.80 268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 272: f50 -> [33] : [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Accelerating simple loops of location 8. 89.46/74.80 89.46/74.80 Accelerating the following rules: 89.46/74.80 89.46/74.80 263: f50 -> f50 : B'=1+B, C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A 89.46/74.80 89.46/74.80 264: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 265: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 266: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 4-2*C+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Found no metering function for rule 263. 89.46/74.80 89.46/74.80 Found no metering function for rule 264. 89.46/74.80 89.46/74.80 Found no metering function for rule 265. 89.46/74.80 89.46/74.80 Found no metering function for rule 266. 89.46/74.80 89.46/74.80 Found no metering function for rule 267. 89.46/74.80 89.46/74.80 Removing the simple loops:. 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Accelerated all simple loops using metering functions (where possible): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 263: f50 -> f50 : B'=1+B, C'=1+A, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A 89.46/74.80 89.46/74.80 264: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_12, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 265: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 266: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_21, J'=free_5, K'=100*free_5, L'=free_4, M'=free_4+100*free_5, N'=free_3, O'=100*free_5+free_3, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A 89.46/74.80 89.46/74.80 267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=free_15+100*free_16, N'=free_13, O'=free_14, [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 4-2*C+2*A 89.46/74.80 89.46/74.80 268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 272: f50 -> [33] : [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Chained accelerated rules (with incoming rules): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 128: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 129: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 130: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 131: f27 -> f50 : B'=1+B, C'=1+A, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2 89.46/74.80 89.46/74.80 72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A 89.46/74.80 89.46/74.80 268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A 89.46/74.80 89.46/74.80 269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A 89.46/74.80 89.46/74.80 272: f50 -> [33] : [ A>=1+B && E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 3-2*C+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Eliminated locations (on tree-shaped paths): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 273: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && 0>=1-free_1*(-1+C-A) && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 274: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && 0>=1-free_1*(-1+C-A) && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 275: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && -free_1*(-1+C-A)>=1 && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 276: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && -free_1*(-1+C-A)>=1 && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 278: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 280: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Applied pruning (of leafs and parallel rules): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 273: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && 0>=1-free_1*(-1+C-A) && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 274: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && 0>=1-free_1*(-1+C-A) && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 275: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && -free_1*(-1+C-A)>=1 && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 276: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && -free_1*(-1+C-A)>=1 && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 278: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 280: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Accelerating simple loops of location 4. 89.46/74.80 89.46/74.80 Accelerating the following rules: 89.46/74.80 89.46/74.80 273: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && 0>=1-free_1*(-1+C-A) && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 274: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && 0>=1-free_1*(-1+C-A) && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 275: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && -free_1*(-1+C-A)>=1 && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 276: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && -free_1*(-1+C-A)>=1 && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Found no metering function for rule 273 (rule is too complicated). 89.46/74.80 89.46/74.80 Found no metering function for rule 274 (rule is too complicated). 89.46/74.80 89.46/74.80 Found no metering function for rule 275 (rule is too complicated). 89.46/74.80 89.46/74.80 Found no metering function for rule 276 (rule is too complicated). 89.46/74.80 89.46/74.80 Removing the simple loops:. 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Accelerated all simple loops using metering functions (where possible): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 273: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && 0>=1-free_1*(-1+C-A) && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 274: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && 0>=1-free_1*(-1+C-A) && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 275: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=free_2, [ A>=C && -free_1*(-1+C-A)>=1 && 3>=E && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 276: f27 -> f27 : B'=1+A, C'=1+A, E'=1+E, F'=-free_1*(-1+C-A), G'=free_1, H'=0, [ 50>=E && A>=C && -free_1*(-1+C-A)>=1 && E>=4 && -1-B+A==0 ], cost: 8-C-B+2*A 89.46/74.80 89.46/74.80 277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 278: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 280: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Chained accelerated rules (with incoming rules): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 125: f2 -> f27 : [ B>=1+A ], cost: 3 89.46/74.80 89.46/74.80 126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A 89.46/74.80 89.46/74.80 277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 278: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A 89.46/74.80 89.46/74.80 280: f27 -> [35] : [ 50>=E && A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && E>=4 ], cost: 6-C+A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Eliminated locations (on tree-shaped paths): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 281: f2 -> [37] : [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 282: f2 -> [37] : [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Applied pruning (of leafs and parallel rules): 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 281: f2 -> [37] : [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 282: f2 -> [37] : [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 ### Computing asymptotic complexity ### 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Fully simplified ITS problem 89.46/74.80 89.46/74.80 Start location: f2 89.46/74.80 89.46/74.80 281: f2 -> [37] : [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A 89.46/74.80 89.46/74.80 282: f2 -> [37] : [ A>=B && C>=1+A ], cost: 5-2*B+2*A 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Computing asymptotic complexity for rule 281 89.46/74.80 89.46/74.80 Solved the limit problem by the following transformations: 89.46/74.80 89.46/74.80 Created initial limit problem: 89.46/74.80 89.46/74.80 6-C+A (+), 1+B-A (+/+!), 1-C+A (+/+!), 1-B+A (+/+!) [not solved] 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 applying transformation rule (C) using substitution {A==B} 89.46/74.80 89.46/74.80 resulting limit problem: 89.46/74.80 89.46/74.80 1 (+/+!), 6-C+B (+), 1-C+B (+/+!) [not solved] 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 applying transformation rule (C) using substitution {A==C} 89.46/74.80 89.46/74.80 resulting limit problem: 89.46/74.80 89.46/74.80 1 (+/+!), 6-C+B (+), 1-C+B (+/+!) [not solved] 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 applying transformation rule (B), deleting 1 (+/+!) 89.46/74.80 89.46/74.80 resulting limit problem: 89.46/74.80 89.46/74.80 6-C+B (+), 1-C+B (+/+!) [not solved] 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 removing all constraints (solved by SMT) 89.46/74.80 89.46/74.80 resulting limit problem: [solved] 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 applying transformation rule (C) using substitution {C==-n,B==0} 89.46/74.80 89.46/74.80 resulting limit problem: 89.46/74.80 89.46/74.80 [solved] 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Solution: 89.46/74.80 89.46/74.80 C / -n 89.46/74.80 89.46/74.80 B / 0 89.46/74.80 89.46/74.80 A / 0 89.46/74.80 89.46/74.80 Resulting cost 6+n has complexity: Poly(n^1) 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Found new complexity Poly(n^1). 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 Obtained the following overall complexity (w.r.t. the length of the input n): 89.46/74.80 89.46/74.80 Complexity: Poly(n^1) 89.46/74.80 89.46/74.80 Cpx degree: 1 89.46/74.80 89.46/74.80 Solved cost: 6+n 89.46/74.80 89.46/74.80 Rule cost: 6-C+A 89.46/74.80 89.46/74.80 Rule guard: [ A>=B && A>=C && 1+B>=1+A ] 89.46/74.80 89.46/74.80 89.46/74.80 89.46/74.80 WORST_CASE(Omega(n^1),?) 89.46/74.80 89.46/74.80 89.46/74.80 ---------------------------------------- 89.46/74.80 89.46/74.80 (4) 89.46/74.80 BOUNDS(n^1, INF) 89.46/74.82 EOF