/export/starexec/sandbox/solver/bin/starexec_run_complexity /export/starexec/sandbox/benchmark/theBenchmark.koat /export/starexec/sandbox/output/output_files


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WORST_CASE(Omega(n^1), O(n^1))
proof of /export/starexec/sandbox/benchmark/theBenchmark.koat
# AProVE Commit ID: 794c25de1cacf0d048858bcd21c9a779e1221865 marcel 20200619 unpublished dirty


The runtime complexity of the given CpxIntTrs could be proven to be BOUNDS(n^1, n^1).

(0) CpxIntTrs
(1) Koat Proof [FINISHED, 3686 ms]
(2) BOUNDS(1, n^1)
(3) Loat Proof [FINISHED, 100.1 s]
(4) BOUNDS(n^1, INF)


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(0)
Obligation:
Complexity Int TRS consisting of the following rules:
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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
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

The start-symbols are:[f2_27]


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(1) Koat Proof (FINISHED)
YES(?, 122*Ar_0 + 8*Ar_1 + 112*Ar_2 + 2*Ar_26 + 138)



Initial complexity problem:

1:	T:

		(Comp: ?, Cost: 1)    f2(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26))

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f17(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f17(Ar_0, Ar_1 + 1, Ar_2, Fresh_66, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, 0, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_3, Ar_4, Ar_5 + Fresh_65, Fresh_65, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Fresh_64, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, 0, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Fresh_61, 100*Fresh_61, Fresh_62, Fresh_62 + 100*Fresh_61, Fresh_63, Fresh_63 + 100*Fresh_61, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Fresh_59, Fresh_60, 100*Fresh_60, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Fresh_54, Fresh_55, 100*Fresh_55, Fresh_56, Fresh_56 + 100*Fresh_55, Fresh_57, Fresh_58, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Fresh_49, Fresh_50, 100*Fresh_50, Fresh_51, Fresh_51 + 100*Fresh_50, Fresh_52, Fresh_53, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Fresh_45, Fresh_46, 100*Fresh_46, Fresh_47, Fresh_48, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Fresh_41, Fresh_42, 100*Fresh_42, Fresh_43, Fresh_44, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Fresh_33 - Fresh_34, Fresh_35, Fresh_36, Fresh_37, Fresh_38, Fresh_39, Fresh_40, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Fresh_25 - Fresh_26, Fresh_27, Fresh_28, Fresh_29, Fresh_30, Fresh_31, Fresh_32, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_18*Fresh_20, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Fresh_21, Fresh_22, Fresh_23, Fresh_24, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Fresh_13, Fresh_14, Fresh_14 + Ar_10, Fresh_15, Ar_19, Ar_20, Ar_21, Fresh_16, Fresh_17, Fresh_18, Fresh_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, -Ar_18*Fresh_8, Ar_16, Ar_17, -Ar_18, Ar_19, Ar_20, Ar_21, Fresh_9, Fresh_10, -Ar_18*Fresh_11, Fresh_12, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Fresh_6, Ar_11, Ar_12, Ar_13, Ar_14, Fresh_7, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Fresh_4, Ar_11, Ar_12, Ar_13, Ar_14, Fresh_5, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Fresh_2, Ar_11, Ar_12, Ar_13, Ar_14, Fresh_3, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Fresh_0, Ar_11, Ar_12, Ar_13, Ar_14, Fresh_1, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4 + 1, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, 0, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: ?, Cost: 1)    f17(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 0)    koat_start(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_3, Ar_4, Ar_5, Ar_6, Ar_7, Ar_8, Ar_9, Ar_10, Ar_11, Ar_12, Ar_13, Ar_14, Ar_15, Ar_16, Ar_17, Ar_18, Ar_19, Ar_20, Ar_21, Ar_22, Ar_23, Ar_24, Ar_25, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



Slicing away variables that do not contribute to conditions from problem 1 leaves variables [Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26].

We thus obtain the following problem:

2:	T:

		(Comp: 1, Cost: 0)    koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_0, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

	start location:	koat_start

	leaf cost:	0



Testing for reachability in the complexity graph removes the following transitions from problem 2:

	f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_0, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

	f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

We thus obtain the following problem:

3:	T:

		(Comp: ?, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)    koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



Repeatedly propagating knowledge in problem 3 produces the following problem:

4:	T:

		(Comp: ?, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)    f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)    koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



A polynomial rank function with

	Pol(f119) = 1

	Pol(f53) = 1

	Pol(f110) = 1

	Pol(f101) = 1

	Pol(f80) = 1

	Pol(f92) = 1

	Pol(f69) = 1

	Pol(f50) = 1

	Pol(f132) = 1

	Pol(f27) = 1

	Pol(f46) = 1

	Pol(f31) = 1

	Pol(f34) = 1

	Pol(f1) = 0

	Pol(f8) = 3

	Pol(f5) = 3

	Pol(f17) = 2

	Pol(f2) = 3

	Pol(koat_start) = 3

orients all transitions weakly and the transitions

	f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

	f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

	f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

strictly and produces the following problem:

5:	T:

		(Comp: ?, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: ?, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)    f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 3, Cost: 1)    f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)    f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: 3, Cost: 1)    f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)    f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)    f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)    koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



A polynomial rank function with

	Pol(f119) = V_1 - V_11 + 1

	Pol(f53) = V_1 - V_11 + 1

	Pol(f110) = V_1 - V_11 + 1

	Pol(f101) = V_1 - V_11 + 1

	Pol(f80) = V_1 - V_11 + 1

	Pol(f92) = V_1 - V_11 + 1

	Pol(f69) = V_1 - V_11 + 1

	Pol(f50) = V_1 - V_11 + 1

	Pol(f132) = V_1 - V_11 + 1

	Pol(f27) = V_1 - V_11 + 1

	Pol(f46) = V_1 - V_11 + 1

	Pol(f31) = V_1 - V_11 + 1

	Pol(f34) = V_1 - V_11 + 1

	Pol(f1) = V_1 - V_11

	Pol(f8) = V_1 - V_11 + 1

	Pol(f5) = V_1 - V_11 + 1

	Pol(f17) = V_1 - V_11 + 1

	Pol(f2) = V_1 - V_11 + 1

	Pol(koat_start) = V_1 - V_11 + 1

orients all transitions weakly and the transition

	f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

strictly and produces the following problem:

6:	T:

		(Comp: ?, Cost: 1)                   f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_26 + 1, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)                   f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)                   f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)                   f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: ?, Cost: 1)                   f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)                   f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)                   f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)                   f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)                   f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)                   f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)                   f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: ?, Cost: 1)                   f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                   f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 3, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)                   f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                   f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: ?, Cost: 1)                   f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                   f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: 3, Cost: 1)                   f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                   f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)                   f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)                   koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



A polynomial rank function with

	Pol(f119) = V_1 - V_3

	Pol(f53) = V_1 - V_3 + 1

	Pol(f110) = V_1 - V_3

	Pol(f101) = V_1 - V_3

	Pol(f80) = V_1 - V_3

	Pol(f92) = V_1 - V_3

	Pol(f69) = V_1 - V_3

	Pol(f50) = V_1 - V_3 + 1

	Pol(f132) = V_1 - V_3 + 1

	Pol(f27) = V_1 - V_3 + 1

	Pol(f46) = V_1 - V_3 + 1

	Pol(f31) = V_1 - V_3 + 1

	Pol(f34) = V_1 - V_3 + 1

	Pol(f1) = V_1 - V_3

	Pol(f8) = V_1 - V_3 + 1

	Pol(f5) = V_1 - V_3 + 1

	Pol(f17) = V_1 - V_3 + 1

	Pol(f2) = V_1 - V_3 + 1

	Pol(koat_start) = V_1 - V_3 + 1

orients all transitions weakly and the transitions

	f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

	f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

strictly and produces the following problem:

7:	T:

		(Comp: ?, Cost: 1)                   f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_26 + 1, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)                   f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)                   f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)                   f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: ?, Cost: 1)                   f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)                   f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)                   f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: ?, Cost: 1)                   f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)                   f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)                   f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)                   f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)                   f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)                   f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                   f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 3, Cost: 1)                   f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)                   f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                   f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)     f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                   f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: 3, Cost: 1)                   f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                   f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                   f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)                   f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)                   koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



Repeatedly propagating knowledge in problem 7 produces the following problem:

8:	T:

		(Comp: ?, Cost: 1)                         f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_26 + 1, Cost: 1)          f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: ?, Cost: 1)                         f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                         f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)                         f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)    f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)                         f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: ?, Cost: 1)                         f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)       f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)       f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)       f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)       f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)                         f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                         f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)                         f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                         f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)                         f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)                         f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)                         f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)                         f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)                         f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                         f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                         f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 3, Cost: 1)                         f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)                         f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                         f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)           f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                         f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: 3, Cost: 1)                         f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                         f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                         f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)                         f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)                         koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



A polynomial rank function with

	Pol(f92) = 4

	Pol(f101) = 3

	Pol(f8) = 0

	Pol(f5) = 0

	Pol(f53) = 0

	Pol(f50) = 0

	Pol(f132) = 0

	Pol(f46) = 0

	Pol(f34) = 0

	Pol(f31) = 0

	Pol(f27) = 0

	Pol(f119) = 1

	Pol(f110) = 2

and size complexities

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-0) = Ar_0

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-1) = Ar_1

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-2) = Ar_2

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-3) = Ar_4

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-4) = Ar_5

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-5) = Ar_7

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-6) = Ar_8

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-7) = Ar_10

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-8) = Ar_18

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-9) = Ar_19

	S("koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]", 0-10) = Ar_26

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-0) = Ar_0

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-1) = Ar_1

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-2) = Ar_2

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-3) = Ar_4

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-4) = Ar_5

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-5) = Ar_7

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-6) = Ar_8

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-7) = Ar_10

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-8) = Ar_18

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-9) = Ar_19

	S("f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))", 0-10) = Ar_26

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-1) = ?

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-2) = 2*Ar_0 + 2*Ar_2 + 8

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-3) = Ar_4

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-4) = Ar_5

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-5) = Ar_7

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-6) = Ar_8

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-7) = Ar_10

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-8) = Ar_18

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-9) = Ar_19

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-10) = Ar_26

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-0) = Ar_0

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-1) = ?

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-2) = 2*Ar_0 + 2*Ar_2 + 4

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-3) = Ar_4

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-4) = Ar_5

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-5) = Ar_7

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-6) = Ar_8

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-7) = Ar_10

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-8) = Ar_18

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-9) = Ar_19

	S("f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-10) = Ar_26

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-1) = ?

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-2) = 2*Ar_0 + 2*Ar_2 + 16

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-3) = Ar_4

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-4) = Ar_5

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-5) = Ar_7

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-6) = Ar_8

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-7) = Ar_10

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-8) = Ar_18

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-9) = Ar_19

	S("f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-10) = Ar_26

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-1) = ?

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-2) = 2*Ar_0 + 2*Ar_2 + 4

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-3) = Ar_4

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-4) = Ar_5

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-5) = Ar_7

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-6) = Ar_8

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-7) = Ar_10

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-8) = Ar_18

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-9) = Ar_19

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-10) = Ar_26

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-0) = Ar_0

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-1) = ?

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-2) = 2*Ar_0 + 2*Ar_2 + 4

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-3) = Ar_4

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-4) = Ar_5

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-5) = Ar_7

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-6) = Ar_8

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-7) = Ar_10

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-8) = Ar_18

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-9) = Ar_19

	S("f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-10) = Ar_26

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-0) = Ar_0

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-1) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-2) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-3) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-4) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-5) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-6) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-7) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-8) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-9) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]", 0-10) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-0) = Ar_0

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-1) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-2) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-3) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-4) = 0

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-5) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-6) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-7) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-8) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-9) = ?

	S("f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]", 0-10) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-0) = Ar_0

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-1) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-2) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-3) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-4) = 0

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-5) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-6) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-7) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-8) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-9) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 = 0 ]", 0-10) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-0) = Ar_0

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-1) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-2) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-3) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-4) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-5) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-6) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-7) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-8) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-9) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-10) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-1) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-2) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-3) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-4) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-5) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-6) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-7) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-8) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-9) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-10) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-0) = Ar_0

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-1) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-2) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-3) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-4) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-5) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-6) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-7) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-8) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-9) = ?

	S("f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]", 0-10) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-0) = Ar_0

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-1) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-2) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-3) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-4) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-5) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-6) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-7) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-8) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-9) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ Ar_5 >= 1 ]", 0-10) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-0) = Ar_0

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-1) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-2) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-3) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-4) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-5) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-6) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-7) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-8) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-9) = ?

	S("f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\\ 0 >= Ar_5 + 1 ]", 0-10) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-0) = Ar_0

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-1) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-2) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-3) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-4) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-5) = 0

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-6) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-7) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-8) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-9) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]", 0-10) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-0) = Ar_0

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-1) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-2) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-3) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-4) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-5) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-6) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-7) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-8) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-9) = ?

	S("f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]", 0-10) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-0) = Ar_0

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-1) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-2) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-3) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-4) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-5) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-6) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-7) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-8) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-9) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]", 0-10) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-0) = Ar_0

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-1) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-2) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-3) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-4) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-5) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-6) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-7) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-8) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-9) = ?

	S("f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]", 0-10) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-1) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-2) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-3) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-4) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-5) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-6) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-7) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-8) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-9) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]", 0-10) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-0) = Ar_0

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-1) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-2) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-3) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-4) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-5) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-6) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-7) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-8) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-9) = ?

	S("f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]", 0-10) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-1) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-2) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-3) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-4) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-5) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-6) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-7) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-8) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-9) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]", 0-10) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-0) = Ar_0

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-1) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-2) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-3) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-4) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-5) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-6) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-7) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-8) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-9) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]", 0-10) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-0) = Ar_0

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-1) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-2) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-3) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-4) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-5) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-6) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-7) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-8) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-9) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]", 0-10) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-0) = Ar_0

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-1) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-2) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-3) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-4) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-5) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-6) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-7) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-8) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-9) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]", 0-10) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-0) = Ar_0

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-1) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-2) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-3) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-4) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-5) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-6) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-7) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-8) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-9) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\\ Ar_0 >= Ar_2 /\\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]", 0-10) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-0) = Ar_0

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-1) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-2) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-3) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-4) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-5) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-6) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-7) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-8) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-9) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ 4 >= Ar_4 ]", 0-10) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-0) = Ar_0

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-1) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-2) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-3) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-4) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-5) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-6) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-7) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-8) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-9) = ?

	S("f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\\ Ar_4 >= 5 ]", 0-10) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-0) = Ar_0

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-1) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-2) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-3) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-4) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-5) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-6) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-7) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-8) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-9) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*L1 /\\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*N1 /\\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\\ G1 + N1*O1 >= L1*O1 /\\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\\ O1 >= Fresh_18 /\\ I1 >= Fresh_16*I1*P1 /\\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*Q1 /\\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*R1 /\\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\\ P1 + R1*S1 >= Q1*S1 /\\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\\ Fresh_18 >= S1 /\\ I1 >= Fresh_16*I1*T1 /\\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\\ J1 >= Fresh_16*J1*U1 /\\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\\ M1 >= Fresh_16*M1*V1 /\\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\\ T1 + V1*W1 >= U1*W1 /\\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\\ 1 >= Fresh_16*X1' /\\ Fresh_16*X1' + X1' >= 2 /\\ W1 >= Y1 + X1'*Y1 /\\ 2*Y1 + X1'*Y1 >= W1 + 1 /\\ Y1 >= Fresh_19 /\\ I1 >= Fresh_16*I1*Z1 /\\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\\ J1 >= A2*Fresh_16*J1 /\\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\\ M1 >= B2*Fresh_16*M1 /\\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\\ Z1 + B2*C2 >= A2*C2 /\\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\\ 1 >= D2*Fresh_16 /\\ D2*Fresh_16 + D2 >= 2 /\\ C2 >= E2 + D2*E2 /\\ 2*E2 + D2*E2 >= C2 + 1 /\\ Fresh_19 >= E2 /\\ I1 + F2*M1 >= F2*J1 /\\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\\ F2 >= Fresh_15 /\\ I1 + G2*M1 >= G2*J1 /\\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\\ Fresh_15 >= G2 /\\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\\ I2 >= Fresh_13 /\\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\\ Fresh_13 >= J2 /\\ 1 >= Fresh_16*K2 /\\ Fresh_16*K2 + K2 >= 2 /\\ Fresh_17 >= K2 /\\ 1 >= Fresh_16*L2 /\\ Fresh_16*L2 + L2 >= 2 /\\ L2 >= Fresh_17 /\\ Ar_8 >= Ar_7 + 1 ]", 0-10) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-0) = Ar_0

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-1) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-2) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-3) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-4) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-5) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-6) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-7) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-8) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-9) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\\ Fresh_29 >= G1 /\\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\\ J1 >= Fresh_29 /\\ Ar_8 >= Ar_7 + 1 ]", 0-10) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-0) = Ar_0

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-1) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-2) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-3) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-4) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-5) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-6) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-7) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-8) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-9) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\\ Fresh_37 >= G1 /\\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\\ J1 >= Fresh_37 /\\ Ar_8 >= Ar_7 + 1 ]", 0-10) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-0) = Ar_0

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-1) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-2) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-3) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-4) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-5) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-6) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-7) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-8) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-9) = ?

	S("f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]", 0-10) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-0) = Ar_0

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-1) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-2) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-3) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-4) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-5) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-6) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-7) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-8) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-9) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]", 0-10) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-0) = Ar_0

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-1) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-2) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-3) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-4) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-5) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-6) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-7) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-8) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-9) = ?

	S("f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]", 0-10) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-0) = Ar_0

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-1) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-2) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-3) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-4) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-5) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-6) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-7) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-8) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-9) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\\ 0 >= Ar_19 + 1 /\\ 1 >= Fresh_9*K1 /\\ Fresh_9*K1 + K1 >= 2 /\\ Fresh_10 >= K1 /\\ 1 >= Fresh_9*H1 /\\ Fresh_9*H1 + H1 >= 2 /\\ H1 >= Fresh_10 /\\ 1 >= Fresh_9*I1 /\\ Fresh_9*I1 + I1 >= 2 /\\ 1 >= Fresh_9*G1 /\\ Fresh_9*G1 + G1 >= 2 /\\ 0 >= Ar_18*I1 + J1 + G1*J1 /\\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\\ Fresh_12 >= J1 /\\ 1 >= Fresh_9*L1 /\\ Fresh_9*L1 + L1 >= 2 /\\ 1 >= Fresh_9*M1 /\\ Fresh_9*M1 + M1 >= 2 /\\ 0 >= Ar_18*L1 + N1 + M1*N1 /\\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\\ N1 >= Fresh_12 ]", 0-10) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-0) = Ar_0

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-1) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-2) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-3) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-4) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-5) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-6) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-7) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-8) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-9) = ?

	S("f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\\ Ar_18 >= Ar_18*Fresh_21*K1 /\\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\\ K1 >= Fresh_23 /\\ Ar_18 >= Ar_18*Fresh_21*H1 /\\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\\ Fresh_23 >= H1 /\\ 1 >= Fresh_21*I1 /\\ Fresh_21*I1 + I1 >= 2 /\\ Fresh_22 >= I1 /\\ 1 >= Fresh_21*G1 /\\ Fresh_21*G1 + G1 >= 2 /\\ G1 >= Fresh_22 /\\ Ar_18 >= Ar_18*Fresh_21*J1 /\\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*L1 /\\ Fresh_21*L1 + L1 >= 2 /\\ J1 >= M1 + L1*M1 /\\ 2*M1 + L1*M1 >= J1 + 1 /\\ M1 >= Fresh_24 /\\ Ar_18 >= Ar_18*Fresh_21*N1 /\\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\\ 1 >= Fresh_21*O1 /\\ Fresh_21*O1 + O1 >= 2 /\\ N1 >= P1 + O1*P1 /\\ 2*P1 + O1*P1 >= N1 + 1 /\\ Fresh_24 >= P1 ]", 0-10) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-0) = Ar_0

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-1) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-2) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-3) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-4) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-5) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-6) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-7) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-8) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-9) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]", 0-10) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-0) = Ar_0

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-1) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-2) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-3) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-4) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-5) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-6) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-7) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-8) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-9) = ?

	S("f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]", 0-10) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-1) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-2) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-3) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-4) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-5) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-6) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-7) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-8) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-9) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-10) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-0) = Ar_0

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-1) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-2) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-3) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-4) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-5) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-6) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-7) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-8) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-9) = ?

	S("f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]", 0-10) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-0) = Ar_0

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-1) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-2) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-3) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-4) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-5) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-6) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-7) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-8) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-9) = ?

	S("f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]", 0-10) = ?

orients the transitions

	f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

	f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

	f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

	f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

	f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

	f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

	f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

	f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

	f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

	f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

	f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

	f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

	f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

	f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

	f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

	f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

weakly and the transitions

	f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

	f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

	f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

	f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

strictly and produces the following problem:

9:	T:

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_26 + 1, Cost: 1)                       f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                                      f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                 f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                 f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)                                      f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)                                      f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                                      f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)                                      f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                                      f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)                                      f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)                                      f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)                                      f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)                                      f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)                                      f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                                      f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                                      f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 3, Cost: 1)                                      f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)                                      f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                                      f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                                      f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: 3, Cost: 1)                                      f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                                      f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                                      f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)                                      f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)                                      koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



A polynomial rank function with

	Pol(f119) = V_1 - V_2

	Pol(f53) = V_1 - V_2

	Pol(f110) = V_1 - V_2

	Pol(f101) = V_1 - V_2

	Pol(f80) = V_1 - V_2

	Pol(f92) = V_1 - V_2

	Pol(f69) = V_1 - V_2

	Pol(f50) = V_1 - V_2 + 1

	Pol(f132) = V_1 - V_2 + 1

	Pol(f27) = V_1 - V_2 + 1

	Pol(f46) = V_1 - V_2 + 1

	Pol(f31) = V_1 - V_2 + 1

	Pol(f34) = V_1 - V_2

	Pol(f1) = V_1 - V_2

	Pol(f8) = V_1 - V_2

	Pol(f5) = V_1 - V_2 + 1

	Pol(f17) = V_1 - V_2 + 1

	Pol(f2) = V_1 - V_2 + 1

	Pol(koat_start) = V_1 - V_2 + 1

orients all transitions weakly and the transitions

	f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

	f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

	f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

strictly and produces the following problem:

10:	T:

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_26 + 1, Cost: 1)                       f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                                      f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                 f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                 f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)                                      f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)    f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                    f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: ?, Cost: 1)                                      f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                        f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: ?, Cost: 1)                                      f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                        f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: ?, Cost: 1)                                      f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: ?, Cost: 1)                                      f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: ?, Cost: 1)                                      f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: ?, Cost: 1)                                      f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: ?, Cost: 1)                                      f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                                      f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                        f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 3, Cost: 1)                                      f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: ?, Cost: 1)                                      f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                                      f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                        f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: ?, Cost: 1)                                      f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: 3, Cost: 1)                                      f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                        f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                                      f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)                                      f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)                                      koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



Repeatedly propagating knowledge in problem 10 produces the following problem:

11:	T:

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_26 + 1, Cost: 1)                                f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_0 >= Ar_26 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_0 + 1 ]

		(Comp: ?, Cost: 1)                                               f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_2 >= Ar_26 + 1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_2 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                          f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                          f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: ?, Cost: 1)                                               f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ Ar_1 >= Ar_26 + 1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_26 >= Ar_1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_7 >= Ar_8 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: 109*Ar_0 + Ar_1 + 106*Ar_2 + 2*Ar_26 + 109, Cost: 1)      f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 118*Ar_0 + 6*Ar_1 + 110*Ar_2 + 2*Ar_26 + 118, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 117*Ar_0 + 5*Ar_1 + 110*Ar_2 + 2*Ar_26 + 117, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 ]

		(Comp: 4*Ar_0 + 2*Ar_1 + 2*Ar_2 + 4, Cost: 1)                    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 3 >= Ar_4 ]

		(Comp: 4*Ar_0 + 2*Ar_1 + 2*Ar_2 + 4, Cost: 1)                    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 4 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 + 1 ]

		(Comp: 3, Cost: 1)                                               f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: 118*Ar_0 + 6*Ar_1 + 110*Ar_2 + 2*Ar_26 + 121, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                                               f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_4 >= 51 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_2 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_2 >= Ar_0 + 1 ]

		(Comp: 3, Cost: 1)                                               f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                                               f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: 1, Cost: 1)                                               f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 1, Cost: 0)                                               koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



Applied AI with 'oct' on problem 11 to obtain the following invariants:

  For symbol f101: -1 >= 0

  For symbol f110: -1 >= 0

  For symbol f119: -1 >= 0

  For symbol f132: -1 >= 0

  For symbol f17: -X_1 + X_2 - 1 >= 0

  For symbol f27: -X_1 + X_2 - 1 >= 0

  For symbol f31: -X_5 >= 0 /\ -X_4 - X_5 + 50 >= 0 /\ X_5 >= 0 /\ -X_4 + X_5 + 50 >= 0 /\ -X_4 + 50 >= 0 /\ -X_1 + X_2 - 1 >= 0

  For symbol f34: -1 >= 0

  For symbol f46: -1 >= 0

  For symbol f50: -1 >= 0

  For symbol f53: -1 >= 0

  For symbol f69: -1 >= 0

  For symbol f8: X_1 - X_2 >= 0

  For symbol f80: -1 >= 0

  For symbol f92: -1 >= 0





This yielded the following problem:

12:	T:

		(Comp: 1, Cost: 0)                                               koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

		(Comp: 1, Cost: 1)                                               f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 3, Cost: 1)                                               f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                                               f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 + 1 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 - Ar_1 >= 0 /\ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 - Ar_1 >= 0 /\ Ar_0 >= Ar_2 ]

		(Comp: 3, Cost: 1)                                               f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_4 >= 51 ]

		(Comp: 118*Ar_0 + 6*Ar_1 + 110*Ar_2 + 2*Ar_26 + 121, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_0 + Ar_1 - 1 >= 0 /\ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                                               f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_0 >= Ar_1 + 1 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_2 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

		(Comp: 4*Ar_0 + 2*Ar_1 + 2*Ar_2 + 4, Cost: 1)                    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 4 ]

		(Comp: 4*Ar_0 + 2*Ar_1 + 2*Ar_2 + 4, Cost: 1)                    f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ 3 >= Ar_4 ]

		(Comp: 117*Ar_0 + 5*Ar_1 + 110*Ar_2 + 2*Ar_26 + 117, Cost: 1)    f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_1 >= Ar_0 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_1 + 1 ]

		(Comp: 118*Ar_0 + 6*Ar_1 + 110*Ar_2 + 2*Ar_26 + 118, Cost: 1)    f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_1 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_1 ]

		(Comp: 109*Ar_0 + Ar_1 + 106*Ar_2 + 2*Ar_26 + 109, Cost: 1)      f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ -1 >= 0 /\ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ -1 >= 0 /\ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ -1 >= 0 /\ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

		(Comp: 5*Ar_0 + 5*Ar_2 + 5, Cost: 1)                             f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_7 >= Ar_8 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_1 ]

		(Comp: ?, Cost: 1)                                               f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ -1 >= 0 /\ Ar_1 >= Ar_26 + 1 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                          f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

		(Comp: 10*Ar_0 + 10*Ar_2 + 10, Cost: 1)                          f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_2 ]

		(Comp: ?, Cost: 1)                                               f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ -1 >= 0 /\ Ar_2 >= Ar_26 + 1 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_26 + 1, Cost: 1)                                f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ -1 >= 0 /\ Ar_0 >= Ar_26 ]

		(Comp: 102*Ar_0 + 100*Ar_2 + 2*Ar_26 + 102, Cost: 1)             f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_0 + 1 ]

	start location:	koat_start

	leaf cost:	0



Testing for unsatisfiable constraints removes the following transitions from problem 12:

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_0 >= Ar_1 + 1 ]

	f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_2 >= Ar_0 + 1 ]

	f34(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f34(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5 + Fresh_65, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_2 ]

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 /\ Ar_5 >= 1 ]

	f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 /\ 0 >= Ar_5 + 1 ]

	f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, 0, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 4 ]

	f46(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Fresh_64, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ 3 >= Ar_4 ]

	f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_1 >= Ar_0 ]

	f50(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_1 + 1 ]

	f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4 + 1, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_1 >= Ar_0 + 1 ]

	f132(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f132(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f50(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_2 >= Ar_0 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_41, 100*Fresh_42, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_43 + 100*Fresh_42 >= Fresh_44 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_45, 100*Fresh_46, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_48 >= Fresh_47 + 100*Fresh_46 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_49, 100*Fresh_50, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_52 + 100*Fresh_50 >= Fresh_53 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_54, 100*Fresh_55, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_4 >= 5 /\ Ar_0 >= Ar_2 /\ Fresh_58 >= Fresh_57 + 100*Fresh_55 + 1 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Fresh_59, 100*Fresh_60, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_2 /\ 4 >= Ar_4 ]

	f53(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, 100*Fresh_61, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_0 >= Ar_2 /\ Ar_4 >= 5 ]

	f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_15, Ar_19, Ar_26)) [ -1 >= 0 /\ I1 >= Fresh_16*G1*I1 /\ Fresh_16*G1*I1 + G1 >= I1 + 1 /\ J1 >= Fresh_16*J1*L1 /\ Fresh_16*J1*L1 + L1 >= J1 + 1 /\ M1 >= Fresh_16*M1*N1 /\ Fresh_16*M1*N1 + N1 >= M1 + 1 /\ G1 + N1*O1 >= L1*O1 /\ L1*O1 + O1 >= N1*O1 + G1 + 1 /\ O1 >= Fresh_18 /\ I1 >= Fresh_16*I1*P1 /\ Fresh_16*I1*P1 + P1 >= I1 + 1 /\ J1 >= Fresh_16*J1*Q1 /\ Fresh_16*J1*Q1 + Q1 >= J1 + 1 /\ M1 >= Fresh_16*M1*R1 /\ Fresh_16*M1*R1 + R1 >= M1 + 1 /\ P1 + R1*S1 >= Q1*S1 /\ Q1*S1 + S1 >= R1*S1 + P1 + 1 /\ Fresh_18 >= S1 /\ I1 >= Fresh_16*I1*T1 /\ Fresh_16*I1*T1 + T1 >= I1 + 1 /\ J1 >= Fresh_16*J1*U1 /\ Fresh_16*J1*U1 + U1 >= J1 + 1 /\ M1 >= Fresh_16*M1*V1 /\ Fresh_16*M1*V1 + V1 >= M1 + 1 /\ T1 + V1*W1 >= U1*W1 /\ U1*W1 + W1 >= V1*W1 + T1 + 1 /\ 1 >= Fresh_16*X1' /\ Fresh_16*X1' + X1' >= 2 /\ W1 >= Y1 + X1'*Y1 /\ 2*Y1 + X1'*Y1 >= W1 + 1 /\ Y1 >= Fresh_19 /\ I1 >= Fresh_16*I1*Z1 /\ Fresh_16*I1*Z1 + Z1 >= I1 + 1 /\ J1 >= A2*Fresh_16*J1 /\ A2*Fresh_16*J1 + A2 >= J1 + 1 /\ M1 >= B2*Fresh_16*M1 /\ B2*Fresh_16*M1 + B2 >= M1 + 1 /\ Z1 + B2*C2 >= A2*C2 /\ A2*C2 + C2 >= B2*C2 + Z1 + 1 /\ 1 >= D2*Fresh_16 /\ D2*Fresh_16 + D2 >= 2 /\ C2 >= E2 + D2*E2 /\ 2*E2 + D2*E2 >= C2 + 1 /\ Fresh_19 >= E2 /\ I1 + F2*M1 >= F2*J1 /\ F2*J1 + F2 >= F2*M1 + I1 + 1 /\ F2 >= Fresh_15 /\ I1 + G2*M1 >= G2*J1 /\ G2*J1 + G2 >= G2*M1 + I1 + 1 /\ Fresh_15 >= G2 /\ H2*I1 + H2*I2*M1 >= H2*I2*J1 /\ H2*I2*J1 + I2 >= H2*I2*M1 + H2*I1 + 1 /\ I2 >= Fresh_13 /\ H2*I1 + H2*J2*M1 >= H2*J1*J2 /\ H2*J1*J2 + J2 >= H2*J2*M1 + H2*I1 + 1 /\ Fresh_13 >= J2 /\ 1 >= Fresh_16*K2 /\ Fresh_16*K2 + K2 >= 2 /\ Fresh_17 >= K2 /\ 1 >= Fresh_16*L2 /\ Fresh_16*L2 + L2 >= 2 /\ L2 >= Fresh_17 /\ Ar_8 >= Ar_7 + 1 ]

	f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_29, Fresh_30, Ar_26)) [ -1 >= 0 /\ Fresh_27 + Ar_10 >= Fresh_28 + 1 /\ 1 >= Fresh_31*G1 + Fresh_32*G1 /\ Fresh_31*G1 + Fresh_32*G1 + G1 >= 2 /\ Fresh_29 >= G1 /\ 1 >= Fresh_31*J1 + Fresh_32*J1 /\ Fresh_31*J1 + Fresh_32*J1 + J1 >= 2 /\ J1 >= Fresh_29 /\ Ar_8 >= Ar_7 + 1 ]

	f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Fresh_37, Fresh_38, Ar_26)) [ -1 >= 0 /\ Fresh_36 >= Fresh_35 + Ar_10 + 1 /\ 1 >= Fresh_39*G1 + Fresh_40*G1 /\ Fresh_39*G1 + Fresh_40*G1 + G1 >= 2 /\ Fresh_37 >= G1 /\ 1 >= Fresh_39*J1 + Fresh_40*J1 /\ Fresh_39*J1 + Fresh_40*J1 + J1 >= 2 /\ J1 >= Fresh_37 /\ Ar_8 >= Ar_7 + 1 ]

	f69(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_7 >= Ar_8 ]

	f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_1 ]

	f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_6, Ar_18, Ar_19, Ar_26 + 1)) [ -1 >= 0 /\ Ar_1 >= Ar_26 + 1 ]

	f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, -Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ 1 >= Fresh_11*Fresh_9 /\ Fresh_11*Fresh_9 + Fresh_11 >= 2 /\ 0 >= Ar_19 + 1 /\ 1 >= Fresh_9*K1 /\ Fresh_9*K1 + K1 >= 2 /\ Fresh_10 >= K1 /\ 1 >= Fresh_9*H1 /\ Fresh_9*H1 + H1 >= 2 /\ H1 >= Fresh_10 /\ 1 >= Fresh_9*I1 /\ Fresh_9*I1 + I1 >= 2 /\ 1 >= Fresh_9*G1 /\ Fresh_9*G1 + G1 >= 2 /\ 0 >= Ar_18*I1 + J1 + G1*J1 /\ 2*J1 + G1*J1 + Ar_18*I1 >= 1 /\ Fresh_12 >= J1 /\ 1 >= Fresh_9*L1 /\ Fresh_9*L1 + L1 >= 2 /\ 1 >= Fresh_9*M1 /\ Fresh_9*M1 + M1 >= 2 /\ 0 >= Ar_18*L1 + N1 + M1*N1 /\ 2*N1 + M1*N1 + Ar_18*L1 >= 1 /\ N1 >= Fresh_12 ]

	f80(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f92(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_19 >= 0 /\ Ar_18 >= Ar_18*Fresh_21*K1 /\ Ar_18*Fresh_21*K1 + K1 >= Ar_18 + 1 /\ K1 >= Fresh_23 /\ Ar_18 >= Ar_18*Fresh_21*H1 /\ Ar_18*Fresh_21*H1 + H1 >= Ar_18 + 1 /\ Fresh_23 >= H1 /\ 1 >= Fresh_21*I1 /\ Fresh_21*I1 + I1 >= 2 /\ Fresh_22 >= I1 /\ 1 >= Fresh_21*G1 /\ Fresh_21*G1 + G1 >= 2 /\ G1 >= Fresh_22 /\ Ar_18 >= Ar_18*Fresh_21*J1 /\ Ar_18*Fresh_21*J1 + J1 >= Ar_18 + 1 /\ 1 >= Fresh_21*L1 /\ Fresh_21*L1 + L1 >= 2 /\ J1 >= M1 + L1*M1 /\ 2*M1 + L1*M1 >= J1 + 1 /\ M1 >= Fresh_24 /\ Ar_18 >= Ar_18*Fresh_21*N1 /\ Ar_18*Fresh_21*N1 + N1 >= Ar_18 + 1 /\ 1 >= Fresh_21*O1 /\ Fresh_21*O1 + O1 >= 2 /\ N1 >= P1 + O1*P1 /\ 2*P1 + O1*P1 >= N1 + 1 /\ Fresh_24 >= P1 ]

	f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_2 ]

	f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f101(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_4, Ar_18, Ar_19, Ar_26 + 1)) [ -1 >= 0 /\ Ar_2 >= Ar_26 + 1 ]

	f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_0 + 1 ]

	f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f110(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Fresh_2, Ar_18, Ar_19, Ar_26 + 1)) [ -1 >= 0 /\ Ar_0 >= Ar_26 ]

	f119(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f53(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -1 >= 0 /\ Ar_26 >= Ar_0 + 1 ]

We thus obtain the following problem:

13:	T:

		(Comp: 1, Cost: 0)                                               koat_start(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ 0 <= 0 ]

		(Comp: 1, Cost: 1)                                               f2(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26))

		(Comp: 3, Cost: 1)                                               f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_1 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_1 + 1, Cost: 1)                                 f5(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 >= Ar_1 ]

		(Comp: 3, Cost: 1)                                               f17(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 + 1 ]

		(Comp: 2*Ar_0 + Ar_1 + Ar_2 + 2, Cost: 1)                        f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f5(Ar_0, Ar_1 + 1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 - Ar_1 >= 0 /\ Ar_2 >= Ar_0 + 1 ]

		(Comp: Ar_0 + Ar_2 + 1, Cost: 1)                                 f8(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f8(Ar_0, Ar_1, Ar_2 + 1, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ Ar_0 - Ar_1 >= 0 /\ Ar_0 >= Ar_2 ]

		(Comp: 3, Cost: 1)                                               f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_4 >= 51 ]

		(Comp: 118*Ar_0 + 6*Ar_1 + 110*Ar_2 + 2*Ar_26 + 121, Cost: 1)    f27(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f31(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_0 + Ar_1 - 1 >= 0 /\ 50 >= Ar_4 ]

		(Comp: 3, Cost: 1)                                               f31(Ar_0, Ar_1, Ar_2, Ar_4, Ar_5, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26) -> Com_1(f1(Ar_0, Ar_1, Ar_2, Ar_4, 0, Ar_7, Ar_8, Ar_10, Ar_18, Ar_19, Ar_26)) [ -Ar_5 >= 0 /\ -Ar_4 - Ar_5 + 50 >= 0 /\ Ar_5 >= 0 /\ -Ar_4 + Ar_5 + 50 >= 0 /\ -Ar_4 + 50 >= 0 /\ -Ar_0 + Ar_1 - 1 >= 0 /\ Ar_1 >= Ar_0 /\ Ar_5 = 0 ]

	start location:	koat_start

	leaf cost:	0



Complexity upper bound 122*Ar_0 + 8*Ar_1 + 112*Ar_2 + 2*Ar_26 + 138



Time: 3.553 sec (SMT: 1.033 sec)


----------------------------------------

(2)
BOUNDS(1, n^1)

----------------------------------------

(3) Loat Proof (FINISHED)


### Pre-processing the ITS problem ###



Initial linear ITS problem

   Start location: f2

      0: f2 -> f5 : [], cost: 1

      1: f5 -> f8 : [ A>=B ], cost: 1

     41: f5 -> f17 : [ B>=1+A ], cost: 1

      2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1

     40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1

      3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1

     39: f17 -> f27 : [ B>=1+A ], cost: 1

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

     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

      5: f31 -> f34 : [ A>=1+B ], cost: 1

     35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1

     36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1

     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

      6: f34 -> f34 : C'=1+C, F'=F+free_1, G'=free_1, [ A>=C ], cost: 1

     34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1

      7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1

      8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     33: f50 -> f132 : [ B>=A ], cost: 1

     10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1

     17: f69 -> f80 : P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ free_31>=1+free_33+K && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && Q>=1+H ], cost: 1

     18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ free_43+K>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && Q>=1+H ], cost: 1

     20: f69 -> f92 : P'=free_89, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && 1>=free_77*free_75 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H ], cost: 1

     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'=free_3+100*free_5, [ A>=C && E>=5 ], cost: 1

     12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1

     13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1

     14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1

     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+free_19+100*free_20 ], cost: 1

     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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1

     31: f92 -> f101 : [ A1>=B ], cost: 1

     23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1

     30: f101 -> f110 : [ A1>=C ], cost: 1

     24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1

     29: f110 -> f119 : [ A1>=1+A ], cost: 1

     25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1

     28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1

     26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1

     27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1



Checking for constant complexity:

   The following rule is satisfiable with cost >= 1, yielding constant complexity:

      0: f2 -> f5 : [], cost: 1



Removed unreachable and leaf rules:

   Start location: f2

      0: f2 -> f5 : [], cost: 1

      1: f5 -> f8 : [ A>=B ], cost: 1

     41: f5 -> f17 : [ B>=1+A ], cost: 1

      2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1

     40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1

      3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1

     39: f17 -> f27 : [ B>=1+A ], cost: 1

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

      5: f31 -> f34 : [ A>=1+B ], cost: 1

     35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1

     36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1

      6: f34 -> f34 : C'=1+C, F'=F+free_1, G'=free_1, [ A>=C ], cost: 1

     34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1

      7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1

      8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     33: f50 -> f132 : [ B>=A ], cost: 1

     10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1

     17: f69 -> f80 : P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ free_31>=1+free_33+K && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && Q>=1+H ], cost: 1

     18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ free_43+K>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && Q>=1+H ], cost: 1

     20: f69 -> f92 : P'=free_89, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && 1>=free_77*free_75 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H ], cost: 1

     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'=free_3+100*free_5, [ A>=C && E>=5 ], cost: 1

     12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1

     13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1

     14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1

     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+free_19+100*free_20 ], cost: 1

     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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1

     31: f92 -> f101 : [ A1>=B ], cost: 1

     23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1

     30: f101 -> f110 : [ A1>=C ], cost: 1

     24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1

     29: f110 -> f119 : [ A1>=1+A ], cost: 1

     25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1

     28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1

     26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1

     27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1



Simplified all rules, resulting in:

   Start location: f2

      0: f2 -> f5 : [], cost: 1

      1: f5 -> f8 : [ A>=B ], cost: 1

     41: f5 -> f17 : [ B>=1+A ], cost: 1

      2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1

     40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1

      3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1

     39: f17 -> f27 : [ B>=1+A ], cost: 1

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

      5: f31 -> f34 : [ A>=1+B ], cost: 1

     35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1

     36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1

      6: f34 -> f34 : C'=1+C, F'=F+free_1, G'=free_1, [ A>=C ], cost: 1

     34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1

      7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1

      8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     33: f50 -> f132 : [ B>=A ], cost: 1

     10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1

     17: f69 -> f80 : P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ free_31>=1+free_33+K && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && Q>=1+H ], cost: 1

     18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ free_43+K>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && Q>=1+H ], cost: 1

     20: f69 -> f92 : P'=free_89, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H ], cost: 1

     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'=free_3+100*free_5, [ A>=C && E>=5 ], cost: 1

     12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1

     13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1

     14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1

     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+free_19+100*free_20 ], cost: 1

     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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1

     31: f92 -> f101 : [ A1>=B ], cost: 1

     23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1

     30: f101 -> f110 : [ A1>=C ], cost: 1

     24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1

     29: f110 -> f119 : [ A1>=1+A ], cost: 1

     25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1

     28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1

     26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1

     27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1



### Simplification by acceleration and chaining ###



Accelerating simple loops of location 2.

   Accelerating the following rules:

      2: f8 -> f8 : C'=1+C, [ A>=C ], cost: 1



   Accelerated rule 2 with metering function 1-C+A, yielding the new rule 42.

   Removing the simple loops: 2.



Accelerating simple loops of location 3.

   Accelerating the following rules:

      3: f17 -> f17 : B'=1+B, D'=free, [ A>=B ], cost: 1



   Accelerated rule 3 with metering function 1-B+A, yielding the new rule 43.

   Removing the simple loops: 3.



Accelerating simple loops of location 6.

   Accelerating the following rules:

      6: f34 -> f34 : C'=1+C, F'=F+free_1, G'=free_1, [ A>=C ], cost: 1



   Accelerated rule 6 with metering function 1-C+A, yielding the new rule 44.

   Removing the simple loops: 6.



Accelerating simple loops of location 10.

   Accelerating the following rules:

     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'=free_3+100*free_5, [ A>=C && E>=5 ], cost: 1



   Accelerated rule 11 with metering function 1-C+A, yielding the new rule 45.

   Removing the simple loops: 11.



Accelerating simple loops of location 12.

   Accelerating the following rules:

     22: f92 -> f92 : A1'=1+A1, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: 1



   Accelerated rule 22 with metering function B-A1, yielding the new rule 46.

   Removing the simple loops: 22.



Accelerating simple loops of location 13.

   Accelerating the following rules:

     23: f101 -> f101 : A1'=1+A1, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: 1



   Accelerated rule 23 with metering function C-A1, yielding the new rule 47.

   Removing the simple loops: 23.



Accelerating simple loops of location 14.

   Accelerating the following rules:

     24: f110 -> f110 : A1'=1+A1, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1



   Accelerated rule 24 with metering function 1+A-A1, yielding the new rule 48.

   Removing the simple loops: 24.



Accelerating simple loops of location 15.

   Accelerating the following rules:

     25: f119 -> f119 : A1'=1+A1, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1



   Accelerated rule 25 with metering function 1+A-A1, yielding the new rule 49.

   Removing the simple loops: 25.



Accelerating simple loops of location 16.

   Accelerating the following rules:

     26: f132 -> f132 : B'=1+B, [ A>=B ], cost: 1



   Accelerated rule 26 with metering function 1-B+A, yielding the new rule 50.

   Removing the simple loops: 26.



Accelerated all simple loops using metering functions (where possible):

   Start location: f2

      0: f2 -> f5 : [], cost: 1

      1: f5 -> f8 : [ A>=B ], cost: 1

     41: f5 -> f17 : [ B>=1+A ], cost: 1

     40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1

     42: f8 -> f8 : C'=1+A, [ A>=C ], cost: 1-C+A

     39: f17 -> f27 : [ B>=1+A ], cost: 1

     43: f17 -> f17 : B'=1+A, D'=free, [ A>=B ], cost: 1-B+A

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

      5: f31 -> f34 : [ A>=1+B ], cost: 1

     35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1

     36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1

     34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1

     44: f34 -> f34 : C'=1+A, F'=F-free_1*(-1+C-A), G'=free_1, [ A>=C ], cost: 1-C+A

      7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1

      8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     33: f50 -> f132 : [ B>=A ], cost: 1

     10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1

     17: f69 -> f80 : P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ free_31>=1+free_33+K && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && Q>=1+H ], cost: 1

     18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ free_43+K>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && Q>=1+H ], cost: 1

     20: f69 -> f92 : P'=free_89, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H ], cost: 1

     12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1

     13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1

     14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1

     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+free_19+100*free_20 ], cost: 1

     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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     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'=free_3+100*free_5, [ A>=C && E>=5 ], cost: 1-C+A

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     31: f92 -> f101 : [ A1>=B ], cost: 1

     46: f92 -> f92 : A1'=B, K'=free_112, P'=free_111, [ B>=1+A1 ], cost: B-A1

     30: f101 -> f110 : [ A1>=C ], cost: 1

     47: f101 -> f101 : A1'=C, K'=free_114, P'=free_113, [ C>=1+A1 ], cost: C-A1

     29: f110 -> f119 : [ A1>=1+A ], cost: 1

     48: f110 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A>=A1 ], cost: 1+A-A1

     28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1

     49: f119 -> f119 : A1'=1+A, K'=free_118, P'=free_117, [ A>=A1 ], cost: 1+A-A1

     27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1

     50: f132 -> f132 : B'=1+A, [ A>=B ], cost: 1-B+A



Chained accelerated rules (with incoming rules):

   Start location: f2

      0: f2 -> f5 : [], cost: 1

      1: f5 -> f8 : [ A>=B ], cost: 1

     41: f5 -> f17 : [ B>=1+A ], cost: 1

     51: f5 -> f8 : C'=1+A, [ A>=B && A>=C ], cost: 2-C+A

     40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1

     39: f17 -> f27 : [ B>=1+A ], cost: 1

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

      5: f31 -> f34 : [ A>=1+B ], cost: 1

     35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1

     36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1

     52: f31 -> f34 : C'=1+A, F'=F-free_1*(-1+C-A), G'=free_1, [ A>=1+B && A>=C ], cost: 2-C+A

     34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1

      7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1

      8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     33: f50 -> f132 : [ B>=A ], cost: 1

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     61: f50 -> f132 : B'=1+A, [ -B+A==0 ], cost: 2-B+A

     10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1

     17: f69 -> f80 : P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ free_31>=1+free_33+K && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && Q>=1+H ], cost: 1

     18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ free_43+K>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && Q>=1+H ], cost: 1

     20: f69 -> f92 : P'=free_89, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H ], cost: 1

     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'=free_3+100*free_5, [ H>=Q && A>=1+C && E>=5 ], cost: 1-C+A

     57: f69 -> f92 : A1'=B, K'=free_112, P'=free_111, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 1+B-A1

     12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1

     13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1

     14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1

     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+free_19+100*free_20 ], cost: 1

     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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 ], cost: 1+B-A1

     58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 ], cost: 1+B-A1

     31: f92 -> f101 : [ A1>=B ], cost: 1

     59: f92 -> f101 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 1+C-A1

     30: f101 -> f110 : [ A1>=C ], cost: 1

     60: f101 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=C && A>=A1 ], cost: 2+A-A1

     29: f110 -> f119 : [ A1>=1+A ], cost: 1

     28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1

     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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 1-C+A

     27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1



Eliminated locations (on linear paths):

   Start location: f2

      0: f2 -> f5 : [], cost: 1

      1: f5 -> f8 : [ A>=B ], cost: 1

     51: f5 -> f8 : C'=1+A, [ A>=B && A>=C ], cost: 2-C+A

     62: f5 -> f27 : [ B>=1+A ], cost: 2

     40: f8 -> f5 : B'=1+B, [ C>=1+A ], cost: 1

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

      5: f31 -> f34 : [ A>=1+B ], cost: 1

     35: f31 -> f46 : [ B>=A && 0>=1+F ], cost: 1

     36: f31 -> f46 : [ B>=A && F>=1 ], cost: 1

     52: f31 -> f34 : C'=1+A, F'=F-free_1*(-1+C-A), G'=free_1, [ A>=1+B && A>=C ], cost: 2-C+A

     34: f34 -> f31 : B'=1+B, [ C>=1+A ], cost: 1

      7: f46 -> f50 : H'=free_2, [ 3>=E ], cost: 1

      8: f46 -> f50 : H'=0, [ E>=4 ], cost: 1

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     33: f50 -> f132 : [ B>=A ], cost: 1

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     61: f50 -> f132 : B'=1+A, [ -B+A==0 ], cost: 2-B+A

     10: f69 -> f53 : C'=1+C, [ H>=Q ], cost: 1

     17: f69 -> f80 : P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ free_31>=1+free_33+K && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && Q>=1+H ], cost: 1

     18: f69 -> f80 : P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ free_43+K>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && Q>=1+H ], cost: 1

     20: f69 -> f92 : P'=free_89, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H ], cost: 1

     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'=free_3+100*free_5, [ H>=Q && A>=1+C && E>=5 ], cost: 1-C+A

     57: f69 -> f92 : A1'=B, K'=free_112, P'=free_111, Q_1'=free_86, R'=K+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && Q>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 1+B-A1

     12: f53 -> f69 : Q'=free_7, J'=free_6, K'=100*free_6, [ A>=C && 4>=E ], cost: 1

     13: f53 -> f69 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 ], cost: 1

     14: f53 -> f69 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 ], cost: 1

     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+free_19+100*free_20 ], cost: 1

     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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 ], cost: 1+B-A1

     58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 ], cost: 1+B-A1

     31: f92 -> f101 : [ A1>=B ], cost: 1

     59: f92 -> f101 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 1+C-A1

     30: f101 -> f110 : [ A1>=C ], cost: 1

     60: f101 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=C && A>=A1 ], cost: 2+A-A1

     29: f110 -> f119 : [ A1>=1+A ], cost: 1

     28: f119 -> f53 : C'=1+C, [ A1>=1+A ], cost: 1

     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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 1-C+A

     27: f132 -> f27 : E'=1+E, [ B>=1+A ], cost: 1



Eliminated locations (on tree-shaped paths):

   Start location: f2

      0: f2 -> f5 : [], cost: 1

     62: f5 -> f27 : [ B>=1+A ], cost: 2

     63: f5 -> f5 : B'=1+B, [ A>=B && C>=1+A ], cost: 2

     64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

     65: f31 -> f31 : B'=1+B, [ A>=1+B && C>=1+A ], cost: 2

     66: f31 -> f31 : B'=1+B, C'=1+A, F'=F-free_1*(-1+C-A), G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A

     67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2

     68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2

     69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2

     70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     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

     74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H ], cost: 2

     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_36, U'=free_39, V'=free_38, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H ], cost: 2

     76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_89, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H ], cost: 2

     77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     78: f53 -> f53 : C'=1+C, Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && H>=free_12 ], cost: 2

     79: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_31>=1+free_33+100*free_11 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_12>=1+H ], cost: 2

     80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H ], cost: 2

     81: f53 -> f92 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_89, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && free_9>=1+100*free_11+free_8 && H>=free_12 && A>=1+C ], cost: 2-C+A

     83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     84: f53 -> f53 : C'=1+C, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2

     85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H ], cost: 2

     86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H ], cost: 2

     87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_89, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && 100*free_16+free_13>=1+free_14 && H>=free_17 && A>=1+C ], cost: 2-C+A

     89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     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+free_19+100*free_20 && H>=free_21 ], cost: 2

     91: f53 -> f80 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ E>=5 && A>=C && free_18>=1+free_19+100*free_20 && free_31>=1+100*free_20+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_21>=1+H ], cost: 2

     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_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && free_18>=1+free_19+100*free_20 && 100*free_20+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_21>=1+H ], cost: 2

     93: f53 -> f92 : Q'=free_21, J'=free_20, K'=100*free_20, L'=free_19, M'=free_18, P'=free_89, Q_1'=free_86, R'=100*free_20+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_18>=1+free_19+100*free_20 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_21>=1+H ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && free_18>=1+free_19+100*free_20 && H>=free_21 && A>=1+C ], cost: 2-C+A

     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_86, R'=100*free_20+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_18>=1+free_19+100*free_20 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_21>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     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

     97: f53 -> f80 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && free_31>=1+free_33+100*free_24 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_25>=1+H ], cost: 2

     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_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && free_43+100*free_24>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_25>=1+H ], cost: 2

     99: f53 -> f92 : Q'=free_25, J'=free_24, K'=100*free_24, L'=free_23, M'=free_22, P'=free_89, Q_1'=free_86, R'=100*free_24+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_25>=1+H ], cost: 2

    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'=free_3+100*free_5, [ E>=5 && free_23+100*free_24>=1+free_22 && H>=free_25 && A>=1+C ], cost: 2-C+A

    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_86, R'=100*free_24+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_23+100*free_24>=1+free_22 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_25>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 ], cost: 1+B-A1

     58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 ], cost: 1+B-A1

    102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2

    103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1

    104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1

    105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1

    106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2

    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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A



Applied pruning (of leafs and parallel rules):

   Start location: f2

      0: f2 -> f5 : [], cost: 1

     62: f5 -> f27 : [ B>=1+A ], cost: 2

     63: f5 -> f5 : B'=1+B, [ A>=B && C>=1+A ], cost: 2

     64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

     65: f31 -> f31 : B'=1+B, [ A>=1+B && C>=1+A ], cost: 2

     66: f31 -> f31 : B'=1+B, C'=1+A, F'=F-free_1*(-1+C-A), G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A

     67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2

     68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2

     69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2

     70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H ], cost: 2

     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_36, U'=free_39, V'=free_38, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H ], cost: 2

     76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_89, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H ], cost: 2

     77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && free_9>=1+100*free_11+free_8 && H>=free_12 && A>=1+C ], cost: 2-C+A

     83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     84: f53 -> f53 : C'=1+C, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2

     85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H ], cost: 2

     86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H ], cost: 2

     87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_89, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && 100*free_16+free_13>=1+free_14 && H>=free_17 && A>=1+C ], cost: 2-C+A

     89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     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'=free_3+100*free_5, [ E>=5 && free_18>=1+free_19+100*free_20 && H>=free_21 && A>=1+C ], cost: 2-C+A

    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'=free_3+100*free_5, [ E>=5 && free_23+100*free_24>=1+free_22 && H>=free_25 && A>=1+C ], cost: 2-C+A

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 ], cost: 1+B-A1

     58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 ], cost: 1+B-A1

    102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2

    103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1

    104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1

    105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1

    106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2

    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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A



Accelerating simple loops of location 1.

   Accelerating the following rules:

     63: f5 -> f5 : B'=1+B, [ A>=B && C>=1+A ], cost: 2

     64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A



   Accelerated rule 63 with metering function 1-B+A, yielding the new rule 108.

   Found no metering function for rule 64.

   Removing the simple loops: 63.



Accelerating simple loops of location 5.

   Accelerating the following rules:

     65: f31 -> f31 : B'=1+B, [ A>=1+B && C>=1+A ], cost: 2

     66: f31 -> f31 : B'=1+B, C'=1+A, F'=F-free_1*(-1+C-A), G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A



   Accelerated rule 65 with metering function -B+A, yielding the new rule 109.

   Found no metering function for rule 66.

   Removing the simple loops: 65.



Accelerating simple loops of location 10.

   Simplified some of the simple loops (and removed duplicate rules).

   Accelerating the following rules:

     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'=free_3+100*free_5, [ E>=5 && H>=free_12 && A>=1+C ], cost: 2-C+A

     84: f53 -> f53 : C'=1+C, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && H>=free_17 ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && H>=free_17 && A>=1+C ], cost: 2-C+A

     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'=free_3+100*free_5, [ E>=5 && H>=free_21 && A>=1+C ], cost: 2-C+A

    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'=free_3+100*free_5, [ E>=5 && H>=free_25 && A>=1+C ], cost: 2-C+A



   Found no metering function for rule 82.

   Accelerated rule 84 with metering function 1-C+A, yielding the new rule 110.

   Found no metering function for rule 88.

   Found no metering function for rule 94.

   Found no metering function for rule 100.

   Removing the simple loops: 84.



Accelerated all simple loops using metering functions (where possible):

   Start location: f2

      0: f2 -> f5 : [], cost: 1

     62: f5 -> f27 : [ B>=1+A ], cost: 2

     64: f5 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 3-C+A

    108: f5 -> f5 : B'=1+A, [ A>=B && C>=1+A ], cost: 2-2*B+2*A

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

     66: f31 -> f31 : B'=1+B, C'=1+A, F'=F-free_1*(-1+C-A), G'=free_1, [ A>=1+B && A>=C ], cost: 3-C+A

     67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2

     68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2

     69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2

     70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2

    109: f31 -> f31 : B'=A, [ A>=1+B && C>=1+A ], cost: -2*B+2*A

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H ], cost: 2

     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_36, U'=free_39, V'=free_38, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H ], cost: 2

     76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_89, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H ], cost: 2

     77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && H>=free_12 && A>=1+C ], cost: 2-C+A

     83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H ], cost: 2

     86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H ], cost: 2

     87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_89, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H ], cost: 2

     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'=free_3+100*free_5, [ E>=5 && H>=free_17 && A>=1+C ], cost: 2-C+A

     89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     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'=free_3+100*free_5, [ E>=5 && H>=free_21 && A>=1+C ], cost: 2-C+A

    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'=free_3+100*free_5, [ E>=5 && H>=free_25 && A>=1+C ], cost: 2-C+A

    110: f53 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 ], cost: 1+B-A1

     58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 ], cost: 1+B-A1

    102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2

    103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1

    104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1

    105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1

    106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2

    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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A



Chained accelerated rules (with incoming rules):

   Start location: f2

      0: f2 -> f5 : [], cost: 1

    111: f2 -> f5 : B'=1+B, C'=1+A, [ A>=B && A>=C ], cost: 4-C+A

    112: f2 -> f5 : B'=1+A, [ A>=B && C>=1+A ], cost: 3-2*B+2*A

     62: f5 -> f27 : [ B>=1+A ], cost: 2

      4: f27 -> f31 : F'=0, [ 50>=E ], cost: 1

    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

    114: f27 -> f31 : B'=A, F'=0, [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     67: f31 -> f50 : H'=free_2, [ B>=A && 0>=1+F && 3>=E ], cost: 2

     68: f31 -> f50 : H'=0, [ B>=A && 0>=1+F && E>=4 ], cost: 2

     69: f31 -> f50 : H'=free_2, [ B>=A && F>=1 && 3>=E ], cost: 2

     70: f31 -> f50 : H'=0, [ B>=A && F>=1 && E>=4 ], cost: 2

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_25 && A>=1+C ], cost: 3-C+A

    123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

     74: f53 -> f80 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H ], cost: 2

     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_36, U'=free_39, V'=free_38, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H ], cost: 2

     76: f53 -> f92 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_89, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H ], cost: 2

     77: f53 -> f92 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     80: f53 -> f80 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H ], cost: 2

     83: f53 -> f92 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     85: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_35-free_34, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H ], cost: 2

     86: f53 -> f80 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_45-free_44, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H ], cost: 2

     87: f53 -> f92 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_89, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H ], cost: 2

     89: f53 -> f92 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 ], cost: 2+B-A1

     19: f80 -> f92 : P'=free_58*S, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 ], cost: 1

     21: f80 -> f92 : P'=-S*free_109, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 ], cost: 1

     56: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ T>=0 && S>=S*free_47*free_57 && S*free_47*free_57+free_47>=1+S && free_47>=free_53 && S>=free_51*S*free_57 && free_51+free_51*S*free_57>=1+S && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && S>=free_48*S*free_57 && free_48+free_48*S*free_57>=1+S && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && S>=free_55*S*free_57 && free_55*S*free_57+free_55>=1+S && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 ], cost: 1+B-A1

     58: f80 -> f92 : A1'=B, K'=free_112, P'=free_111, S'=-S, W'=free_108, X'=free_107, Y'=-S*free_104, Z'=free_105, [ 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+T && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+S*free_101 && 2*free_100+free_103*free_100+S*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+S*free_98+free_106*free_110 && 2*free_106+S*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 ], cost: 1+B-A1

    102: f92 -> f110 : [ A1>=B && A1>=C ], cost: 2

    103: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && A1>=C && A>=A1 ], cost: 3+A-A1

    104: f92 -> f110 : A1'=C, K'=free_114, P'=free_113, [ A1>=B && C>=1+A1 ], cost: 2+C-A1

    105: f92 -> f110 : A1'=1+A, K'=free_116, P'=free_115, [ A1>=B && C>=1+A1 && A>=C ], cost: 3+A-A1

    106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2

    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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_12 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_17 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_21 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_25 && A>=2+C ], cost: 3-C+A

    124: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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



Eliminated locations (on tree-shaped paths):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

      9: f50 -> f53 : [ A>=1+B ], cost: 1

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_25 && A>=1+C ], cost: 3-C+A

    123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

    153: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_89, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C ], cost: 4

    154: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1

    155: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 4+C-A1

    156: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    157: f53 -> f110 : A1'=B, Q'=free_7, J'=free_6, K'=free_112, P'=free_111, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && B>=C ], cost: 4+B-A1

    158: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && B>=C && A>=B ], cost: 5+A-A1

    159: f53 -> f110 : A1'=C, Q'=free_7, J'=free_6, K'=free_114, P'=free_113, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 4+C-A1

    160: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1

    161: f53 -> f110 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 && B>=C ], cost: 4+B-A1

    162: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 && B>=C && A>=B ], cost: 5+A-A1

    163: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 4+C-A1

    164: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_86, R'=100*free_11+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_12>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1

    165: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_89, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && A1>=C ], cost: 4

    166: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1

    167: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 ], cost: 4+C-A1

    168: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    169: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 && B>=C ], cost: 4+B-A1

    170: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 && B>=C && A>=B ], cost: 5+A-A1

    171: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 4+C-A1

    172: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1

    173: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_32*free_58, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C ], cost: 5

    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_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    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_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    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_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && A1>=C ], cost: 5

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    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_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C ], cost: 5+B-A1

    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_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    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_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    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_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && B>=C ], cost: 5+B-A1

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    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_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ A>=C && 4>=E && free_31>=1+100*free_6+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    189: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_58*free_42, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C ], cost: 5

    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_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    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_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    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_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && A1>=C ], cost: 5

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    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_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C ], cost: 5+B-A1

    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_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    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_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    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_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && B>=C ], cost: 5+B-A1

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    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_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ A>=C && 4>=E && 100*free_6+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_7>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    205: f53 -> f110 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_58*free_42, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C ], cost: 5

    206: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    207: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    208: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    209: f53 -> f110 : Q'=free_12, J'=free_11, K'=100*free_11, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=-free_42*free_109, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && A1>=C ], cost: 5

    210: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    211: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    212: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    213: f53 -> f110 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C ], cost: 5+B-A1

    214: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    215: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    216: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    217: f53 -> f110 : A1'=B, Q'=free_12, J'=free_11, K'=free_112, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_111, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && B>=C ], cost: 5+B-A1

    218: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    219: f53 -> f110 : A1'=C, Q'=free_12, J'=free_11, K'=free_114, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    220: f53 -> f110 : A1'=1+A, Q'=free_12, J'=free_11, K'=free_116, L'=free_10, M'=free_10+100*free_11, N'=free_8, O'=free_9, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && free_9>=1+100*free_11+free_8 && free_43+100*free_11>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_12>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    221: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_32*free_58, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C ], cost: 5

    222: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    223: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    224: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    225: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=-free_32*free_109, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && A1>=C ], cost: 5

    226: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    227: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    228: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    229: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C ], cost: 5+B-A1

    230: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    231: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    232: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && free_26>=0 && free_32>=free_32*free_47*free_57 && free_32*free_47*free_57+free_47>=1+free_32 && free_47>=free_53 && free_32>=free_51*free_32*free_57 && free_51+free_51*free_32*free_57>=1+free_32 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_32>=free_48*free_32*free_57 && free_48+free_48*free_32*free_57>=1+free_32 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_32>=free_32*free_55*free_57 && free_32*free_55*free_57+free_55>=1+free_32 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    233: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && B>=C ], cost: 5+B-A1

    234: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    235: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    236: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_33, R'=free_31, S'=-free_32, T'=free_26, U'=free_29, V'=free_28, W'=free_108, X'=free_107, Y'=-free_32*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_31>=1+100*free_16+free_33 && 1>=free_30*free_28+free_29*free_30 && free_30+free_30*free_28+free_29*free_30>=2 && free_32>=free_30 && 1>=free_29*free_27+free_27*free_28 && free_29*free_27+free_27+free_27*free_28>=2 && free_27>=free_32 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_26 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_32*free_101+free_100+free_103*free_100 && free_32*free_101+2*free_100+free_103*free_100>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_106*free_110+free_32*free_98 && 2*free_106+free_106*free_110+free_32*free_98>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    237: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_58*free_42, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C ], cost: 5

    238: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    239: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    240: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    241: f53 -> f110 : Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=-free_42*free_109, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && A1>=C ], cost: 5

    242: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && A1>=C && A>=A1 ], cost: 6+A-A1

    243: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 5+C-A1

    244: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && A1>=B && C>=1+A1 ], cost: 6+A-A1

    245: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C ], cost: 5+B-A1

    246: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    247: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    248: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_57, X'=free_56, Y'=free_53, Z'=free_54, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && free_36>=0 && free_42>=free_42*free_47*free_57 && free_42*free_47*free_57+free_47>=1+free_42 && free_47>=free_53 && free_42>=free_51*free_42*free_57 && free_51+free_51*free_42*free_57>=1+free_42 && free_53>=free_51 && 1>=free_50*free_57 && free_50*free_57+free_50>=2 && free_56>=free_50 && 1>=free_52*free_57 && free_52+free_52*free_57>=2 && free_52>=free_56 && free_42>=free_48*free_42*free_57 && free_48+free_48*free_42*free_57>=1+free_42 && 1>=free_46*free_57 && free_46*free_57+free_46>=2 && free_48>=free_46*free_60+free_60 && free_46*free_60+2*free_60>=1+free_48 && free_60>=free_54 && free_42>=free_42*free_55*free_57 && free_42*free_55*free_57+free_55>=1+free_42 && 1>=free_49*free_57 && free_49*free_57+free_49>=2 && free_55>=free_59+free_49*free_59 && 2*free_59+free_49*free_59>=1+free_55 && free_54>=free_59 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    249: f53 -> f110 : A1'=B, Q'=free_17, J'=free_16, K'=free_112, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_111, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && B>=C ], cost: 5+B-A1

    250: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && B>=C && A>=B ], cost: 6+A-A1

    251: f53 -> f110 : A1'=C, Q'=free_17, J'=free_16, K'=free_114, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_113, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 5+C-A1

    252: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_43, R'=free_41, S'=-free_42, T'=free_36, U'=free_39, V'=free_38, W'=free_108, X'=free_107, Y'=-free_42*free_104, Z'=free_105, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && 100*free_16+free_43>=1+free_41 && 1>=free_38*free_40+free_39*free_40 && free_38*free_40+free_39*free_40+free_40>=2 && free_42>=free_40 && 1>=free_38*free_37+free_39*free_37 && free_38*free_37+free_39*free_37+free_37>=2 && free_37>=free_42 && free_17>=1+H && 1>=free_104*free_108 && free_104+free_104*free_108>=2 && 0>=1+free_36 && 1>=free_108*free_99 && free_108*free_99+free_99>=2 && free_107>=free_99 && 1>=free_108*free_102 && free_108*free_102+free_102>=2 && free_102>=free_107 && 1>=free_101*free_108 && free_101+free_101*free_108>=2 && 1>=free_103*free_108 && free_103+free_103*free_108>=2 && 0>=free_100+free_103*free_100+free_42*free_101 && 2*free_100+free_103*free_100+free_42*free_101>=1 && free_105>=free_100 && 1>=free_98*free_108 && free_98*free_108+free_98>=2 && 1>=free_110*free_108 && free_110*free_108+free_110>=2 && 0>=free_106+free_42*free_98+free_106*free_110 && 2*free_106+free_42*free_98+free_106*free_110>=1 && free_106>=free_105 && B>=1+A1 && C>=1+B ], cost: 6+A-A1

    106: f110 -> f53 : C'=1+C, [ A1>=1+A ], cost: 2

    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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_12 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_17 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_21 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_25 && A>=2+C ], cost: 3-C+A

    124: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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



Applied pruning (of leafs and parallel rules):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

    153: f53 -> f110 : Q'=free_7, J'=free_6, K'=100*free_6, P'=free_89, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C ], cost: 4

    154: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1

    156: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    160: f53 -> f110 : A1'=1+A, Q'=free_7, J'=free_6, K'=free_116, P'=free_115, Q_1'=free_86, R'=100*free_6+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1

    168: f53 -> f110 : A1'=1+A, Q'=free_17, J'=free_16, K'=free_116, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && A>=C && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    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'=free_3+100*free_5, [ A1>=1+A && A>=1+C && E>=5 ], cost: 2-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_12 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_17 && A>=2+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A1>=1+A && E>=5 && H>=free_21 && A>=2+C ], cost: 3-C+A

    124: f110 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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



Eliminated locations (on tree-shaped paths):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C ], cost: 7-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && H>=free_12 && A>=2+C ], cost: 8-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && H>=free_17 && A>=2+C ], cost: 8-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && H>=free_21 && A>=2+C ], cost: 8-C+2*A-A1

    257: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && H>=free_17 ], cost: 7-2*C+3*A-A1

    258: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1

    259: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    260: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1



Accelerating simple loops of location 10.

   Simplified some of the simple loops (and removed duplicate rules).

   Accelerating the following rules:

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && free_78<=free_81 ], cost: 7-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && A1>=B && C>=1+A1 && H>=free_12 && A>=2+C && free_78<=free_81 ], cost: 8-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && H>=free_17 && A>=2+C && free_78<=free_81 ], cost: 8-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && A1>=B && C>=1+A1 && H>=free_21 && A>=2+C && free_78<=free_81 ], cost: 8-C+2*A-A1

    257: f53 -> f53 : A1'=1+A, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, N'=free_13, O'=free_14, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && H>=free_17 && free_78<=free_81 ], cost: 7-2*C+3*A-A1



   Found no metering function for rule 253.

   Found no metering function for rule 254.

   Accelerated rule 255 with NONTERM, yielding the new rule 261.

   Found no metering function for rule 256.

   Accelerated rule 257 with NONTERM, yielding the new rule 262.

   Removing the simple loops: 255 257.



Accelerated all simple loops using metering functions (where possible):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && free_78<=free_81 ], cost: 7-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && A1>=B && C>=1+A1 && H>=free_12 && A>=2+C && free_78<=free_81 ], cost: 8-C+2*A-A1

    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'=free_3+100*free_5, P'=free_115, Q_1'=free_86, R'=100*free_16+free_86, S'=free_83, W'=free_77, X'=free_80, Y'=free_64, Z'=free_71, [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && A1>=B && C>=1+A1 && H>=free_21 && A>=2+C && free_78<=free_81 ], cost: 8-C+2*A-A1

    258: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1

    259: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    260: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1

    261: f53 -> [32] : [ E>=5 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && H>=free_17 && A>=2+C && free_78<=free_81 && 8-C+2*A-A1>=1 ], cost: NONTERM

    262: f53 -> [32] : [ E>=5 && 100*free_16+free_13>=1+free_14 && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_17>=1+H && A1>=B && C>=1+A1 && A>=1+C && H>=free_17 && free_78<=free_81 && 7-2*C+3*A-A1>=1 ], cost: NONTERM



Chained accelerated rules (with incoming rules):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

    258: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1

    259: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    260: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1



Removed unreachable locations (and leaf rules with constant cost):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    123: f50 -> f53 : C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

     32: f53 -> f50 : B'=1+B, [ C>=1+A ], cost: 1

    258: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && A1>=C && A>=A1 ], cost: 5+A-A1

    259: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_81>=free_89 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_89>=free_78 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && A1>=B && C>=1+A1 ], cost: 5+A-A1

    260: f53 -> [31] : [ A>=C && 4>=E && free_69>=free_77*free_74*free_69 && free_74+free_77*free_74*free_69>=1+free_69 && free_67>=free_77*free_61*free_67 && free_61+free_77*free_61*free_67>=1+free_67 && free_95>=free_77*free_82*free_95 && free_77*free_82*free_95+free_82>=1+free_95 && free_74+free_68*free_82>=free_61*free_68 && free_68+free_61*free_68>=1+free_74+free_68*free_82 && free_68>=free_64 && free_69>=free_77*free_91*free_69 && free_91+free_77*free_91*free_69>=1+free_69 && free_67>=free_77*free_76*free_67 && free_76+free_77*free_76*free_67>=1+free_67 && free_95>=free_77*free_62*free_95 && free_62+free_77*free_62*free_95>=1+free_95 && free_91+free_62*free_85>=free_85*free_76 && free_85+free_85*free_76>=1+free_91+free_62*free_85 && free_64>=free_85 && free_69>=free_77*free_69*free_70 && free_77*free_69*free_70+free_70>=1+free_69 && free_67>=free_93*free_77*free_67 && free_93+free_93*free_77*free_67>=1+free_67 && free_95>=free_77*free_95*free_79 && free_79+free_77*free_95*free_79>=1+free_95 && free_65*free_79+free_70>=free_93*free_65 && free_65+free_93*free_65>=1+free_65*free_79+free_70 && 1>=free_77*free_88 && free_88+free_77*free_88>=2 && free_65>=free_88*free_73+free_73 && free_88*free_73+2*free_73>=1+free_65 && free_73>=free_71 && free_69>=free_77*free_69*free_96 && free_77*free_69*free_96+free_96>=1+free_69 && free_67>=free_77*free_66*free_67 && free_77*free_66*free_67+free_66>=1+free_67 && free_95>=free_77*free_95*free_63 && free_63+free_77*free_95*free_63>=1+free_95 && free_97*free_63+free_96>=free_97*free_66 && free_97+free_97*free_66>=1+free_97*free_63+free_96 && 1>=free_77*free_94 && free_94+free_77*free_94>=2 && free_97>=free_94*free_92+free_92 && free_94*free_92+2*free_92>=1+free_97 && free_71>=free_92 && free_90*free_95+free_69>=free_90*free_67 && free_90+free_90*free_67>=1+free_90*free_95+free_69 && free_90>=free_83 && free_69+free_87*free_95>=free_87*free_67 && free_87*free_67+free_87>=1+free_69+free_87*free_95 && free_83>=free_87 && free_84*free_81*free_95+free_84*free_69>=free_84*free_81*free_67 && free_81+free_84*free_81*free_67>=1+free_84*free_81*free_95+free_84*free_69 && free_84*free_69+free_84*free_78*free_95>=free_84*free_78*free_67 && free_84*free_78*free_67+free_78>=1+free_84*free_69+free_84*free_78*free_95 && free_75+free_77*free_75>=2 && free_80>=free_75 && 1>=free_77*free_72 && free_77*free_72+free_72>=2 && free_72>=free_80 && free_7>=1+H && B>=1+A1 && free_78<=free_81 && C>=1+B ], cost: 5+A-A1



Eliminated locations (on tree-shaped paths):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A

    267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

    268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

    269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    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



Applied pruning (of leafs and parallel rules):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A

    267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

    268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

    269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    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



Accelerating simple loops of location 8.

   Accelerating the following rules:

    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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A

    267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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



   Found no metering function for rule 263.

   Found no metering function for rule 264.

   Found no metering function for rule 265.

   Found no metering function for rule 266.

   Found no metering function for rule 267.

   Removing the simple loops:.



Accelerated all simple loops using metering functions (where possible):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    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'=free_3+100*free_5, [ A>=1+B && A>=C && E>=5 ], cost: 3-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 4-C+A

    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'=free_3+100*free_5, [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 4-C+A

    267: f50 -> f50 : B'=1+B, C'=1+A, Q'=free_17, J'=free_16, K'=100*free_16, L'=free_15, M'=100*free_16+free_15, 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

    268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

    269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    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



Chained accelerated rules (with incoming rules):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    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

    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

    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

    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

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

     71: f50 -> f27 : E'=1+E, [ B>=1+A ], cost: 2

     72: f50 -> f27 : B'=1+A, E'=1+E, [ -B+A==0 ], cost: 3-B+A

    268: f50 -> [33] : [ A>=1+B && A>=C && E>=5 ], cost: 2-C+A

    269: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_12 && A>=1+C ], cost: 3-C+A

    270: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_17 && A>=1+C ], cost: 3-C+A

    271: f50 -> [33] : [ A>=1+B && E>=5 && H>=free_21 && A>=1+C ], cost: 3-C+A

    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



Eliminated locations (on tree-shaped paths):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

    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

    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

    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

    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

    277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A

    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

    279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A

    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



Applied pruning (of leafs and parallel rules):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

    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

    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

    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

    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

    277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A

    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

    279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A

    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



Accelerating simple loops of location 4.

   Accelerating the following rules:

    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

    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

    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

    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



   Found no metering function for rule 273 (rule is too complicated).

   Found no metering function for rule 274 (rule is too complicated).

   Found no metering function for rule 275 (rule is too complicated).

   Found no metering function for rule 276 (rule is too complicated).

   Removing the simple loops:.



Accelerated all simple loops using metering functions (where possible):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

    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

    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

    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

    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

    277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A

    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

    279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A

    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



Chained accelerated rules (with incoming rules):

   Start location: f2

    125: f2 -> f27 : [ B>=1+A ], cost: 3

    126: f2 -> f27 : B'=1+B, C'=1+A, [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    127: f2 -> f27 : B'=1+A, [ A>=B && C>=1+A ], cost: 5-2*B+2*A

    132: f27 -> [30] : [ 50>=E && A>=1+B && C>=1+A ], cost: 1-2*B+2*A

    277: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && 0>=1-free_1*(-1+C-A) && 3>=E ], cost: 6-C+A

    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

    279: f27 -> [35] : [ A>=1+B && A>=C && 1+B>=A && -free_1*(-1+C-A)>=1 && 3>=E ], cost: 6-C+A

    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



Eliminated locations (on tree-shaped paths):

   Start location: f2

    281: f2 -> [37] : [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    282: f2 -> [37] : [ A>=B && C>=1+A ], cost: 5-2*B+2*A



Applied pruning (of leafs and parallel rules):

   Start location: f2

    281: f2 -> [37] : [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    282: f2 -> [37] : [ A>=B && C>=1+A ], cost: 5-2*B+2*A



### Computing asymptotic complexity ###



Fully simplified ITS problem

   Start location: f2

    281: f2 -> [37] : [ A>=B && A>=C && 1+B>=1+A ], cost: 6-C+A

    282: f2 -> [37] : [ A>=B && C>=1+A ], cost: 5-2*B+2*A



Computing asymptotic complexity for rule 281

   Solved the limit problem by the following transformations:

      Created initial limit problem:

      1-C+A (+/+!), 6-C+A (+), 1+B-A (+/+!), 1-B+A (+/+!) [not solved]



      removing all constraints (solved by SMT)

      resulting limit problem: [solved]



      applying transformation rule (C) using substitution {C==-n,B==0,A==0}

      resulting limit problem:

      [solved]



   Solution:

      C / -n

      B / 0

      A / 0

   Resulting cost 6+n has complexity: Poly(n^1)



Found new complexity Poly(n^1).



Obtained the following overall complexity (w.r.t. the length of the input n):

   Complexity:  Poly(n^1)

   Cpx degree:  1

   Solved cost: 6+n

   Rule cost:   6-C+A

   Rule guard:  [ A>=B && A>=C && 1+B>=1+A ]



WORST_CASE(Omega(n^1),?)


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(4)
BOUNDS(n^1, INF)