238.17/148.84 WORST_CASE(Omega(n^1), O(n^1)) 238.17/148.86 proof of /export/starexec/sandbox/benchmark/theBenchmark.koat 238.17/148.86 # AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty 238.17/148.86 238.17/148.86 238.17/148.86 The runtime complexity of the given CpxIntTrs could be proven to be BOUNDS(n^1, nat(2 + 2 * Arg_7 + -2 * Arg_8) + nat(2 + -2 * Arg_8) + max(6 + -16 * Arg_10 + 32 * Arg_9, 6) + nat(4 + -4 * Arg_10) + nat(13 + -13 * Arg_10 + 13 * Arg_9) + nat(-2 * Arg_10 + 4 * Arg_9) + nat(8 + -8 * Arg_10) + nat(-4 * Arg_10 + 4 * Arg_9) + nat(4 * Arg_15 + 4 * Arg_7 + -4 * Arg_8) + nat(8 + -4 * Arg_8) + nat(-2 * Arg_10 + 2 * Arg_9) + nat(5 + 5 * Arg_7 + -5 * Arg_8) + nat(4 + -4 * Arg_8) + max(1, 2 + Arg_7 + -1 * Arg_8) + nat(12 + 24 * Arg_15 + -12 * Arg_16) + nat(2 * Arg_15 + 2 * Arg_7 + -2 * Arg_8) + nat(4 + -2 * Arg_8)). 238.17/148.86 238.17/148.86 (0) CpxIntTrs 238.17/148.86 (1) Koat2 Proof [FINISHED, 83.1 s] 238.17/148.86 (2) BOUNDS(1, nat(2 + 2 * Arg_7 + -2 * Arg_8) + nat(2 + -2 * Arg_8) + max(6 + -16 * Arg_10 + 32 * Arg_9, 6) + nat(4 + -4 * Arg_10) + nat(13 + -13 * Arg_10 + 13 * Arg_9) + nat(-2 * Arg_10 + 4 * Arg_9) + nat(8 + -8 * Arg_10) + nat(-4 * Arg_10 + 4 * Arg_9) + nat(4 * Arg_15 + 4 * Arg_7 + -4 * Arg_8) + nat(8 + -4 * Arg_8) + nat(-2 * Arg_10 + 2 * Arg_9) + nat(5 + 5 * Arg_7 + -5 * Arg_8) + nat(4 + -4 * Arg_8) + max(1, 2 + Arg_7 + -1 * Arg_8) + nat(12 + 24 * Arg_15 + -12 * Arg_16) + nat(2 * Arg_15 + 2 * Arg_7 + -2 * Arg_8) + nat(4 + -2 * Arg_8)) 238.17/148.86 (3) Loat Proof [FINISHED, 147.3 s] 238.17/148.86 (4) BOUNDS(n^1, INF) 238.17/148.86 238.17/148.86 238.17/148.86 ---------------------------------------- 238.17/148.86 238.17/148.86 (0) 238.17/148.86 Obligation: 238.17/148.86 Complexity Int TRS consisting of the following rules: 238.17/148.86 f2(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f13(1, X, Y, Z, A1, B1, C1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: A >= 1 && A <= 1 238.17/148.86 f13(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f16(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: H >= I 238.17/148.86 f16(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f16(A, B, C, D, E, F, G, H, I, J, K + 1, L + 2, M, N, O, P, Q, R, S, T, U, V, W)) :|: J >= K 238.17/148.86 f2(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f27(A, X, Y, Z, A1, B1, C1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: 0 >= A 238.17/148.86 f2(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f27(A, X, Y, Z, A1, B1, C1, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: A >= 2 238.17/148.86 f27(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f35(A, B, C, D, E, F, G, H, I, J, K, L, H - I + 2, 1, 0, P, Q, R, S, T, U, V, W)) :|: 0 >= I && H >= I 238.17/148.86 f27(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f35(A, B, C, D, E, F, G, H, I, J, K, L, H - I + 2, 1, 0, P, Q, R, S, T, U, V, W)) :|: I >= 2 && H >= I 238.17/148.86 f27(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f35(A, B, C, D, E, F, G, H, 1, J, K, L, 1, 1, 0, P, Q, R, S, T, U, V, W)) :|: H >= 1 && I >= 1 && I <= 1 238.17/148.86 f35(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f38(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: P >= 2 * X && 3 * X >= P + 1 && X + 1 >= Q 238.17/148.86 f38(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> 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)) :|: 0 >= Q && J >= K 238.17/148.86 f38(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> 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)) :|: Q >= 2 && J >= K 238.17/148.86 f38(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f38(A, B, C, D, E, F, G, H, I, J, K + 1, X + 3, M, N, O, P, 1, B * Y + B * Z, B * A1 - B * B1, C * C1 - C * D1, -(C) * E1 - C * F1, V, W)) :|: J >= K + 4 * X && 5 * X + K >= J + 1 && 0 >= K && J >= K && Q >= 1 && Q <= 1 238.17/148.86 f38(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f38(A, B, C, D, E, F, G, H, I, J, K + 1, X + 3, M, N, O, P, 1, B * Y + B * Z, B * A1 - B * B1, C * C1 - C * D1, -(C) * E1 - C * F1, V, W)) :|: J >= K + 4 * X && 5 * X + K >= J + 1 && J >= K && K >= 2 && Q >= 1 && Q <= 1 238.17/148.86 f38(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f38(A, B, C, D, E, F, G, H, I, J, 2, 1, M, N, O, P, 1, B * X + B * Y, B * Z - B * A1, C * B1 - C * C1, -(C) * D1 - C * E1, V, W)) :|: J >= 1 && K >= 1 && K <= 1 && Q >= 1 && Q <= 1 238.17/148.86 f53(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f38(A, B, C, D, E, F, G, H, I, J, K + 1, J - K + 2, M, N, O, P, Q, B * X + B * Y, B * Z - B * A1, C * B1 - C * C1, -(C) * D1 - C * E1, P + 3 - F1, W)) :|: Q >= 2 * F1 && 3 * F1 >= Q + 1 && 0 >= K 238.17/148.86 f53(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f38(A, B, C, D, E, F, G, H, I, J, K + 1, J - K + 2, M, N, O, P, Q, B * X + B * Y, B * Z - B * A1, C * B1 - C * C1, -(C) * D1 - C * E1, P + 3 - F1, W)) :|: Q >= 2 * F1 && 3 * F1 >= Q + 1 && K >= 2 238.17/148.86 f53(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f38(A, B, C, D, E, F, G, H, I, J, 2, 1, M, N, O, P, Q, B * X + B * Y, B * Z - B * A1, C * B1 - C * C1, -(C) * D1 - C * E1, P + 3 - F1, W)) :|: Q >= 2 * F1 && 3 * F1 >= Q + 1 && K >= 1 && K <= 1 238.17/148.86 f38(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f35(A, B, C, D, N, F, G, H, I, J, K, L, M, F * N - G * O + N, F * O + G * N + O, P, Q + 1, R, S, T, U, V, W + 2)) :|: K >= 1 + J 238.17/148.86 f35(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f27(A, B, C, D, E, F, G, H, I + 1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: P >= 2 * X && 3 * X >= P + 1 && Q >= 2 + X 238.17/148.86 f27(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> 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)) :|: 0 >= 2 + A && I >= 1 + H 238.17/148.86 f27(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> 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)) :|: A >= 0 && I >= 1 + H 238.17/148.86 f27(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f1(-(1), B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: I >= 1 + H && A + 1 >= 0 && A + 1 <= 0 238.17/148.86 f16(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> Com_1(f13(A, B, C, D, E, F, G, H, I + 1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W)) :|: K >= 1 + J 238.17/148.86 f13(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W) -> 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)) :|: I >= 1 + H 238.17/148.86 238.17/148.86 The start-symbols are:[f2_23] 238.17/148.86 238.17/148.86 238.17/148.86 ---------------------------------------- 238.17/148.86 238.17/148.86 (1) Koat2 Proof (FINISHED) 238.17/148.86 YES( ?, 6+2*2*max([0, -(Arg_10)+2*Arg_9])+2*max([0, 1-Arg_10])+2*2*max([0, 1+Arg_9-Arg_10])+2*max([0, -(Arg_10)+2*Arg_9])+2*max([0, Arg_9-Arg_10])+2*max([0, 1-Arg_10])+2*2*max([0, 1-Arg_16+2*Arg_15])+2*max([0, Arg_7+Arg_15-Arg_8])+2*max([0, 2-Arg_8])+2*max([0, 1+Arg_7-Arg_8])+2*max([0, 1-Arg_8])+max([0, -(Arg_10)+2*Arg_9])+max([0, 1-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, Arg_9-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, Arg_7+Arg_15-Arg_8])+max([0, 2-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_9-Arg_10])+max([1, 2+Arg_7-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)}) 238.17/148.86 238.17/148.86 238.17/148.86 238.17/148.86 Initial Complexity Problem: 238.17/148.86 238.17/148.86 Start: f2 238.17/148.86 238.17/148.86 Program_Vars: Arg_0, Arg_1, Arg_2, Arg_3, Arg_4, Arg_5, Arg_6, Arg_7, Arg_8, Arg_9, Arg_10, Arg_11, Arg_12, Arg_13, Arg_14, Arg_15, Arg_16, Arg_17, Arg_18, Arg_19, Arg_20, Arg_21, Arg_22 238.17/148.86 238.17/148.86 Temp_Vars: A1, B1, C1, D1, E1, F1, X, Y, Z 238.17/148.86 238.17/148.86 Locations: f1, f13, f16, f2, f27, f35, f38, f53 238.17/148.86 238.17/148.86 Transitions: 238.17/148.86 238.17/148.86 f13(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f16(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_0 <= 1 && 1 <= Arg_0 && Arg_8 <= Arg_7 238.17/148.86 238.17/148.86 f13(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_0 <= 1 && 1 <= Arg_0 && 1+Arg_7 <= Arg_8 238.17/148.86 238.17/148.86 f16(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f13(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8+1,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && Arg_0 <= 1 && 1 <= Arg_0 && 1+Arg_9 <= Arg_10 238.17/148.86 238.17/148.86 f16(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f16(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10+1,Arg_11+2,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && Arg_0 <= 1 && 1 <= Arg_0 && Arg_10 <= Arg_9 238.17/148.86 238.17/148.86 f2(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f13(1,X,Y,Z,A1,B1,C1,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_0 <= 1 && 1 <= Arg_0 238.17/148.86 238.17/148.86 f2(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f27(Arg_0,X,Y,Z,A1,B1,C1,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_0 <= 0 238.17/148.86 238.17/148.86 f2(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f27(Arg_0,X,Y,Z,A1,B1,C1,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:2 <= Arg_0 238.17/148.86 238.17/148.86 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f1(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:2+Arg_0 <= 0 && 1+Arg_7 <= Arg_8 238.17/148.86 238.17/148.86 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f1(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:0 <= Arg_0 && 1+Arg_7 <= Arg_8 238.17/148.86 238.17/148.86 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f1(-1,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:1+Arg_7 <= Arg_8 && Arg_0+1 <= 0 && 0 <= 1+Arg_0 238.17/148.86 238.17/148.86 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f35(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_7-Arg_8+2,1,0,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_8 <= 0 && Arg_8 <= Arg_7 238.17/148.86 238.17/148.86 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f35(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_7-Arg_8+2,1,0,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:2 <= Arg_8 && Arg_8 <= Arg_7 238.17/148.86 238.17/148.86 f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f35(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,1,Arg_9,Arg_10,Arg_11,1,1,0,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:1 <= Arg_7 && Arg_8 <= 1 && 1 <= Arg_8 238.17/148.86 238.17/148.86 f35(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f27(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8+1,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && (2)*X <= Arg_15 && Arg_15+1 <= (3)*X && 2+X <= Arg_16 238.17/148.86 238.17/148.86 f35(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && (2)*X <= Arg_15 && Arg_15+1 <= (3)*X && Arg_16 <= X+1 238.17/148.86 238.17/148.86 f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f35(Arg_0,Arg_1,Arg_2,Arg_3,Arg_13,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_5Arg_13-Arg_6Arg_14+Arg_13,Arg_5Arg_14+Arg_6Arg_13+Arg_14,Arg_15,Arg_16+1,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22+2):|:Arg_8 <= Arg_7 && 1+Arg_9 <= Arg_10 238.17/148.86 238.17/148.86 f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10+1,X+3,Arg_12,Arg_13,Arg_14,Arg_15,1,Arg_1Y+Arg_1Z,A1Arg_1-Arg_1B1,Arg_2C1-Arg_2D1,-Arg_2E1-Arg_2F1,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && Arg_10+(4)*X <= Arg_9 && Arg_9+1 <= (5)*X+Arg_10 && Arg_10 <= 0 && Arg_10 <= Arg_9 && Arg_16 <= 1 && 1 <= Arg_16 238.17/148.86 238.17/148.86 f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10+1,X+3,Arg_12,Arg_13,Arg_14,Arg_15,1,Arg_1Y+Arg_1Z,A1Arg_1-Arg_1B1,Arg_2C1-Arg_2D1,-Arg_2E1-Arg_2F1,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && Arg_10+(4)*X <= Arg_9 && Arg_9+1 <= (5)*X+Arg_10 && Arg_10 <= Arg_9 && 2 <= Arg_10 && Arg_16 <= 1 && 1 <= Arg_16 238.17/148.86 238.17/148.86 f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,2,1,Arg_12,Arg_13,Arg_14,Arg_15,1,Arg_1X+Arg_1Y,Arg_1Z-A1Arg_1,B1Arg_2-Arg_2C1,-Arg_2D1-Arg_2E1,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && 1 <= Arg_9 && Arg_10 <= 1 && 1 <= Arg_10 && Arg_16 <= 1 && 1 <= Arg_16 238.17/148.86 238.17/148.86 f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f53(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && Arg_16 <= 0 && Arg_10 <= Arg_9 238.17/148.86 238.17/148.86 f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f53(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22):|:Arg_8 <= Arg_7 && 2 <= Arg_16 && Arg_10 <= Arg_9 238.17/148.86 238.17/148.86 f53(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10+1,Arg_9-Arg_10+2,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_1X+Arg_1Y,Arg_1Z-A1Arg_1,B1Arg_2-Arg_2C1,-Arg_2D1-Arg_2E1,Arg_15+3-F1,Arg_22):|:Arg_10 <= Arg_9 && Arg_8 <= Arg_7 && (2)*F1 <= Arg_16 && Arg_16+1 <= (3)*F1 && Arg_10 <= 0 238.17/148.86 238.17/148.86 f53(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10+1,Arg_9-Arg_10+2,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_1X+Arg_1Y,Arg_1Z-A1Arg_1,B1Arg_2-Arg_2C1,-Arg_2D1-Arg_2E1,Arg_15+3-F1,Arg_22):|:Arg_10 <= Arg_9 && Arg_8 <= Arg_7 && (2)*F1 <= Arg_16 && Arg_16+1 <= (3)*F1 && 2 <= Arg_10 238.17/148.86 238.17/148.86 f53(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,Arg_10,Arg_11,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_17,Arg_18,Arg_19,Arg_20,Arg_21,Arg_22) -> f38(Arg_0,Arg_1,Arg_2,Arg_3,Arg_4,Arg_5,Arg_6,Arg_7,Arg_8,Arg_9,2,1,Arg_12,Arg_13,Arg_14,Arg_15,Arg_16,Arg_1X+Arg_1Y,Arg_1Z-A1Arg_1,B1Arg_2-Arg_2C1,-Arg_2D1-Arg_2E1,Arg_15+3-F1,Arg_22):|:Arg_10 <= Arg_9 && Arg_8 <= Arg_7 && (2)*F1 <= Arg_16 && Arg_16+1 <= (3)*F1 && Arg_10 <= 1 && 1 <= Arg_10 238.17/148.86 238.17/148.86 238.17/148.86 238.17/148.86 Timebounds: 238.17/148.86 238.17/148.86 Overall timebound: 6+2*2*max([0, -(Arg_10)+2*Arg_9])+2*max([0, 1-Arg_10])+2*2*max([0, 1+Arg_9-Arg_10])+2*max([0, -(Arg_10)+2*Arg_9])+2*max([0, Arg_9-Arg_10])+2*max([0, 1-Arg_10])+2*2*max([0, 1-Arg_16+2*Arg_15])+2*max([0, Arg_7+Arg_15-Arg_8])+2*max([0, 2-Arg_8])+2*max([0, 1+Arg_7-Arg_8])+2*max([0, 1-Arg_8])+max([0, -(Arg_10)+2*Arg_9])+max([0, 1-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, Arg_9-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, Arg_7+Arg_15-Arg_8])+max([0, 2-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_9-Arg_10])+max([1, 2+Arg_7-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16: max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27: 1 {O(1)} 238.17/148.86 238.17/148.86 2: f16->f16: max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13: max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13: 1 {O(1)} 238.17/148.86 238.17/148.86 3: f2->f27: 1 {O(1)} 238.17/148.86 238.17/148.86 4: f2->f27: 1 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35: 2*max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35: 2*max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35: 2*max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1: 1 {O(1)} 238.17/148.86 238.17/148.86 20: f27->f1: 1 {O(1)} 238.17/148.86 238.17/148.86 21: f27->f1: 1 {O(1)} 238.17/148.86 238.17/148.86 8: f35->f38: 2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27: 2*max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53: 2*max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53: 2*max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38: 2*max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 12: f38->f38: 2*max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 13: f38->f38: 2*max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35: 2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38: 2*max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 15: f53->f38: 2*max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 16: f53->f38: 2*max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 238.17/148.86 238.17/148.86 Costbounds: 238.17/148.86 238.17/148.86 Overall costbound: 6+2*2*max([0, -(Arg_10)+2*Arg_9])+2*max([0, 1-Arg_10])+2*2*max([0, 1+Arg_9-Arg_10])+2*max([0, -(Arg_10)+2*Arg_9])+2*max([0, Arg_9-Arg_10])+2*max([0, 1-Arg_10])+2*2*max([0, 1-Arg_16+2*Arg_15])+2*max([0, Arg_7+Arg_15-Arg_8])+2*max([0, 2-Arg_8])+2*max([0, 1+Arg_7-Arg_8])+2*max([0, 1-Arg_8])+max([0, -(Arg_10)+2*Arg_9])+max([0, 1-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, Arg_9-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, Arg_7+Arg_15-Arg_8])+max([0, 2-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_9-Arg_10])+max([1, 2+Arg_7-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16: max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27: 1 {O(1)} 238.17/148.86 238.17/148.86 2: f16->f16: max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13: max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13: 1 {O(1)} 238.17/148.86 238.17/148.86 3: f2->f27: 1 {O(1)} 238.17/148.86 238.17/148.86 4: f2->f27: 1 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35: 2*max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8])+max([0, 1-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35: 2*max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8])+max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35: 2*max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8])+max([0, 2-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1: 1 {O(1)} 238.17/148.86 238.17/148.86 20: f27->f1: 1 {O(1)} 238.17/148.86 238.17/148.86 21: f27->f1: 1 {O(1)} 238.17/148.86 238.17/148.86 8: f35->f38: 2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27: 2*max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53: 2*max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53: 2*max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10])+max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38: 2*max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 12: f38->f38: 2*max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 13: f38->f38: 2*max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35: 2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38: 2*max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10])+max([0, 1-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 15: f53->f38: 2*max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 16: f53->f38: 2*max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 238.17/148.86 238.17/148.86 Sizebounds: 238.17/148.86 238.17/148.86 `Lower: 238.17/148.86 238.17/148.86 1: f13->f16, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_0: Arg_0 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_0: 2 {O(1)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_12: 2 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_13: 1 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_14: 0 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_15: min([2, Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_16: min([3, Arg_16]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_7: 2 {O(1)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_8: 2 {O(1)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_12: 2 {O(1)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_13: 1 {O(1)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_14: 0 {O(1)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_15: min([2, Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_16: min([3, Arg_16]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_7: 1 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_8: 1 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_13: 1 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_14: 0 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_15: min([2, Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_16: min([3, Arg_16]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_12: min([1, Arg_12]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_15: min([2, Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_16: min([3, Arg_16]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_0: 0 {O(1)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_12: min([1, Arg_12]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_15: min([2, Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_16: min([3, Arg_16]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_0: -1 {O(1)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_12: min([1, Arg_12]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_15: min([2, Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_16: min([3, Arg_16]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_16: min([3, min([3, min([1, min([3, Arg_16])])])]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_16: 3 {O(1)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_16: min([3, min([3, min([1, min([3, Arg_16])])])]) {O(n)} 238.17/148.86 238.17/148.86 9: f38->f53, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_11: min([1, min([1, Arg_11])]) {O(n)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_16: 2 {O(1)} 238.17/148.86 238.17/148.86 10: f38->f53, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_11: 4 {O(1)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_16: 1 {O(1)} 238.17/148.86 238.17/148.86 11: f38->f38, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_9: 6 {O(1)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_10: 3 {O(1)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_11: 4 {O(1)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_16: 1 {O(1)} 238.17/148.86 238.17/148.86 12: f38->f38, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_9: 1 {O(1)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_10: 2 {O(1)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_11: 1 {O(1)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_16: 1 {O(1)} 238.17/148.86 238.17/148.86 13: f38->f38, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_11: min([1, Arg_11]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_16: min([3, min([3, min([1, min([3, Arg_16])])])]) {O(n)} 238.17/148.86 238.17/148.86 17: f38->f35, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_9: min([1, Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_10: min([2, Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_11: 2 {O(1)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_16: 2 {O(1)} 238.17/148.86 238.17/148.86 14: f53->f38, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_9: 2 {O(1)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_10: 3 {O(1)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_11: 2 {O(1)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_16: 2 {O(1)} 238.17/148.86 238.17/148.86 15: f53->f38, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_0: min([2, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_7: min([1, Arg_7]) {O(n)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_8: min([1, Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_9: 1 {O(1)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_10: 2 {O(1)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_11: 1 {O(1)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_15: 2 {O(1)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_16: 2 {O(1)} 238.17/148.86 238.17/148.86 16: f53->f38, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 `Upper: 238.17/148.86 238.17/148.86 1: f13->f16, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_8: Arg_8+max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_10: Arg_10+max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_11: Arg_11+max([0, 2*(1+Arg_9-Arg_10)]) {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 1: f13->f16, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_8: max([Arg_8, Arg_8+max([0, 1+Arg_7-Arg_8])]) {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_10: max([Arg_10, Arg_10+max([0, 1+Arg_9-Arg_10])]) {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_11: max([Arg_11, Arg_11+max([0, 2*(1+Arg_9-Arg_10)])]) {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 23: f13->f27, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_8: Arg_8+max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_10: Arg_10+max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_11: Arg_11+max([0, 2*(1+Arg_9-Arg_10)]) {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 2: f16->f16, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_8: Arg_8+max([0, 1+Arg_7-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_10: Arg_10+max([0, 1+Arg_9-Arg_10]) {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_11: Arg_11+max([0, 2*(1+Arg_9-Arg_10)]) {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 22: f16->f13, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_0: 1 {O(1)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 0: f2->f13, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_0: 0 {O(1)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 3: f2->f27, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_0: Arg_0 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_8: Arg_8 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_10: Arg_10 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_11: Arg_11 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_12: Arg_12 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_13: Arg_13 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_14: Arg_14 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_16: Arg_16 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_17: Arg_17 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_18: Arg_18 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_19: Arg_19 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_20: Arg_20 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_21: Arg_21 {O(n)} 238.17/148.86 238.17/148.86 4: f2->f27, Arg_22: Arg_22 {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_8: 0 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_12: max([2+Arg_7-Arg_8, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_13: 1 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_14: 0 {O(1)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 5: f27->f35, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_12: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_13: 1 {O(1)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_14: 0 {O(1)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 6: f27->f35, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_8: 1 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_12: 1 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_13: 1 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_14: 0 {O(1)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 7: f27->f35, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_0: -2 {O(1)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_8: max([Arg_8, 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_10: max([Arg_10, 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_12: max([1, max([Arg_7, max([Arg_7, max([Arg_12, max([2+Arg_7-Arg_8, max([2+Arg_7+max([-1, -(Arg_8)]), max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_16: max([Arg_16, 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 19: f27->f1, Arg_22: max([Arg_22, Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]))]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_0: max([1, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_8: max([Arg_8, max([Arg_8, max([Arg_8+max([0, 1+Arg_7-Arg_8]), 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])])])]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_10: max([Arg_10, max([Arg_10, max([Arg_10+max([0, 1+Arg_9-Arg_10]), 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])])])]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_11: max([1, max([Arg_11, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([2+Arg_9+max([-2, -(Arg_10)]), Arg_11+max([0, 2*(1+Arg_9-Arg_10)])])])])])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_12: max([1, max([Arg_7, max([Arg_7, max([Arg_12, max([Arg_12, max([Arg_12, max([2+Arg_7-Arg_8, max([2+Arg_7+max([-1, -(Arg_8)]), max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_16: max([Arg_16, 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 20: f27->f1, Arg_22: max([Arg_22, Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]))]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_0: -1 {O(1)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_8: max([Arg_8, 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_10: max([Arg_10, 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_12: max([1, max([Arg_7, max([Arg_7, max([Arg_12, max([2+Arg_7-Arg_8, max([2+Arg_7+max([-1, -(Arg_8)]), max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_16: max([Arg_16, 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 21: f27->f1, Arg_22: max([Arg_22, Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]))]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_9: Arg_9 {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_15: Arg_15 {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.86 238.17/148.86 8: f35->f38, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_7: Arg_7 {O(n)} 238.17/148.86 238.17/148.86 18: f35->f27, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])]) {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_12: max([1, max([Arg_7, max([Arg_7, max([2+Arg_7-Arg_8, max([2+Arg_7+max([-1, -(Arg_8)]), max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])])])])]) {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 18: f35->f27, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])]) {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_16: 0 {O(1)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 9: f38->f53, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_11: max([1, max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_9, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])])])]) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 10: f38->f53, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_10: 1 {O(1)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_16: 1 {O(1)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 11: f38->f38, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_10: 2*max([0, Arg_9-Arg_10])+max([2, 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10])+max([0, Arg_9-Arg_10]) {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_16: 1 {O(1)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 12: f38->f38, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_10: 2 {O(1)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_11: 1 {O(1)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_16: 1 {O(1)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 13: f38->f38, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_11: max([1, max([Arg_9, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, max([Arg_11, 2+Arg_9+max([-2, -(Arg_10)])])])])])])])])]) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_21: max([Arg_21, 2+Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 17: f38->f35, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_10: 1 {O(1)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_11: 2+Arg_9+max([-2, -(Arg_10)]) {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_21: 2+Arg_15 {O(n)} 238.17/148.87 238.17/148.87 14: f53->f38, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_10: 2*max([0, -(Arg_10)+2*Arg_9])+max([2, Arg_10])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9])+max([0, -(Arg_10)+2*Arg_9]) {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_11: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_21: 2+Arg_15 {O(n)} 238.17/148.87 238.17/148.87 15: f53->f38, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_0: max([0, Arg_0]) {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_7: Arg_7 {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_8: 2*max([0, Arg_7+Arg_15-Arg_8])+max([1, Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8])+max([0, Arg_7+Arg_15-Arg_8]) {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_9: Arg_9 {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_10: 2 {O(1)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_11: 1 {O(1)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_12: max([1, max([Arg_7, max([2+Arg_7+max([-1, -(Arg_8)]), 2+Arg_7-Arg_8])])]) {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_15: Arg_15 {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_16: 2*max([0, 1-Arg_16+2*Arg_15])+max([1, Arg_16])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15]) {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_21: 2+Arg_15 {O(n)} 238.17/148.87 238.17/148.87 16: f53->f38, Arg_22: Arg_22+2*(2*max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])+max([0, 1-Arg_16+2*Arg_15])) {O(n)} 238.17/148.87 238.17/148.87 238.17/148.87 ---------------------------------------- 238.17/148.87 238.17/148.87 (2) 238.17/148.87 BOUNDS(1, nat(2 + 2 * Arg_7 + -2 * Arg_8) + nat(2 + -2 * Arg_8) + max(6 + -16 * Arg_10 + 32 * Arg_9, 6) + nat(4 + -4 * Arg_10) + nat(13 + -13 * Arg_10 + 13 * Arg_9) + nat(-2 * Arg_10 + 4 * Arg_9) + nat(8 + -8 * Arg_10) + nat(-4 * Arg_10 + 4 * Arg_9) + nat(4 * Arg_15 + 4 * Arg_7 + -4 * Arg_8) + nat(8 + -4 * Arg_8) + nat(-2 * Arg_10 + 2 * Arg_9) + nat(5 + 5 * Arg_7 + -5 * Arg_8) + nat(4 + -4 * Arg_8) + max(1, 2 + Arg_7 + -1 * Arg_8) + nat(12 + 24 * Arg_15 + -12 * Arg_16) + nat(2 * Arg_15 + 2 * Arg_7 + -2 * Arg_8) + nat(4 + -2 * Arg_8)) 238.17/148.87 238.17/148.87 ---------------------------------------- 238.17/148.87 238.17/148.87 (3) Loat Proof (FINISHED) 238.17/148.87 238.17/148.87 238.17/148.87 ### Pre-processing the ITS problem ### 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Initial linear ITS problem 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 0: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 ], cost: 1 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 1: f13 -> f16 : [ H>=Q ], cost: 1 238.17/148.87 238.17/148.87 23: f13 -> f27 : [ Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 2: f16 -> f16 : K'=1+K, L'=2+L, [ J>=K ], cost: 1 238.17/148.87 238.17/148.87 22: f16 -> f13 : Q'=1+Q, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 19: f27 -> f1 : A1'=B, B'=C, B1'=D, C'=E, C1'=F, D'=G, D1'=H, E'=Q, E1'=J, F'=K, F1'=L, G'=M, H'=N, Q'=O, J'=P, K'=Q_1, L'=R, M'=S, N'=T, O'=U, P'=V, Q_1'=W, [ 0>=2+A && Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 20: f27 -> f1 : A1'=B, B'=C, B1'=D, C'=E, C1'=F, D'=G, D1'=H, E'=Q, E1'=J, F'=K, F1'=L, G'=M, H'=N, Q'=O, J'=P, K'=Q_1, L'=R, M'=S, N'=T, O'=U, P'=V, Q_1'=W, [ A>=0 && Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 21: f27 -> f1 : A'=-1, A1'=B, B'=C, B1'=D, C'=E, C1'=F, D'=G, D1'=H, E'=Q, E1'=J, F'=K, F1'=L, G'=M, H'=N, Q'=O, J'=P, K'=Q_1, L'=R, M'=S, N'=T, O'=U, P'=V, Q_1'=W, [ Q>=1+H && 1+A==0 ], cost: 1 238.17/148.87 238.17/148.87 8: f35 -> f38 : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 9: f38 -> f53 : [ 0>=Q_1 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 10: f38 -> f53 : [ Q_1>=2 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 11: f38 -> f38 : K'=1+K, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && J>=K && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 12: f38 -> f38 : K'=1+K, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ J>=K+4*free_35 && K+5*free_35>=1+J && J>=K && K>=2 && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 13: f38 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ J>=1 && K==1 && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 17: f38 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 14: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K ], cost: 1 238.17/148.87 238.17/148.87 15: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 1 238.17/148.87 238.17/148.87 16: f53 -> f38 : K'=2, L'=1, R'=free_64*B+B*free_70, S'=B*free_67-free_71*B, T'=-free_65*C+free_68*C, U'=-free_66*C-free_69*C, V'=3+P-free_63, [ Q_1>=2*free_63 && 3*free_63>=1+Q_1 && K==1 ], cost: 1 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Removed unreachable and leaf rules: 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 0: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 ], cost: 1 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 1: f13 -> f16 : [ H>=Q ], cost: 1 238.17/148.87 238.17/148.87 23: f13 -> f27 : [ Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 2: f16 -> f16 : K'=1+K, L'=2+L, [ J>=K ], cost: 1 238.17/148.87 238.17/148.87 22: f16 -> f13 : Q'=1+Q, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 8: f35 -> f38 : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 9: f38 -> f53 : [ 0>=Q_1 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 10: f38 -> f53 : [ Q_1>=2 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 11: f38 -> f38 : K'=1+K, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && J>=K && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 12: f38 -> f38 : K'=1+K, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ J>=K+4*free_35 && K+5*free_35>=1+J && J>=K && K>=2 && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 13: f38 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ J>=1 && K==1 && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 17: f38 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 14: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K ], cost: 1 238.17/148.87 238.17/148.87 15: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 1 238.17/148.87 238.17/148.87 16: f53 -> f38 : K'=2, L'=1, R'=free_64*B+B*free_70, S'=B*free_67-free_71*B, T'=-free_65*C+free_68*C, U'=-free_66*C-free_69*C, V'=3+P-free_63, [ Q_1>=2*free_63 && 3*free_63>=1+Q_1 && K==1 ], cost: 1 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 ### Simplification by acceleration and chaining ### 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerating simple loops of location 2. 238.17/148.87 238.17/148.87 Accelerating the following rules: 238.17/148.87 238.17/148.87 2: f16 -> f16 : K'=1+K, L'=2+L, [ J>=K ], cost: 1 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated rule 2 with metering function 1+J-K, yielding the new rule 24. 238.17/148.87 238.17/148.87 Removing the simple loops: 2. 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerating simple loops of location 5. 238.17/148.87 238.17/148.87 Accelerating the following rules: 238.17/148.87 238.17/148.87 11: f38 -> f38 : K'=1+K, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 12: f38 -> f38 : K'=1+K, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 13: f38 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ J>=1 && K==1 && Q_1==1 ], cost: 1 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated rule 11 with backward acceleration, yielding the new rule 25. 238.17/148.87 238.17/148.87 Accelerated rule 11 with backward acceleration, yielding the new rule 26. 238.17/148.87 238.17/148.87 Accelerated rule 12 with metering function 1+J-K-4*free_35, yielding the new rule 27. 238.17/148.87 238.17/148.87 Accelerated rule 13 with metering function 2-K, yielding the new rule 28. 238.17/148.87 238.17/148.87 Nested simple loops 13 (outer loop) and 25 (inner loop) with metering function J-4*free_26, resulting in the new rules: 29. 238.17/148.87 238.17/148.87 Removing the simple loops: 11 12 13. 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated all simple loops using metering functions (where possible): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 0: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 ], cost: 1 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 1: f13 -> f16 : [ H>=Q ], cost: 1 238.17/148.87 238.17/148.87 23: f13 -> f27 : [ Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 22: f16 -> f13 : Q'=1+Q, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 24: f16 -> f16 : K'=1+J, L'=2+2*J-2*K+L, [ J>=K ], cost: 1+J-K 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 8: f35 -> f38 : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 9: f38 -> f53 : [ 0>=Q_1 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 10: f38 -> f53 : [ Q_1>=2 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 17: f38 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 25: f38 -> f38 : K'=1+J-4*free_26, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 1+J-K-4*free_26 238.17/148.87 238.17/148.87 26: f38 -> f38 : K'=1, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 1-K 238.17/148.87 238.17/148.87 27: f38 -> f38 : K'=1+J-4*free_35, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 1+J-K-4*free_35 238.17/148.87 238.17/148.87 28: f38 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ J>=1 && K==1 && Q_1==1 ], cost: 2-K 238.17/148.87 238.17/148.87 29: f38 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && J>=1 && 1+J-4*free_26==1 && J-4*free_26>=1 ], cost: -4*(J-4*free_26)*free_26+J*(J-4*free_26) 238.17/148.87 238.17/148.87 14: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K ], cost: 1 238.17/148.87 238.17/148.87 15: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 1 238.17/148.87 238.17/148.87 16: f53 -> f38 : K'=2, L'=1, R'=free_64*B+B*free_70, S'=B*free_67-free_71*B, T'=-free_65*C+free_68*C, U'=-free_66*C-free_69*C, V'=3+P-free_63, [ Q_1>=2*free_63 && 3*free_63>=1+Q_1 && K==1 ], cost: 1 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Chained accelerated rules (with incoming rules): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 0: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 ], cost: 1 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 1: f13 -> f16 : [ H>=Q ], cost: 1 238.17/148.87 238.17/148.87 23: f13 -> f27 : [ Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 30: f13 -> f16 : K'=1+J, L'=2+2*J-2*K+L, [ H>=Q && J>=K ], cost: 2+J-K 238.17/148.87 238.17/148.87 22: f16 -> f13 : Q'=1+Q, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 8: f35 -> f38 : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 31: f35 -> f38 : K'=1+J-4*free_26, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 2+J-K-4*free_26 238.17/148.87 238.17/148.87 32: f35 -> f38 : K'=1, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 2-K 238.17/148.87 238.17/148.87 33: f35 -> f38 : K'=1+J-4*free_35, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 2+J-K-4*free_35 238.17/148.87 238.17/148.87 34: f35 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=1 && K==1 && Q_1==1 ], cost: 3-K 238.17/148.87 238.17/148.87 9: f38 -> f53 : [ 0>=Q_1 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 10: f38 -> f53 : [ Q_1>=2 && J>=K ], cost: 1 238.17/148.87 238.17/148.87 17: f38 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 14: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K ], cost: 1 238.17/148.87 238.17/148.87 15: f53 -> f38 : K'=1+K, L'=2+J-K, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 1 238.17/148.87 238.17/148.87 16: f53 -> f38 : K'=2, L'=1, R'=free_64*B+B*free_70, S'=B*free_67-free_71*B, T'=-free_65*C+free_68*C, U'=-free_66*C-free_69*C, V'=3+P-free_63, [ Q_1>=2*free_63 && 3*free_63>=1+Q_1 && K==1 ], cost: 1 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Eliminated locations (on tree-shaped paths): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 0: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 ], cost: 1 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 23: f13 -> f27 : [ Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 35: f13 -> f13 : Q'=1+Q, [ H>=Q && K>=1+J ], cost: 2 238.17/148.87 238.17/148.87 36: f13 -> f13 : Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ H>=Q && J>=K ], cost: 3+J-K 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 8: f35 -> f38 : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 31: f35 -> f38 : K'=1+J-4*free_26, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 2+J-K-4*free_26 238.17/148.87 238.17/148.87 32: f35 -> f38 : K'=1, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 2-K 238.17/148.87 238.17/148.87 33: f35 -> f38 : K'=1+J-4*free_35, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 2+J-K-4*free_35 238.17/148.87 238.17/148.87 34: f35 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=1 && K==1 && Q_1==1 ], cost: 3-K 238.17/148.87 238.17/148.87 17: f38 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 37: f38 -> f38 : K'=1+K, L'=2+J-K, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K ], cost: 2 238.17/148.87 238.17/148.87 38: f38 -> f38 : K'=1+K, L'=2+J-K, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 2 238.17/148.87 238.17/148.87 39: f38 -> f38 : K'=2, L'=1, R'=free_64*B+B*free_70, S'=B*free_67-free_71*B, T'=-free_65*C+free_68*C, U'=-free_66*C-free_69*C, V'=3+P-free_63, [ Q_1>=2 && J>=K && Q_1>=2*free_63 && 3*free_63>=1+Q_1 && K==1 ], cost: 2 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerating simple loops of location 1. 238.17/148.87 238.17/148.87 Accelerating the following rules: 238.17/148.87 238.17/148.87 35: f13 -> f13 : Q'=1+Q, [ H>=Q && K>=1+J ], cost: 2 238.17/148.87 238.17/148.87 36: f13 -> f13 : Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ H>=Q && J>=K ], cost: 3+J-K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated rule 35 with metering function 1+H-Q, yielding the new rule 40. 238.17/148.87 238.17/148.87 Found no metering function for rule 36. 238.17/148.87 238.17/148.87 Removing the simple loops: 35. 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerating simple loops of location 5. 238.17/148.87 238.17/148.87 Accelerating the following rules: 238.17/148.87 238.17/148.87 37: f38 -> f38 : K'=1+K, L'=2+J-K, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K ], cost: 2 238.17/148.87 238.17/148.87 38: f38 -> f38 : K'=1+K, L'=2+J-K, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 2 238.17/148.87 238.17/148.87 39: f38 -> f38 : K'=2, L'=1, R'=free_64*B+B*free_70, S'=B*free_67-free_71*B, T'=-free_65*C+free_68*C, U'=-free_66*C-free_69*C, V'=3+P-free_63, [ Q_1>=2 && J>=K && Q_1>=2*free_63 && 3*free_63>=1+Q_1 && K==1 ], cost: 2 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated rule 37 with backward acceleration, yielding the new rule 41. 238.17/148.87 238.17/148.87 Accelerated rule 37 with backward acceleration, yielding the new rule 42. 238.17/148.87 238.17/148.87 Accelerated rule 38 with metering function 1+J-K, yielding the new rule 43. 238.17/148.87 238.17/148.87 Accelerated rule 39 with metering function 1-K, yielding the new rule 44. 238.17/148.87 238.17/148.87 Removing the simple loops: 37 38 39. 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated all simple loops using metering functions (where possible): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 0: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 ], cost: 1 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 23: f13 -> f27 : [ Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 36: f13 -> f13 : Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ H>=Q && J>=K ], cost: 3+J-K 238.17/148.87 238.17/148.87 40: f13 -> f13 : Q'=1+H, [ H>=Q && K>=1+J ], cost: 2+2*H-2*Q 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 8: f35 -> f38 : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 31: f35 -> f38 : K'=1+J-4*free_26, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 2+J-K-4*free_26 238.17/148.87 238.17/148.87 32: f35 -> f38 : K'=1, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 2-K 238.17/148.87 238.17/148.87 33: f35 -> f38 : K'=1+J-4*free_35, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 2+J-K-4*free_35 238.17/148.87 238.17/148.87 34: f35 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=1 && K==1 && Q_1==1 ], cost: 3-K 238.17/148.87 238.17/148.87 17: f38 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 41: f38 -> f38 : K'=1+J, L'=2, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 2+2*J-2*K 238.17/148.87 238.17/148.87 42: f38 -> f38 : K'=1, L'=2+J, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && J>=0 ], cost: 2-2*K 238.17/148.87 238.17/148.87 43: f38 -> f38 : K'=1+J, L'=2, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 2+2*J-2*K 238.17/148.87 238.17/148.87 44: f38 -> f38 : K'=2, L'=1, R'=free_64*B+B*free_70, S'=B*free_67-free_71*B, T'=-free_65*C+free_68*C, U'=-free_66*C-free_69*C, V'=3+P-free_63, [ Q_1>=2 && J>=K && Q_1>=2*free_63 && 3*free_63>=1+Q_1 && K==1 && 1-K>=1 ], cost: 2-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Chained accelerated rules (with incoming rules): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 0: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 ], cost: 1 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 45: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K ], cost: 4+J-K 238.17/148.87 238.17/148.87 46: f2 -> f13 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 3+2*H-2*Q 238.17/148.87 238.17/148.87 23: f13 -> f27 : [ Q>=1+H ], cost: 1 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 8: f35 -> f38 : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 31: f35 -> f38 : K'=1+J-4*free_26, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 2+J-K-4*free_26 238.17/148.87 238.17/148.87 32: f35 -> f38 : K'=1, L'=3+free_26, Q_1'=1, R'=B*free_20+B*free_23, S'=free_27*B-free_24*B, T'=free_21*C-free_25*C, U'=-free_22*C-free_19*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 2-K 238.17/148.87 238.17/148.87 33: f35 -> f38 : K'=1+J-4*free_35, L'=3+free_35, Q_1'=1, R'=B*free_29+B*free_32, S'=free_36*B-free_33*B, T'=free_30*C-free_34*C, U'=-free_31*C-free_28*C, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 2+J-K-4*free_35 238.17/148.87 238.17/148.87 34: f35 -> f38 : K'=2, L'=1, Q_1'=1, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=1 && K==1 && Q_1==1 ], cost: 3-K 238.17/148.87 238.17/148.87 47: f35 -> f38 : K'=1+J, L'=2, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 3+2*J-2*K 238.17/148.87 238.17/148.87 48: f35 -> f38 : K'=1, L'=2+J, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && J>=0 ], cost: 3-2*K 238.17/148.87 238.17/148.87 49: f35 -> f38 : K'=1+J, L'=2, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 3+2*J-2*K 238.17/148.87 238.17/148.87 17: f38 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ K>=1+J ], cost: 1 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Eliminated locations (on tree-shaped paths): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 50: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 && Q>=1+H ], cost: 2 238.17/148.87 238.17/148.87 51: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 52: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 53: f35 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J ], cost: 2 238.17/148.87 238.17/148.87 54: f35 -> f35 : E'=N, K'=2, L'=1, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=2, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=1 && K==1 && Q_1==1 && 2>=1+J ], cost: 4-K 238.17/148.87 238.17/148.87 55: f35 -> f35 : E'=N, K'=1+J, L'=2, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 4+2*J-2*K 238.17/148.87 238.17/148.87 56: f35 -> f35 : E'=N, K'=1, L'=2+J, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && J>=0 && 1>=1+J ], cost: 4-2*K 238.17/148.87 238.17/148.87 57: f35 -> f35 : E'=N, K'=1+J, L'=2, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 4+2*J-2*K 238.17/148.87 238.17/148.87 58: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 2+J-K-4*free_26 238.17/148.87 238.17/148.87 59: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 2-K 238.17/148.87 238.17/148.87 60: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 2+J-K-4*free_35 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerating simple loops of location 4. 238.17/148.87 238.17/148.87 Simplified some of the simple loops (and removed duplicate rules). 238.17/148.87 238.17/148.87 Accelerating the following rules: 238.17/148.87 238.17/148.87 53: f35 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J ], cost: 2 238.17/148.87 238.17/148.87 54: f35 -> f35 : E'=N, K'=2, L'=1, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=2, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 4-K 238.17/148.87 238.17/148.87 55: f35 -> f35 : E'=N, K'=1+J, L'=2, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 4+2*J-2*K 238.17/148.87 238.17/148.87 56: f35 -> f35 : E'=N, K'=1, L'=2+J, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 4-2*K 238.17/148.87 238.17/148.87 57: f35 -> f35 : E'=N, K'=1+J, L'=2, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 4+2*J-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Found no metering function for rule 53 (rule is too complicated). 238.17/148.87 238.17/148.87 Found no metering function for rule 54 (rule is too complicated). 238.17/148.87 238.17/148.87 Found no metering function for rule 55. 238.17/148.87 238.17/148.87 Found no metering function for rule 56 (rule is too complicated). 238.17/148.87 238.17/148.87 Found no metering function for rule 57. 238.17/148.87 238.17/148.87 Removing the simple loops:. 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated all simple loops using metering functions (where possible): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 50: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 && Q>=1+H ], cost: 2 238.17/148.87 238.17/148.87 51: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 52: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 53: f35 -> f35 : E'=N, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J ], cost: 2 238.17/148.87 238.17/148.87 54: f35 -> f35 : E'=N, K'=2, L'=1, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=2, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 4-K 238.17/148.87 238.17/148.87 55: f35 -> f35 : E'=N, K'=1+J, L'=2, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 4+2*J-2*K 238.17/148.87 238.17/148.87 56: f35 -> f35 : E'=N, K'=1, L'=2+J, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 4-2*K 238.17/148.87 238.17/148.87 57: f35 -> f35 : E'=N, K'=1+J, L'=2, N'=N*F+N-G*O, O'=G*N+F*O+O, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 4+2*J-2*K 238.17/148.87 238.17/148.87 58: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 2+J-K-4*free_26 238.17/148.87 238.17/148.87 59: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 2-K 238.17/148.87 238.17/148.87 60: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 2+J-K-4*free_35 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Chained accelerated rules (with incoming rules): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 50: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 && Q>=1+H ], cost: 2 238.17/148.87 238.17/148.87 51: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 52: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 5: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 6: f27 -> f35 : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q ], cost: 1 238.17/148.87 238.17/148.87 7: f27 -> f35 : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 ], cost: 1 238.17/148.87 238.17/148.87 61: f27 -> f35 : E'=1, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J ], cost: 3 238.17/148.87 238.17/148.87 62: f27 -> f35 : E'=1, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J ], cost: 3 238.17/148.87 238.17/148.87 63: f27 -> f35 : E'=1, Q'=1, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J ], cost: 3 238.17/148.87 238.17/148.87 64: f27 -> f35 : E'=1, K'=2, L'=1, M'=2+H-Q, N'=1+F, O'=G, Q_1'=2, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 5-K 238.17/148.87 238.17/148.87 65: f27 -> f35 : E'=1, K'=2, L'=1, M'=2+H-Q, N'=1+F, O'=G, Q_1'=2, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 5-K 238.17/148.87 238.17/148.87 66: f27 -> f35 : E'=1, Q'=1, K'=2, L'=1, M'=1, N'=1+F, O'=G, Q_1'=2, R'=B*free_43+B*free_37, S'=B*free_40-B*free_44, T'=-free_38*C+free_41*C, U'=-free_39*C-C*free_42, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 5-K 238.17/148.87 238.17/148.87 67: f27 -> f35 : E'=1, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 68: f27 -> f35 : E'=1, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 69: f27 -> f35 : E'=1, Q'=1, K'=1+J, L'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 70: f27 -> f35 : E'=1, K'=1, L'=2+J, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 71: f27 -> f35 : E'=1, K'=1, L'=2+J, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 72: f27 -> f35 : E'=1, Q'=1, K'=1, L'=2+J, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 73: f27 -> f35 : E'=1, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 74: f27 -> f35 : E'=1, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 75: f27 -> f35 : E'=1, Q'=1, K'=1+J, L'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 18: f35 -> f27 : Q'=1+Q, [ P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 1 238.17/148.87 238.17/148.87 58: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 2+J-K-4*free_26 238.17/148.87 238.17/148.87 59: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 2-K 238.17/148.87 238.17/148.87 60: f35 -> [12] : [ P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 2+J-K-4*free_35 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Eliminated locations (on tree-shaped paths): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 50: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 && Q>=1+H ], cost: 2 238.17/148.87 238.17/148.87 51: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 52: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 76: f27 -> f27 : Q'=1+Q, M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q && P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 2 238.17/148.87 238.17/148.87 77: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 78: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 3-K 238.17/148.87 238.17/148.87 79: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 3+J-K-4*free_35 238.17/148.87 238.17/148.87 80: f27 -> f27 : Q'=1+Q, M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q && P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 2 238.17/148.87 238.17/148.87 81: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 82: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 3-K 238.17/148.87 238.17/148.87 83: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 3+J-K-4*free_35 238.17/148.87 238.17/148.87 84: f27 -> f27 : Q'=2, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_72 && 3*free_72>=1+P && Q_1>=2+free_72 ], cost: 2 238.17/148.87 238.17/148.87 85: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 86: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 3-K 238.17/148.87 238.17/148.87 87: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 3+J-K-4*free_35 238.17/148.87 238.17/148.87 88: f27 -> f27 : E'=1, Q'=1+Q, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 4 238.17/148.87 238.17/148.87 89: f27 -> f27 : E'=1, Q'=1+Q, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 4 238.17/148.87 238.17/148.87 90: f27 -> f27 : E'=1, Q'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && K>=1+J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 4 238.17/148.87 238.17/148.87 91: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 92: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 93: f27 -> f27 : E'=1, Q'=2, K'=1+J, L'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 94: f27 -> f27 : E'=1, Q'=1+Q, K'=1, L'=2+J, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6-2*K 238.17/148.87 238.17/148.87 95: f27 -> f27 : E'=1, Q'=1+Q, K'=1, L'=2+J, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6-2*K 238.17/148.87 238.17/148.87 96: f27 -> f27 : E'=1, Q'=2, K'=1, L'=2+J, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6-2*K 238.17/148.87 238.17/148.87 97: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 98: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 99: f27 -> f27 : E'=1, Q'=2, K'=1+J, L'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_55*B+free_61*B, S'=-B*free_62+B*free_58, T'=-free_56*C+free_59*C, U'=-free_57*C-free_60*C, V'=3+P-free_54, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 100: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 5-K 238.17/148.87 238.17/148.87 101: f27 -> [14] : [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 5-K 238.17/148.87 238.17/148.87 102: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && 1-J==0 && K==1 && Q_1==1 ], cost: 5-K 238.17/148.87 238.17/148.87 103: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 104: f27 -> [14] : [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 105: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 106: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 107: f27 -> [14] : [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 108: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 109: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 110: f27 -> [14] : [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 111: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Applied pruning (of leafs and parallel rules): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 50: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 && Q>=1+H ], cost: 2 238.17/148.87 238.17/148.87 51: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 52: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 77: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 81: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 85: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 86: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 3-K 238.17/148.87 238.17/148.87 87: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 3+J-K-4*free_35 238.17/148.87 238.17/148.87 91: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 92: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 93: f27 -> f27 : E'=1, Q'=2, K'=1+J, L'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 94: f27 -> f27 : E'=1, Q'=1+Q, K'=1, L'=2+J, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6-2*K 238.17/148.87 238.17/148.87 96: f27 -> f27 : E'=1, Q'=2, K'=1, L'=2+J, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6-2*K 238.17/148.87 238.17/148.87 103: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 106: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 107: f27 -> [14] : [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 108: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 111: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerating simple loops of location 3. 238.17/148.87 238.17/148.87 Accelerating the following rules: 238.17/148.87 238.17/148.87 91: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 92: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 93: f27 -> f27 : E'=1, Q'=2, K'=1+J, L'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 94: f27 -> f27 : E'=1, Q'=1+Q, K'=1, L'=2+J, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6-2*K 238.17/148.87 238.17/148.87 96: f27 -> f27 : E'=1, Q'=2, K'=1, L'=2+J, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Found no metering function for rule 91. 238.17/148.87 238.17/148.87 Found no metering function for rule 92. 238.17/148.87 238.17/148.87 Accelerated rule 93 with metering function 1-Q, yielding the new rule 112. 238.17/148.87 238.17/148.87 Accelerated rule 94 with metering function -J, yielding the new rule 113. 238.17/148.87 238.17/148.87 Accelerated rule 96 with metering function 1-J-Q, yielding the new rule 114. 238.17/148.87 238.17/148.87 Removing the simple loops: 93 94 96. 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Accelerated all simple loops using metering functions (where possible): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 50: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 && Q>=1+H ], cost: 2 238.17/148.87 238.17/148.87 51: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 52: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 77: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 81: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 85: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 86: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 3-K 238.17/148.87 238.17/148.87 87: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 3+J-K-4*free_35 238.17/148.87 238.17/148.87 91: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 92: f27 -> f27 : E'=1, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+F, O'=G, Q_1'=1+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 103: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 106: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 107: f27 -> [14] : [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 108: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 111: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 112: f27 -> f27 : E'=1, Q'=2, K'=1+J, L'=2, M'=1, N'=1+F, O'=G, Q_1'=1+Q_1-Q, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2+W-2*Q, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 && 1-Q>=1 ], cost: 4-4*Q 238.17/148.87 238.17/148.87 113: f27 -> f27 : E'=1, Q'=-J+Q, K'=1, L'=2+J, M'=3+J+H-Q, N'=1+F, O'=G, Q_1'=-J+Q_1, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=-2*J+W, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 && -J>=1 ], cost: -4*J 238.17/148.87 238.17/148.87 114: f27 -> f27 : E'=1, Q'=2, K'=1, L'=2+J, M'=1, N'=1+F, O'=G, Q_1'=1-J+Q_1-Q, R'=free_52*B+free_46*B, S'=-B*free_53+free_49*B, T'=-free_47*C+free_50*C, U'=-free_48*C-free_51*C, V'=3+P-free_45, W'=2-2*J+W-2*Q, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 && 1-J-Q>=1 ], cost: 4-4*J-4*Q 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Chained accelerated rules (with incoming rules): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 3: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A ], cost: 1 238.17/148.87 238.17/148.87 4: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 ], cost: 1 238.17/148.87 238.17/148.87 50: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, [ A==1 && Q>=1+H ], cost: 2 238.17/148.87 238.17/148.87 51: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+Q, K'=1+J, L'=2+2*J-2*K+L, [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 52: f2 -> f27 : A'=1, B'=free_4, C'=free, D'=free_2, E'=free_5, F'=free_3, G'=free_1, Q'=1+H, [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 115: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=1, F'=free_9, G'=free_7, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+free_9, O'=free_7, Q_1'=1+Q_1, R'=free_52*free_10+free_46*free_10, S'=free_49*free_10-free_53*free_10, T'=free_50*free_6-free_47*free_6, U'=-free_6*free_51-free_6*free_48, V'=3+P-free_45, W'=2+W, [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 116: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=1, F'=free_15, G'=free_13, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+free_15, O'=free_13, Q_1'=1+Q_1, R'=free_46*free_16+free_52*free_16, S'=free_49*free_16-free_53*free_16, T'=-free_12*free_47+free_50*free_12, U'=-free_12*free_48-free_12*free_51, V'=3+P-free_45, W'=2+W, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 117: f2 -> f27 : B'=free_10, C'=free_6, D'=free_8, E'=1, F'=free_9, G'=free_7, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+free_9, O'=free_7, Q_1'=1+Q_1, R'=free_52*free_10+free_46*free_10, S'=free_49*free_10-free_53*free_10, T'=free_50*free_6-free_47*free_6, U'=-free_6*free_51-free_6*free_48, V'=3+P-free_45, W'=2+W, [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 118: f2 -> f27 : B'=free_16, C'=free_12, D'=free_14, E'=1, F'=free_15, G'=free_13, Q'=1+Q, K'=1+J, L'=2, M'=2+H-Q, N'=1+free_15, O'=free_13, Q_1'=1+Q_1, R'=free_46*free_16+free_52*free_16, S'=free_49*free_16-free_53*free_16, T'=-free_12*free_47+free_50*free_12, U'=-free_12*free_48-free_12*free_51, V'=3+P-free_45, W'=2+W, [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 77: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 81: f27 -> [12] : M'=2+H-Q, N'=1, O'=0, [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 85: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 3+J-K-4*free_26 238.17/148.87 238.17/148.87 86: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 3-K 238.17/148.87 238.17/148.87 87: f27 -> [12] : Q'=1, M'=1, N'=1, O'=0, [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 3+J-K-4*free_35 238.17/148.87 238.17/148.87 103: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 106: f27 -> [14] : [ 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 107: f27 -> [14] : [ Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 108: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 5-2*K 238.17/148.87 238.17/148.87 111: f27 -> [14] : [ H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 5+2*J-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Eliminated locations (on tree-shaped paths): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 119: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, M'=2+H-Q, N'=1, O'=0, [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 120: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, M'=2+H-Q, N'=1, O'=0, [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 121: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, Q'=1, M'=1, N'=1, O'=0, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 122: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, Q'=1, M'=1, N'=1, O'=0, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 4-K 238.17/148.87 238.17/148.87 123: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, Q'=1, M'=1, N'=1, O'=0, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 4+J-K-4*free_35 238.17/148.87 238.17/148.87 124: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 125: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 126: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 127: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 128: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 129: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, M'=2+H-Q, N'=1, O'=0, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 130: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, M'=2+H-Q, N'=1, O'=0, [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 131: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, Q'=1, M'=1, N'=1, O'=0, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 132: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, Q'=1, M'=1, N'=1, O'=0, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 4-K 238.17/148.87 238.17/148.87 133: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, Q'=1, M'=1, N'=1, O'=0, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_35 && K+5*free_35>=1+J && K>=2 && Q_1==1 ], cost: 4+J-K-4*free_35 238.17/148.87 238.17/148.87 134: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 135: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 136: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 137: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 138: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_54 && 3*free_54>=1+Q_1 && K>=2 ], cost: 6+2*J-2*K 238.17/148.87 238.17/148.87 139: f2 -> [16] : [ A==1 && H>=Q && J>=K && 1+Q>=1+H ], cost: 5+J-K 238.17/148.87 238.17/148.87 140: f2 -> [16] : [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 141: f2 -> [16] : [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 142: f2 -> [16] : [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 143: f2 -> [16] : [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 144: f2 -> [16] : [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Applied pruning (of leafs and parallel rules): 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 121: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, Q'=1, M'=1, N'=1, O'=0, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 122: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, Q'=1, M'=1, N'=1, O'=0, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 4-K 238.17/148.87 238.17/148.87 125: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 126: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 127: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 129: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, M'=2+H-Q, N'=1, O'=0, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 131: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, Q'=1, M'=1, N'=1, O'=0, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 132: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, Q'=1, M'=1, N'=1, O'=0, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 4-K 238.17/148.87 238.17/148.87 135: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 136: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 140: f2 -> [16] : [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 141: f2 -> [16] : [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 142: f2 -> [16] : [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 143: f2 -> [16] : [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 144: f2 -> [16] : [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 ### Computing asymptotic complexity ### 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Fully simplified ITS problem 238.17/148.87 238.17/148.87 Start location: f2 238.17/148.87 238.17/148.87 121: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, Q'=1, M'=1, N'=1, O'=0, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 122: f2 -> [12] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, Q'=1, M'=1, N'=1, O'=0, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 4-K 238.17/148.87 238.17/148.87 125: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 126: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 127: f2 -> [14] : B'=free_10, C'=free_6, D'=free_8, E'=free_11, F'=free_9, G'=free_7, [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 129: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, M'=2+H-Q, N'=1, O'=0, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 131: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, Q'=1, M'=1, N'=1, O'=0, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J+free_26>=1+J && 0>=J-4*free_26 ], cost: 4+J-K-4*free_26 238.17/148.87 238.17/148.87 132: f2 -> [12] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, Q'=1, M'=1, N'=1, O'=0, [ A>=2 && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && J>=4*free_26 && 5*free_26>=1+J ], cost: 4-K 238.17/148.87 238.17/148.87 135: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 136: f2 -> [14] : B'=free_16, C'=free_12, D'=free_14, E'=free_17, F'=free_15, G'=free_13, [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && -J==0 ], cost: 6-2*K 238.17/148.87 238.17/148.87 140: f2 -> [16] : [ A==1 && H>=Q && K>=1+J ], cost: 4+2*H-2*Q 238.17/148.87 238.17/148.87 141: f2 -> [16] : [ 0>=A && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 142: f2 -> [16] : [ A>=2 && 0>=Q && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 143: f2 -> [16] : [ 0>=A && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 144: f2 -> [16] : [ A>=2 && Q>=2 && H>=Q && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && Q_1>=2 && J>=K && Q_1>=2*free_45 && 3*free_45>=1+Q_1 && 0>=K && 0>=J && P>=2*free_72 && 3*free_72>=1+P && 1+Q_1>=2+free_72 ], cost: 7+2*J-2*K 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Computing asymptotic complexity for rule 121 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==-n,H==n,free_26==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {A==0} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==8*n,free_18==1,K==-n,free_26==2*n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==-n,free_26==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {A==0} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,H==n,free_26==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==-n,H==n,free_26==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {A==0} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,free_26==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==-n,free_26==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {A==0} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,H==n,free_26==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solution: 238.17/148.87 238.17/148.87 P / 2 238.17/148.87 238.17/148.87 J / 4*n 238.17/148.87 238.17/148.87 free_18 / 1 238.17/148.87 238.17/148.87 Q_1 / 1 238.17/148.87 238.17/148.87 K / 1-n 238.17/148.87 238.17/148.87 A / -n 238.17/148.87 238.17/148.87 H / n 238.17/148.87 238.17/148.87 free_26 / n 238.17/148.87 238.17/148.87 Q / 1 238.17/148.87 238.17/148.87 Resulting cost 3+n has complexity: Poly(n^1) 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Found new complexity Poly(n^1). 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Computing asymptotic complexity for rule 129 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==n,H==0,free_26==n,Q==0} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {A==2} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==0} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==Q} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+Q (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+Q (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+Q (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,free_26==n,Q==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q==0} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==Q} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+Q (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+Q (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+Q (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==n,free_26==n,Q==n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {A==2} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==Q} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,free_26==n,Q==-n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {H==Q} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 removing all constraints (solved by SMT) 238.17/148.87 238.17/148.87 resulting limit problem: [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==n,free_26==n,Q==-n} 238.17/148.87 238.17/148.87 resulting limit problem: 238.17/148.87 238.17/148.87 [solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 Solved the limit problem by the following transformations: 238.17/148.87 238.17/148.87 Created initial limit problem: 238.17/148.87 238.17/148.87 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.87 238.17/148.87 238.17/148.87 238.17/148.87 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,H==n,free_26==n,Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==n,H==0,free_26==n,Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==Q} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+Q (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+Q (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,free_26==n,Q==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==Q} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+Q (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+Q (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==n,free_26==n,Q==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==Q} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,free_26==n,Q==-n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==Q} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==n,free_26==n,Q==-n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1+H (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), 1+H-Q (+/+!), 1-Q (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,H==0,free_26==n,Q==0} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solution: 238.17/148.88 238.17/148.88 P / 2 238.17/148.88 238.17/148.88 J / 4*n 238.17/148.88 238.17/148.88 free_18 / 1 238.17/148.88 238.17/148.88 Q_1 / 1 238.17/148.88 238.17/148.88 K / 1-n 238.17/148.88 238.17/148.88 A / n 238.17/148.88 238.17/148.88 H / 0 238.17/148.88 238.17/148.88 free_26 / n 238.17/148.88 238.17/148.88 Q / 0 238.17/148.88 238.17/148.88 Resulting cost 3+n has complexity: Poly(n^1) 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Computing asymptotic complexity for rule 131 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==8*n,free_18==1,K==-n,free_26==2*n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2*free_18} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1-K (+/+!), free_18 (+/+!), 1+J-K-4*free_26 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {J==4*n,free_18==1,K==1-n,A==n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {H==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,A==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solved the limit problem by the following transformations: 238.17/148.88 238.17/148.88 Created initial limit problem: 238.17/148.88 238.17/148.88 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q (+/+!), 2-Q_1 (+/+!), Q (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 2+free_18-Q_1 (+/+!), 1-K (+/+!), Q_1 (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!), 2-Q_1 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {Q_1==1} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), -1+A (+/+!), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {A==2} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1 (+/+!), 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (B), deleting 1 (+/+!) 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 1+free_18 (+/+!), 4+J-K-4*free_26 (+), 1+P-2*free_18 (+/+!), 1-K (+/+!), 1+J-K-4*free_26 (+/+!), -P+3*free_18 (+/+!), H (+/+!), -J+K+5*free_26 (+/+!), 1-J+4*free_26 (+/+!) [not solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 removing all constraints (solved by SMT) 238.17/148.88 238.17/148.88 resulting limit problem: [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 applying transformation rule (C) using substitution {P==2,J==4*n,free_18==1,K==1-n,H==n,free_26==n} 238.17/148.88 238.17/148.88 resulting limit problem: 238.17/148.88 238.17/148.88 [solved] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Solution: 238.17/148.88 238.17/148.88 P / 2 238.17/148.88 238.17/148.88 J / 4*n 238.17/148.88 238.17/148.88 free_18 / 1 238.17/148.88 238.17/148.88 Q_1 / 1 238.17/148.88 238.17/148.88 K / 1-n 238.17/148.88 238.17/148.88 A / n 238.17/148.88 238.17/148.88 H / n 238.17/148.88 238.17/148.88 free_26 / n 238.17/148.88 238.17/148.88 Q / 1 238.17/148.88 238.17/148.88 Resulting cost 3+n has complexity: Poly(n^1) 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 Obtained the following overall complexity (w.r.t. the length of the input n): 238.17/148.88 238.17/148.88 Complexity: Poly(n^1) 238.17/148.88 238.17/148.88 Cpx degree: 1 238.17/148.88 238.17/148.88 Solved cost: 3+n 238.17/148.88 238.17/148.88 Rule cost: 4+J-K-4*free_26 238.17/148.88 238.17/148.88 Rule guard: [ 0>=A && H>=1 && Q==1 && P>=2*free_18 && 3*free_18>=1+P && 1+free_18>=Q_1 && J>=K+4*free_26 && K+5*free_26>=1+J && 0>=K && Q_1==1 && 0>=J-4*free_26 ] 238.17/148.88 238.17/148.88 238.17/148.88 238.17/148.88 WORST_CASE(Omega(n^1),?) 238.17/148.88 238.17/148.88 238.17/148.88 ---------------------------------------- 238.17/148.88 238.17/148.88 (4) 238.17/148.88 BOUNDS(n^1, INF) 238.30/148.89 EOF