/export/starexec/sandbox/solver/bin/starexec_run_complexity /export/starexec/sandbox/benchmark/theBenchmark.koat /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- WORST_CASE(NON_POLY, ?) proof of /export/starexec/sandbox/benchmark/theBenchmark.koat # AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty The runtime complexity of the given CpxIntTrs could be proven to be BOUNDS(INF, INF). (0) CpxIntTrs (1) Loat Proof [FINISHED, 16.5 s] (2) BOUNDS(INF, INF) ---------------------------------------- (0) Obligation: Complexity Int TRS consisting of the following rules: f2(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f2(A, B + 1, B1, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: A >= B f10(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f19(A, B, C, B1, C1, D1, E1, F1, 1, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: B >= 1 f19(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f23(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: G >= J && I >= J + 1 f23(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f26(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: J + F >= 2 + K f26(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f26(A, B, C, D, E, F, G, H, I, J, K, L + G, I + L - J, B1, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: H >= L f19(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f41(A, B, C, D, E, F, G, H, I, J, K, L, M, N, B1, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: G >= J && J >= I f41(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f41(A, B, C, D, E, F, G, H, I - O, J, K, L, M, N, B1, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: O >= F && I >= 1 + O f53(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f63(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, B1, C1, D1, E1, F1, 1, 0, X, Y, Z, A1)) :|: G >= P + 1 f63(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f66(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: P >= L f66(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f69(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: L + F >= 2 + K f69(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f69(A, B, C, D, E, F, G, H, I, J + Q, K, L, M, B1, O, P, Q, R, S, T, U, V, W, J, J + P, C1, A1)) :|: H >= J f69(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f66(A, B, C, D, E, F, G, H, I, J, K + 2, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: J >= 1 + H f66(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f63(A, B, C, D, E, F, G, H, I, J, K, L + F, M, N, O, P, Q, R, V, T, U, B1, C1, X, Y, Z, A1)) :|: K + 1 >= L + F f63(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f53(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, Q, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: L >= 1 + P f53(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f10(A, B - 1, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, B1)) :|: P >= G f41(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f19(A, B, C, D, E, F, G, H, I + O, J + F, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: O >= F && O >= I f41(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f19(A, B, C, D, E, F, G, H, I + O, J + F, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: F >= O + 1 f26(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f23(A, B, C, D, E, F, G, H, I, J, K + 2, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: L >= 1 + H f23(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f41(A, B, C, D, E, F, G, H, I, J, K, L, M, N, B1, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: K + 1 >= J + F f19(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f53(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, F, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: J >= 1 + G f10(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f1(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: 0 >= B f2(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f10(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, 1)) :|: B >= 1 + A start(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1) -> Com_1(f2(A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y, Z, A1)) :|: TRUE The start-symbols are:[start_27] ---------------------------------------- (1) Loat Proof (FINISHED) ### Pre-processing the ITS problem ### Initial linear ITS problem Start location: start 0: f2 -> f2 : B'=1+B, C'=free, [ A>=B ], cost: 1 21: f2 -> f10 : A1'=1, [ B>=1+A ], cost: 1 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 20: f10 -> 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, R'=X, S'=Y, T'=Z, U'=A1, [ 0>=B ], cost: 1 2: f19 -> f23 : [ G>=J && Q>=1+J ], cost: 1 5: f19 -> f41 : O'=free_7, [ G>=J && J>=Q ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 3: f23 -> f26 : [ J+F>=2+K ], cost: 1 18: f23 -> f41 : O'=free_19, [ 1+K>=J+F ], cost: 1 4: f26 -> f26 : L'=G+L, M'=-J+L+Q, N'=free_6, [ H>=L ], cost: 1 17: f26 -> f23 : K'=2+K, [ L>=1+H ], cost: 1 6: f41 -> f41 : Q'=-O+Q, O'=free_8, [ O>=F && Q>=1+O ], cost: 1 15: f41 -> f19 : Q'=O+Q, J'=J+F, [ O>=F && O>=Q ], cost: 1 16: f41 -> f19 : Q'=O+Q, J'=J+F, [ F>=1+O ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 8: f63 -> f66 : [ P>=L ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 9: f66 -> f69 : [ F+L>=2+K ], cost: 1 12: f66 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ 1+K>=F+L ], cost: 1 10: f69 -> f69 : J'=J+Q_1, N'=free_15, X'=J, Y'=P+J, Z'=free_14, [ H>=J ], cost: 1 11: f69 -> f66 : K'=2+K, [ J>=1+H ], cost: 1 22: start -> f2 : [], cost: 1 Removed unreachable and leaf rules: Start location: start 0: f2 -> f2 : B'=1+B, C'=free, [ A>=B ], cost: 1 21: f2 -> f10 : A1'=1, [ B>=1+A ], cost: 1 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 2: f19 -> f23 : [ G>=J && Q>=1+J ], cost: 1 5: f19 -> f41 : O'=free_7, [ G>=J && J>=Q ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 3: f23 -> f26 : [ J+F>=2+K ], cost: 1 18: f23 -> f41 : O'=free_19, [ 1+K>=J+F ], cost: 1 4: f26 -> f26 : L'=G+L, M'=-J+L+Q, N'=free_6, [ H>=L ], cost: 1 17: f26 -> f23 : K'=2+K, [ L>=1+H ], cost: 1 6: f41 -> f41 : Q'=-O+Q, O'=free_8, [ O>=F && Q>=1+O ], cost: 1 15: f41 -> f19 : Q'=O+Q, J'=J+F, [ O>=F && O>=Q ], cost: 1 16: f41 -> f19 : Q'=O+Q, J'=J+F, [ F>=1+O ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 8: f63 -> f66 : [ P>=L ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 9: f66 -> f69 : [ F+L>=2+K ], cost: 1 12: f66 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ 1+K>=F+L ], cost: 1 10: f69 -> f69 : J'=J+Q_1, N'=free_15, X'=J, Y'=P+J, Z'=free_14, [ H>=J ], cost: 1 11: f69 -> f66 : K'=2+K, [ J>=1+H ], cost: 1 22: start -> f2 : [], cost: 1 ### Simplification by acceleration and chaining ### Accelerating simple loops of location 0. Accelerating the following rules: 0: f2 -> f2 : B'=1+B, C'=free, [ A>=B ], cost: 1 Accelerated rule 0 with metering function 1-B+A, yielding the new rule 23. Removing the simple loops: 0. Accelerating simple loops of location 4. Accelerating the following rules: 4: f26 -> f26 : L'=G+L, M'=-J+L+Q, N'=free_6, [ H>=L ], cost: 1 Found no metering function for rule 4. Removing the simple loops:. Accelerating simple loops of location 5. Accelerating the following rules: 6: f41 -> f41 : Q'=-O+Q, O'=free_8, [ O>=F && Q>=1+O ], cost: 1 Found no metering function for rule 6. Removing the simple loops:. Accelerating simple loops of location 9. Accelerating the following rules: 10: f69 -> f69 : J'=J+Q_1, N'=free_15, X'=J, Y'=P+J, Z'=free_14, [ H>=J ], cost: 1 Found no metering function for rule 10. Removing the simple loops:. Accelerated all simple loops using metering functions (where possible): Start location: start 21: f2 -> f10 : A1'=1, [ B>=1+A ], cost: 1 23: f2 -> f2 : B'=1+A, C'=free, [ A>=B ], cost: 1-B+A 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 2: f19 -> f23 : [ G>=J && Q>=1+J ], cost: 1 5: f19 -> f41 : O'=free_7, [ G>=J && J>=Q ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 3: f23 -> f26 : [ J+F>=2+K ], cost: 1 18: f23 -> f41 : O'=free_19, [ 1+K>=J+F ], cost: 1 4: f26 -> f26 : L'=G+L, M'=-J+L+Q, N'=free_6, [ H>=L ], cost: 1 17: f26 -> f23 : K'=2+K, [ L>=1+H ], cost: 1 6: f41 -> f41 : Q'=-O+Q, O'=free_8, [ O>=F && Q>=1+O ], cost: 1 15: f41 -> f19 : Q'=O+Q, J'=J+F, [ O>=F && O>=Q ], cost: 1 16: f41 -> f19 : Q'=O+Q, J'=J+F, [ F>=1+O ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 8: f63 -> f66 : [ P>=L ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 9: f66 -> f69 : [ F+L>=2+K ], cost: 1 12: f66 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ 1+K>=F+L ], cost: 1 10: f69 -> f69 : J'=J+Q_1, N'=free_15, X'=J, Y'=P+J, Z'=free_14, [ H>=J ], cost: 1 11: f69 -> f66 : K'=2+K, [ J>=1+H ], cost: 1 22: start -> f2 : [], cost: 1 Chained accelerated rules (with incoming rules): Start location: start 21: f2 -> f10 : A1'=1, [ B>=1+A ], cost: 1 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 2: f19 -> f23 : [ G>=J && Q>=1+J ], cost: 1 5: f19 -> f41 : O'=free_7, [ G>=J && J>=Q ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 26: f19 -> f41 : Q'=-free_7+Q, O'=free_8, [ G>=J && J>=Q && free_7>=F && Q>=1+free_7 ], cost: 2 3: f23 -> f26 : [ J+F>=2+K ], cost: 1 18: f23 -> f41 : O'=free_19, [ 1+K>=J+F ], cost: 1 25: f23 -> f26 : L'=G+L, M'=-J+L+Q, N'=free_6, [ J+F>=2+K && H>=L ], cost: 2 27: f23 -> f41 : Q'=-free_19+Q, O'=free_8, [ 1+K>=J+F && free_19>=F && Q>=1+free_19 ], cost: 2 17: f26 -> f23 : K'=2+K, [ L>=1+H ], cost: 1 15: f41 -> f19 : Q'=O+Q, J'=J+F, [ O>=F && O>=Q ], cost: 1 16: f41 -> f19 : Q'=O+Q, J'=J+F, [ F>=1+O ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 8: f63 -> f66 : [ P>=L ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 9: f66 -> f69 : [ F+L>=2+K ], cost: 1 12: f66 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ 1+K>=F+L ], cost: 1 28: f66 -> f69 : J'=J+Q_1, N'=free_15, X'=J, Y'=P+J, Z'=free_14, [ F+L>=2+K && H>=J ], cost: 2 11: f69 -> f66 : K'=2+K, [ J>=1+H ], cost: 1 22: start -> f2 : [], cost: 1 24: start -> f2 : B'=1+A, C'=free, [ A>=B ], cost: 2-B+A Eliminated locations (on tree-shaped paths): Start location: start 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 2: f19 -> f23 : [ G>=J && Q>=1+J ], cost: 1 5: f19 -> f41 : O'=free_7, [ G>=J && J>=Q ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 26: f19 -> f41 : Q'=-free_7+Q, O'=free_8, [ G>=J && J>=Q && free_7>=F && Q>=1+free_7 ], cost: 2 18: f23 -> f41 : O'=free_19, [ 1+K>=J+F ], cost: 1 27: f23 -> f41 : Q'=-free_19+Q, O'=free_8, [ 1+K>=J+F && free_19>=F && Q>=1+free_19 ], cost: 2 31: f23 -> f23 : K'=2+K, [ J+F>=2+K && L>=1+H ], cost: 2 32: f23 -> f23 : K'=2+K, L'=G+L, M'=-J+L+Q, N'=free_6, [ J+F>=2+K && H>=L && G+L>=1+H ], cost: 3 15: f41 -> f19 : Q'=O+Q, J'=J+F, [ O>=F && O>=Q ], cost: 1 16: f41 -> f19 : Q'=O+Q, J'=J+F, [ F>=1+O ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 8: f63 -> f66 : [ P>=L ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 12: f66 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ 1+K>=F+L ], cost: 1 33: f66 -> f66 : K'=2+K, [ F+L>=2+K && J>=1+H ], cost: 2 34: f66 -> f66 : J'=J+Q_1, K'=2+K, N'=free_15, X'=J, Y'=P+J, Z'=free_14, [ F+L>=2+K && H>=J && J+Q_1>=1+H ], cost: 3 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Accelerating simple loops of location 3. Accelerating the following rules: 31: f23 -> f23 : K'=2+K, [ J+F>=2+K && L>=1+H ], cost: 2 32: f23 -> f23 : K'=2+K, L'=G+L, M'=-J+L+Q, N'=free_6, [ J+F>=2+K && H>=L && G+L>=1+H ], cost: 3 Accelerated rule 31 with metering function meter (where 2*meter==-1+J-K+F), yielding the new rule 35. Accelerated rule 32 with backward acceleration, yielding the new rule 36. During metering: Instantiating temporary variables by {meter==1} Removing the simple loops: 31 32. Accelerating simple loops of location 8. Accelerating the following rules: 33: f66 -> f66 : K'=2+K, [ F+L>=2+K && J>=1+H ], cost: 2 34: f66 -> f66 : J'=J+Q_1, K'=2+K, N'=free_15, X'=J, Y'=P+J, Z'=free_14, [ F+L>=2+K && H>=J && J+Q_1>=1+H ], cost: 3 Accelerated rule 33 with metering function meter_2 (where 2*meter_2==-1-K+F+L), yielding the new rule 37. Accelerated rule 34 with backward acceleration, yielding the new rule 38. During metering: Instantiating temporary variables by {meter_2==1} Removing the simple loops: 33 34. Accelerated all simple loops using metering functions (where possible): Start location: start 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 2: f19 -> f23 : [ G>=J && Q>=1+J ], cost: 1 5: f19 -> f41 : O'=free_7, [ G>=J && J>=Q ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 26: f19 -> f41 : Q'=-free_7+Q, O'=free_8, [ G>=J && J>=Q && free_7>=F && Q>=1+free_7 ], cost: 2 18: f23 -> f41 : O'=free_19, [ 1+K>=J+F ], cost: 1 27: f23 -> f41 : Q'=-free_19+Q, O'=free_8, [ 1+K>=J+F && free_19>=F && Q>=1+free_19 ], cost: 2 35: f23 -> f23 : K'=2*meter+K, [ J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 ], cost: 2*meter 36: f23 -> f23 : K'=2*k+K, L'=G*k+L, M'=G*k-J-G+L+Q, N'=free_6, [ J+F>=2+K && H>=L && G+L>=1+H && k>0 && J+F>=2*k+K && H>=L+G*(-1+k) && G+L+G*(-1+k)>=1+H ], cost: 3*k 15: f41 -> f19 : Q'=O+Q, J'=J+F, [ O>=F && O>=Q ], cost: 1 16: f41 -> f19 : Q'=O+Q, J'=J+F, [ F>=1+O ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 8: f63 -> f66 : [ P>=L ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 12: f66 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ 1+K>=F+L ], cost: 1 37: f66 -> f66 : K'=K+2*meter_2, [ F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 ], cost: 2*meter_2 38: f66 -> f66 : J'=J+Q_1*k_1, K'=2*k_1+K, N'=free_15, X'=J+Q_1*k_1-Q_1, Y'=P+J+Q_1*k_1-Q_1, Z'=free_14, [ F+L>=2+K && H>=J && J+Q_1>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*Q_1 && J+(-1+k_1)*Q_1+Q_1>=1+H ], cost: 3*k_1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Chained accelerated rules (with incoming rules): Start location: start 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 2: f19 -> f23 : [ G>=J && Q>=1+J ], cost: 1 5: f19 -> f41 : O'=free_7, [ G>=J && J>=Q ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 26: f19 -> f41 : Q'=-free_7+Q, O'=free_8, [ G>=J && J>=Q && free_7>=F && Q>=1+free_7 ], cost: 2 39: f19 -> f23 : K'=2*meter+K, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 ], cost: 1+2*meter 40: f19 -> f23 : K'=2*k+K, L'=G*k+L, M'=G*k-J-G+L+Q, N'=free_6, [ G>=J && Q>=1+J && J+F>=2+K && H>=L && G+L>=1+H && k>0 && J+F>=2*k+K && H>=L+G*(-1+k) && G+L+G*(-1+k)>=1+H ], cost: 1+3*k 18: f23 -> f41 : O'=free_19, [ 1+K>=J+F ], cost: 1 27: f23 -> f41 : Q'=-free_19+Q, O'=free_8, [ 1+K>=J+F && free_19>=F && Q>=1+free_19 ], cost: 2 15: f41 -> f19 : Q'=O+Q, J'=J+F, [ O>=F && O>=Q ], cost: 1 16: f41 -> f19 : Q'=O+Q, J'=J+F, [ F>=1+O ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 8: f63 -> f66 : [ P>=L ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 41: f63 -> f66 : K'=K+2*meter_2, [ P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 ], cost: 1+2*meter_2 42: f63 -> f66 : J'=J+Q_1*k_1, K'=2*k_1+K, N'=free_15, X'=J+Q_1*k_1-Q_1, Y'=P+J+Q_1*k_1-Q_1, Z'=free_14, [ P>=L && F+L>=2+K && H>=J && J+Q_1>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*Q_1 && J+(-1+k_1)*Q_1+Q_1>=1+H ], cost: 1+3*k_1 12: f66 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ 1+K>=F+L ], cost: 1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Eliminated locations (on tree-shaped paths): Start location: start 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 49: f19 -> f19 : Q'=free_7+Q, J'=J+F, O'=free_7, [ G>=J && J>=Q && free_7>=F && free_7>=Q ], cost: 2 50: f19 -> f19 : Q'=free_7+Q, J'=J+F, O'=free_7, [ G>=J && J>=Q && F>=1+free_7 ], cost: 2 51: f19 -> f19 : Q'=free_8-free_7+Q, J'=J+F, O'=free_8, [ G>=J && J>=Q && free_7>=F && Q>=1+free_7 && free_8>=F && free_8>=-free_7+Q ], cost: 3 52: f19 -> f19 : Q'=free_8-free_7+Q, J'=J+F, O'=free_8, [ G>=J && J>=Q && free_7>=F && Q>=1+free_7 && F>=1+free_8 ], cost: 3 53: f19 -> f19 : Q'=free_19+Q, J'=J+F, O'=free_19, [ G>=J && Q>=1+J && 1+K>=J+F && free_19>=F && free_19>=Q ], cost: 3 54: f19 -> f19 : Q'=free_19+Q, J'=J+F, O'=free_19, [ G>=J && Q>=1+J && 1+K>=J+F && F>=1+free_19 ], cost: 3 55: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, O'=free_8, [ G>=J && Q>=1+J && 1+K>=J+F && free_19>=F && Q>=1+free_19 && free_8>=F && free_8>=-free_19+Q ], cost: 4 56: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, O'=free_8, [ G>=J && Q>=1+J && 1+K>=J+F && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4 57: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && free_19>=Q ], cost: 3+2*meter 58: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && F>=1+free_19 ], cost: 3+2*meter 59: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && free_8>=F && free_8>=-free_19+Q ], cost: 4+2*meter 60: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4+2*meter 61: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*k+K, L'=G*k+L, M'=G*k-J-G+L+Q, N'=free_6, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && H>=L && G+L>=1+H && k>0 && J+F>=2*k+K && H>=L+G*(-1+k) && G+L+G*(-1+k)>=1+H && 1+2*k+K>=J+F && free_19>=F && free_19>=Q ], cost: 3+3*k 62: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*k+K, L'=G*k+L, M'=G*k-J-G+L+Q, N'=free_6, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && H>=L && G+L>=1+H && k>0 && J+F>=2*k+K && H>=L+G*(-1+k) && G+L+G*(-1+k)>=1+H && 1+2*k+K>=J+F && F>=1+free_19 ], cost: 3+3*k 63: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*k+K, L'=G*k+L, M'=G*k-J-G+L+Q, N'=free_6, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && H>=L && G+L>=1+H && k>0 && J+F>=2*k+K && H>=L+G*(-1+k) && G+L+G*(-1+k)>=1+H && 1+2*k+K>=J+F && free_19>=F && Q>=1+free_19 && free_8>=F && free_8>=-free_19+Q ], cost: 4+3*k 64: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*k+K, L'=G*k+L, M'=G*k-J-G+L+Q, N'=free_6, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && H>=L && G+L>=1+H && k>0 && J+F>=2*k+K && H>=L+G*(-1+k) && G+L+G*(-1+k)>=1+H && 1+2*k+K>=J+F && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4+3*k 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 65: f63 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && 1+K>=F+L ], cost: 2 66: f63 -> f63 : K'=K+2*meter_2, L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 ], cost: 2+2*meter_2 67: f63 -> f63 : J'=J+Q_1*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, S'=V, V'=free_17, W'=free_16, X'=J+Q_1*k_1-Q_1, Y'=P+J+Q_1*k_1-Q_1, Z'=free_14, [ P>=L && F+L>=2+K && H>=J && J+Q_1>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*Q_1 && J+(-1+k_1)*Q_1+Q_1>=1+H && 1+2*k_1+K>=F+L ], cost: 2+3*k_1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Applied pruning (of leafs and parallel rules): Start location: start 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 56: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, O'=free_8, [ G>=J && Q>=1+J && 1+K>=J+F && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4 57: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && free_19>=Q ], cost: 3+2*meter 58: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && F>=1+free_19 ], cost: 3+2*meter 59: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && free_8>=F && free_8>=-free_19+Q ], cost: 4+2*meter 60: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4+2*meter 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 65: f63 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && 1+K>=F+L ], cost: 2 66: f63 -> f63 : K'=K+2*meter_2, L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 ], cost: 2+2*meter_2 67: f63 -> f63 : J'=J+Q_1*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, S'=V, V'=free_17, W'=free_16, X'=J+Q_1*k_1-Q_1, Y'=P+J+Q_1*k_1-Q_1, Z'=free_14, [ P>=L && F+L>=2+K && H>=J && J+Q_1>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*Q_1 && J+(-1+k_1)*Q_1+Q_1>=1+H && 1+2*k_1+K>=F+L ], cost: 2+3*k_1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Accelerating simple loops of location 2. Accelerating the following rules: 56: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, O'=free_8, [ G>=J && Q>=1+J && 1+K>=J+F && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4 57: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && free_19>=Q ], cost: 3+2*meter 58: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && F>=1+free_19 ], cost: 3+2*meter 59: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && free_8>=F && free_8>=-free_19+Q ], cost: 4+2*meter 60: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4+2*meter Found no metering function for rule 56. Found no metering function for rule 57. Found no metering function for rule 58. During metering: Instantiating temporary variables by {free_8==F,meter==1,free_19==-free_8+Q} Found no metering function for rule 59. Found no metering function for rule 60. Removing the simple loops:. Accelerating simple loops of location 7. Accelerating the following rules: 65: f63 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && 1+K>=F+L ], cost: 2 66: f63 -> f63 : K'=K+2*meter_2, L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 ], cost: 2+2*meter_2 67: f63 -> f63 : J'=J+Q_1*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, S'=V, V'=free_17, W'=free_16, X'=J+Q_1*k_1-Q_1, Y'=P+J+Q_1*k_1-Q_1, Z'=free_14, [ P>=L && F+L>=2+K && H>=J && J+Q_1>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*Q_1 && J+(-1+k_1)*Q_1+Q_1>=1+H && 1+2*k_1+K>=F+L ], cost: 2+3*k_1 Found no metering function for rule 65. Found no metering function for rule 66. Found no metering function for rule 67 (rule is too complicated). Removing the simple loops:. Accelerated all simple loops using metering functions (where possible): Start location: start 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 56: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, O'=free_8, [ G>=J && Q>=1+J && 1+K>=J+F && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4 57: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && free_19>=Q ], cost: 3+2*meter 58: f19 -> f19 : Q'=free_19+Q, J'=J+F, K'=2*meter+K, O'=free_19, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && F>=1+free_19 ], cost: 3+2*meter 59: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && free_8>=F && free_8>=-free_19+Q ], cost: 4+2*meter 60: f19 -> f19 : Q'=free_8-free_19+Q, J'=J+F, K'=2*meter+K, O'=free_8, [ G>=J && Q>=1+J && J+F>=2+K && L>=1+H && 2*meter==-1+J-K+F && meter>=1 && free_19>=F && Q>=1+free_19 && F>=1+free_8 ], cost: 4+2*meter 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 65: f63 -> f63 : L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && 1+K>=F+L ], cost: 2 66: f63 -> f63 : K'=K+2*meter_2, L'=F+L, S'=V, V'=free_17, W'=free_16, [ P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 ], cost: 2+2*meter_2 67: f63 -> f63 : J'=J+Q_1*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, S'=V, V'=free_17, W'=free_16, X'=J+Q_1*k_1-Q_1, Y'=P+J+Q_1*k_1-Q_1, Z'=free_14, [ P>=L && F+L>=2+K && H>=J && J+Q_1>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*Q_1 && J+(-1+k_1)*Q_1+Q_1>=1+H && 1+2*k_1+K>=F+L ], cost: 2+3*k_1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Chained accelerated rules (with incoming rules): Start location: start 1: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, [ B>=1 ], cost: 1 68: f10 -> f19 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1+free_8-free_19, J'=J+free_5, O'=free_8, [ B>=1 && free_3>=J && 1>=1+J && 1+K>=J+free_5 && free_19>=free_5 && 1>=1+free_19 && free_5>=1+free_8 ], cost: 5 69: f10 -> f19 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && free_19>=1 ], cost: 4+2*meter 70: f10 -> f19 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 ], cost: 4+2*meter 71: f10 -> f19 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_8-free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_8, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 72: f10 -> f19 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_8-free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_8, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 19: f19 -> f53 : P'=F, [ J>=1+G ], cost: 1 7: f53 -> f63 : Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P ], cost: 1 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 73: f53 -> f63 : L'=F+L, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && 1+K>=F+L ], cost: 3 74: f53 -> f63 : K'=K+2*meter_2, L'=F+L, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 ], cost: 3+2*meter_2 75: f53 -> f63 : J'=J+free_12*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, X'=J+free_12*k_1-free_12, Y'=P+J+free_12*k_1-free_12, Z'=free_14, [ G>=1+P && P>=L && F+L>=2+K && H>=J && J+free_12>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*free_12 && J+(-1+k_1)*free_12+free_12>=1+H && 1+2*k_1+K>=F+L ], cost: 3+3*k_1 13: f63 -> f53 : P'=Q_1, [ L>=1+P ], cost: 1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Eliminated locations (on tree-shaped paths): Start location: start 76: f10 -> f53 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 ], cost: 2 77: f10 -> f53 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && free_19>=1 && 1+2*meter+K>=1+free_3 ], cost: 5+2*meter 78: f10 -> f53 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 ], cost: 5+2*meter 79: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 80: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 81: f53 -> f53 : P'=free_12, Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P && L>=1+P ], cost: 2 82: f53 -> f53 : L'=F+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && 1+K>=F+L && F+L>=1+P ], cost: 4 83: f53 -> f53 : K'=K+2*meter_2, L'=F+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 && F+L>=1+P ], cost: 4+2*meter_2 84: f53 -> f53 : J'=J+free_12*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, X'=J+free_12*k_1-free_12, Y'=P+J+free_12*k_1-free_12, Z'=free_14, [ G>=1+P && P>=L && F+L>=2+K && H>=J && J+free_12>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*free_12 && J+(-1+k_1)*free_12+free_12>=1+H && 1+2*k_1+K>=F+L && F+L>=1+P ], cost: 4+3*k_1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Accelerating simple loops of location 6. Accelerating the following rules: 81: f53 -> f53 : P'=free_12, Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P && L>=1+P ], cost: 2 82: f53 -> f53 : L'=F+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && 1+K>=F+L && F+L>=1+P ], cost: 4 83: f53 -> f53 : K'=K+2*meter_2, L'=F+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 && F+L>=1+P ], cost: 4+2*meter_2 84: f53 -> f53 : J'=J+free_12*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, X'=J+free_12*k_1-free_12, Y'=P+J+free_12*k_1-free_12, Z'=free_14, [ G>=1+P && P>=L && F+L>=2+K && H>=J && J+free_12>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*free_12 && J+(-1+k_1)*free_12+free_12>=1+H && 1+2*k_1+K>=F+L && F+L>=1+P ], cost: 4+3*k_1 Accelerated rule 81 with NONTERM (after strengthening guard), yielding the new rule 85. Found no metering function for rule 82. Found no metering function for rule 83. Found no metering function for rule 84 (rule is too complicated). Removing the simple loops:. Accelerated all simple loops using metering functions (where possible): Start location: start 76: f10 -> f53 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 ], cost: 2 77: f10 -> f53 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && free_19>=1 && 1+2*meter+K>=1+free_3 ], cost: 5+2*meter 78: f10 -> f53 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 ], cost: 5+2*meter 79: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 80: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 81: f53 -> f53 : P'=free_12, Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ G>=1+P && L>=1+P ], cost: 2 82: f53 -> f53 : L'=F+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && 1+K>=F+L && F+L>=1+P ], cost: 4 83: f53 -> f53 : K'=K+2*meter_2, L'=F+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ G>=1+P && P>=L && F+L>=2+K && J>=1+H && 2*meter_2==-1-K+F+L && meter_2>=1 && F+L>=1+P ], cost: 4+2*meter_2 84: f53 -> f53 : J'=J+free_12*k_1, K'=2*k_1+K, L'=F+L, N'=free_15, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, X'=J+free_12*k_1-free_12, Y'=P+J+free_12*k_1-free_12, Z'=free_14, [ G>=1+P && P>=L && F+L>=2+K && H>=J && J+free_12>=1+H && k_1>0 && F+L>=2*k_1+K && H>=J+(-1+k_1)*free_12 && J+(-1+k_1)*free_12+free_12>=1+H && 1+2*k_1+K>=F+L && F+L>=1+P ], cost: 4+3*k_1 85: f53 -> [21] : [ G>=1+P && L>=1+P && G>=1+free_12 && L>=1+free_12 ], cost: INF 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Chained accelerated rules (with incoming rules): Start location: start 76: f10 -> f53 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 ], cost: 2 77: f10 -> f53 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && free_19>=1 && 1+2*meter+K>=1+free_3 ], cost: 5+2*meter 78: f10 -> f53 : D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 ], cost: 5+2*meter 79: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 80: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 86: f10 -> f53 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_12, Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: 4 87: f10 -> f53 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 ], cost: 6 88: f10 -> f53 : D'=free_4, E'=free_2, F'=1+K+2*meter_2-L, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L ], cost: 6+2*meter_2 89: f10 -> f53 : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, J'=J+free_12*k_1, K'=2*k_1+K, L'=free_5+L, N'=free_15, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, X'=J+free_12*k_1-free_12, Y'=J+free_5+free_12*k_1-free_12, Z'=free_14, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && free_5+L>=2+K && free_1>=J && J+free_12>=1+free_1 && k_1>0 && free_5+L>=2*k_1+K && free_1>=J+(-1+k_1)*free_12 && J+(-1+k_1)*free_12+free_12>=1+free_1 && 1+2*k_1+K>=free_5+L && free_5+L>=1+free_5 ], cost: 6+3*k_1 90: f10 -> [21] : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 14: f53 -> f10 : A1'=free_18, B'=-1+B, [ P>=G ], cost: 1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Eliminated locations (on tree-shaped paths): Start location: start 79: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 80: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 90: f10 -> [21] : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 91: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 3 92: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && free_19>=1 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 6+2*meter 93: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 6+2*meter 94: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_12, Q_1'=free_12, R'=free_10, S'=free_13, T'=free_11, U'=free_9, V'=1, W'=0, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 && free_12>=free_3 ], cost: 5 95: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 ], cost: 7 96: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1+K+2*meter_2-L, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 7+2*meter_2 97: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, J'=J+free_12*k_1, K'=2*k_1+K, L'=free_5+L, N'=free_15, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, X'=J+free_12*k_1-free_12, Y'=J+free_5+free_12*k_1-free_12, Z'=free_14, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && free_5+L>=2+K && free_1>=J && J+free_12>=1+free_1 && k_1>0 && free_5+L>=2*k_1+K && free_1>=J+(-1+k_1)*free_12 && J+(-1+k_1)*free_12+free_12>=1+free_1 && 1+2*k_1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 ], cost: 7+3*k_1 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Applied pruning (of leafs and parallel rules): Start location: start 79: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 80: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 90: f10 -> [21] : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 91: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 3 92: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && free_19>=1 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 6+2*meter 93: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 6+2*meter 95: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 ], cost: 7 96: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1+K+2*meter_2-L, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 7+2*meter_2 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Accelerating simple loops of location 1. Accelerating the following rules: 91: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 3 92: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && free_19>=1 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 6+2*meter 93: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 6+2*meter 95: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 ], cost: 7 96: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1+K+2*meter_2-L, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 7+2*meter_2 Accelerated rule 91 with metering function B, yielding the new rule 98. During metering: Instantiating temporary variables by {meter==1,free_19==1,free_3==J} Accelerated rule 92 with metering function -2+J-K, yielding the new rule 99. During metering: Instantiating temporary variables by {meter==1,free_19==-J+2*meter+K,free_3==2*meter+K} Found no metering function for rule 93. Accelerated rule 95 with backward acceleration, yielding the new rule 100. Found no metering function for rule 96. During metering: Instantiating temporary variables by {free_5==free_3,meter==1,free_19==1-J+2*meter+K,free_3==2*meter+K} During metering: Instantiating temporary variables by {free_5==free_3,meter==1,free_19==-J+2*meter+K,free_3==2*meter+K} Removing the simple loops: 91 92 95. Accelerated all simple loops using metering functions (where possible): Start location: start 79: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 80: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 90: f10 -> [21] : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 93: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 6+2*meter 96: f10 -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1+K+2*meter_2-L, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 7+2*meter_2 98: f10 -> f10 : A1'=free_18, B'=0, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 3*B 99: f10 -> f10 : A1'=free_18, B'=2+B-J+K, D'=free_4, E'=free_2, F'=2, G'=-5+2*J-K, H'=free_1, Q'=2, J'=-3+2*J-K, K'=-4+2*J-K, O'=1, P'=2, [ B>=1 && 1>=1+J && L>=1+free_1 && 3+K>=1+J && 3-J+K>=J && -2+J-K>=1 ], cost: -16+8*J-8*K 100: f10 -> f10 : A1'=free_18, B'=B-k_2, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5*k_2+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && 1+B-k_2>=1 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 ], cost: 7*k_2 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A Chained accelerated rules (with incoming rules): Start location: start 79: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 5+2*meter 80: f10 -> [20] : [ B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 5+2*meter 90: f10 -> [21] : D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 29: start -> f10 : A1'=1, [ B>=1+A ], cost: 2 30: start -> f10 : A1'=1, B'=1+A, C'=free, [ A>=B ], cost: 3-B+A 101: start -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 8+2*meter 102: start -> f10 : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=1-J+2*meter+K, G'=free_3, H'=free_1, Q'=1+free_19, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=1-J+2*meter+K, [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 9-B+2*meter+A 103: start -> f10 : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=1+K+2*meter_2-L, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 9+2*meter_2 104: start -> f10 : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=1+K+2*meter_2-L, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 10-B+2*meter_2+A 105: start -> f10 : A1'=free_18, B'=0, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1+A && B>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 2+3*B 106: start -> f10 : A1'=free_18, B'=0, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ A>=B && 1+A>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 6-B+4*A 107: start -> f10 : A1'=free_18, B'=B-k_2, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5*k_2+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && 1+B-k_2>=1 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 ], cost: 2+7*k_2 108: start -> f10 : A1'=free_18, B'=1-k_2+A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5*k_2+L, P'=free_12, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && 2-k_2+A>=1 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 ], cost: 3-B+7*k_2+A Eliminated locations (on tree-shaped paths): Start location: start 109: start -> [20] : A1'=1, [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 7+2*meter 110: start -> [20] : A1'=1, [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 7+2*meter 111: start -> [21] : A1'=1, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 112: start -> [20] : A1'=1, B'=1+A, C'=free, [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 8-B+2*meter+A 113: start -> [20] : A1'=1, B'=1+A, C'=free, [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 8-B+2*meter+A 114: start -> [21] : A1'=1, B'=1+A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 115: start -> [21] : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=free_5, [ B>=1+A && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 && -1+B>=1 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 116: start -> [21] : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=free_5, [ A>=B && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 && A>=1 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 117: start -> [21] : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1+A && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 && -1+B>=1 && free_3>=1+free_5 && 1+K+2*meter_2>=1+free_5 ], cost: INF 118: start -> [21] : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ A>=B && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 && A>=1 && free_3>=1+free_5 && 1+K+2*meter_2>=1+free_5 ], cost: INF 119: start -> [21] : A1'=free_18, B'=B-k_2, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5*k_2+L, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 && B-k_2>=1 ], cost: INF 120: start -> [21] : A1'=free_18, B'=1-k_2+A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, L'=free_5*k_2+L, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 && 1-k_2+A>=1 ], cost: INF 121: start -> [23] : [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 8+2*meter 122: start -> [23] : [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 9-B+2*meter+A 123: start -> [23] : [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 9+2*meter_2 124: start -> [23] : [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 10-B+2*meter_2+A 125: start -> [23] : [ B>=1+A && B>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 2+3*B 126: start -> [23] : [ A>=B && 1+A>=1 && J>=1+free_3 && free_5>=free_3 ], cost: 6-B+4*A 127: start -> [23] : [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && 1+B-k_2>=1 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 ], cost: 2+7*k_2 128: start -> [23] : [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && 2-k_2+A>=1 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 ], cost: 3-B+7*k_2+A Applied pruning (of leafs and parallel rules): Start location: start 109: start -> [20] : A1'=1, [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 7+2*meter 110: start -> [20] : A1'=1, [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 7+2*meter 111: start -> [21] : A1'=1, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 112: start -> [20] : A1'=1, B'=1+A, C'=free, [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 8-B+2*meter+A 113: start -> [20] : A1'=1, B'=1+A, C'=free, [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 8-B+2*meter+A 114: start -> [21] : A1'=1, B'=1+A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 116: start -> [21] : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=free_5, [ A>=B && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 && A>=1 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 117: start -> [21] : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1+A && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 && -1+B>=1 && free_3>=1+free_5 && 1+K+2*meter_2>=1+free_5 ], cost: INF 118: start -> [21] : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ A>=B && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 && A>=1 && free_3>=1+free_5 && 1+K+2*meter_2>=1+free_5 ], cost: INF 121: start -> [23] : [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 8+2*meter 122: start -> [23] : [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 9-B+2*meter+A 123: start -> [23] : [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 9+2*meter_2 124: start -> [23] : [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 10-B+2*meter_2+A 128: start -> [23] : [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && 2-k_2+A>=1 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 ], cost: 3-B+7*k_2+A ### Computing asymptotic complexity ### Fully simplified ITS problem Start location: start 109: start -> [20] : A1'=1, [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 7+2*meter 110: start -> [20] : A1'=1, [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 7+2*meter 111: start -> [21] : A1'=1, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 112: start -> [20] : A1'=1, B'=1+A, C'=free, [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && free_8>=1-J+2*meter+K && free_8>=1-free_19 ], cost: 8-B+2*meter+A 113: start -> [20] : A1'=1, B'=1+A, C'=free, [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && free_19>=1-J+2*meter+K && 1>=1+free_19 && 1-J+2*meter+K>=1+free_8 ], cost: 8-B+2*meter+A 114: start -> [21] : A1'=1, B'=1+A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, P'=free_5, [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 116: start -> [21] : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, J'=1+2*meter+K, K'=2*meter+K, O'=free_19, P'=free_5, [ A>=B && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 && A>=1 && free_3>=1+free_5 && L>=1+free_5 ], cost: INF 117: start -> [21] : A1'=free_18, B'=-1+B, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ B>=1+A && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 && -1+B>=1 && free_3>=1+free_5 && 1+K+2*meter_2>=1+free_5 ], cost: INF 118: start -> [21] : A1'=free_18, B'=A, C'=free, D'=free_4, E'=free_2, F'=free_5, G'=free_3, H'=free_1, Q'=1, K'=K+2*meter_2, L'=1+K+2*meter_2, P'=free_5, Q_1'=free_12, R'=free_10, S'=1, T'=free_11, U'=free_9, V'=free_17, W'=free_16, [ A>=B && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 && A>=1 && free_3>=1+free_5 && 1+K+2*meter_2>=1+free_5 ], cost: INF 121: start -> [23] : [ B>=1+A && B>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 8+2*meter 122: start -> [23] : [ A>=B && 1+A>=1 && free_3>=J && 1>=1+J && 1+2*meter+K>=2+K && L>=1+free_1 && meter>=1 && 1-J+2*meter+K>=1+free_19 && 1+2*meter+K>=1+free_3 && 1-J+2*meter+K>=free_3 ], cost: 9-B+2*meter+A 123: start -> [23] : [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 9+2*meter_2 124: start -> [23] : [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=2+K+2*meter_2-L && 1+K+2*meter_2-L>=L && 1+K+2*meter_2>=2+K && J>=1+free_1 && meter_2>=1 && 1+K+2*meter_2>=2+K+2*meter_2-L && free_12>=free_3 ], cost: 10-B+2*meter_2+A 128: start -> [23] : [ A>=B && 1+A>=1 && J>=1+free_3 && free_3>=1+free_5 && free_5>=L && 1+K>=free_5+L && free_5+L>=1+free_5 && free_12>=free_3 && k_2>0 && 2-k_2+A>=1 && free_5>=free_5*(-1+k_2)+L && 1+K>=free_5*(-1+k_2)+free_5+L && free_5*(-1+k_2)+free_5+L>=1+free_5 ], cost: 3-B+7*k_2+A Computing asymptotic complexity for rule 109 Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1,B==1,J==0,meter==n,K==-1-2*n,free_19==0,A==0,free_3==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-1-2*n,free_19==0,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-1-2*n,free_19==0,A==-n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-1-2*n,free_19==0,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {B==n,J==0,meter==-1+n,K==1-2*n,free_19==0,A==-1+n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-1-2*n,free_19==0,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-1-2*n,free_19==0,A==-n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-1-2*n,free_19==0,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {B==n,J==0,meter==-1+n,K==1-2*n,free_19==0,A==-1+n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,J==0,meter==-1+n,K==1-2*n,free_19==0,A==n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,J==0,meter==-1+n,K==1-2*n,free_19==0,A==-n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,J==0,meter==-1+n,K==1-2*n,free_19==0,A==n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,B==n,J==0,meter==n,K==-1-2*n,free_19==0,A==-1+n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,J==0,meter==-1+n,K==1-2*n,free_19==0,A==n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,J==0,meter==-1+n,K==1-2*n,free_19==0,A==-n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,J==0,meter==-1+n,K==1-2*n,free_19==0,A==n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 2-J+2*meter+K-free_19 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,B==n,J==0,meter==n,K==-1-2*n,free_19==0,A==-1+n,free_3==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-3*n,free_19==1-n,A==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==1-n,meter==n,K==-4*n,free_19==-n,A==-n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-3*n,free_19==1-n,A==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {B==1+n,J==-n,meter==n,K==-5*n,free_19==-n,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-4*n,free_19==-n,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==-n,meter==n,K==-5*n,free_19==-n,A==-n,free_3==-n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {J==0,meter==n,K==-4*n,free_19==-n,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {B==1+n,J==-n,meter==n,K==-5*n,free_19==-n,A==n,free_3==-n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,J==0,meter==n,K==-4*n,free_19==-n,A==n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,J==-n,meter==n,K==-5*n,free_19==-n,A==-n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,J==0,meter==n,K==-4*n,free_19==-n,A==n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,B==1+n,J==-n,meter==n,K==-5*n,free_19==-n,A==n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,J==0,meter==n,K==-3*n,free_19==1-n,A==0,free_3==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,J==-n,meter==n,K==-5*n,free_19==-n,A==-n,free_3==-n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,J==0,meter==n,K==-3*n,free_19==1-n,A==0,free_3==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_8==1-free_19} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1+J-2*meter-K-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-n,B==1+n,J==-n,meter==-1+n,K==-4*n,free_19==-n,A==n,free_3==-n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1,J==0,meter==n,K==-1-2*n,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1,J==0,meter==n,K==-1-2*n,A==-n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1,J==0,meter==n,K==-1-2*n,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==2,B==n,J==0,meter==-1+n,K==-2*n,A==-1+n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1,J==0,meter==n,K==-1-2*n,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1,J==0,meter==n,K==-1-2*n,A==-n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1,J==0,meter==n,K==-1-2*n,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==2,B==n,J==0,meter==-1+n,K==-2*n,A==-1+n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==2,J==0,meter==-1+n,K==-2*n,A==n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==2,J==0,meter==-1+n,K==-2*n,A==-n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==2,J==0,meter==-1+n,K==-2*n,A==n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1,B==n,J==0,meter==n,K==-1-2*n,A==-1+n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==2,J==0,meter==-1+n,K==-2*n,A==n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==2,J==0,meter==-1+n,K==-2*n,A==-n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==2,J==0,meter==-1+n,K==-2*n,A==n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), free_8+J-2*meter-K (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1+free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1,B==n,J==0,meter==n,K==-1-2*n,A==-1+n,free_3==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1+n,J==0,meter==n,K==-4*n,free_19==-n,A==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1+n,J==0,meter==n,K==-1-3*n,free_19==-n,A==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1+n,J==0,meter==n,K==-4*n,free_19==-n,A==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==2*n,B==1+n,J==0,meter==n,K==-1-3*n,free_19==-n,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1+n,J==0,meter==n,K==-1-3*n,free_19==-n,A==0,free_3==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==2*n,J==0,meter==n,K==-1-3*n,free_19==-n,A==-n,free_3==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==1+n,J==0,meter==n,K==-1-3*n,free_19==-n,A==0,free_3==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==n,B==1+n,J==0,meter==n,K==-1-2*n,free_19==0,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1+n,J==0,meter==n,K==-1-3*n,free_19==-n,A==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==2*n,J==0,meter==n,K==-1-3*n,free_19==-n,A==-n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1+n,J==0,meter==n,K==-1-3*n,free_19==-n,A==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==n,B==1+n,J==0,meter==n,K==-1-2*n,free_19==0,A==n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1,J==0,meter==n,K==-1-2*n,free_19==0,A==0,free_3==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1,J==0,meter==n,K==-1-2*n,free_19==0,A==0,free_3==n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), free_8+J-2*meter-K (+/+!), free_8+free_19 (+/+!), -free_1+L (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==1,J==0,meter==n,K==-1-2*n,free_19==0,A==0,free_3==0,L==0} resulting limit problem: [solved] Solution: free_1 / -1 free_8 / 1 B / 1 J / 0 meter / n K / -1-2*n free_19 / 0 A / 0 free_3 / 0 L / 0 Resulting cost 7+2*n has complexity: Poly(n^1) Found new complexity Poly(n^1). Computing asymptotic complexity for rule 110 Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-1,J==0,meter==n,K==-1-2*n,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-n,B==1,J==0,meter==-1+n,K==-2*n,free_19==0,A==0,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-1,J==0,meter==n,K==-1-2*n,A==-n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-1,J==0,meter==n,K==-1-2*n,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), B (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), B (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-2,B==n,J==0,meter==-1+n,K==-2*n,A==-1+n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-1,J==0,meter==n,K==-1-2*n,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-1,J==0,meter==n,K==-1-2*n,A==-n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-1,J==0,meter==n,K==-1-2*n,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), B (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), B (+/+!), J-2*meter-K (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-2,B==n,J==0,meter==-1+n,K==-2*n,A==-1+n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2,J==0,meter==-1+n,K==-2*n,A==n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2,J==0,meter==-1+n,K==-2*n,A==-n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2,J==0,meter==-1+n,K==-2*n,A==n,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==-1,B==n,J==0,meter==n,K==-1-2*n,A==-1+n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2,J==0,meter==-1+n,K==-2*n,A==n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-A (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2,J==0,meter==-1+n,K==-2*n,A==-n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2,J==0,meter==-1+n,K==-2*n,A==n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_19==1-J+2*meter+K} resulting limit problem: 2*meter (+/+!), 1 (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), B (+/+!), J-2*meter-K (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==-1,B==n,J==0,meter==n,K==-1-2*n,A==-1+n,free_3==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-2*n,J==0,meter==n,K==-3*n,free_19==0,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-A (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-n,J==0,meter==n,K==-3*n,free_19==0,A==-n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-2*n,J==0,meter==n,K==-3*n,free_19==0,A==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-2,B==n,J==0,meter==-1+n,K==-2*n,free_19==0,A==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-3*n,J==0,meter==n,K==-4*n,free_19==-n,A==0,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-A (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-2,J==0,meter==-1+n,K==-2*n,free_19==0,A==-n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-3*n,J==0,meter==n,K==-4*n,free_19==-n,A==0,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {L==1+free_1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_8==-2*n,B==1+n,J==0,meter==-1+n,K==-3*n,free_19==-n,A==n,free_3==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-n,free_8==-2*n,J==0,meter==n,K==-4*n,free_19==-n,A==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-1,free_8==-n,J==0,meter==-1+n,K==-2*n,free_19==0,A==-n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-n,free_8==-2*n,J==0,meter==n,K==-4*n,free_19==-n,A==0,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {free_3==J} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==-n,free_8==-2-n,B==1+n,J==0,meter==-1+n,K==-3*n,free_19==-n,A==n,L==0} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2*n,J==0,meter==-1+n,K==-3*n,free_19==-n,A==n,free_3==0,L==1} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), 1-A (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2-n,J==0,meter==-1+n,K==-3*n,free_19==-n,A==-n,free_3==n,L==n} resulting limit problem: [solved] Solved the limit problem by the following transformations: Created initial limit problem: 2*meter (+/+!), 1-free_19 (+/+!), B (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), B-A (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!) [not solved] applying transformation rule (C) using substitution {B==1+A} resulting limit problem: 2*meter (+/+!), 1 (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] applying transformation rule (B), deleting 1 (+/+!) resulting limit problem: 2*meter (+/+!), 1-free_19 (+/+!), -free_1+L (+/+!), 1-free_8-J+2*meter+K (+/+!), 7+2*meter (+), 1-J+free_3 (+/+!), 1-J (+/+!), J-2*meter-K+free_19 (+/+!), 1+A (+/+!) [not solved] removing all constraints (solved by SMT) resulting limit problem: [solved] applying transformation rule (C) using substitution {free_1==0,free_8==-2*n,J==0,meter==-1+n,K==-3*n,free_19==-n,A==n,free_3==0,L==1} resulting limit problem: [solved] Solution: free_1 / 0 free_8 / -1 B / 1+n J / 0 meter / n K / -1-2*n free_19 / 0 A / n free_3 / 0 L / 1 Resulting cost 7+2*n has complexity: Poly(n^1) Computing asymptotic complexity for rule 111 Resulting cost INF has complexity: Nonterm Found new complexity Nonterm. Obtained the following overall complexity (w.r.t. the length of the input n): Complexity: Nonterm Cpx degree: Nonterm Solved cost: INF Rule cost: INF Rule guard: [ B>=1+A && B>=1 && J>=1+free_3 && free_3>=1+free_5 && L>=1+free_5 ] NO ---------------------------------------- (2) BOUNDS(INF, INF)