/export/starexec/sandbox/solver/bin/starexec_run_rcdcRelativeAlsoLower /export/starexec/sandbox/benchmark/theBenchmark.xml /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- WORST_CASE(Omega(n^1), O(n^3)) proof of /export/starexec/sandbox/benchmark/theBenchmark.xml # AProVE Commit ID: 794c25de1cacf0d048858bcd21c9a779e1221865 marcel 20200619 unpublished dirty The Derivational Complexity (innermost) of the given DCpxTrs could be proven to be BOUNDS(n^1, n^3). (0) DCpxTrs (1) DerivationalComplexityToRuntimeComplexityProof [BOTH BOUNDS(ID, ID), 0 ms] (2) CpxRelTRS (3) SInnermostTerminationProof [BOTH CONCRETE BOUNDS(ID, ID), 206 ms] (4) CpxRelTRS (5) RelTrsToWeightedTrsProof [BOTH BOUNDS(ID, ID), 0 ms] (6) CpxWeightedTrs (7) CpxWeightedTrsRenamingProof [BOTH BOUNDS(ID, ID), 0 ms] (8) CpxWeightedTrs (9) TypeInferenceProof [BOTH BOUNDS(ID, ID), 0 ms] (10) CpxTypedWeightedTrs (11) CompletionProof [UPPER BOUND(ID), 0 ms] (12) CpxTypedWeightedCompleteTrs (13) CpxTypedWeightedTrsToRntsProof [UPPER BOUND(ID), 0 ms] (14) CpxRNTS (15) CompleteCoflocoProof [FINISHED, 154.2 s] (16) BOUNDS(1, n^3) (17) RelTrsToDecreasingLoopProblemProof [LOWER BOUND(ID), 0 ms] (18) TRS for Loop Detection (19) DecreasingLoopProof [LOWER BOUND(ID), 7 ms] (20) BEST (21) proven lower bound (22) LowerBoundPropagationProof [FINISHED, 0 ms] (23) BOUNDS(n^1, INF) (24) TRS for Loop Detection ---------------------------------------- (0) Obligation: The Derivational Complexity (innermost) of the given DCpxTrs could be proven to be BOUNDS(n^1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 min(0, y) -> 0 min(s(x), s(y)) -> s(min(x, y)) max(x, 0) -> x max(0, y) -> y max(s(x), s(y)) -> s(max(x, y)) -(x, 0) -> x -(s(x), s(y)) -> -(x, y) gcd(s(x), s(y)) -> gcd(-(s(max(x, y)), s(min(x, y))), s(min(x, y))) gcd(s(x), 0) -> s(x) gcd(0, s(y)) -> s(y) S is empty. Rewrite Strategy: INNERMOST ---------------------------------------- (1) DerivationalComplexityToRuntimeComplexityProof (BOTH BOUNDS(ID, ID)) The following rules have been added to S to convert the given derivational complexity problem to a runtime complexity problem: encArg(0) -> 0 encArg(s(x_1)) -> s(encArg(x_1)) encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) encArg(cons_-(x_1, x_2)) -> -(encArg(x_1), encArg(x_2)) encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) encode_0 -> 0 encode_s(x_1) -> s(encArg(x_1)) encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) encode_-(x_1, x_2) -> -(encArg(x_1), encArg(x_2)) encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) ---------------------------------------- (2) Obligation: The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(n^1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 min(0, y) -> 0 min(s(x), s(y)) -> s(min(x, y)) max(x, 0) -> x max(0, y) -> y max(s(x), s(y)) -> s(max(x, y)) -(x, 0) -> x -(s(x), s(y)) -> -(x, y) gcd(s(x), s(y)) -> gcd(-(s(max(x, y)), s(min(x, y))), s(min(x, y))) gcd(s(x), 0) -> s(x) gcd(0, s(y)) -> s(y) The (relative) TRS S consists of the following rules: encArg(0) -> 0 encArg(s(x_1)) -> s(encArg(x_1)) encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) encArg(cons_-(x_1, x_2)) -> -(encArg(x_1), encArg(x_2)) encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) encode_0 -> 0 encode_s(x_1) -> s(encArg(x_1)) encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) encode_-(x_1, x_2) -> -(encArg(x_1), encArg(x_2)) encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) Rewrite Strategy: INNERMOST ---------------------------------------- (3) SInnermostTerminationProof (BOTH CONCRETE BOUNDS(ID, ID)) proved innermost termination of relative rules ---------------------------------------- (4) Obligation: The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(n^1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 min(0, y) -> 0 min(s(x), s(y)) -> s(min(x, y)) max(x, 0) -> x max(0, y) -> y max(s(x), s(y)) -> s(max(x, y)) -(x, 0) -> x -(s(x), s(y)) -> -(x, y) gcd(s(x), s(y)) -> gcd(-(s(max(x, y)), s(min(x, y))), s(min(x, y))) gcd(s(x), 0) -> s(x) gcd(0, s(y)) -> s(y) The (relative) TRS S consists of the following rules: encArg(0) -> 0 encArg(s(x_1)) -> s(encArg(x_1)) encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) encArg(cons_-(x_1, x_2)) -> -(encArg(x_1), encArg(x_2)) encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) encode_0 -> 0 encode_s(x_1) -> s(encArg(x_1)) encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) encode_-(x_1, x_2) -> -(encArg(x_1), encArg(x_2)) encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) Rewrite Strategy: INNERMOST ---------------------------------------- (5) RelTrsToWeightedTrsProof (BOTH BOUNDS(ID, ID)) Transformed relative TRS to weighted TRS ---------------------------------------- (6) Obligation: The Runtime Complexity (innermost) of the given CpxWeightedTrs could be proven to be BOUNDS(1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 [1] min(0, y) -> 0 [1] min(s(x), s(y)) -> s(min(x, y)) [1] max(x, 0) -> x [1] max(0, y) -> y [1] max(s(x), s(y)) -> s(max(x, y)) [1] -(x, 0) -> x [1] -(s(x), s(y)) -> -(x, y) [1] gcd(s(x), s(y)) -> gcd(-(s(max(x, y)), s(min(x, y))), s(min(x, y))) [1] gcd(s(x), 0) -> s(x) [1] gcd(0, s(y)) -> s(y) [1] encArg(0) -> 0 [0] encArg(s(x_1)) -> s(encArg(x_1)) [0] encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) [0] encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) [0] encArg(cons_-(x_1, x_2)) -> -(encArg(x_1), encArg(x_2)) [0] encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) [0] encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) [0] encode_0 -> 0 [0] encode_s(x_1) -> s(encArg(x_1)) [0] encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) [0] encode_-(x_1, x_2) -> -(encArg(x_1), encArg(x_2)) [0] encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) [0] Rewrite Strategy: INNERMOST ---------------------------------------- (7) CpxWeightedTrsRenamingProof (BOTH BOUNDS(ID, ID)) Renamed defined symbols to avoid conflicts with arithmetic symbols: - => minus ---------------------------------------- (8) Obligation: The Runtime Complexity (innermost) of the given CpxWeightedTrs could be proven to be BOUNDS(1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 [1] min(0, y) -> 0 [1] min(s(x), s(y)) -> s(min(x, y)) [1] max(x, 0) -> x [1] max(0, y) -> y [1] max(s(x), s(y)) -> s(max(x, y)) [1] minus(x, 0) -> x [1] minus(s(x), s(y)) -> minus(x, y) [1] gcd(s(x), s(y)) -> gcd(minus(s(max(x, y)), s(min(x, y))), s(min(x, y))) [1] gcd(s(x), 0) -> s(x) [1] gcd(0, s(y)) -> s(y) [1] encArg(0) -> 0 [0] encArg(s(x_1)) -> s(encArg(x_1)) [0] encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) [0] encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) [0] encArg(cons_-(x_1, x_2)) -> minus(encArg(x_1), encArg(x_2)) [0] encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) [0] encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) [0] encode_0 -> 0 [0] encode_s(x_1) -> s(encArg(x_1)) [0] encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) [0] encode_-(x_1, x_2) -> minus(encArg(x_1), encArg(x_2)) [0] encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) [0] Rewrite Strategy: INNERMOST ---------------------------------------- (9) TypeInferenceProof (BOTH BOUNDS(ID, ID)) Infered types. ---------------------------------------- (10) Obligation: Runtime Complexity Weighted TRS with Types. The TRS R consists of the following rules: min(x, 0) -> 0 [1] min(0, y) -> 0 [1] min(s(x), s(y)) -> s(min(x, y)) [1] max(x, 0) -> x [1] max(0, y) -> y [1] max(s(x), s(y)) -> s(max(x, y)) [1] minus(x, 0) -> x [1] minus(s(x), s(y)) -> minus(x, y) [1] gcd(s(x), s(y)) -> gcd(minus(s(max(x, y)), s(min(x, y))), s(min(x, y))) [1] gcd(s(x), 0) -> s(x) [1] gcd(0, s(y)) -> s(y) [1] encArg(0) -> 0 [0] encArg(s(x_1)) -> s(encArg(x_1)) [0] encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) [0] encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) [0] encArg(cons_-(x_1, x_2)) -> minus(encArg(x_1), encArg(x_2)) [0] encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) [0] encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) [0] encode_0 -> 0 [0] encode_s(x_1) -> s(encArg(x_1)) [0] encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) [0] encode_-(x_1, x_2) -> minus(encArg(x_1), encArg(x_2)) [0] encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) [0] The TRS has the following type information: min :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd 0 :: 0:s:cons_min:cons_max:cons_-:cons_gcd s :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd max :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd minus :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd encArg :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd cons_min :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd cons_max :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd cons_- :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd cons_gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd encode_min :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd encode_0 :: 0:s:cons_min:cons_max:cons_-:cons_gcd encode_s :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd encode_max :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd encode_- :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd encode_gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd Rewrite Strategy: INNERMOST ---------------------------------------- (11) CompletionProof (UPPER BOUND(ID)) The TRS is a completely defined constructor system, as every type has a constant constructor and the following rules were added: encArg(v0) -> null_encArg [0] encode_min(v0, v1) -> null_encode_min [0] encode_0 -> null_encode_0 [0] encode_s(v0) -> null_encode_s [0] encode_max(v0, v1) -> null_encode_max [0] encode_-(v0, v1) -> null_encode_- [0] encode_gcd(v0, v1) -> null_encode_gcd [0] min(v0, v1) -> null_min [0] max(v0, v1) -> null_max [0] minus(v0, v1) -> null_minus [0] gcd(v0, v1) -> null_gcd [0] And the following fresh constants: null_encArg, null_encode_min, null_encode_0, null_encode_s, null_encode_max, null_encode_-, null_encode_gcd, null_min, null_max, null_minus, null_gcd ---------------------------------------- (12) Obligation: Runtime Complexity Weighted TRS where all functions are completely defined. The underlying TRS is: Runtime Complexity Weighted TRS with Types. The TRS R consists of the following rules: min(x, 0) -> 0 [1] min(0, y) -> 0 [1] min(s(x), s(y)) -> s(min(x, y)) [1] max(x, 0) -> x [1] max(0, y) -> y [1] max(s(x), s(y)) -> s(max(x, y)) [1] minus(x, 0) -> x [1] minus(s(x), s(y)) -> minus(x, y) [1] gcd(s(x), s(y)) -> gcd(minus(s(max(x, y)), s(min(x, y))), s(min(x, y))) [1] gcd(s(x), 0) -> s(x) [1] gcd(0, s(y)) -> s(y) [1] encArg(0) -> 0 [0] encArg(s(x_1)) -> s(encArg(x_1)) [0] encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) [0] encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) [0] encArg(cons_-(x_1, x_2)) -> minus(encArg(x_1), encArg(x_2)) [0] encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) [0] encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) [0] encode_0 -> 0 [0] encode_s(x_1) -> s(encArg(x_1)) [0] encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) [0] encode_-(x_1, x_2) -> minus(encArg(x_1), encArg(x_2)) [0] encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) [0] encArg(v0) -> null_encArg [0] encode_min(v0, v1) -> null_encode_min [0] encode_0 -> null_encode_0 [0] encode_s(v0) -> null_encode_s [0] encode_max(v0, v1) -> null_encode_max [0] encode_-(v0, v1) -> null_encode_- [0] encode_gcd(v0, v1) -> null_encode_gcd [0] min(v0, v1) -> null_min [0] max(v0, v1) -> null_max [0] minus(v0, v1) -> null_minus [0] gcd(v0, v1) -> null_gcd [0] The TRS has the following type information: min :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd 0 :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd s :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd max :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd minus :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd encArg :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd cons_min :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd cons_max :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd cons_- :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd cons_gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd encode_min :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd encode_0 :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd encode_s :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd encode_max :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd encode_- :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd encode_gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd -> 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_encArg :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_encode_min :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_encode_0 :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_encode_s :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_encode_max :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_encode_- :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_encode_gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_min :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_max :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_minus :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd null_gcd :: 0:s:cons_min:cons_max:cons_-:cons_gcd:null_encArg:null_encode_min:null_encode_0:null_encode_s:null_encode_max:null_encode_-:null_encode_gcd:null_min:null_max:null_minus:null_gcd Rewrite Strategy: INNERMOST ---------------------------------------- (13) CpxTypedWeightedTrsToRntsProof (UPPER BOUND(ID)) Transformed the TRS into an over-approximating RNTS by (improved) Size Abstraction. The constant constructors are abstracted as follows: 0 => 0 null_encArg => 0 null_encode_min => 0 null_encode_0 => 0 null_encode_s => 0 null_encode_max => 0 null_encode_- => 0 null_encode_gcd => 0 null_min => 0 null_max => 0 null_minus => 0 null_gcd => 0 ---------------------------------------- (14) Obligation: Complexity RNTS consisting of the following rules: encArg(z) -{ 0 }-> minus(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, z = 1 + x_1 + x_2, x_2 >= 0 encArg(z) -{ 0 }-> min(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, z = 1 + x_1 + x_2, x_2 >= 0 encArg(z) -{ 0 }-> max(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, z = 1 + x_1 + x_2, x_2 >= 0 encArg(z) -{ 0 }-> gcd(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, z = 1 + x_1 + x_2, x_2 >= 0 encArg(z) -{ 0 }-> 0 :|: z = 0 encArg(z) -{ 0 }-> 0 :|: v0 >= 0, z = v0 encArg(z) -{ 0 }-> 1 + encArg(x_1) :|: z = 1 + x_1, x_1 >= 0 encode_-(z, z') -{ 0 }-> minus(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, x_2 >= 0, z = x_1, z' = x_2 encode_-(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 encode_0 -{ 0 }-> 0 :|: encode_gcd(z, z') -{ 0 }-> gcd(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, x_2 >= 0, z = x_1, z' = x_2 encode_gcd(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 encode_max(z, z') -{ 0 }-> max(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, x_2 >= 0, z = x_1, z' = x_2 encode_max(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 encode_min(z, z') -{ 0 }-> min(encArg(x_1), encArg(x_2)) :|: x_1 >= 0, x_2 >= 0, z = x_1, z' = x_2 encode_min(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 encode_s(z) -{ 0 }-> 0 :|: v0 >= 0, z = v0 encode_s(z) -{ 0 }-> 1 + encArg(x_1) :|: x_1 >= 0, z = x_1 gcd(z, z') -{ 1 }-> gcd(minus(1 + max(x, y), 1 + min(x, y)), 1 + min(x, y)) :|: z' = 1 + y, x >= 0, y >= 0, z = 1 + x gcd(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 gcd(z, z') -{ 1 }-> 1 + x :|: x >= 0, z = 1 + x, z' = 0 gcd(z, z') -{ 1 }-> 1 + y :|: z' = 1 + y, y >= 0, z = 0 max(z, z') -{ 1 }-> x :|: x >= 0, z = x, z' = 0 max(z, z') -{ 1 }-> y :|: y >= 0, z = 0, z' = y max(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 max(z, z') -{ 1 }-> 1 + max(x, y) :|: z' = 1 + y, x >= 0, y >= 0, z = 1 + x min(z, z') -{ 1 }-> 0 :|: x >= 0, z = x, z' = 0 min(z, z') -{ 1 }-> 0 :|: y >= 0, z = 0, z' = y min(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 min(z, z') -{ 1 }-> 1 + min(x, y) :|: z' = 1 + y, x >= 0, y >= 0, z = 1 + x minus(z, z') -{ 1 }-> x :|: x >= 0, z = x, z' = 0 minus(z, z') -{ 1 }-> minus(x, y) :|: z' = 1 + y, x >= 0, y >= 0, z = 1 + x minus(z, z') -{ 0 }-> 0 :|: v0 >= 0, v1 >= 0, z = v0, z' = v1 Only complete derivations are relevant for the runtime complexity. ---------------------------------------- (15) CompleteCoflocoProof (FINISHED) Transformed the RNTS (where only complete derivations are relevant) into cost relations for CoFloCo: eq(start(V1, V),0,[min(V1, V, Out)],[V1 >= 0,V >= 0]). eq(start(V1, V),0,[max(V1, V, Out)],[V1 >= 0,V >= 0]). eq(start(V1, V),0,[minus(V1, V, Out)],[V1 >= 0,V >= 0]). eq(start(V1, V),0,[gcd(V1, V, Out)],[V1 >= 0,V >= 0]). eq(start(V1, V),0,[encArg(V1, Out)],[V1 >= 0]). eq(start(V1, V),0,[fun(V1, V, Out)],[V1 >= 0,V >= 0]). eq(start(V1, V),0,[fun1(Out)],[]). eq(start(V1, V),0,[fun2(V1, Out)],[V1 >= 0]). eq(start(V1, V),0,[fun3(V1, V, Out)],[V1 >= 0,V >= 0]). eq(start(V1, V),0,[fun4(V1, V, Out)],[V1 >= 0,V >= 0]). eq(start(V1, V),0,[fun5(V1, V, Out)],[V1 >= 0,V >= 0]). eq(min(V1, V, Out),1,[],[Out = 0,V2 >= 0,V1 = V2,V = 0]). eq(min(V1, V, Out),1,[],[Out = 0,V3 >= 0,V1 = 0,V = V3]). eq(min(V1, V, Out),1,[min(V4, V5, Ret1)],[Out = 1 + Ret1,V = 1 + V5,V4 >= 0,V5 >= 0,V1 = 1 + V4]). eq(max(V1, V, Out),1,[],[Out = V6,V6 >= 0,V1 = V6,V = 0]). eq(max(V1, V, Out),1,[],[Out = V7,V7 >= 0,V1 = 0,V = V7]). eq(max(V1, V, Out),1,[max(V8, V9, Ret11)],[Out = 1 + Ret11,V = 1 + V9,V8 >= 0,V9 >= 0,V1 = 1 + V8]). eq(minus(V1, V, Out),1,[],[Out = V10,V10 >= 0,V1 = V10,V = 0]). eq(minus(V1, V, Out),1,[minus(V12, V11, Ret)],[Out = Ret,V = 1 + V11,V12 >= 0,V11 >= 0,V1 = 1 + V12]). eq(gcd(V1, V, Out),1,[max(V14, V13, Ret001),min(V14, V13, Ret011),minus(1 + Ret001, 1 + Ret011, Ret0),min(V14, V13, Ret111),gcd(Ret0, 1 + Ret111, Ret2)],[Out = Ret2,V = 1 + V13,V14 >= 0,V13 >= 0,V1 = 1 + V14]). eq(gcd(V1, V, Out),1,[],[Out = 1 + V15,V15 >= 0,V1 = 1 + V15,V = 0]). eq(gcd(V1, V, Out),1,[],[Out = 1 + V16,V = 1 + V16,V16 >= 0,V1 = 0]). eq(encArg(V1, Out),0,[],[Out = 0,V1 = 0]). eq(encArg(V1, Out),0,[encArg(V17, Ret12)],[Out = 1 + Ret12,V1 = 1 + V17,V17 >= 0]). eq(encArg(V1, Out),0,[encArg(V18, Ret01),encArg(V19, Ret13),min(Ret01, Ret13, Ret3)],[Out = Ret3,V18 >= 0,V1 = 1 + V18 + V19,V19 >= 0]). eq(encArg(V1, Out),0,[encArg(V20, Ret02),encArg(V21, Ret14),max(Ret02, Ret14, Ret4)],[Out = Ret4,V20 >= 0,V1 = 1 + V20 + V21,V21 >= 0]). eq(encArg(V1, Out),0,[encArg(V23, Ret03),encArg(V22, Ret15),minus(Ret03, Ret15, Ret5)],[Out = Ret5,V23 >= 0,V1 = 1 + V22 + V23,V22 >= 0]). eq(encArg(V1, Out),0,[encArg(V25, Ret04),encArg(V24, Ret16),gcd(Ret04, Ret16, Ret6)],[Out = Ret6,V25 >= 0,V1 = 1 + V24 + V25,V24 >= 0]). eq(fun(V1, V, Out),0,[encArg(V26, Ret05),encArg(V27, Ret17),min(Ret05, Ret17, Ret7)],[Out = Ret7,V26 >= 0,V27 >= 0,V1 = V26,V = V27]). eq(fun1(Out),0,[],[Out = 0]). eq(fun2(V1, Out),0,[encArg(V28, Ret18)],[Out = 1 + Ret18,V28 >= 0,V1 = V28]). eq(fun3(V1, V, Out),0,[encArg(V30, Ret06),encArg(V29, Ret19),max(Ret06, Ret19, Ret8)],[Out = Ret8,V30 >= 0,V29 >= 0,V1 = V30,V = V29]). eq(fun4(V1, V, Out),0,[encArg(V32, Ret07),encArg(V31, Ret110),minus(Ret07, Ret110, Ret9)],[Out = Ret9,V32 >= 0,V31 >= 0,V1 = V32,V = V31]). eq(fun5(V1, V, Out),0,[encArg(V33, Ret08),encArg(V34, Ret112),gcd(Ret08, Ret112, Ret10)],[Out = Ret10,V33 >= 0,V34 >= 0,V1 = V33,V = V34]). eq(encArg(V1, Out),0,[],[Out = 0,V35 >= 0,V1 = V35]). eq(fun(V1, V, Out),0,[],[Out = 0,V37 >= 0,V36 >= 0,V1 = V37,V = V36]). eq(fun2(V1, Out),0,[],[Out = 0,V38 >= 0,V1 = V38]). eq(fun3(V1, V, Out),0,[],[Out = 0,V39 >= 0,V40 >= 0,V1 = V39,V = V40]). eq(fun4(V1, V, Out),0,[],[Out = 0,V41 >= 0,V42 >= 0,V1 = V41,V = V42]). eq(fun5(V1, V, Out),0,[],[Out = 0,V43 >= 0,V44 >= 0,V1 = V43,V = V44]). eq(min(V1, V, Out),0,[],[Out = 0,V46 >= 0,V45 >= 0,V1 = V46,V = V45]). eq(max(V1, V, Out),0,[],[Out = 0,V47 >= 0,V48 >= 0,V1 = V47,V = V48]). eq(minus(V1, V, Out),0,[],[Out = 0,V49 >= 0,V50 >= 0,V1 = V49,V = V50]). eq(gcd(V1, V, Out),0,[],[Out = 0,V51 >= 0,V52 >= 0,V1 = V51,V = V52]). input_output_vars(min(V1,V,Out),[V1,V],[Out]). input_output_vars(max(V1,V,Out),[V1,V],[Out]). input_output_vars(minus(V1,V,Out),[V1,V],[Out]). input_output_vars(gcd(V1,V,Out),[V1,V],[Out]). input_output_vars(encArg(V1,Out),[V1],[Out]). input_output_vars(fun(V1,V,Out),[V1,V],[Out]). input_output_vars(fun1(Out),[],[Out]). input_output_vars(fun2(V1,Out),[V1],[Out]). input_output_vars(fun3(V1,V,Out),[V1,V],[Out]). input_output_vars(fun4(V1,V,Out),[V1,V],[Out]). input_output_vars(fun5(V1,V,Out),[V1,V],[Out]). CoFloCo proof output: Preprocessing Cost Relations ===================================== #### Computed strongly connected components 0. recursive : [max/3] 1. recursive : [min/3] 2. recursive : [minus/3] 3. recursive : [gcd/3] 4. recursive [non_tail,multiple] : [encArg/2] 5. non_recursive : [fun/3] 6. non_recursive : [fun1/1] 7. non_recursive : [fun2/2] 8. non_recursive : [fun3/3] 9. non_recursive : [fun4/3] 10. non_recursive : [fun5/3] 11. non_recursive : [start/2] #### Obtained direct recursion through partial evaluation 0. SCC is partially evaluated into max/3 1. SCC is partially evaluated into min/3 2. SCC is partially evaluated into minus/3 3. SCC is partially evaluated into gcd/3 4. SCC is partially evaluated into encArg/2 5. SCC is partially evaluated into fun/3 6. SCC is completely evaluated into other SCCs 7. SCC is partially evaluated into fun2/2 8. SCC is partially evaluated into fun3/3 9. SCC is partially evaluated into fun4/3 10. SCC is partially evaluated into fun5/3 11. SCC is partially evaluated into start/2 Control-Flow Refinement of Cost Relations ===================================== ### Specialization of cost equations max/3 * CE 19 is refined into CE [43] * CE 16 is refined into CE [44] * CE 17 is refined into CE [45] * CE 18 is refined into CE [46] ### Cost equations --> "Loop" of max/3 * CEs [46] --> Loop 24 * CEs [43] --> Loop 25 * CEs [44] --> Loop 26 * CEs [45] --> Loop 27 ### Ranking functions of CR max(V1,V,Out) * RF of phase [24]: [V,V1] #### Partial ranking functions of CR max(V1,V,Out) * Partial RF of phase [24]: - RF of loop [24:1]: V V1 ### Specialization of cost equations min/3 * CE 12 is refined into CE [47] * CE 13 is refined into CE [48] * CE 15 is refined into CE [49] * CE 14 is refined into CE [50] ### Cost equations --> "Loop" of min/3 * CEs [50] --> Loop 28 * CEs [47] --> Loop 29 * CEs [48,49] --> Loop 30 ### Ranking functions of CR min(V1,V,Out) * RF of phase [28]: [V,V1] #### Partial ranking functions of CR min(V1,V,Out) * Partial RF of phase [28]: - RF of loop [28:1]: V V1 ### Specialization of cost equations minus/3 * CE 22 is refined into CE [51] * CE 20 is refined into CE [52] * CE 21 is refined into CE [53] ### Cost equations --> "Loop" of minus/3 * CEs [53] --> Loop 31 * CEs [51] --> Loop 32 * CEs [52] --> Loop 33 ### Ranking functions of CR minus(V1,V,Out) * RF of phase [31]: [V,V1] #### Partial ranking functions of CR minus(V1,V,Out) * Partial RF of phase [31]: - RF of loop [31:1]: V V1 ### Specialization of cost equations gcd/3 * CE 26 is refined into CE [54] * CE 24 is refined into CE [55] * CE 25 is refined into CE [56] * CE 23 is refined into CE [57,58,59,60,61,62,63,64,65,66,67,68,69,70,71,72,73,74,75,76,77,78,79,80,81,82,83,84,85,86,87,88,89,90] ### Cost equations --> "Loop" of gcd/3 * CEs [74] --> Loop 34 * CEs [82] --> Loop 35 * CEs [86] --> Loop 36 * CEs [78] --> Loop 37 * CEs [70] --> Loop 38 * CEs [73] --> Loop 39 * CEs [81] --> Loop 40 * CEs [85] --> Loop 41 * CEs [89] --> Loop 42 * CEs [77] --> Loop 43 * CEs [69] --> Loop 44 * CEs [68,72] --> Loop 45 * CEs [62,64,66,76,80,84,88,90] --> Loop 46 * CEs [60] --> Loop 47 * CEs [59] --> Loop 48 * CEs [58] --> Loop 49 * CEs [57,61,63,65,67,71,75,79,83,87] --> Loop 50 * CEs [54] --> Loop 51 * CEs [55] --> Loop 52 * CEs [56] --> Loop 53 ### Ranking functions of CR gcd(V1,V,Out) * RF of phase [34,35,36,37,38,46]: [V1+V-3] * RF of phase [47,49]: [V1+V-1] #### Partial ranking functions of CR gcd(V1,V,Out) * Partial RF of phase [34,35,36,37,38,46]: - RF of loop [34:1,36:1,38:1,46:1]: V1-1 depends on loops [35:1,37:1] - RF of loop [35:1,36:1,37:1,46:1]: V1+V-3 * Partial RF of phase [47,49]: - RF of loop [47:1]: V1 depends on loops [49:1] - RF of loop [49:1]: V1+V-1 ### Specialization of cost equations encArg/2 * CE 27 is refined into CE [91] * CE 29 is refined into CE [92,93] * CE 30 is refined into CE [94,95,96,97,98,99] * CE 31 is refined into CE [100,101,102] * CE 32 is refined into CE [103,104,105,106,107,108] * CE 28 is refined into CE [109] ### Cost equations --> "Loop" of encArg/2 * CEs [109] --> Loop 54 * CEs [102] --> Loop 55 * CEs [98] --> Loop 56 * CEs [97] --> Loop 57 * CEs [95,100,104] --> Loop 58 * CEs [94,103] --> Loop 59 * CEs [93,99,106,107,108] --> Loop 60 * CEs [92,96,101,105] --> Loop 61 * CEs [91] --> Loop 62 ### Ranking functions of CR encArg(V1,Out) * RF of phase [54,55,56,57,58,59,60,61]: [V1] #### Partial ranking functions of CR encArg(V1,Out) * Partial RF of phase [54,55,56,57,58,59,60,61]: - RF of loop [54:1,55:1,55:2,56:1,56:2,57:1,57:2,58:1,58:2,59:1,59:2,60:1,60:2,61:1,61:2]: V1 ### Specialization of cost equations fun/3 * CE 33 is refined into CE [110,111,112,113,114] * CE 34 is refined into CE [115] ### Cost equations --> "Loop" of fun/3 * CEs [114] --> Loop 63 * CEs [110,111,112,113,115] --> Loop 64 ### Ranking functions of CR fun(V1,V,Out) #### Partial ranking functions of CR fun(V1,V,Out) ### Specialization of cost equations fun2/2 * CE 35 is refined into CE [116,117] * CE 36 is refined into CE [118] ### Cost equations --> "Loop" of fun2/2 * CEs [117] --> Loop 65 * CEs [116] --> Loop 66 * CEs [118] --> Loop 67 ### Ranking functions of CR fun2(V1,Out) #### Partial ranking functions of CR fun2(V1,Out) ### Specialization of cost equations fun3/3 * CE 37 is refined into CE [119,120,121,122,123,124,125,126,127,128,129,130,131,132,133] * CE 38 is refined into CE [134] ### Cost equations --> "Loop" of fun3/3 * CEs [126,129,131] --> Loop 68 * CEs [122,128,132,133] --> Loop 69 * CEs [119,120,121,123,124,125,127,130,134] --> Loop 70 ### Ranking functions of CR fun3(V1,V,Out) #### Partial ranking functions of CR fun3(V1,V,Out) ### Specialization of cost equations fun4/3 * CE 39 is refined into CE [135,136,137,138,139,140,141,142,143] * CE 40 is refined into CE [144] ### Cost equations --> "Loop" of fun4/3 * CEs [139,141,143] --> Loop 71 * CEs [135,136,137,138,140,142,144] --> Loop 72 ### Ranking functions of CR fun4(V1,V,Out) #### Partial ranking functions of CR fun4(V1,V,Out) ### Specialization of cost equations fun5/3 * CE 41 is refined into CE [145,146,147,148,149,150,151,152,153,154,155] * CE 42 is refined into CE [156] ### Cost equations --> "Loop" of fun5/3 * CEs [148,151] --> Loop 73 * CEs [146,150,153,154,155] --> Loop 74 * CEs [145,147,149,152,156] --> Loop 75 ### Ranking functions of CR fun5(V1,V,Out) #### Partial ranking functions of CR fun5(V1,V,Out) ### Specialization of cost equations start/2 * CE 1 is refined into CE [157,158] * CE 2 is refined into CE [159,160,161,162,163,164] * CE 3 is refined into CE [165,166,167] * CE 4 is refined into CE [168,169,170,171,172,173] * CE 5 is refined into CE [174,175] * CE 6 is refined into CE [176,177] * CE 7 is refined into CE [178] * CE 8 is refined into CE [179,180,181] * CE 9 is refined into CE [182,183,184] * CE 10 is refined into CE [185,186] * CE 11 is refined into CE [187,188,189] ### Cost equations --> "Loop" of start/2 * CEs [157,158,159,160,161,162,163,164,165,166,167,168,169,170,171,172,173,174,175,176,177,178,179,180,181,182,183,184,185,186,187,188,189] --> Loop 76 ### Ranking functions of CR start(V1,V) #### Partial ranking functions of CR start(V1,V) Computing Bounds ===================================== #### Cost of chains of max(V1,V,Out): * Chain [[24],27]: 1*it(24)+1 Such that:it(24) =< V1 with precondition: [V=Out,V1>=1,V>=V1] * Chain [[24],26]: 1*it(24)+1 Such that:it(24) =< V with precondition: [V1=Out,V>=1,V1>=V] * Chain [[24],25]: 1*it(24)+0 Such that:it(24) =< Out with precondition: [Out>=1,V1>=Out,V>=Out] * Chain [27]: 1 with precondition: [V1=0,V=Out,V>=0] * Chain [26]: 1 with precondition: [V=0,V1=Out,V1>=0] * Chain [25]: 0 with precondition: [Out=0,V1>=0,V>=0] #### Cost of chains of min(V1,V,Out): * Chain [[28],30]: 1*it(28)+1 Such that:it(28) =< Out with precondition: [Out>=1,V1>=Out,V>=Out] * Chain [[28],29]: 1*it(28)+1 Such that:it(28) =< Out with precondition: [V=Out,V>=1,V1>=V] * Chain [30]: 1 with precondition: [Out=0,V1>=0,V>=0] * Chain [29]: 1 with precondition: [V=0,Out=0,V1>=0] #### Cost of chains of minus(V1,V,Out): * Chain [[31],33]: 1*it(31)+1 Such that:it(31) =< V with precondition: [V1=Out+V,V>=1,V1>=V] * Chain [[31],32]: 1*it(31)+0 Such that:it(31) =< V with precondition: [Out=0,V1>=1,V>=1] * Chain [33]: 1 with precondition: [V=0,V1=Out,V1>=0] * Chain [32]: 0 with precondition: [Out=0,V1>=0,V>=0] #### Cost of chains of gcd(V1,V,Out): * Chain [[47,49],53]: 5*it(47)+6*it(49)+1*s(8)+1 Such that:aux(13) =< V1 aux(14) =< V1+V aux(15) =< V aux(6) =< aux(14) it(47) =< aux(14) it(49) =< aux(14) aux(6) =< aux(15)+aux(13) it(47) =< aux(15)+aux(13) s(8) =< aux(6) with precondition: [Out=1,V1>=1,V>=1] * Chain [[47,49],51]: 5*it(47)+6*it(49)+1*s(8)+0 Such that:aux(16) =< V1 aux(17) =< V1+V aux(18) =< V aux(6) =< aux(17) it(47) =< aux(17) it(49) =< aux(17) aux(6) =< aux(18)+aux(16) it(47) =< aux(18)+aux(16) s(8) =< aux(6) with precondition: [Out=0,V1>=1,V>=1] * Chain [[47,49],50,53]: 5*it(47)+15*it(49)+1*s(8)+15*s(10)+5 Such that:aux(26) =< 1 aux(27) =< V1 aux(28) =< V1+V aux(29) =< V s(10) =< aux(26) it(49) =< aux(28) aux(6) =< aux(28) it(47) =< aux(28) aux(6) =< aux(29)+aux(27) it(47) =< aux(29)+aux(27) s(8) =< aux(6) with precondition: [Out=1,V1>=1,V>=1,V+V1>=3] * Chain [[47,49],50,51]: 5*it(47)+15*it(49)+1*s(8)+15*s(10)+4 Such that:aux(30) =< 1 aux(31) =< V1 aux(32) =< V1+V aux(33) =< V s(10) =< aux(30) it(49) =< aux(32) aux(6) =< aux(32) it(47) =< aux(32) aux(6) =< aux(33)+aux(31) it(47) =< aux(33)+aux(31) s(8) =< aux(6) with precondition: [Out=0,V1>=1,V>=1,V+V1>=3] * Chain [[47,49],48,53]: 5*it(47)+6*it(49)+1*s(8)+1*s(34)+5 Such that:s(34) =< 1 aux(34) =< V1 aux(35) =< V1+V aux(36) =< V aux(6) =< aux(35) it(47) =< aux(35) it(49) =< aux(35) aux(6) =< aux(36)+aux(34) it(47) =< aux(36)+aux(34) s(8) =< aux(6) with precondition: [Out=1,V1>=1,V>=1,V+V1>=3] * Chain [[47,49],48,51]: 5*it(47)+6*it(49)+1*s(8)+1*s(34)+4 Such that:s(34) =< 1 aux(37) =< V1 aux(38) =< V1+V aux(39) =< V aux(6) =< aux(38) it(47) =< aux(38) it(49) =< aux(38) aux(6) =< aux(39)+aux(37) it(47) =< aux(39)+aux(37) s(8) =< aux(6) with precondition: [Out=0,V1>=1,V>=1,V+V1>=3] * Chain [[34,35,36,37,38,46],[47,49],53]: 18*it(34)+20*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1 Such that:aux(100) =< V1 aux(101) =< V1+V aux(102) =< V aux(6) =< aux(101) it(47) =< aux(101) it(35) =< aux(101) aux(6) =< aux(101)+aux(101) it(47) =< aux(101)+aux(101) s(8) =< aux(6) aux(71) =< aux(101) it(34) =< aux(101) aux(65) =< aux(101) aux(62) =< aux(102) aux(72) =< aux(101)-1 aux(71) =< aux(102)+aux(102)+aux(100) it(34) =< aux(102)+aux(102)+aux(100) s(133) =< it(35)*aux(101) s(132) =< aux(102)+aux(102)+aux(100) s(155) =< aux(102)+aux(102)+aux(100) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(102) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],[47,49],51]: 18*it(34)+20*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+0 Such that:aux(103) =< V1 aux(104) =< V1+V aux(105) =< V aux(6) =< aux(104) it(47) =< aux(104) it(35) =< aux(104) aux(6) =< aux(104)+aux(104) it(47) =< aux(104)+aux(104) s(8) =< aux(6) aux(71) =< aux(104) it(34) =< aux(104) aux(65) =< aux(104) aux(62) =< aux(105) aux(72) =< aux(104)-1 aux(71) =< aux(105)+aux(105)+aux(103) it(34) =< aux(105)+aux(105)+aux(103) s(133) =< it(35)*aux(104) s(132) =< aux(105)+aux(105)+aux(103) s(155) =< aux(105)+aux(105)+aux(103) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(105) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],[47,49],50,53]: 18*it(34)+29*it(35)+5*it(47)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+5 Such that:aux(26) =< 1 aux(106) =< V1 aux(107) =< V1+V aux(108) =< V s(10) =< aux(26) it(35) =< aux(107) aux(6) =< aux(107) it(47) =< aux(107) aux(6) =< aux(107)+aux(107) it(47) =< aux(107)+aux(107) s(8) =< aux(6) aux(71) =< aux(107) it(34) =< aux(107) aux(65) =< aux(107) aux(62) =< aux(108) aux(72) =< aux(107)-1 aux(71) =< aux(108)+aux(108)+aux(106) it(34) =< aux(108)+aux(108)+aux(106) s(133) =< it(35)*aux(107) s(132) =< aux(108)+aux(108)+aux(106) s(155) =< aux(108)+aux(108)+aux(106) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(108) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],[47,49],50,51]: 18*it(34)+29*it(35)+5*it(47)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4 Such that:aux(30) =< 1 aux(109) =< V1 aux(110) =< V1+V aux(111) =< V s(10) =< aux(30) it(35) =< aux(110) aux(6) =< aux(110) it(47) =< aux(110) aux(6) =< aux(110)+aux(110) it(47) =< aux(110)+aux(110) s(8) =< aux(6) aux(71) =< aux(110) it(34) =< aux(110) aux(65) =< aux(110) aux(62) =< aux(111) aux(72) =< aux(110)-1 aux(71) =< aux(111)+aux(111)+aux(109) it(34) =< aux(111)+aux(111)+aux(109) s(133) =< it(35)*aux(110) s(132) =< aux(111)+aux(111)+aux(109) s(155) =< aux(111)+aux(111)+aux(109) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(111) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],[47,49],48,53]: 18*it(34)+20*it(35)+5*it(47)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+5 Such that:s(34) =< 1 aux(112) =< V1 aux(113) =< V1+V aux(114) =< V aux(6) =< aux(113) it(47) =< aux(113) it(35) =< aux(113) aux(6) =< aux(113)+aux(113) it(47) =< aux(113)+aux(113) s(8) =< aux(6) aux(71) =< aux(113) it(34) =< aux(113) aux(65) =< aux(113) aux(62) =< aux(114) aux(72) =< aux(113)-1 aux(71) =< aux(114)+aux(114)+aux(112) it(34) =< aux(114)+aux(114)+aux(112) s(133) =< it(35)*aux(113) s(132) =< aux(114)+aux(114)+aux(112) s(155) =< aux(114)+aux(114)+aux(112) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(114) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],[47,49],48,51]: 18*it(34)+20*it(35)+5*it(47)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4 Such that:s(34) =< 1 aux(115) =< V1 aux(116) =< V1+V aux(117) =< V aux(6) =< aux(116) it(47) =< aux(116) it(35) =< aux(116) aux(6) =< aux(116)+aux(116) it(47) =< aux(116)+aux(116) s(8) =< aux(6) aux(71) =< aux(116) it(34) =< aux(116) aux(65) =< aux(116) aux(62) =< aux(117) aux(72) =< aux(116)-1 aux(71) =< aux(117)+aux(117)+aux(115) it(34) =< aux(117)+aux(117)+aux(115) s(133) =< it(35)*aux(116) s(132) =< aux(117)+aux(117)+aux(115) s(155) =< aux(117)+aux(117)+aux(115) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(117) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],53]: 18*it(34)+10*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1 Such that:aux(95) =< V1+V aux(96) =< V1+V-Out aux(98) =< V aux(99) =< V-Out aux(118) =< V1 aux(71) =< aux(95) aux(74) =< aux(95) it(34) =< aux(95) it(35) =< aux(95) aux(71) =< aux(96) aux(74) =< aux(96) it(34) =< aux(96) it(35) =< aux(96) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(95) aux(62) =< aux(98) aux(72) =< aux(95)-1 aux(71) =< aux(49)+aux(49)+aux(118) it(34) =< aux(49)+aux(49)+aux(118) s(134) =< aux(74) s(133) =< it(35)*aux(95) s(132) =< aux(49)+aux(49)+aux(118) s(155) =< aux(49)+aux(49)+aux(118) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out>=2,V1>=Out,V>=Out] * Chain [[34,35,36,37,38,46],51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+0 Such that:aux(119) =< V1 aux(120) =< V1+V aux(121) =< V aux(71) =< aux(120) it(34) =< aux(120) it(35) =< aux(120) aux(65) =< aux(120) aux(62) =< aux(121) aux(72) =< aux(120)-1 aux(71) =< aux(121)+aux(121)+aux(119) it(34) =< aux(121)+aux(121)+aux(119) s(133) =< it(35)*aux(120) s(132) =< aux(121)+aux(121)+aux(119) s(155) =< aux(121)+aux(121)+aux(119) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(121) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],50,53]: 18*it(34)+32*it(35)+6*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+5 Such that:aux(23) =< 1 aux(122) =< V1 aux(123) =< V1+V aux(124) =< V s(10) =< aux(23) it(35) =< aux(123) aux(71) =< aux(123) it(34) =< aux(123) aux(65) =< aux(123) aux(62) =< aux(124) aux(72) =< aux(123)-1 aux(71) =< aux(124)+aux(124)+aux(122) it(34) =< aux(124)+aux(124)+aux(122) s(133) =< it(35)*aux(123) s(132) =< aux(124)+aux(124)+aux(122) s(155) =< aux(124)+aux(124)+aux(122) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(124) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],50,51]: 18*it(34)+32*it(35)+6*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4 Such that:aux(23) =< 1 aux(125) =< V1 aux(126) =< V1+V aux(127) =< V s(10) =< aux(23) it(35) =< aux(126) aux(71) =< aux(126) it(34) =< aux(126) aux(65) =< aux(126) aux(62) =< aux(127) aux(72) =< aux(126)-1 aux(71) =< aux(127)+aux(127)+aux(125) it(34) =< aux(127)+aux(127)+aux(125) s(133) =< it(35)*aux(126) s(132) =< aux(127)+aux(127)+aux(125) s(155) =< aux(127)+aux(127)+aux(125) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(127) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2] * Chain [[34,35,36,37,38,46],45,53]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+5*s(160)+1*s(161)+4*s(163)+5 Such that:s(161) =< 1 aux(94) =< V1 aux(97) =< V1-Out aux(130) =< Out aux(131) =< V1+V aux(132) =< V s(160) =< aux(132) s(163) =< aux(130) aux(71) =< aux(131) it(34) =< aux(131) it(35) =< aux(131) aux(65) =< aux(131) aux(62) =< aux(132) aux(72) =< aux(131)-1 aux(71) =< aux(132)+aux(132)+aux(94) it(34) =< aux(132)+aux(132)+aux(94) s(133) =< it(35)*aux(131) it(34) =< aux(132)+aux(132)+aux(97) s(132) =< aux(132)+aux(132)+aux(97) s(155) =< aux(132)+aux(132)+aux(97) s(132) =< aux(132)+aux(132)+aux(94) s(155) =< aux(132)+aux(132)+aux(94) aux(71) =< aux(132)+aux(132)+aux(97) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(132) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out>=2,V1>=Out,V>=Out,V+V1>=2*Out+1] * Chain [[34,35,36,37,38,46],45,51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9*s(160)+1*s(161)+4 Such that:s(161) =< 1 aux(134) =< V1 aux(135) =< V1+V aux(136) =< V s(160) =< aux(136) aux(71) =< aux(135) it(34) =< aux(135) it(35) =< aux(135) aux(65) =< aux(135) aux(62) =< aux(136) aux(72) =< aux(135)-1 aux(71) =< aux(136)+aux(136)+aux(134) it(34) =< aux(136)+aux(136)+aux(134) s(133) =< it(35)*aux(135) s(132) =< aux(136)+aux(136)+aux(134) s(155) =< aux(136)+aux(136)+aux(134) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(136) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],44,[47,49],53]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(171)+6 Such that:aux(137) =< 1 aux(139) =< V1 aux(140) =< V1+V aux(141) =< V it(35) =< aux(140) s(171) =< aux(137) aux(6) =< aux(140) it(47) =< aux(140) aux(6) =< aux(137)+aux(140) it(47) =< aux(137)+aux(140) s(8) =< aux(6) aux(71) =< aux(140) it(34) =< aux(140) aux(65) =< aux(140) aux(62) =< aux(141) aux(72) =< aux(140)-1 aux(71) =< aux(141)+aux(141)+aux(139) it(34) =< aux(141)+aux(141)+aux(139) s(133) =< it(35)*aux(140) s(132) =< aux(141)+aux(141)+aux(139) s(155) =< aux(141)+aux(141)+aux(139) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(141) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],44,[47,49],51]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(171)+5 Such that:aux(142) =< 1 aux(144) =< V1 aux(145) =< V1+V aux(146) =< V it(35) =< aux(145) s(171) =< aux(142) aux(6) =< aux(145) it(47) =< aux(145) aux(6) =< aux(142)+aux(145) it(47) =< aux(142)+aux(145) s(8) =< aux(6) aux(71) =< aux(145) it(34) =< aux(145) aux(65) =< aux(145) aux(62) =< aux(146) aux(72) =< aux(145)-1 aux(71) =< aux(146)+aux(146)+aux(144) it(34) =< aux(146)+aux(146)+aux(144) s(133) =< it(35)*aux(145) s(132) =< aux(146)+aux(146)+aux(144) s(155) =< aux(146)+aux(146)+aux(144) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(146) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],44,[47,49],50,53]: 18*it(34)+30*it(35)+5*it(47)+1*s(8)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(147) =< 1 aux(149) =< V1 aux(150) =< V1+V aux(151) =< V it(35) =< aux(150) s(10) =< aux(147) aux(6) =< aux(150) it(47) =< aux(150) aux(6) =< aux(147)+aux(150) it(47) =< aux(147)+aux(150) s(8) =< aux(6) aux(71) =< aux(150) it(34) =< aux(150) aux(65) =< aux(150) aux(62) =< aux(151) aux(72) =< aux(150)-1 aux(71) =< aux(151)+aux(151)+aux(149) it(34) =< aux(151)+aux(151)+aux(149) s(133) =< it(35)*aux(150) s(132) =< aux(151)+aux(151)+aux(149) s(155) =< aux(151)+aux(151)+aux(149) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(151) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],44,[47,49],50,51]: 18*it(34)+30*it(35)+5*it(47)+1*s(8)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(152) =< 1 aux(154) =< V1 aux(155) =< V1+V aux(156) =< V it(35) =< aux(155) s(10) =< aux(152) aux(6) =< aux(155) it(47) =< aux(155) aux(6) =< aux(152)+aux(155) it(47) =< aux(152)+aux(155) s(8) =< aux(6) aux(71) =< aux(155) it(34) =< aux(155) aux(65) =< aux(155) aux(62) =< aux(156) aux(72) =< aux(155)-1 aux(71) =< aux(156)+aux(156)+aux(154) it(34) =< aux(156)+aux(156)+aux(154) s(133) =< it(35)*aux(155) s(132) =< aux(156)+aux(156)+aux(154) s(155) =< aux(156)+aux(156)+aux(154) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(156) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],44,[47,49],48,53]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(157) =< 1 aux(159) =< V1 aux(160) =< V1+V aux(161) =< V it(35) =< aux(160) s(34) =< aux(157) aux(6) =< aux(160) it(47) =< aux(160) aux(6) =< aux(157)+aux(160) it(47) =< aux(157)+aux(160) s(8) =< aux(6) aux(71) =< aux(160) it(34) =< aux(160) aux(65) =< aux(160) aux(62) =< aux(161) aux(72) =< aux(160)-1 aux(71) =< aux(161)+aux(161)+aux(159) it(34) =< aux(161)+aux(161)+aux(159) s(133) =< it(35)*aux(160) s(132) =< aux(161)+aux(161)+aux(159) s(155) =< aux(161)+aux(161)+aux(159) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(161) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],44,[47,49],48,51]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(162) =< 1 aux(164) =< V1 aux(165) =< V1+V aux(166) =< V it(35) =< aux(165) s(34) =< aux(162) aux(6) =< aux(165) it(47) =< aux(165) aux(6) =< aux(162)+aux(165) it(47) =< aux(162)+aux(165) s(8) =< aux(6) aux(71) =< aux(165) it(34) =< aux(165) aux(65) =< aux(165) aux(62) =< aux(166) aux(72) =< aux(165)-1 aux(71) =< aux(166)+aux(166)+aux(164) it(34) =< aux(166)+aux(166)+aux(164) s(133) =< it(35)*aux(165) s(132) =< aux(166)+aux(166)+aux(164) s(155) =< aux(166)+aux(166)+aux(164) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(166) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],44,51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(170)+1*s(171)+5 Such that:s(171) =< 1 aux(167) =< V1 aux(168) =< V1+V aux(169) =< V s(170) =< aux(169) aux(71) =< aux(168) it(34) =< aux(168) it(35) =< aux(168) aux(65) =< aux(168) aux(62) =< aux(169) aux(72) =< aux(168)-1 aux(71) =< aux(169)+aux(169)+aux(167) it(34) =< aux(169)+aux(169)+aux(167) s(133) =< it(35)*aux(168) s(132) =< aux(169)+aux(169)+aux(167) s(155) =< aux(169)+aux(169)+aux(167) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(169) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],44,50,53]: 18*it(34)+24*it(35)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(170) =< 1 aux(171) =< V1 aux(172) =< V1+V aux(173) =< V it(35) =< aux(172) s(10) =< aux(170) aux(71) =< aux(172) it(34) =< aux(172) aux(65) =< aux(172) aux(62) =< aux(173) aux(72) =< aux(172)-1 aux(71) =< aux(173)+aux(173)+aux(171) it(34) =< aux(173)+aux(173)+aux(171) s(133) =< it(35)*aux(172) s(132) =< aux(173)+aux(173)+aux(171) s(155) =< aux(173)+aux(173)+aux(171) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(173) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],44,50,51]: 18*it(34)+24*it(35)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(174) =< 1 aux(175) =< V1 aux(176) =< V1+V aux(177) =< V it(35) =< aux(176) s(10) =< aux(174) aux(71) =< aux(176) it(34) =< aux(176) aux(65) =< aux(176) aux(62) =< aux(177) aux(72) =< aux(176)-1 aux(71) =< aux(177)+aux(177)+aux(175) it(34) =< aux(177)+aux(177)+aux(175) s(133) =< it(35)*aux(176) s(132) =< aux(177)+aux(177)+aux(175) s(155) =< aux(177)+aux(177)+aux(175) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(177) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],44,48,53]: 18*it(34)+14*it(35)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(170)+10 Such that:aux(178) =< 1 aux(179) =< V1 aux(180) =< V1+V aux(181) =< V s(170) =< aux(181) s(34) =< aux(178) aux(71) =< aux(180) it(34) =< aux(180) it(35) =< aux(180) aux(65) =< aux(180) aux(62) =< aux(181) aux(72) =< aux(180)-1 aux(71) =< aux(181)+aux(181)+aux(179) it(34) =< aux(181)+aux(181)+aux(179) s(133) =< it(35)*aux(180) s(132) =< aux(181)+aux(181)+aux(179) s(155) =< aux(181)+aux(181)+aux(179) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(181) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],44,48,51]: 18*it(34)+14*it(35)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(170)+9 Such that:aux(182) =< 1 aux(183) =< V1 aux(184) =< V1+V aux(185) =< V s(170) =< aux(185) s(34) =< aux(182) aux(71) =< aux(184) it(34) =< aux(184) it(35) =< aux(184) aux(65) =< aux(184) aux(62) =< aux(185) aux(72) =< aux(184)-1 aux(71) =< aux(185)+aux(185)+aux(183) it(34) =< aux(185)+aux(185)+aux(183) s(133) =< it(35)*aux(184) s(132) =< aux(185)+aux(185)+aux(183) s(155) =< aux(185)+aux(185)+aux(183) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(185) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],43,[47,49],53]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(173)+6 Such that:aux(186) =< 1 aux(188) =< V1 aux(189) =< V1+V aux(190) =< V it(35) =< aux(189) s(173) =< aux(186) aux(6) =< aux(189) it(47) =< aux(189) aux(6) =< aux(186)+aux(189) it(47) =< aux(186)+aux(189) s(8) =< aux(6) aux(71) =< aux(189) it(34) =< aux(189) aux(65) =< aux(189) aux(62) =< aux(190) aux(72) =< aux(189)-1 aux(71) =< aux(190)+aux(190)+aux(188) it(34) =< aux(190)+aux(190)+aux(188) s(133) =< it(35)*aux(189) s(132) =< aux(190)+aux(190)+aux(188) s(155) =< aux(190)+aux(190)+aux(188) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(190) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],43,[47,49],51]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(173)+5 Such that:aux(191) =< 1 aux(193) =< V1 aux(194) =< V1+V aux(195) =< V it(35) =< aux(194) s(173) =< aux(191) aux(6) =< aux(194) it(47) =< aux(194) aux(6) =< aux(191)+aux(194) it(47) =< aux(191)+aux(194) s(8) =< aux(6) aux(71) =< aux(194) it(34) =< aux(194) aux(65) =< aux(194) aux(62) =< aux(195) aux(72) =< aux(194)-1 aux(71) =< aux(195)+aux(195)+aux(193) it(34) =< aux(195)+aux(195)+aux(193) s(133) =< it(35)*aux(194) s(132) =< aux(195)+aux(195)+aux(193) s(155) =< aux(195)+aux(195)+aux(193) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(195) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],43,[47,49],50,53]: 18*it(34)+30*it(35)+5*it(47)+1*s(8)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(196) =< 1 aux(198) =< V1 aux(199) =< V1+V aux(200) =< V it(35) =< aux(199) s(10) =< aux(196) aux(6) =< aux(199) it(47) =< aux(199) aux(6) =< aux(196)+aux(199) it(47) =< aux(196)+aux(199) s(8) =< aux(6) aux(71) =< aux(199) it(34) =< aux(199) aux(65) =< aux(199) aux(62) =< aux(200) aux(72) =< aux(199)-1 aux(71) =< aux(200)+aux(200)+aux(198) it(34) =< aux(200)+aux(200)+aux(198) s(133) =< it(35)*aux(199) s(132) =< aux(200)+aux(200)+aux(198) s(155) =< aux(200)+aux(200)+aux(198) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(200) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],43,[47,49],50,51]: 18*it(34)+30*it(35)+5*it(47)+1*s(8)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(201) =< 1 aux(203) =< V1 aux(204) =< V1+V aux(205) =< V it(35) =< aux(204) s(10) =< aux(201) aux(6) =< aux(204) it(47) =< aux(204) aux(6) =< aux(201)+aux(204) it(47) =< aux(201)+aux(204) s(8) =< aux(6) aux(71) =< aux(204) it(34) =< aux(204) aux(65) =< aux(204) aux(62) =< aux(205) aux(72) =< aux(204)-1 aux(71) =< aux(205)+aux(205)+aux(203) it(34) =< aux(205)+aux(205)+aux(203) s(133) =< it(35)*aux(204) s(132) =< aux(205)+aux(205)+aux(203) s(155) =< aux(205)+aux(205)+aux(203) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(205) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],43,[47,49],48,53]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(206) =< 1 aux(208) =< V1 aux(209) =< V1+V aux(210) =< V it(35) =< aux(209) s(34) =< aux(206) aux(6) =< aux(209) it(47) =< aux(209) aux(6) =< aux(206)+aux(209) it(47) =< aux(206)+aux(209) s(8) =< aux(6) aux(71) =< aux(209) it(34) =< aux(209) aux(65) =< aux(209) aux(62) =< aux(210) aux(72) =< aux(209)-1 aux(71) =< aux(210)+aux(210)+aux(208) it(34) =< aux(210)+aux(210)+aux(208) s(133) =< it(35)*aux(209) s(132) =< aux(210)+aux(210)+aux(208) s(155) =< aux(210)+aux(210)+aux(208) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(210) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],43,[47,49],48,51]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(211) =< 1 aux(213) =< V1 aux(214) =< V1+V aux(215) =< V it(35) =< aux(214) s(34) =< aux(211) aux(6) =< aux(214) it(47) =< aux(214) aux(6) =< aux(211)+aux(214) it(47) =< aux(211)+aux(214) s(8) =< aux(6) aux(71) =< aux(214) it(34) =< aux(214) aux(65) =< aux(214) aux(62) =< aux(215) aux(72) =< aux(214)-1 aux(71) =< aux(215)+aux(215)+aux(213) it(34) =< aux(215)+aux(215)+aux(213) s(133) =< it(35)*aux(214) s(132) =< aux(215)+aux(215)+aux(213) s(155) =< aux(215)+aux(215)+aux(213) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(215) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],43,51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(172)+1*s(173)+5 Such that:s(173) =< 1 aux(216) =< V1 aux(217) =< V1+V aux(218) =< V s(172) =< aux(216) aux(71) =< aux(217) it(34) =< aux(217) it(35) =< aux(217) aux(65) =< aux(217) aux(62) =< aux(218) aux(72) =< aux(217)-1 aux(71) =< aux(218)+aux(218)+aux(216) it(34) =< aux(218)+aux(218)+aux(216) s(133) =< it(35)*aux(217) s(132) =< aux(218)+aux(218)+aux(216) s(155) =< aux(218)+aux(218)+aux(216) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(218) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],43,50,53]: 18*it(34)+24*it(35)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(219) =< 1 aux(220) =< V1 aux(221) =< V1+V aux(222) =< V it(35) =< aux(221) s(10) =< aux(219) aux(71) =< aux(221) it(34) =< aux(221) aux(65) =< aux(221) aux(62) =< aux(222) aux(72) =< aux(221)-1 aux(71) =< aux(222)+aux(222)+aux(220) it(34) =< aux(222)+aux(222)+aux(220) s(133) =< it(35)*aux(221) s(132) =< aux(222)+aux(222)+aux(220) s(155) =< aux(222)+aux(222)+aux(220) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(222) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],43,50,51]: 18*it(34)+24*it(35)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(223) =< 1 aux(224) =< V1 aux(225) =< V1+V aux(226) =< V it(35) =< aux(225) s(10) =< aux(223) aux(71) =< aux(225) it(34) =< aux(225) aux(65) =< aux(225) aux(62) =< aux(226) aux(72) =< aux(225)-1 aux(71) =< aux(226)+aux(226)+aux(224) it(34) =< aux(226)+aux(226)+aux(224) s(133) =< it(35)*aux(225) s(132) =< aux(226)+aux(226)+aux(224) s(155) =< aux(226)+aux(226)+aux(224) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(226) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],43,48,53]: 18*it(34)+14*it(35)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(172)+10 Such that:aux(227) =< 1 aux(228) =< V1 aux(229) =< V1+V aux(230) =< V s(172) =< aux(228) s(34) =< aux(227) aux(71) =< aux(229) it(34) =< aux(229) it(35) =< aux(229) aux(65) =< aux(229) aux(62) =< aux(230) aux(72) =< aux(229)-1 aux(71) =< aux(230)+aux(230)+aux(228) it(34) =< aux(230)+aux(230)+aux(228) s(133) =< it(35)*aux(229) s(132) =< aux(230)+aux(230)+aux(228) s(155) =< aux(230)+aux(230)+aux(228) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(230) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],43,48,51]: 18*it(34)+14*it(35)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(172)+9 Such that:aux(231) =< 1 aux(232) =< V1 aux(233) =< V1+V aux(234) =< V s(172) =< aux(232) s(34) =< aux(231) aux(71) =< aux(233) it(34) =< aux(233) it(35) =< aux(233) aux(65) =< aux(233) aux(62) =< aux(234) aux(72) =< aux(233)-1 aux(71) =< aux(234)+aux(234)+aux(232) it(34) =< aux(234)+aux(234)+aux(232) s(133) =< it(35)*aux(233) s(132) =< aux(234)+aux(234)+aux(232) s(155) =< aux(234)+aux(234)+aux(232) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(234) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],42,[47,49],53]: 18*it(34)+24*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+5 Such that:aux(15) =< 1 aux(98) =< V aux(99) =< V+1 aux(237) =< V1 aux(238) =< V1+V it(35) =< aux(238) aux(6) =< aux(238) it(47) =< aux(238) aux(6) =< aux(15)+aux(238) it(47) =< aux(15)+aux(238) s(8) =< aux(6) aux(71) =< aux(238) it(34) =< aux(238) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(238) aux(62) =< aux(98) aux(72) =< aux(238)-1 aux(71) =< aux(49)+aux(49)+aux(237) it(34) =< aux(49)+aux(49)+aux(237) s(133) =< it(35)*aux(238) s(132) =< aux(49)+aux(49)+aux(237) s(155) =< aux(49)+aux(49)+aux(237) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],42,[47,49],51]: 18*it(34)+24*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4 Such that:aux(18) =< 1 aux(98) =< V aux(99) =< V+1 aux(240) =< V1 aux(241) =< V1+V it(35) =< aux(241) aux(6) =< aux(241) it(47) =< aux(241) aux(6) =< aux(18)+aux(241) it(47) =< aux(18)+aux(241) s(8) =< aux(6) aux(71) =< aux(241) it(34) =< aux(241) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(241) aux(62) =< aux(98) aux(72) =< aux(241)-1 aux(71) =< aux(49)+aux(49)+aux(240) it(34) =< aux(49)+aux(49)+aux(240) s(133) =< it(35)*aux(241) s(132) =< aux(49)+aux(49)+aux(240) s(155) =< aux(49)+aux(49)+aux(240) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],42,[47,49],50,53]: 18*it(34)+33*it(35)+5*it(47)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(242) =< 1 aux(98) =< V aux(99) =< V+1 aux(244) =< V1 aux(245) =< V1+V it(35) =< aux(245) s(10) =< aux(242) aux(6) =< aux(245) it(47) =< aux(245) aux(6) =< aux(242)+aux(245) it(47) =< aux(242)+aux(245) s(8) =< aux(6) aux(71) =< aux(245) it(34) =< aux(245) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(245) aux(62) =< aux(98) aux(72) =< aux(245)-1 aux(71) =< aux(49)+aux(49)+aux(244) it(34) =< aux(49)+aux(49)+aux(244) s(133) =< it(35)*aux(245) s(132) =< aux(49)+aux(49)+aux(244) s(155) =< aux(49)+aux(49)+aux(244) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=4,V>=4,V+V1>=9] * Chain [[34,35,36,37,38,46],42,[47,49],50,51]: 18*it(34)+33*it(35)+5*it(47)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+8 Such that:aux(246) =< 1 aux(98) =< V aux(99) =< V+1 aux(248) =< V1 aux(249) =< V1+V it(35) =< aux(249) s(10) =< aux(246) aux(6) =< aux(249) it(47) =< aux(249) aux(6) =< aux(246)+aux(249) it(47) =< aux(246)+aux(249) s(8) =< aux(6) aux(71) =< aux(249) it(34) =< aux(249) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(249) aux(62) =< aux(98) aux(72) =< aux(249)-1 aux(71) =< aux(49)+aux(49)+aux(248) it(34) =< aux(49)+aux(49)+aux(248) s(133) =< it(35)*aux(249) s(132) =< aux(49)+aux(49)+aux(248) s(155) =< aux(49)+aux(49)+aux(248) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=4,V>=4,V+V1>=9] * Chain [[34,35,36,37,38,46],42,[47,49],48,53]: 18*it(34)+24*it(35)+5*it(47)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(250) =< 1 aux(98) =< V aux(99) =< V+1 aux(252) =< V1 aux(253) =< V1+V s(34) =< aux(250) it(35) =< aux(253) aux(6) =< aux(253) it(47) =< aux(253) aux(6) =< aux(250)+aux(253) it(47) =< aux(250)+aux(253) s(8) =< aux(6) aux(71) =< aux(253) it(34) =< aux(253) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(253) aux(62) =< aux(98) aux(72) =< aux(253)-1 aux(71) =< aux(49)+aux(49)+aux(252) it(34) =< aux(49)+aux(49)+aux(252) s(133) =< it(35)*aux(253) s(132) =< aux(49)+aux(49)+aux(252) s(155) =< aux(49)+aux(49)+aux(252) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=4,V>=4,V+V1>=9] * Chain [[34,35,36,37,38,46],42,[47,49],48,51]: 18*it(34)+24*it(35)+5*it(47)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+8 Such that:aux(254) =< 1 aux(98) =< V aux(99) =< V+1 aux(256) =< V1 aux(257) =< V1+V s(34) =< aux(254) it(35) =< aux(257) aux(6) =< aux(257) it(47) =< aux(257) aux(6) =< aux(254)+aux(257) it(47) =< aux(254)+aux(257) s(8) =< aux(6) aux(71) =< aux(257) it(34) =< aux(257) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(257) aux(62) =< aux(98) aux(72) =< aux(257)-1 aux(71) =< aux(49)+aux(49)+aux(256) it(34) =< aux(49)+aux(49)+aux(256) s(133) =< it(35)*aux(257) s(132) =< aux(49)+aux(49)+aux(256) s(155) =< aux(49)+aux(49)+aux(256) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=4,V>=4,V+V1>=9] * Chain [[34,35,36,37,38,46],42,53]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(174)+5 Such that:aux(259) =< V1 aux(260) =< V1+V aux(261) =< V s(174) =< aux(261) aux(71) =< aux(260) it(34) =< aux(260) it(35) =< aux(260) aux(65) =< aux(260) aux(62) =< aux(261) aux(72) =< aux(260)-1 aux(71) =< aux(261)+aux(261)+aux(259) it(34) =< aux(261)+aux(261)+aux(259) s(133) =< it(35)*aux(260) s(132) =< aux(261)+aux(261)+aux(259) s(155) =< aux(261)+aux(261)+aux(259) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(261) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],42,51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(174)+4 Such that:aux(263) =< V1 aux(264) =< V1+V aux(265) =< V s(174) =< aux(265) aux(71) =< aux(264) it(34) =< aux(264) it(35) =< aux(264) aux(65) =< aux(264) aux(62) =< aux(265) aux(72) =< aux(264)-1 aux(71) =< aux(265)+aux(265)+aux(263) it(34) =< aux(265)+aux(265)+aux(263) s(133) =< it(35)*aux(264) s(132) =< aux(265)+aux(265)+aux(263) s(155) =< aux(265)+aux(265)+aux(263) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(265) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],42,50,53]: 18*it(34)+14*it(35)+15*s(10)+13*s(22)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(266) =< 1 aux(268) =< V1 aux(269) =< V1+V aux(270) =< V s(22) =< aux(270) s(10) =< aux(266) aux(71) =< aux(269) it(34) =< aux(269) it(35) =< aux(269) aux(65) =< aux(269) aux(62) =< aux(270) aux(72) =< aux(269)-1 aux(71) =< aux(270)+aux(270)+aux(268) it(34) =< aux(270)+aux(270)+aux(268) s(133) =< it(35)*aux(269) s(132) =< aux(270)+aux(270)+aux(268) s(155) =< aux(270)+aux(270)+aux(268) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(270) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],42,50,51]: 18*it(34)+14*it(35)+15*s(10)+13*s(22)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+8 Such that:aux(271) =< 1 aux(273) =< V1 aux(274) =< V1+V aux(275) =< V s(22) =< aux(275) s(10) =< aux(271) aux(71) =< aux(274) it(34) =< aux(274) it(35) =< aux(274) aux(65) =< aux(274) aux(62) =< aux(275) aux(72) =< aux(274)-1 aux(71) =< aux(275)+aux(275)+aux(273) it(34) =< aux(275)+aux(275)+aux(273) s(133) =< it(35)*aux(274) s(132) =< aux(275)+aux(275)+aux(273) s(155) =< aux(275)+aux(275)+aux(273) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(275) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],42,48,53]: 18*it(34)+14*it(35)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(174)+9 Such that:s(34) =< 1 aux(277) =< V1 aux(278) =< V1+V aux(279) =< V s(174) =< aux(279) aux(71) =< aux(278) it(34) =< aux(278) it(35) =< aux(278) aux(65) =< aux(278) aux(62) =< aux(279) aux(72) =< aux(278)-1 aux(71) =< aux(279)+aux(279)+aux(277) it(34) =< aux(279)+aux(279)+aux(277) s(133) =< it(35)*aux(278) s(132) =< aux(279)+aux(279)+aux(277) s(155) =< aux(279)+aux(279)+aux(277) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(279) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],42,48,51]: 18*it(34)+14*it(35)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(174)+8 Such that:s(34) =< 1 aux(281) =< V1 aux(282) =< V1+V aux(283) =< V s(174) =< aux(283) aux(71) =< aux(282) it(34) =< aux(282) it(35) =< aux(282) aux(65) =< aux(282) aux(62) =< aux(283) aux(72) =< aux(282)-1 aux(71) =< aux(283)+aux(283)+aux(281) it(34) =< aux(283)+aux(283)+aux(281) s(133) =< it(35)*aux(282) s(132) =< aux(283)+aux(283)+aux(281) s(155) =< aux(283)+aux(283)+aux(281) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(283) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],41,[47,49],53]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(179)+5 Such that:aux(284) =< 1 aux(286) =< V1 aux(287) =< V1+V aux(288) =< V s(179) =< aux(284) it(35) =< aux(287) aux(6) =< aux(287) it(47) =< aux(287) aux(6) =< aux(284)+aux(287) it(47) =< aux(284)+aux(287) s(8) =< aux(6) aux(71) =< aux(287) it(34) =< aux(287) aux(65) =< aux(287) aux(62) =< aux(288) aux(72) =< aux(287)-1 aux(71) =< aux(288)+aux(288)+aux(286) it(34) =< aux(288)+aux(288)+aux(286) s(133) =< it(35)*aux(287) s(132) =< aux(288)+aux(288)+aux(286) s(155) =< aux(288)+aux(288)+aux(286) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(288) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],41,[47,49],51]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(179)+4 Such that:aux(289) =< 1 aux(291) =< V1 aux(292) =< V1+V aux(293) =< V s(179) =< aux(289) it(35) =< aux(292) aux(6) =< aux(292) it(47) =< aux(292) aux(6) =< aux(289)+aux(292) it(47) =< aux(289)+aux(292) s(8) =< aux(6) aux(71) =< aux(292) it(34) =< aux(292) aux(65) =< aux(292) aux(62) =< aux(293) aux(72) =< aux(292)-1 aux(71) =< aux(293)+aux(293)+aux(291) it(34) =< aux(293)+aux(293)+aux(291) s(133) =< it(35)*aux(292) s(132) =< aux(293)+aux(293)+aux(291) s(155) =< aux(293)+aux(293)+aux(291) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(293) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],41,[47,49],50,53]: 18*it(34)+30*it(35)+5*it(47)+1*s(8)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(294) =< 1 aux(296) =< V1 aux(297) =< V1+V aux(298) =< V s(10) =< aux(294) it(35) =< aux(297) aux(6) =< aux(297) it(47) =< aux(297) aux(6) =< aux(294)+aux(297) it(47) =< aux(294)+aux(297) s(8) =< aux(6) aux(71) =< aux(297) it(34) =< aux(297) aux(65) =< aux(297) aux(62) =< aux(298) aux(72) =< aux(297)-1 aux(71) =< aux(298)+aux(298)+aux(296) it(34) =< aux(298)+aux(298)+aux(296) s(133) =< it(35)*aux(297) s(132) =< aux(298)+aux(298)+aux(296) s(155) =< aux(298)+aux(298)+aux(296) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(298) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],41,[47,49],50,51]: 18*it(34)+30*it(35)+5*it(47)+1*s(8)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+8 Such that:aux(299) =< 1 aux(301) =< V1 aux(302) =< V1+V aux(303) =< V s(10) =< aux(299) it(35) =< aux(302) aux(6) =< aux(302) it(47) =< aux(302) aux(6) =< aux(299)+aux(302) it(47) =< aux(299)+aux(302) s(8) =< aux(6) aux(71) =< aux(302) it(34) =< aux(302) aux(65) =< aux(302) aux(62) =< aux(303) aux(72) =< aux(302)-1 aux(71) =< aux(303)+aux(303)+aux(301) it(34) =< aux(303)+aux(303)+aux(301) s(133) =< it(35)*aux(302) s(132) =< aux(303)+aux(303)+aux(301) s(155) =< aux(303)+aux(303)+aux(301) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(303) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],41,[47,49],48,53]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(304) =< 1 aux(306) =< V1 aux(307) =< V1+V aux(308) =< V s(34) =< aux(304) it(35) =< aux(307) aux(6) =< aux(307) it(47) =< aux(307) aux(6) =< aux(304)+aux(307) it(47) =< aux(304)+aux(307) s(8) =< aux(6) aux(71) =< aux(307) it(34) =< aux(307) aux(65) =< aux(307) aux(62) =< aux(308) aux(72) =< aux(307)-1 aux(71) =< aux(308)+aux(308)+aux(306) it(34) =< aux(308)+aux(308)+aux(306) s(133) =< it(35)*aux(307) s(132) =< aux(308)+aux(308)+aux(306) s(155) =< aux(308)+aux(308)+aux(306) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(308) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],41,[47,49],48,51]: 18*it(34)+21*it(35)+5*it(47)+1*s(8)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+8 Such that:aux(309) =< 1 aux(311) =< V1 aux(312) =< V1+V aux(313) =< V s(34) =< aux(309) it(35) =< aux(312) aux(6) =< aux(312) it(47) =< aux(312) aux(6) =< aux(309)+aux(312) it(47) =< aux(309)+aux(312) s(8) =< aux(6) aux(71) =< aux(312) it(34) =< aux(312) aux(65) =< aux(312) aux(62) =< aux(313) aux(72) =< aux(312)-1 aux(71) =< aux(313)+aux(313)+aux(311) it(34) =< aux(313)+aux(313)+aux(311) s(133) =< it(35)*aux(312) s(132) =< aux(313)+aux(313)+aux(311) s(155) =< aux(313)+aux(313)+aux(311) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(313) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3,V+V1>=7] * Chain [[34,35,36,37,38,46],41,51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(178)+1*s(179)+4 Such that:s(179) =< 1 aux(314) =< V1 aux(315) =< V1+V aux(316) =< V s(178) =< aux(316) aux(71) =< aux(315) it(34) =< aux(315) it(35) =< aux(315) aux(65) =< aux(315) aux(62) =< aux(316) aux(72) =< aux(315)-1 aux(71) =< aux(316)+aux(316)+aux(314) it(34) =< aux(316)+aux(316)+aux(314) s(133) =< it(35)*aux(315) s(132) =< aux(316)+aux(316)+aux(314) s(155) =< aux(316)+aux(316)+aux(314) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(316) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],41,50,53]: 18*it(34)+24*it(35)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(317) =< 1 aux(319) =< V1 aux(320) =< V1+V aux(321) =< V s(10) =< aux(317) it(35) =< aux(320) aux(71) =< aux(320) it(34) =< aux(320) aux(65) =< aux(320) aux(62) =< aux(321) aux(72) =< aux(320)-1 aux(71) =< aux(321)+aux(321)+aux(319) it(34) =< aux(321)+aux(321)+aux(319) s(133) =< it(35)*aux(320) s(132) =< aux(321)+aux(321)+aux(319) s(155) =< aux(321)+aux(321)+aux(319) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(321) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],41,50,51]: 18*it(34)+24*it(35)+16*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+8 Such that:aux(322) =< 1 aux(324) =< V1 aux(325) =< V1+V aux(326) =< V s(10) =< aux(322) it(35) =< aux(325) aux(71) =< aux(325) it(34) =< aux(325) aux(65) =< aux(325) aux(62) =< aux(326) aux(72) =< aux(325)-1 aux(71) =< aux(326)+aux(326)+aux(324) it(34) =< aux(326)+aux(326)+aux(324) s(133) =< it(35)*aux(325) s(132) =< aux(326)+aux(326)+aux(324) s(155) =< aux(326)+aux(326)+aux(324) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(326) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],41,48,53]: 18*it(34)+14*it(35)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(178)+9 Such that:aux(327) =< 1 aux(328) =< V1 aux(329) =< V1+V aux(330) =< V s(178) =< aux(330) s(34) =< aux(327) aux(71) =< aux(329) it(34) =< aux(329) it(35) =< aux(329) aux(65) =< aux(329) aux(62) =< aux(330) aux(72) =< aux(329)-1 aux(71) =< aux(330)+aux(330)+aux(328) it(34) =< aux(330)+aux(330)+aux(328) s(133) =< it(35)*aux(329) s(132) =< aux(330)+aux(330)+aux(328) s(155) =< aux(330)+aux(330)+aux(328) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(330) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],41,48,51]: 18*it(34)+14*it(35)+2*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+1*s(178)+8 Such that:aux(331) =< 1 aux(332) =< V1 aux(333) =< V1+V aux(334) =< V s(178) =< aux(334) s(34) =< aux(331) aux(71) =< aux(333) it(34) =< aux(333) it(35) =< aux(333) aux(65) =< aux(333) aux(62) =< aux(334) aux(72) =< aux(333)-1 aux(71) =< aux(334)+aux(334)+aux(332) it(34) =< aux(334)+aux(334)+aux(332) s(133) =< it(35)*aux(333) s(132) =< aux(334)+aux(334)+aux(332) s(155) =< aux(334)+aux(334)+aux(332) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(334) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],40,[47,49],53]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+6 Such that:aux(15) =< 1 aux(98) =< V aux(99) =< V+1 aux(337) =< V1 aux(338) =< V1+V aux(339) =< V1+V+1 it(49) =< aux(339) aux(6) =< aux(339) it(47) =< aux(339) aux(6) =< aux(15)+aux(338) it(47) =< aux(15)+aux(338) s(8) =< aux(6) aux(71) =< aux(338) aux(74) =< aux(338) it(34) =< aux(338) it(35) =< aux(338) aux(71) =< aux(339) aux(74) =< aux(339) it(34) =< aux(339) it(35) =< aux(339) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(338) aux(62) =< aux(98) aux(72) =< aux(338)-1 aux(71) =< aux(49)+aux(49)+aux(337) it(34) =< aux(49)+aux(49)+aux(337) s(134) =< aux(74) s(133) =< it(35)*aux(338) s(132) =< aux(49)+aux(49)+aux(337) s(155) =< aux(49)+aux(49)+aux(337) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],40,[47,49],51]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+5 Such that:aux(18) =< 1 aux(98) =< V aux(99) =< V+1 aux(341) =< V1 aux(342) =< V1+V aux(343) =< V1+V+1 it(49) =< aux(343) aux(6) =< aux(343) it(47) =< aux(343) aux(6) =< aux(18)+aux(342) it(47) =< aux(18)+aux(342) s(8) =< aux(6) aux(71) =< aux(342) aux(74) =< aux(342) it(34) =< aux(342) it(35) =< aux(342) aux(71) =< aux(343) aux(74) =< aux(343) it(34) =< aux(343) it(35) =< aux(343) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(342) aux(62) =< aux(98) aux(72) =< aux(342)-1 aux(71) =< aux(49)+aux(49)+aux(341) it(34) =< aux(49)+aux(49)+aux(341) s(134) =< aux(74) s(133) =< it(35)*aux(342) s(132) =< aux(49)+aux(49)+aux(341) s(155) =< aux(49)+aux(49)+aux(341) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],40,[47,49],50,53]: 18*it(34)+10*it(35)+5*it(47)+19*it(49)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(344) =< 1 aux(98) =< V aux(99) =< V+1 aux(346) =< V1 aux(347) =< V1+V aux(348) =< V1+V+1 it(49) =< aux(348) s(10) =< aux(344) aux(6) =< aux(348) it(47) =< aux(348) aux(6) =< aux(344)+aux(347) it(47) =< aux(344)+aux(347) s(8) =< aux(6) aux(71) =< aux(347) aux(74) =< aux(347) it(34) =< aux(347) it(35) =< aux(347) aux(71) =< aux(348) aux(74) =< aux(348) it(34) =< aux(348) it(35) =< aux(348) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(347) aux(62) =< aux(98) aux(72) =< aux(347)-1 aux(71) =< aux(49)+aux(49)+aux(346) it(34) =< aux(49)+aux(49)+aux(346) s(134) =< aux(74) s(133) =< it(35)*aux(347) s(132) =< aux(49)+aux(49)+aux(346) s(155) =< aux(49)+aux(49)+aux(346) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=4,V>=4] * Chain [[34,35,36,37,38,46],40,[47,49],50,51]: 18*it(34)+10*it(35)+5*it(47)+19*it(49)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(349) =< 1 aux(98) =< V aux(99) =< V+1 aux(351) =< V1 aux(352) =< V1+V aux(353) =< V1+V+1 it(49) =< aux(353) s(10) =< aux(349) aux(6) =< aux(353) it(47) =< aux(353) aux(6) =< aux(349)+aux(352) it(47) =< aux(349)+aux(352) s(8) =< aux(6) aux(71) =< aux(352) aux(74) =< aux(352) it(34) =< aux(352) it(35) =< aux(352) aux(71) =< aux(353) aux(74) =< aux(353) it(34) =< aux(353) it(35) =< aux(353) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(352) aux(62) =< aux(98) aux(72) =< aux(352)-1 aux(71) =< aux(49)+aux(49)+aux(351) it(34) =< aux(49)+aux(49)+aux(351) s(134) =< aux(74) s(133) =< it(35)*aux(352) s(132) =< aux(49)+aux(49)+aux(351) s(155) =< aux(49)+aux(49)+aux(351) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=4,V>=4] * Chain [[34,35,36,37,38,46],40,[47,49],48,53]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(354) =< 1 aux(98) =< V aux(99) =< V+1 aux(356) =< V1 aux(357) =< V1+V aux(358) =< V1+V+1 it(49) =< aux(358) s(34) =< aux(354) aux(6) =< aux(358) it(47) =< aux(358) aux(6) =< aux(354)+aux(357) it(47) =< aux(354)+aux(357) s(8) =< aux(6) aux(71) =< aux(357) aux(74) =< aux(357) it(34) =< aux(357) it(35) =< aux(357) aux(71) =< aux(358) aux(74) =< aux(358) it(34) =< aux(358) it(35) =< aux(358) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(357) aux(62) =< aux(98) aux(72) =< aux(357)-1 aux(71) =< aux(49)+aux(49)+aux(356) it(34) =< aux(49)+aux(49)+aux(356) s(134) =< aux(74) s(133) =< it(35)*aux(357) s(132) =< aux(49)+aux(49)+aux(356) s(155) =< aux(49)+aux(49)+aux(356) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=4,V>=4] * Chain [[34,35,36,37,38,46],40,[47,49],48,51]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(359) =< 1 aux(98) =< V aux(99) =< V+1 aux(361) =< V1 aux(362) =< V1+V aux(363) =< V1+V+1 it(49) =< aux(363) s(34) =< aux(359) aux(6) =< aux(363) it(47) =< aux(363) aux(6) =< aux(359)+aux(362) it(47) =< aux(359)+aux(362) s(8) =< aux(6) aux(71) =< aux(362) aux(74) =< aux(362) it(34) =< aux(362) it(35) =< aux(362) aux(71) =< aux(363) aux(74) =< aux(363) it(34) =< aux(363) it(35) =< aux(363) aux(49) =< aux(98) aux(49) =< aux(99) aux(65) =< aux(362) aux(62) =< aux(98) aux(72) =< aux(362)-1 aux(71) =< aux(49)+aux(49)+aux(361) it(34) =< aux(49)+aux(49)+aux(361) s(134) =< aux(74) s(133) =< it(35)*aux(362) s(132) =< aux(49)+aux(49)+aux(361) s(155) =< aux(49)+aux(49)+aux(361) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(98) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=4,V>=4] * Chain [[34,35,36,37,38,46],40,53]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(180)+6 Such that:aux(365) =< V1 aux(366) =< V1+V aux(367) =< V s(180) =< aux(367) aux(71) =< aux(366) it(34) =< aux(366) it(35) =< aux(366) aux(65) =< aux(366) aux(62) =< aux(367) aux(72) =< aux(366)-1 aux(71) =< aux(367)+aux(367)+aux(365) it(34) =< aux(367)+aux(367)+aux(365) s(133) =< it(35)*aux(366) s(132) =< aux(367)+aux(367)+aux(365) s(155) =< aux(367)+aux(367)+aux(365) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(367) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],40,51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(180)+5 Such that:aux(369) =< V1 aux(370) =< V1+V aux(371) =< V s(180) =< aux(369) aux(71) =< aux(370) it(34) =< aux(370) it(35) =< aux(370) aux(65) =< aux(370) aux(62) =< aux(371) aux(72) =< aux(370)-1 aux(71) =< aux(371)+aux(371)+aux(369) it(34) =< aux(371)+aux(371)+aux(369) s(133) =< it(35)*aux(370) s(132) =< aux(371)+aux(371)+aux(369) s(155) =< aux(371)+aux(371)+aux(369) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(371) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],40,50,53]: 18*it(34)+27*it(35)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(372) =< 1 aux(374) =< V1 aux(375) =< V1+V aux(376) =< V it(35) =< aux(375) s(10) =< aux(372) aux(71) =< aux(375) it(34) =< aux(375) aux(65) =< aux(375) aux(62) =< aux(376) aux(72) =< aux(375)-1 aux(71) =< aux(376)+aux(376)+aux(374) it(34) =< aux(376)+aux(376)+aux(374) s(133) =< it(35)*aux(375) s(132) =< aux(376)+aux(376)+aux(374) s(155) =< aux(376)+aux(376)+aux(374) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(376) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],40,50,51]: 18*it(34)+27*it(35)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(377) =< 1 aux(379) =< V1 aux(380) =< V1+V aux(381) =< V it(35) =< aux(380) s(10) =< aux(377) aux(71) =< aux(380) it(34) =< aux(380) aux(65) =< aux(380) aux(62) =< aux(381) aux(72) =< aux(380)-1 aux(71) =< aux(381)+aux(381)+aux(379) it(34) =< aux(381)+aux(381)+aux(379) s(133) =< it(35)*aux(380) s(132) =< aux(381)+aux(381)+aux(379) s(155) =< aux(381)+aux(381)+aux(379) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(381) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],40,48,53]: 18*it(34)+14*it(35)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(180)+10 Such that:s(34) =< 1 aux(383) =< V1 aux(384) =< V1+V aux(385) =< V s(180) =< aux(383) aux(71) =< aux(384) it(34) =< aux(384) it(35) =< aux(384) aux(65) =< aux(384) aux(62) =< aux(385) aux(72) =< aux(384)-1 aux(71) =< aux(385)+aux(385)+aux(383) it(34) =< aux(385)+aux(385)+aux(383) s(133) =< it(35)*aux(384) s(132) =< aux(385)+aux(385)+aux(383) s(155) =< aux(385)+aux(385)+aux(383) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(385) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],40,48,51]: 18*it(34)+14*it(35)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(180)+9 Such that:s(34) =< 1 aux(387) =< V1 aux(388) =< V1+V aux(389) =< V s(180) =< aux(387) aux(71) =< aux(388) it(34) =< aux(388) it(35) =< aux(388) aux(65) =< aux(388) aux(62) =< aux(389) aux(72) =< aux(388)-1 aux(71) =< aux(389)+aux(389)+aux(387) it(34) =< aux(389)+aux(389)+aux(387) s(133) =< it(35)*aux(388) s(132) =< aux(389)+aux(389)+aux(387) s(155) =< aux(389)+aux(389)+aux(387) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(389) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=3,V>=3] * Chain [[34,35,36,37,38,46],39,[47,49],53]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+6 Such that:aux(15) =< 1 aux(392) =< V1 aux(393) =< V1+V aux(394) =< V1+V+1 aux(395) =< V it(49) =< aux(394) aux(6) =< aux(394) it(47) =< aux(394) aux(6) =< aux(15)+aux(393) it(47) =< aux(15)+aux(393) s(8) =< aux(6) aux(71) =< aux(393) aux(74) =< aux(393) it(34) =< aux(393) it(35) =< aux(393) aux(71) =< aux(394) aux(74) =< aux(394) it(34) =< aux(394) it(35) =< aux(394) aux(65) =< aux(393) aux(62) =< aux(395) aux(72) =< aux(393)-1 aux(71) =< aux(395)+aux(395)+aux(392) it(34) =< aux(395)+aux(395)+aux(392) s(134) =< aux(74) s(133) =< it(35)*aux(393) s(132) =< aux(395)+aux(395)+aux(392) s(155) =< aux(395)+aux(395)+aux(392) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(395) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],39,[47,49],51]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+5 Such that:aux(18) =< 1 aux(397) =< V1 aux(398) =< V1+V aux(399) =< V1+V+1 aux(400) =< V it(49) =< aux(399) aux(6) =< aux(399) it(47) =< aux(399) aux(6) =< aux(18)+aux(398) it(47) =< aux(18)+aux(398) s(8) =< aux(6) aux(71) =< aux(398) aux(74) =< aux(398) it(34) =< aux(398) it(35) =< aux(398) aux(71) =< aux(399) aux(74) =< aux(399) it(34) =< aux(399) it(35) =< aux(399) aux(65) =< aux(398) aux(62) =< aux(400) aux(72) =< aux(398)-1 aux(71) =< aux(400)+aux(400)+aux(397) it(34) =< aux(400)+aux(400)+aux(397) s(134) =< aux(74) s(133) =< it(35)*aux(398) s(132) =< aux(400)+aux(400)+aux(397) s(155) =< aux(400)+aux(400)+aux(397) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(400) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],39,[47,49],50,53]: 18*it(34)+10*it(35)+5*it(47)+19*it(49)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(401) =< 1 aux(403) =< V1 aux(404) =< V1+V aux(405) =< V1+V+1 aux(406) =< V it(49) =< aux(405) s(10) =< aux(401) aux(6) =< aux(405) it(47) =< aux(405) aux(6) =< aux(401)+aux(404) it(47) =< aux(401)+aux(404) s(8) =< aux(6) aux(71) =< aux(404) aux(74) =< aux(404) it(34) =< aux(404) it(35) =< aux(404) aux(71) =< aux(405) aux(74) =< aux(405) it(34) =< aux(405) it(35) =< aux(405) aux(65) =< aux(404) aux(62) =< aux(406) aux(72) =< aux(404)-1 aux(71) =< aux(406)+aux(406)+aux(403) it(34) =< aux(406)+aux(406)+aux(403) s(134) =< aux(74) s(133) =< it(35)*aux(404) s(132) =< aux(406)+aux(406)+aux(403) s(155) =< aux(406)+aux(406)+aux(403) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(406) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=7] * Chain [[34,35,36,37,38,46],39,[47,49],50,51]: 18*it(34)+10*it(35)+5*it(47)+19*it(49)+1*s(8)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(407) =< 1 aux(409) =< V1 aux(410) =< V1+V aux(411) =< V1+V+1 aux(412) =< V it(49) =< aux(411) s(10) =< aux(407) aux(6) =< aux(411) it(47) =< aux(411) aux(6) =< aux(407)+aux(410) it(47) =< aux(407)+aux(410) s(8) =< aux(6) aux(71) =< aux(410) aux(74) =< aux(410) it(34) =< aux(410) it(35) =< aux(410) aux(71) =< aux(411) aux(74) =< aux(411) it(34) =< aux(411) it(35) =< aux(411) aux(65) =< aux(410) aux(62) =< aux(412) aux(72) =< aux(410)-1 aux(71) =< aux(412)+aux(412)+aux(409) it(34) =< aux(412)+aux(412)+aux(409) s(134) =< aux(74) s(133) =< it(35)*aux(410) s(132) =< aux(412)+aux(412)+aux(409) s(155) =< aux(412)+aux(412)+aux(409) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(412) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=7] * Chain [[34,35,36,37,38,46],39,[47,49],48,53]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(413) =< 1 aux(415) =< V1 aux(416) =< V1+V aux(417) =< V1+V+1 aux(418) =< V it(49) =< aux(417) s(34) =< aux(413) aux(6) =< aux(417) it(47) =< aux(417) aux(6) =< aux(413)+aux(416) it(47) =< aux(413)+aux(416) s(8) =< aux(6) aux(71) =< aux(416) aux(74) =< aux(416) it(34) =< aux(416) it(35) =< aux(416) aux(71) =< aux(417) aux(74) =< aux(417) it(34) =< aux(417) it(35) =< aux(417) aux(65) =< aux(416) aux(62) =< aux(418) aux(72) =< aux(416)-1 aux(71) =< aux(418)+aux(418)+aux(415) it(34) =< aux(418)+aux(418)+aux(415) s(134) =< aux(74) s(133) =< it(35)*aux(416) s(132) =< aux(418)+aux(418)+aux(415) s(155) =< aux(418)+aux(418)+aux(415) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(418) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=7] * Chain [[34,35,36,37,38,46],39,[47,49],48,51]: 18*it(34)+10*it(35)+5*it(47)+10*it(49)+1*s(8)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(134)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(419) =< 1 aux(421) =< V1 aux(422) =< V1+V aux(423) =< V1+V+1 aux(424) =< V it(49) =< aux(423) s(34) =< aux(419) aux(6) =< aux(423) it(47) =< aux(423) aux(6) =< aux(419)+aux(422) it(47) =< aux(419)+aux(422) s(8) =< aux(6) aux(71) =< aux(422) aux(74) =< aux(422) it(34) =< aux(422) it(35) =< aux(422) aux(71) =< aux(423) aux(74) =< aux(423) it(34) =< aux(423) it(35) =< aux(423) aux(65) =< aux(422) aux(62) =< aux(424) aux(72) =< aux(422)-1 aux(71) =< aux(424)+aux(424)+aux(421) it(34) =< aux(424)+aux(424)+aux(421) s(134) =< aux(74) s(133) =< it(35)*aux(422) s(132) =< aux(424)+aux(424)+aux(421) s(155) =< aux(424)+aux(424)+aux(421) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(424) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=7] * Chain [[34,35,36,37,38,46],39,53]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(184)+6 Such that:aux(426) =< V1 aux(427) =< V1+V aux(428) =< V s(184) =< aux(428) aux(71) =< aux(427) it(34) =< aux(427) it(35) =< aux(427) aux(65) =< aux(427) aux(62) =< aux(428) aux(72) =< aux(427)-1 aux(71) =< aux(428)+aux(428)+aux(426) it(34) =< aux(428)+aux(428)+aux(426) s(133) =< it(35)*aux(427) s(132) =< aux(428)+aux(428)+aux(426) s(155) =< aux(428)+aux(428)+aux(426) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(428) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],39,51]: 18*it(34)+14*it(35)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(184)+5 Such that:aux(430) =< V1 aux(431) =< V1+V aux(432) =< V s(184) =< aux(432) aux(71) =< aux(431) it(34) =< aux(431) it(35) =< aux(431) aux(65) =< aux(431) aux(62) =< aux(432) aux(72) =< aux(431)-1 aux(71) =< aux(432)+aux(432)+aux(430) it(34) =< aux(432)+aux(432)+aux(430) s(133) =< it(35)*aux(431) s(132) =< aux(432)+aux(432)+aux(430) s(155) =< aux(432)+aux(432)+aux(430) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(432) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=5] * Chain [[34,35,36,37,38,46],39,50,53]: 18*it(34)+27*it(35)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+10 Such that:aux(433) =< 1 aux(435) =< V1 aux(436) =< V1+V aux(437) =< V it(35) =< aux(436) s(10) =< aux(433) aux(71) =< aux(436) it(34) =< aux(436) aux(65) =< aux(436) aux(62) =< aux(437) aux(72) =< aux(436)-1 aux(71) =< aux(437)+aux(437)+aux(435) it(34) =< aux(437)+aux(437)+aux(435) s(133) =< it(35)*aux(436) s(132) =< aux(437)+aux(437)+aux(435) s(155) =< aux(437)+aux(437)+aux(435) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(437) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],39,50,51]: 18*it(34)+27*it(35)+15*s(10)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+9 Such that:aux(438) =< 1 aux(440) =< V1 aux(441) =< V1+V aux(442) =< V it(35) =< aux(441) s(10) =< aux(438) aux(71) =< aux(441) it(34) =< aux(441) aux(65) =< aux(441) aux(62) =< aux(442) aux(72) =< aux(441)-1 aux(71) =< aux(442)+aux(442)+aux(440) it(34) =< aux(442)+aux(442)+aux(440) s(133) =< it(35)*aux(441) s(132) =< aux(442)+aux(442)+aux(440) s(155) =< aux(442)+aux(442)+aux(440) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(442) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],39,48,53]: 18*it(34)+14*it(35)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(184)+10 Such that:s(34) =< 1 aux(444) =< V1 aux(445) =< V1+V aux(446) =< V s(184) =< aux(446) aux(71) =< aux(445) it(34) =< aux(445) it(35) =< aux(445) aux(65) =< aux(445) aux(62) =< aux(446) aux(72) =< aux(445)-1 aux(71) =< aux(446)+aux(446)+aux(444) it(34) =< aux(446)+aux(446)+aux(444) s(133) =< it(35)*aux(445) s(132) =< aux(446)+aux(446)+aux(444) s(155) =< aux(446)+aux(446)+aux(444) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(446) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=1,V1>=2,V>=2,V+V1>=6] * Chain [[34,35,36,37,38,46],39,48,51]: 18*it(34)+14*it(35)+1*s(34)+2*s(128)+3*s(129)+8*s(130)+1*s(133)+4*s(135)+1*s(138)+6*s(139)+28*s(140)+1*s(142)+3*s(154)+4*s(184)+9 Such that:s(34) =< 1 aux(448) =< V1 aux(449) =< V1+V aux(450) =< V s(184) =< aux(450) aux(71) =< aux(449) it(34) =< aux(449) it(35) =< aux(449) aux(65) =< aux(449) aux(62) =< aux(450) aux(72) =< aux(449)-1 aux(71) =< aux(450)+aux(450)+aux(448) it(34) =< aux(450)+aux(450)+aux(448) s(133) =< it(35)*aux(449) s(132) =< aux(450)+aux(450)+aux(448) s(155) =< aux(450)+aux(450)+aux(448) s(136) =< it(35)*aux(65) s(142) =< it(35)*aux(65) s(141) =< it(34)*aux(65) s(131) =< it(34)*aux(62) s(155) =< it(34)*aux(65) s(128) =< it(34)*aux(62) s(139) =< aux(71) s(138) =< it(34)*aux(72) s(132) =< it(34)*aux(450) s(140) =< s(141) s(130) =< s(131) s(154) =< s(155) s(135) =< s(136) s(129) =< s(132) with precondition: [Out=0,V1>=2,V>=2,V+V1>=6] * Chain [53]: 1 with precondition: [V1=0,V=Out,V>=1] * Chain [52]: 1 with precondition: [V=0,V1=Out,V1>=1] * Chain [51]: 0 with precondition: [Out=0,V1>=0,V>=0] * Chain [50,53]: 6*s(10)+9*s(14)+9*s(22)+5 Such that:aux(23) =< 1 aux(24) =< V1 aux(25) =< V s(10) =< aux(23) s(22) =< aux(24) s(14) =< aux(25) with precondition: [Out=1,V1>=1,V>=1] * Chain [50,51]: 6*s(10)+9*s(14)+9*s(22)+4 Such that:aux(23) =< 1 aux(24) =< V1 aux(25) =< V s(10) =< aux(23) s(22) =< aux(24) s(14) =< aux(25) with precondition: [Out=0,V1>=1,V>=1] * Chain [48,53]: 1*s(34)+5 Such that:s(34) =< 1 with precondition: [V=1,Out=1,V1>=1] * Chain [48,51]: 1*s(34)+4 Such that:s(34) =< 1 with precondition: [V=1,Out=0,V1>=1] * Chain [45,53]: 5*s(160)+1*s(161)+4*s(163)+5 Such that:s(161) =< 1 aux(129) =< V aux(130) =< Out s(160) =< aux(129) s(163) =< aux(130) with precondition: [Out>=2,V1>=V,V>=Out] * Chain [45,51]: 9*s(160)+1*s(161)+4 Such that:s(161) =< 1 aux(133) =< V s(160) =< aux(133) with precondition: [Out=0,V>=2,V1>=V] * Chain [44,[47,49],53]: 5*it(47)+6*it(49)+1*s(8)+1*s(170)+1*s(171)+6 Such that:s(170) =< V aux(137) =< 1 aux(138) =< V1 s(171) =< aux(137) aux(6) =< aux(138) it(47) =< aux(138) it(49) =< aux(138) aux(6) =< aux(137)+aux(138) it(47) =< aux(137)+aux(138) s(8) =< aux(6) with precondition: [Out=1,V>=2,V1>=V] * Chain [44,[47,49],51]: 5*it(47)+6*it(49)+1*s(8)+1*s(170)+1*s(171)+5 Such that:s(170) =< V aux(142) =< 1 aux(143) =< V1 s(171) =< aux(142) aux(6) =< aux(143) it(47) =< aux(143) it(49) =< aux(143) aux(6) =< aux(142)+aux(143) it(47) =< aux(142)+aux(143) s(8) =< aux(6) with precondition: [Out=0,V>=2,V1>=V] * Chain [44,[47,49],50,53]: 5*it(47)+15*it(49)+1*s(8)+16*s(10)+1*s(170)+10 Such that:s(170) =< V aux(147) =< 1 aux(148) =< V1 s(10) =< aux(147) it(49) =< aux(148) aux(6) =< aux(148) it(47) =< aux(148) aux(6) =< aux(147)+aux(148) it(47) =< aux(147)+aux(148) s(8) =< aux(6) with precondition: [Out=1,V1>=3,V>=2,V1>=V] * Chain [44,[47,49],50,51]: 5*it(47)+15*it(49)+1*s(8)+16*s(10)+1*s(170)+9 Such that:s(170) =< V aux(152) =< 1 aux(153) =< V1 s(10) =< aux(152) it(49) =< aux(153) aux(6) =< aux(153) it(47) =< aux(153) aux(6) =< aux(152)+aux(153) it(47) =< aux(152)+aux(153) s(8) =< aux(6) with precondition: [Out=0,V1>=3,V>=2,V1>=V] * Chain [44,[47,49],48,53]: 5*it(47)+6*it(49)+1*s(8)+2*s(34)+1*s(170)+10 Such that:s(170) =< V aux(157) =< 1 aux(158) =< V1 s(34) =< aux(157) aux(6) =< aux(158) it(47) =< aux(158) it(49) =< aux(158) aux(6) =< aux(157)+aux(158) it(47) =< aux(157)+aux(158) s(8) =< aux(6) with precondition: [Out=1,V1>=3,V>=2,V1>=V] * Chain [44,[47,49],48,51]: 5*it(47)+6*it(49)+1*s(8)+2*s(34)+1*s(170)+9 Such that:s(170) =< V aux(162) =< 1 aux(163) =< V1 s(34) =< aux(162) aux(6) =< aux(163) it(47) =< aux(163) it(49) =< aux(163) aux(6) =< aux(162)+aux(163) it(47) =< aux(162)+aux(163) s(8) =< aux(6) with precondition: [Out=0,V1>=3,V>=2,V1>=V] * Chain [44,51]: 1*s(170)+1*s(171)+5 Such that:s(171) =< 1 s(170) =< V with precondition: [Out=0,V>=2,V1>=V] * Chain [44,50,53]: 16*s(10)+9*s(22)+1*s(170)+10 Such that:aux(24) =< V1 s(170) =< V aux(170) =< 1 s(10) =< aux(170) s(22) =< aux(24) with precondition: [Out=1,V>=2,V1>=V] * Chain [44,50,51]: 16*s(10)+9*s(22)+1*s(170)+9 Such that:aux(24) =< V1 s(170) =< V aux(174) =< 1 s(10) =< aux(174) s(22) =< aux(24) with precondition: [Out=0,V>=2,V1>=V] * Chain [44,48,53]: 2*s(34)+1*s(170)+10 Such that:s(170) =< V aux(178) =< 1 s(34) =< aux(178) with precondition: [Out=1,V>=2,V1>=V] * Chain [44,48,51]: 2*s(34)+1*s(170)+9 Such that:s(170) =< V aux(182) =< 1 s(34) =< aux(182) with precondition: [Out=0,V>=2,V1>=V] * Chain [43,[47,49],53]: 5*it(47)+6*it(49)+1*s(8)+1*s(172)+1*s(173)+6 Such that:s(172) =< V1 aux(186) =< 1 aux(187) =< V s(173) =< aux(186) aux(6) =< aux(187) it(47) =< aux(187) it(49) =< aux(187) aux(6) =< aux(186)+aux(187) it(47) =< aux(186)+aux(187) s(8) =< aux(6) with precondition: [Out=1,V1>=2,V>=V1] * Chain [43,[47,49],51]: 5*it(47)+6*it(49)+1*s(8)+1*s(172)+1*s(173)+5 Such that:s(172) =< V1 aux(191) =< 1 aux(192) =< V s(173) =< aux(191) aux(6) =< aux(192) it(47) =< aux(192) it(49) =< aux(192) aux(6) =< aux(191)+aux(192) it(47) =< aux(191)+aux(192) s(8) =< aux(6) with precondition: [Out=0,V1>=2,V>=V1] * Chain [43,[47,49],50,53]: 5*it(47)+15*it(49)+1*s(8)+16*s(10)+1*s(172)+10 Such that:s(172) =< V1 aux(196) =< 1 aux(197) =< V s(10) =< aux(196) it(49) =< aux(197) aux(6) =< aux(197) it(47) =< aux(197) aux(6) =< aux(196)+aux(197) it(47) =< aux(196)+aux(197) s(8) =< aux(6) with precondition: [Out=1,V1>=2,V>=3,V>=V1] * Chain [43,[47,49],50,51]: 5*it(47)+15*it(49)+1*s(8)+16*s(10)+1*s(172)+9 Such that:s(172) =< V1 aux(201) =< 1 aux(202) =< V s(10) =< aux(201) it(49) =< aux(202) aux(6) =< aux(202) it(47) =< aux(202) aux(6) =< aux(201)+aux(202) it(47) =< aux(201)+aux(202) s(8) =< aux(6) with precondition: [Out=0,V1>=2,V>=3,V>=V1] * Chain [43,[47,49],48,53]: 5*it(47)+6*it(49)+1*s(8)+2*s(34)+1*s(172)+10 Such that:s(172) =< V1 aux(206) =< 1 aux(207) =< V s(34) =< aux(206) aux(6) =< aux(207) it(47) =< aux(207) it(49) =< aux(207) aux(6) =< aux(206)+aux(207) it(47) =< aux(206)+aux(207) s(8) =< aux(6) with precondition: [Out=1,V1>=2,V>=3,V>=V1] * Chain [43,[47,49],48,51]: 5*it(47)+6*it(49)+1*s(8)+2*s(34)+1*s(172)+9 Such that:s(172) =< V1 aux(211) =< 1 aux(212) =< V s(34) =< aux(211) aux(6) =< aux(212) it(47) =< aux(212) it(49) =< aux(212) aux(6) =< aux(211)+aux(212) it(47) =< aux(211)+aux(212) s(8) =< aux(6) with precondition: [Out=0,V1>=2,V>=3,V>=V1] * Chain [43,51]: 1*s(172)+1*s(173)+5 Such that:s(173) =< 1 s(172) =< V1 with precondition: [Out=0,V1>=2,V>=V1] * Chain [43,50,53]: 16*s(10)+9*s(22)+1*s(172)+10 Such that:s(172) =< V1 aux(24) =< V aux(219) =< 1 s(10) =< aux(219) s(22) =< aux(24) with precondition: [Out=1,V1>=2,V>=V1] * Chain [43,50,51]: 16*s(10)+9*s(22)+1*s(172)+9 Such that:s(172) =< V1 aux(24) =< V aux(223) =< 1 s(10) =< aux(223) s(22) =< aux(24) with precondition: [Out=0,V1>=2,V>=V1] * Chain [43,48,53]: 2*s(34)+1*s(172)+10 Such that:s(172) =< V1 aux(227) =< 1 s(34) =< aux(227) with precondition: [Out=1,V1>=2,V>=V1] * Chain [43,48,51]: 2*s(34)+1*s(172)+9 Such that:s(172) =< V1 aux(231) =< 1 s(34) =< aux(231) with precondition: [Out=0,V1>=2,V>=V1] * Chain [42,[47,49],53]: 5*it(47)+6*it(49)+1*s(8)+4*s(174)+5 Such that:aux(15) =< 1 aux(14) =< V+1 aux(236) =< V s(174) =< aux(236) aux(6) =< aux(14) it(47) =< aux(14) it(49) =< aux(14) aux(6) =< aux(15)+aux(236) it(47) =< aux(15)+aux(236) s(8) =< aux(6) with precondition: [Out=1,V1>=3,V>=3] * Chain [42,[47,49],51]: 5*it(47)+6*it(49)+1*s(8)+4*s(174)+4 Such that:aux(18) =< 1 aux(17) =< V+1 aux(239) =< V s(174) =< aux(239) aux(6) =< aux(17) it(47) =< aux(17) it(49) =< aux(17) aux(6) =< aux(18)+aux(239) it(47) =< aux(18)+aux(239) s(8) =< aux(6) with precondition: [Out=0,V1>=3,V>=3] * Chain [42,[47,49],50,53]: 5*it(47)+15*it(49)+1*s(8)+15*s(10)+4*s(174)+9 Such that:aux(28) =< V+1 aux(242) =< 1 aux(243) =< V s(174) =< aux(243) s(10) =< aux(242) it(49) =< aux(28) aux(6) =< aux(28) it(47) =< aux(28) aux(6) =< aux(242)+aux(243) it(47) =< aux(242)+aux(243) s(8) =< aux(6) with precondition: [Out=1,V1>=4,V>=4] * Chain [42,[47,49],50,51]: 5*it(47)+15*it(49)+1*s(8)+15*s(10)+4*s(174)+8 Such that:aux(32) =< V+1 aux(246) =< 1 aux(247) =< V s(174) =< aux(247) s(10) =< aux(246) it(49) =< aux(32) aux(6) =< aux(32) it(47) =< aux(32) aux(6) =< aux(246)+aux(247) it(47) =< aux(246)+aux(247) s(8) =< aux(6) with precondition: [Out=0,V1>=4,V>=4] * Chain [42,[47,49],48,53]: 5*it(47)+6*it(49)+1*s(8)+1*s(34)+4*s(174)+9 Such that:aux(35) =< V+1 aux(250) =< 1 aux(251) =< V s(34) =< aux(250) s(174) =< aux(251) aux(6) =< aux(35) it(47) =< aux(35) it(49) =< aux(35) aux(6) =< aux(250)+aux(251) it(47) =< aux(250)+aux(251) s(8) =< aux(6) with precondition: [Out=1,V1>=4,V>=4] * Chain [42,[47,49],48,51]: 5*it(47)+6*it(49)+1*s(8)+1*s(34)+4*s(174)+8 Such that:aux(38) =< V+1 aux(254) =< 1 aux(255) =< V s(34) =< aux(254) s(174) =< aux(255) aux(6) =< aux(38) it(47) =< aux(38) it(49) =< aux(38) aux(6) =< aux(254)+aux(255) it(47) =< aux(254)+aux(255) s(8) =< aux(6) with precondition: [Out=0,V1>=4,V>=4] * Chain [42,53]: 4*s(174)+5 Such that:aux(258) =< V s(174) =< aux(258) with precondition: [Out=1,V1>=2,V>=2] * Chain [42,51]: 4*s(174)+4 Such that:aux(262) =< V s(174) =< aux(262) with precondition: [Out=0,V1>=2,V>=2] * Chain [42,50,53]: 15*s(10)+13*s(22)+9 Such that:aux(266) =< 1 aux(267) =< V s(22) =< aux(267) s(10) =< aux(266) with precondition: [Out=1,V1>=3,V>=3] * Chain [42,50,51]: 15*s(10)+13*s(22)+8 Such that:aux(271) =< 1 aux(272) =< V s(22) =< aux(272) s(10) =< aux(271) with precondition: [Out=0,V1>=3,V>=3] * Chain [42,48,53]: 1*s(34)+4*s(174)+9 Such that:s(34) =< 1 aux(276) =< V s(174) =< aux(276) with precondition: [Out=1,V1>=3,V>=3] * Chain [42,48,51]: 1*s(34)+4*s(174)+8 Such that:s(34) =< 1 aux(280) =< V s(174) =< aux(280) with precondition: [Out=0,V1>=3,V>=3] * Chain [41,[47,49],53]: 5*it(47)+7*it(49)+1*s(8)+1*s(179)+5 Such that:aux(284) =< 1 aux(285) =< V1 s(179) =< aux(284) it(49) =< aux(285) aux(6) =< aux(285) it(47) =< aux(285) aux(6) =< aux(284)+aux(285) it(47) =< aux(284)+aux(285) s(8) =< aux(6) with precondition: [Out=1,V1>=2,V>=2] * Chain [41,[47,49],51]: 5*it(47)+7*it(49)+1*s(8)+1*s(179)+4 Such that:aux(289) =< 1 aux(290) =< V1 s(179) =< aux(289) it(49) =< aux(290) aux(6) =< aux(290) it(47) =< aux(290) aux(6) =< aux(289)+aux(290) it(47) =< aux(289)+aux(290) s(8) =< aux(6) with precondition: [Out=0,V1>=2,V>=2] * Chain [41,[47,49],50,53]: 5*it(47)+16*it(49)+1*s(8)+16*s(10)+9 Such that:aux(294) =< 1 aux(295) =< V1 s(10) =< aux(294) it(49) =< aux(295) aux(6) =< aux(295) it(47) =< aux(295) aux(6) =< aux(294)+aux(295) it(47) =< aux(294)+aux(295) s(8) =< aux(6) with precondition: [Out=1,V1>=3,V>=3] * Chain [41,[47,49],50,51]: 5*it(47)+16*it(49)+1*s(8)+16*s(10)+8 Such that:aux(299) =< 1 aux(300) =< V1 s(10) =< aux(299) it(49) =< aux(300) aux(6) =< aux(300) it(47) =< aux(300) aux(6) =< aux(299)+aux(300) it(47) =< aux(299)+aux(300) s(8) =< aux(6) with precondition: [Out=0,V1>=3,V>=3] * Chain [41,[47,49],48,53]: 5*it(47)+7*it(49)+1*s(8)+2*s(34)+9 Such that:aux(304) =< 1 aux(305) =< V1 s(34) =< aux(304) it(49) =< aux(305) aux(6) =< aux(305) it(47) =< aux(305) aux(6) =< aux(304)+aux(305) it(47) =< aux(304)+aux(305) s(8) =< aux(6) with precondition: [Out=1,V1>=3,V>=3] * Chain [41,[47,49],48,51]: 5*it(47)+7*it(49)+1*s(8)+2*s(34)+8 Such that:aux(309) =< 1 aux(310) =< V1 s(34) =< aux(309) it(49) =< aux(310) aux(6) =< aux(310) it(47) =< aux(310) aux(6) =< aux(309)+aux(310) it(47) =< aux(309)+aux(310) s(8) =< aux(6) with precondition: [Out=0,V1>=3,V>=3] * Chain [41,51]: 1*s(178)+1*s(179)+4 Such that:s(179) =< 1 s(178) =< V with precondition: [Out=0,V1>=2,V>=2] * Chain [41,50,53]: 16*s(10)+10*s(22)+9 Such that:aux(317) =< 1 aux(318) =< V1 s(10) =< aux(317) s(22) =< aux(318) with precondition: [Out=1,V1>=2,V>=2] * Chain [41,50,51]: 16*s(10)+10*s(22)+8 Such that:aux(322) =< 1 aux(323) =< V1 s(10) =< aux(322) s(22) =< aux(323) with precondition: [Out=0,V1>=2,V>=2] * Chain [41,48,53]: 2*s(34)+1*s(178)+9 Such that:s(178) =< V aux(327) =< 1 s(34) =< aux(327) with precondition: [Out=1,V1>=2,V>=2] * Chain [41,48,51]: 2*s(34)+1*s(178)+8 Such that:s(178) =< V aux(331) =< 1 s(34) =< aux(331) with precondition: [Out=0,V1>=2,V>=2] * Chain [40,[47,49],53]: 5*it(47)+9*it(49)+1*s(8)+1*s(180)+6 Such that:aux(15) =< 1 s(180) =< V1 aux(13) =< V aux(336) =< V+1 aux(6) =< aux(336) it(47) =< aux(336) it(49) =< aux(336) aux(6) =< aux(15)+aux(13) it(47) =< aux(15)+aux(13) s(8) =< aux(6) with precondition: [Out=1,V1>=2,V>=3,V>=V1] * Chain [40,[47,49],51]: 5*it(47)+9*it(49)+1*s(8)+1*s(180)+5 Such that:aux(18) =< 1 s(180) =< V1 aux(16) =< V aux(340) =< V+1 aux(6) =< aux(340) it(47) =< aux(340) it(49) =< aux(340) aux(6) =< aux(18)+aux(16) it(47) =< aux(18)+aux(16) s(8) =< aux(6) with precondition: [Out=0,V1>=2,V>=3,V>=V1] * Chain [40,[47,49],50,53]: 5*it(47)+18*it(49)+1*s(8)+15*s(10)+1*s(180)+10 Such that:s(180) =< V1 aux(27) =< V aux(344) =< 1 aux(345) =< V+1 s(10) =< aux(344) it(49) =< aux(345) aux(6) =< aux(345) it(47) =< aux(345) aux(6) =< aux(344)+aux(27) it(47) =< aux(344)+aux(27) s(8) =< aux(6) with precondition: [Out=1,V1>=2,V>=4,V>=V1] * Chain [40,[47,49],50,51]: 5*it(47)+18*it(49)+1*s(8)+15*s(10)+1*s(180)+9 Such that:s(180) =< V1 aux(31) =< V aux(349) =< 1 aux(350) =< V+1 s(10) =< aux(349) it(49) =< aux(350) aux(6) =< aux(350) it(47) =< aux(350) aux(6) =< aux(349)+aux(31) it(47) =< aux(349)+aux(31) s(8) =< aux(6) with precondition: [Out=0,V1>=2,V>=4,V>=V1] * Chain [40,[47,49],48,53]: 5*it(47)+9*it(49)+1*s(8)+1*s(34)+1*s(180)+10 Such that:s(180) =< V1 aux(34) =< V aux(354) =< 1 aux(355) =< V+1 s(34) =< aux(354) aux(6) =< aux(355) it(47) =< aux(355) it(49) =< aux(355) aux(6) =< aux(354)+aux(34) it(47) =< aux(354)+aux(34) s(8) =< aux(6) with precondition: [Out=1,V1>=2,V>=4,V>=V1] * Chain [40,[47,49],48,51]: 5*it(47)+9*it(49)+1*s(8)+1*s(34)+1*s(180)+9 Such that:s(180) =< V1 aux(37) =< V aux(359) =< 1 aux(360) =< V+1 s(34) =< aux(359) aux(6) =< aux(360) it(47) =< aux(360) it(49) =< aux(360) aux(6) =< aux(359)+aux(37) it(47) =< aux(359)+aux(37) s(8) =< aux(6) with precondition: [Out=0,V1>=2,V>=4,V>=V1] * Chain [40,53]: 4*s(180)+6 Such that:aux(364) =< V s(180) =< aux(364) with precondition: [Out=1,V1=V,V1>=2] * Chain [40,51]: 4*s(180)+5 Such that:aux(368) =< V1 s(180) =< aux(368) with precondition: [Out=0,V1>=2,V>=V1] * Chain [40,50,53]: 15*s(10)+12*s(22)+1*s(180)+10 Such that:s(180) =< V1 aux(372) =< 1 aux(373) =< V s(10) =< aux(372) s(22) =< aux(373) with precondition: [Out=1,V1>=2,V>=3,V>=V1] * Chain [40,50,51]: 15*s(10)+12*s(22)+1*s(180)+9 Such that:s(180) =< V1 aux(377) =< 1 aux(378) =< V s(10) =< aux(377) s(22) =< aux(378) with precondition: [Out=0,V1>=2,V>=3,V>=V1] * Chain [40,48,53]: 1*s(34)+4*s(180)+10 Such that:s(34) =< 1 aux(382) =< V1 s(180) =< aux(382) with precondition: [Out=1,V1>=2,V>=3,V>=V1] * Chain [40,48,51]: 1*s(34)+4*s(180)+9 Such that:s(34) =< 1 aux(386) =< V1 s(180) =< aux(386) with precondition: [Out=0,V1>=2,V>=3,V>=V1] * Chain [39,[47,49],53]: 5*it(47)+9*it(49)+1*s(8)+1*s(184)+6 Such that:aux(15) =< 1 aux(13) =< V1 s(184) =< V aux(391) =< V1+1 aux(6) =< aux(391) it(47) =< aux(391) it(49) =< aux(391) aux(6) =< aux(15)+aux(13) it(47) =< aux(15)+aux(13) s(8) =< aux(6) with precondition: [Out=1,V1>=3,V>=2,V1>=V] * Chain [39,[47,49],51]: 5*it(47)+9*it(49)+1*s(8)+1*s(184)+5 Such that:aux(18) =< 1 aux(16) =< V1 s(184) =< V aux(396) =< V1+1 aux(6) =< aux(396) it(47) =< aux(396) it(49) =< aux(396) aux(6) =< aux(18)+aux(16) it(47) =< aux(18)+aux(16) s(8) =< aux(6) with precondition: [Out=0,V1>=3,V>=2,V1>=V] * Chain [39,[47,49],50,53]: 5*it(47)+18*it(49)+1*s(8)+15*s(10)+1*s(184)+10 Such that:aux(27) =< V1 s(184) =< V aux(401) =< 1 aux(402) =< V1+1 s(10) =< aux(401) it(49) =< aux(402) aux(6) =< aux(402) it(47) =< aux(402) aux(6) =< aux(401)+aux(27) it(47) =< aux(401)+aux(27) s(8) =< aux(6) with precondition: [Out=1,V1>=4,V>=2,V1>=V] * Chain [39,[47,49],50,51]: 5*it(47)+18*it(49)+1*s(8)+15*s(10)+1*s(184)+9 Such that:aux(31) =< V1 s(184) =< V aux(407) =< 1 aux(408) =< V1+1 s(10) =< aux(407) it(49) =< aux(408) aux(6) =< aux(408) it(47) =< aux(408) aux(6) =< aux(407)+aux(31) it(47) =< aux(407)+aux(31) s(8) =< aux(6) with precondition: [Out=0,V1>=4,V>=2,V1>=V] * Chain [39,[47,49],48,53]: 5*it(47)+9*it(49)+1*s(8)+1*s(34)+1*s(184)+10 Such that:aux(34) =< V1 s(184) =< V aux(413) =< 1 aux(414) =< V1+1 s(34) =< aux(413) aux(6) =< aux(414) it(47) =< aux(414) it(49) =< aux(414) aux(6) =< aux(413)+aux(34) it(47) =< aux(413)+aux(34) s(8) =< aux(6) with precondition: [Out=1,V1>=4,V>=2,V1>=V] * Chain [39,[47,49],48,51]: 5*it(47)+9*it(49)+1*s(8)+1*s(34)+1*s(184)+9 Such that:aux(37) =< V1 s(184) =< V aux(419) =< 1 aux(420) =< V1+1 s(34) =< aux(419) aux(6) =< aux(420) it(47) =< aux(420) it(49) =< aux(420) aux(6) =< aux(419)+aux(37) it(47) =< aux(419)+aux(37) s(8) =< aux(6) with precondition: [Out=0,V1>=4,V>=2,V1>=V] * Chain [39,53]: 4*s(184)+6 Such that:aux(425) =< V s(184) =< aux(425) with precondition: [Out=1,V1=V,V1>=2] * Chain [39,51]: 4*s(184)+5 Such that:aux(429) =< V s(184) =< aux(429) with precondition: [Out=0,V>=2,V1>=V] * Chain [39,50,53]: 15*s(10)+12*s(22)+1*s(184)+10 Such that:s(184) =< V aux(433) =< 1 aux(434) =< V1 s(10) =< aux(433) s(22) =< aux(434) with precondition: [Out=1,V1>=3,V>=2,V1>=V] * Chain [39,50,51]: 15*s(10)+12*s(22)+1*s(184)+9 Such that:s(184) =< V aux(438) =< 1 aux(439) =< V1 s(10) =< aux(438) s(22) =< aux(439) with precondition: [Out=0,V1>=3,V>=2,V1>=V] * Chain [39,48,53]: 1*s(34)+4*s(184)+10 Such that:s(34) =< 1 aux(443) =< V s(184) =< aux(443) with precondition: [Out=1,V1>=3,V>=2,V1>=V] * Chain [39,48,51]: 1*s(34)+4*s(184)+9 Such that:s(34) =< 1 aux(447) =< V s(184) =< aux(447) with precondition: [Out=0,V1>=3,V>=2,V1>=V] #### Cost of chains of encArg(V1,Out): * Chain [62]: 0 with precondition: [Out=0,V1>=0] * Chain [multiple([54,55,56,57,58,59,60,61],[[62]])]: 13*it(55)+478*it(58)+3*s(3376)+150*s(3379)+461*s(3380)+232*s(3381)+45*s(3382)+9*s(3383)+30*s(3384)+6*s(3386)+558*s(3387)+881*s(3388)+39*s(3389)+39*s(3390)+62*s(3391)+186*s(3392)+31*s(3393)+868*s(3394)+248*s(3395)+93*s(3396)+156*s(3397)+93*s(3398)+90*s(3399)+18*s(3400)+108*s(3401)+12*s(3402)+36*s(3403)+6*s(3404)+168*s(3405)+48*s(3406)+18*s(3407)+18*s(3408)+15*s(3409)+3*s(3410)+15*s(3411)+3*s(3412)+15*s(3413)+3*s(3414)+36*s(3416)+4*s(3417)+12*s(3418)+2*s(3419)+56*s(3420)+16*s(3421)+6*s(3422)+6*s(3423)+162*s(3454)+1147*s(3456)+135*s(3457)+27*s(3458)+30*s(3459)+6*s(3461)+648*s(3462)+42*s(3464)+42*s(3465)+72*s(3466)+216*s(3467)+36*s(3468)+1008*s(3469)+288*s(3470)+108*s(3471)+168*s(3472)+108*s(3473)+108*s(3476)+12*s(3477)+36*s(3478)+6*s(3479)+168*s(3480)+48*s(3481)+18*s(3482)+18*s(3483)+15*s(3484)+3*s(3485)+15*s(3486)+3*s(3487)+15*s(3488)+3*s(3489)+0 Such that:aux(504) =< V1 aux(505) =< V1/2 it(55) =< aux(504) it(58) =< aux(504) it(55) =< aux(505) aux(490) =< aux(504)+2 aux(491) =< aux(504)+1 aux(483) =< aux(504) s(3494) =< it(58)*aux(490) s(3491) =< it(58)*aux(491) s(3430) =< it(55)*aux(491) s(3429) =< it(55)*aux(483) s(3431) =< it(55)*aux(490) s(3376) =< it(55)*aux(483) s(3454) =< s(3491) s(3456) =< s(3494) s(3504) =< s(3494) s(3457) =< s(3494) s(3504) =< aux(504)+s(3494) s(3457) =< aux(504)+s(3494) s(3458) =< s(3504) s(3511) =< s(3494) s(3459) =< s(3494) s(3511) =< aux(504)+s(3491) s(3459) =< aux(504)+s(3491) s(3461) =< s(3511) s(3510) =< s(3494) s(3462) =< s(3494) s(3149) =< aux(490) s(3196) =< aux(491) s(3151) =< aux(490)-1 s(3510) =< s(3491)+s(3491)+s(3494) s(3462) =< s(3491)+s(3491)+s(3494) s(3464) =< s(3456)*aux(490) s(3505) =< s(3491)+s(3491)+s(3494) s(3507) =< s(3491)+s(3491)+s(3494) s(3506) =< s(3456)*s(3149) s(3465) =< s(3456)*s(3149) s(3509) =< s(3462)*s(3149) s(3508) =< s(3462)*s(3196) s(3507) =< s(3462)*s(3149) s(3466) =< s(3462)*s(3196) s(3467) =< s(3510) s(3468) =< s(3462)*s(3151) s(3505) =< s(3462)*aux(491) s(3469) =< s(3509) s(3470) =< s(3508) s(3471) =< s(3507) s(3472) =< s(3506) s(3473) =< s(3505) s(3501) =< s(3494) s(3476) =< s(3494) s(3502) =< s(3491) s(3502) =< s(3494) s(3501) =< s(3502)+s(3502)+s(3494) s(3476) =< s(3502)+s(3502)+s(3494) s(3497) =< s(3502)+s(3502)+s(3494) s(3498) =< s(3502)+s(3502)+s(3494) s(3500) =< s(3476)*s(3149) s(3499) =< s(3476)*s(3196) s(3498) =< s(3476)*s(3149) s(3477) =< s(3476)*s(3196) s(3478) =< s(3501) s(3479) =< s(3476)*s(3151) s(3497) =< s(3476)*aux(491) s(3480) =< s(3500) s(3481) =< s(3499) s(3482) =< s(3498) s(3483) =< s(3497) s(3496) =< s(3494) s(3484) =< s(3494) s(3496) =< s(3494)+s(3494) s(3484) =< s(3494)+s(3494) s(3485) =< s(3496) s(3493) =< s(3494) s(3486) =< s(3494) s(3493) =< s(3491)+s(3494) s(3486) =< s(3491)+s(3494) s(3487) =< s(3493) s(3490) =< s(3491) s(3488) =< s(3491) s(3490) =< aux(504)+s(3491) s(3488) =< aux(504)+s(3491) s(3489) =< s(3490) s(3379) =< s(3429) s(3380) =< aux(505) s(3381) =< s(3430) s(3453) =< s(3430) s(3382) =< s(3430) s(3453) =< aux(505)+s(3430) s(3382) =< aux(505)+s(3430) s(3383) =< s(3453) s(3452) =< s(3430) s(3384) =< s(3430) s(3452) =< aux(505)+s(3429) s(3384) =< aux(505)+s(3429) s(3386) =< s(3452) s(3451) =< s(3431) s(3387) =< s(3431) s(3388) =< s(3431) s(3451) =< s(3429)+s(3429)+s(3430) s(3387) =< s(3429)+s(3429)+s(3430) s(3389) =< s(3388)*aux(490) s(3446) =< s(3429)+s(3429)+s(3430) s(3448) =< s(3429)+s(3429)+s(3430) s(3447) =< s(3388)*s(3149) s(3390) =< s(3388)*s(3149) s(3450) =< s(3387)*s(3149) s(3449) =< s(3387)*aux(483) s(3448) =< s(3387)*s(3149) s(3391) =< s(3387)*aux(483) s(3392) =< s(3451) s(3393) =< s(3387)*s(3151) s(3446) =< s(3387)*aux(504) s(3394) =< s(3450) s(3395) =< s(3449) s(3396) =< s(3448) s(3397) =< s(3447) s(3398) =< s(3446) s(3445) =< s(3431) s(3399) =< s(3431) s(3445) =< aux(505)+s(3431) s(3399) =< aux(505)+s(3431) s(3400) =< s(3445) s(3442) =< s(3431) s(3401) =< s(3431) s(3443) =< s(3429) s(3443) =< s(3430) s(3442) =< s(3443)+s(3443)+s(3430) s(3401) =< s(3443)+s(3443)+s(3430) s(3438) =< s(3443)+s(3443)+s(3430) s(3439) =< s(3443)+s(3443)+s(3430) s(3441) =< s(3401)*s(3149) s(3440) =< s(3401)*aux(483) s(3439) =< s(3401)*s(3149) s(3402) =< s(3401)*aux(483) s(3403) =< s(3442) s(3404) =< s(3401)*s(3151) s(3438) =< s(3401)*aux(504) s(3405) =< s(3441) s(3406) =< s(3440) s(3407) =< s(3439) s(3408) =< s(3438) s(3437) =< s(3431) s(3409) =< s(3431) s(3437) =< s(3431)+s(3431) s(3409) =< s(3431)+s(3431) s(3410) =< s(3437) s(3435) =< s(3431) s(3411) =< s(3431) s(3435) =< s(3429)+s(3430) s(3411) =< s(3429)+s(3430) s(3412) =< s(3435) s(3432) =< s(3429) s(3413) =< s(3429) s(3432) =< aux(505)+s(3429) s(3413) =< aux(505)+s(3429) s(3414) =< s(3432) s(3428) =< s(3431) s(3416) =< s(3431) s(3428) =< s(3430)+s(3430)+s(3429) s(3416) =< s(3430)+s(3430)+s(3429) s(3424) =< s(3430)+s(3430)+s(3429) s(3425) =< s(3430)+s(3430)+s(3429) s(3427) =< s(3416)*s(3149) s(3426) =< s(3416)*s(3196) s(3425) =< s(3416)*s(3149) s(3417) =< s(3416)*s(3196) s(3418) =< s(3428) s(3419) =< s(3416)*s(3151) s(3424) =< s(3416)*aux(491) s(3420) =< s(3427) s(3421) =< s(3426) s(3422) =< s(3425) s(3423) =< s(3424) with precondition: [V1>=1,Out>=0,V1>=Out] #### Cost of chains of fun(V1,V,Out): * Chain [64]: 26*s(3515)+956*s(3516)+6*s(3525)+324*s(3526)+2294*s(3527)+270*s(3529)+54*s(3530)+60*s(3532)+12*s(3533)+1296*s(3535)+84*s(3539)+84*s(3543)+144*s(3546)+432*s(3547)+72*s(3548)+2016*s(3549)+576*s(3550)+216*s(3551)+336*s(3552)+216*s(3553)+216*s(3555)+24*s(3561)+72*s(3562)+12*s(3563)+336*s(3564)+96*s(3565)+36*s(3566)+36*s(3567)+30*s(3569)+6*s(3570)+30*s(3572)+6*s(3573)+30*s(3575)+6*s(3576)+300*s(3577)+922*s(3578)+464*s(3579)+90*s(3581)+18*s(3582)+60*s(3584)+12*s(3585)+1116*s(3587)+1762*s(3588)+78*s(3589)+78*s(3593)+124*s(3596)+372*s(3597)+62*s(3598)+1736*s(3599)+496*s(3600)+186*s(3601)+312*s(3602)+186*s(3603)+180*s(3605)+36*s(3606)+216*s(3608)+24*s(3614)+72*s(3615)+12*s(3616)+336*s(3617)+96*s(3618)+36*s(3619)+36*s(3620)+30*s(3622)+6*s(3623)+30*s(3625)+6*s(3626)+30*s(3628)+6*s(3629)+72*s(3631)+8*s(3636)+24*s(3637)+4*s(3638)+112*s(3639)+32*s(3640)+12*s(3641)+12*s(3642)+26*s(3645)+956*s(3646)+6*s(3655)+324*s(3656)+2294*s(3657)+270*s(3659)+54*s(3660)+60*s(3662)+12*s(3663)+1296*s(3665)+84*s(3669)+84*s(3673)+144*s(3676)+432*s(3677)+72*s(3678)+2016*s(3679)+576*s(3680)+216*s(3681)+336*s(3682)+216*s(3683)+216*s(3685)+24*s(3691)+72*s(3692)+12*s(3693)+336*s(3694)+96*s(3695)+36*s(3696)+36*s(3697)+30*s(3699)+6*s(3700)+30*s(3702)+6*s(3703)+30*s(3705)+6*s(3706)+300*s(3707)+922*s(3708)+464*s(3709)+90*s(3711)+18*s(3712)+60*s(3714)+12*s(3715)+1116*s(3717)+1762*s(3718)+78*s(3719)+78*s(3723)+124*s(3726)+372*s(3727)+62*s(3728)+1736*s(3729)+496*s(3730)+186*s(3731)+312*s(3732)+186*s(3733)+180*s(3735)+36*s(3736)+216*s(3738)+24*s(3744)+72*s(3745)+12*s(3746)+336*s(3747)+96*s(3748)+36*s(3749)+36*s(3750)+30*s(3752)+6*s(3753)+30*s(3755)+6*s(3756)+30*s(3758)+6*s(3759)+72*s(3761)+8*s(3766)+24*s(3767)+4*s(3768)+112*s(3769)+32*s(3770)+12*s(3771)+12*s(3772)+1 Such that:aux(506) =< V1 aux(507) =< V1/2 aux(508) =< V aux(509) =< V/2 s(3645) =< aux(506) s(3646) =< aux(506) s(3645) =< aux(507) s(3647) =< aux(506)+2 s(3648) =< aux(506)+1 s(3649) =< aux(506) s(3650) =< s(3646)*s(3647) s(3651) =< s(3646)*s(3648) s(3652) =< s(3645)*s(3648) s(3653) =< s(3645)*s(3649) s(3654) =< s(3645)*s(3647) s(3655) =< s(3645)*s(3649) s(3656) =< s(3651) s(3657) =< s(3650) s(3658) =< s(3650) s(3659) =< s(3650) s(3658) =< aux(506)+s(3650) s(3659) =< aux(506)+s(3650) s(3660) =< s(3658) s(3661) =< s(3650) s(3662) =< s(3650) s(3661) =< aux(506)+s(3651) s(3662) =< aux(506)+s(3651) s(3663) =< s(3661) s(3664) =< s(3650) s(3665) =< s(3650) s(3666) =< s(3647) s(3667) =< s(3648) s(3668) =< s(3647)-1 s(3664) =< s(3651)+s(3651)+s(3650) s(3665) =< s(3651)+s(3651)+s(3650) s(3669) =< s(3657)*s(3647) s(3670) =< s(3651)+s(3651)+s(3650) s(3671) =< s(3651)+s(3651)+s(3650) s(3672) =< s(3657)*s(3666) s(3673) =< s(3657)*s(3666) s(3674) =< s(3665)*s(3666) s(3675) =< s(3665)*s(3667) s(3671) =< s(3665)*s(3666) s(3676) =< s(3665)*s(3667) s(3677) =< s(3664) s(3678) =< s(3665)*s(3668) s(3670) =< s(3665)*s(3648) s(3679) =< s(3674) s(3680) =< s(3675) s(3681) =< s(3671) s(3682) =< s(3672) s(3683) =< s(3670) s(3684) =< s(3650) s(3685) =< s(3650) s(3686) =< s(3651) s(3686) =< s(3650) s(3684) =< s(3686)+s(3686)+s(3650) s(3685) =< s(3686)+s(3686)+s(3650) s(3687) =< s(3686)+s(3686)+s(3650) s(3688) =< s(3686)+s(3686)+s(3650) s(3689) =< s(3685)*s(3666) s(3690) =< s(3685)*s(3667) s(3688) =< s(3685)*s(3666) s(3691) =< s(3685)*s(3667) s(3692) =< s(3684) s(3693) =< s(3685)*s(3668) s(3687) =< s(3685)*s(3648) s(3694) =< s(3689) s(3695) =< s(3690) s(3696) =< s(3688) s(3697) =< s(3687) s(3698) =< s(3650) s(3699) =< s(3650) s(3698) =< s(3650)+s(3650) s(3699) =< s(3650)+s(3650) s(3700) =< s(3698) s(3701) =< s(3650) s(3702) =< s(3650) s(3701) =< s(3651)+s(3650) s(3702) =< s(3651)+s(3650) s(3703) =< s(3701) s(3704) =< s(3651) s(3705) =< s(3651) s(3704) =< aux(506)+s(3651) s(3705) =< aux(506)+s(3651) s(3706) =< s(3704) s(3707) =< s(3653) s(3708) =< aux(507) s(3709) =< s(3652) s(3710) =< s(3652) s(3711) =< s(3652) s(3710) =< aux(507)+s(3652) s(3711) =< aux(507)+s(3652) s(3712) =< s(3710) s(3713) =< s(3652) s(3714) =< s(3652) s(3713) =< aux(507)+s(3653) s(3714) =< aux(507)+s(3653) s(3715) =< s(3713) s(3716) =< s(3654) s(3717) =< s(3654) s(3718) =< s(3654) s(3716) =< s(3653)+s(3653)+s(3652) s(3717) =< s(3653)+s(3653)+s(3652) s(3719) =< s(3718)*s(3647) s(3720) =< s(3653)+s(3653)+s(3652) s(3721) =< s(3653)+s(3653)+s(3652) s(3722) =< s(3718)*s(3666) s(3723) =< s(3718)*s(3666) s(3724) =< s(3717)*s(3666) s(3725) =< s(3717)*s(3649) s(3721) =< s(3717)*s(3666) s(3726) =< s(3717)*s(3649) s(3727) =< s(3716) s(3728) =< s(3717)*s(3668) s(3720) =< s(3717)*aux(506) s(3729) =< s(3724) s(3730) =< s(3725) s(3731) =< s(3721) s(3732) =< s(3722) s(3733) =< s(3720) s(3734) =< s(3654) s(3735) =< s(3654) s(3734) =< aux(507)+s(3654) s(3735) =< aux(507)+s(3654) s(3736) =< s(3734) s(3737) =< s(3654) s(3738) =< s(3654) s(3739) =< s(3653) s(3739) =< s(3652) s(3737) =< s(3739)+s(3739)+s(3652) s(3738) =< s(3739)+s(3739)+s(3652) s(3740) =< s(3739)+s(3739)+s(3652) s(3741) =< s(3739)+s(3739)+s(3652) s(3742) =< s(3738)*s(3666) s(3743) =< s(3738)*s(3649) s(3741) =< s(3738)*s(3666) s(3744) =< s(3738)*s(3649) s(3745) =< s(3737) s(3746) =< s(3738)*s(3668) s(3740) =< s(3738)*aux(506) s(3747) =< s(3742) s(3748) =< s(3743) s(3749) =< s(3741) s(3750) =< s(3740) s(3751) =< s(3654) s(3752) =< s(3654) s(3751) =< s(3654)+s(3654) s(3752) =< s(3654)+s(3654) s(3753) =< s(3751) s(3754) =< s(3654) s(3755) =< s(3654) s(3754) =< s(3653)+s(3652) s(3755) =< s(3653)+s(3652) s(3756) =< s(3754) s(3757) =< s(3653) s(3758) =< s(3653) s(3757) =< aux(507)+s(3653) s(3758) =< aux(507)+s(3653) s(3759) =< s(3757) s(3760) =< s(3654) s(3761) =< s(3654) s(3760) =< s(3652)+s(3652)+s(3653) s(3761) =< s(3652)+s(3652)+s(3653) s(3762) =< s(3652)+s(3652)+s(3653) s(3763) =< s(3652)+s(3652)+s(3653) s(3764) =< s(3761)*s(3666) s(3765) =< s(3761)*s(3667) s(3763) =< s(3761)*s(3666) s(3766) =< s(3761)*s(3667) s(3767) =< s(3760) s(3768) =< s(3761)*s(3668) s(3762) =< s(3761)*s(3648) s(3769) =< s(3764) s(3770) =< s(3765) s(3771) =< s(3763) s(3772) =< s(3762) s(3515) =< aux(508) s(3516) =< aux(508) s(3515) =< aux(509) s(3517) =< aux(508)+2 s(3518) =< aux(508)+1 s(3519) =< aux(508) s(3520) =< s(3516)*s(3517) s(3521) =< s(3516)*s(3518) s(3522) =< s(3515)*s(3518) s(3523) =< s(3515)*s(3519) s(3524) =< s(3515)*s(3517) s(3525) =< s(3515)*s(3519) s(3526) =< s(3521) s(3527) =< s(3520) s(3528) =< s(3520) s(3529) =< s(3520) s(3528) =< aux(508)+s(3520) s(3529) =< aux(508)+s(3520) s(3530) =< s(3528) s(3531) =< s(3520) s(3532) =< s(3520) s(3531) =< aux(508)+s(3521) s(3532) =< aux(508)+s(3521) s(3533) =< s(3531) s(3534) =< s(3520) s(3535) =< s(3520) s(3536) =< s(3517) s(3537) =< s(3518) s(3538) =< s(3517)-1 s(3534) =< s(3521)+s(3521)+s(3520) s(3535) =< s(3521)+s(3521)+s(3520) s(3539) =< s(3527)*s(3517) s(3540) =< s(3521)+s(3521)+s(3520) s(3541) =< s(3521)+s(3521)+s(3520) s(3542) =< s(3527)*s(3536) s(3543) =< s(3527)*s(3536) s(3544) =< s(3535)*s(3536) s(3545) =< s(3535)*s(3537) s(3541) =< s(3535)*s(3536) s(3546) =< s(3535)*s(3537) s(3547) =< s(3534) s(3548) =< s(3535)*s(3538) s(3540) =< s(3535)*s(3518) s(3549) =< s(3544) s(3550) =< s(3545) s(3551) =< s(3541) s(3552) =< s(3542) s(3553) =< s(3540) s(3554) =< s(3520) s(3555) =< s(3520) s(3556) =< s(3521) s(3556) =< s(3520) s(3554) =< s(3556)+s(3556)+s(3520) s(3555) =< s(3556)+s(3556)+s(3520) s(3557) =< s(3556)+s(3556)+s(3520) s(3558) =< s(3556)+s(3556)+s(3520) s(3559) =< s(3555)*s(3536) s(3560) =< s(3555)*s(3537) s(3558) =< s(3555)*s(3536) s(3561) =< s(3555)*s(3537) s(3562) =< s(3554) s(3563) =< s(3555)*s(3538) s(3557) =< s(3555)*s(3518) s(3564) =< s(3559) s(3565) =< s(3560) s(3566) =< s(3558) s(3567) =< s(3557) s(3568) =< s(3520) s(3569) =< s(3520) s(3568) =< s(3520)+s(3520) s(3569) =< s(3520)+s(3520) s(3570) =< s(3568) s(3571) =< s(3520) s(3572) =< s(3520) s(3571) =< s(3521)+s(3520) s(3572) =< s(3521)+s(3520) s(3573) =< s(3571) s(3574) =< s(3521) s(3575) =< s(3521) s(3574) =< aux(508)+s(3521) s(3575) =< aux(508)+s(3521) s(3576) =< s(3574) s(3577) =< s(3523) s(3578) =< aux(509) s(3579) =< s(3522) s(3580) =< s(3522) s(3581) =< s(3522) s(3580) =< aux(509)+s(3522) s(3581) =< aux(509)+s(3522) s(3582) =< s(3580) s(3583) =< s(3522) s(3584) =< s(3522) s(3583) =< aux(509)+s(3523) s(3584) =< aux(509)+s(3523) s(3585) =< s(3583) s(3586) =< s(3524) s(3587) =< s(3524) s(3588) =< s(3524) s(3586) =< s(3523)+s(3523)+s(3522) s(3587) =< s(3523)+s(3523)+s(3522) s(3589) =< s(3588)*s(3517) s(3590) =< s(3523)+s(3523)+s(3522) s(3591) =< s(3523)+s(3523)+s(3522) s(3592) =< s(3588)*s(3536) s(3593) =< s(3588)*s(3536) s(3594) =< s(3587)*s(3536) s(3595) =< s(3587)*s(3519) s(3591) =< s(3587)*s(3536) s(3596) =< s(3587)*s(3519) s(3597) =< s(3586) s(3598) =< s(3587)*s(3538) s(3590) =< s(3587)*aux(508) s(3599) =< s(3594) s(3600) =< s(3595) s(3601) =< s(3591) s(3602) =< s(3592) s(3603) =< s(3590) s(3604) =< s(3524) s(3605) =< s(3524) s(3604) =< aux(509)+s(3524) s(3605) =< aux(509)+s(3524) s(3606) =< s(3604) s(3607) =< s(3524) s(3608) =< s(3524) s(3609) =< s(3523) s(3609) =< s(3522) s(3607) =< s(3609)+s(3609)+s(3522) s(3608) =< s(3609)+s(3609)+s(3522) s(3610) =< s(3609)+s(3609)+s(3522) s(3611) =< s(3609)+s(3609)+s(3522) s(3612) =< s(3608)*s(3536) s(3613) =< s(3608)*s(3519) s(3611) =< s(3608)*s(3536) s(3614) =< s(3608)*s(3519) s(3615) =< s(3607) s(3616) =< s(3608)*s(3538) s(3610) =< s(3608)*aux(508) s(3617) =< s(3612) s(3618) =< s(3613) s(3619) =< s(3611) s(3620) =< s(3610) s(3621) =< s(3524) s(3622) =< s(3524) s(3621) =< s(3524)+s(3524) s(3622) =< s(3524)+s(3524) s(3623) =< s(3621) s(3624) =< s(3524) s(3625) =< s(3524) s(3624) =< s(3523)+s(3522) s(3625) =< s(3523)+s(3522) s(3626) =< s(3624) s(3627) =< s(3523) s(3628) =< s(3523) s(3627) =< aux(509)+s(3523) s(3628) =< aux(509)+s(3523) s(3629) =< s(3627) s(3630) =< s(3524) s(3631) =< s(3524) s(3630) =< s(3522)+s(3522)+s(3523) s(3631) =< s(3522)+s(3522)+s(3523) s(3632) =< s(3522)+s(3522)+s(3523) s(3633) =< s(3522)+s(3522)+s(3523) s(3634) =< s(3631)*s(3536) s(3635) =< s(3631)*s(3537) s(3633) =< s(3631)*s(3536) s(3636) =< s(3631)*s(3537) s(3637) =< s(3630) s(3638) =< s(3631)*s(3538) s(3632) =< s(3631)*s(3518) s(3639) =< s(3634) s(3640) =< s(3635) s(3641) =< s(3633) s(3642) =< s(3632) with precondition: [Out=0,V1>=0,V>=0] * Chain [63]: 13*s(4035)+478*s(4036)+3*s(4045)+162*s(4046)+1147*s(4047)+135*s(4049)+27*s(4050)+30*s(4052)+6*s(4053)+648*s(4055)+42*s(4059)+42*s(4063)+72*s(4066)+216*s(4067)+36*s(4068)+1008*s(4069)+288*s(4070)+108*s(4071)+168*s(4072)+108*s(4073)+108*s(4075)+12*s(4081)+36*s(4082)+6*s(4083)+168*s(4084)+48*s(4085)+18*s(4086)+18*s(4087)+15*s(4089)+3*s(4090)+15*s(4092)+3*s(4093)+15*s(4095)+3*s(4096)+150*s(4097)+461*s(4098)+232*s(4099)+45*s(4101)+9*s(4102)+30*s(4104)+6*s(4105)+558*s(4107)+881*s(4108)+39*s(4109)+39*s(4113)+62*s(4116)+186*s(4117)+31*s(4118)+868*s(4119)+248*s(4120)+93*s(4121)+156*s(4122)+93*s(4123)+90*s(4125)+18*s(4126)+108*s(4128)+12*s(4134)+36*s(4135)+6*s(4136)+168*s(4137)+48*s(4138)+18*s(4139)+18*s(4140)+15*s(4142)+3*s(4143)+15*s(4145)+3*s(4146)+15*s(4148)+3*s(4149)+36*s(4151)+4*s(4156)+12*s(4157)+2*s(4158)+56*s(4159)+16*s(4160)+6*s(4161)+6*s(4162)+13*s(4165)+480*s(4166)+3*s(4175)+162*s(4176)+1147*s(4177)+135*s(4179)+27*s(4180)+30*s(4182)+6*s(4183)+648*s(4185)+42*s(4189)+42*s(4193)+72*s(4196)+216*s(4197)+36*s(4198)+1008*s(4199)+288*s(4200)+108*s(4201)+168*s(4202)+108*s(4203)+108*s(4205)+12*s(4211)+36*s(4212)+6*s(4213)+168*s(4214)+48*s(4215)+18*s(4216)+18*s(4217)+15*s(4219)+3*s(4220)+15*s(4222)+3*s(4223)+15*s(4225)+3*s(4226)+150*s(4227)+461*s(4228)+232*s(4229)+45*s(4231)+9*s(4232)+30*s(4234)+6*s(4235)+558*s(4237)+881*s(4238)+39*s(4239)+39*s(4243)+62*s(4246)+186*s(4247)+31*s(4248)+868*s(4249)+248*s(4250)+93*s(4251)+156*s(4252)+93*s(4253)+90*s(4255)+18*s(4256)+108*s(4258)+12*s(4264)+36*s(4265)+6*s(4266)+168*s(4267)+48*s(4268)+18*s(4269)+18*s(4270)+15*s(4272)+3*s(4273)+15*s(4275)+3*s(4276)+15*s(4278)+3*s(4279)+36*s(4281)+4*s(4286)+12*s(4287)+2*s(4288)+56*s(4289)+16*s(4290)+6*s(4291)+6*s(4292)+1 Such that:s(4033) =< V1 s(4034) =< V1/2 s(4164) =< V/2 aux(510) =< V s(4166) =< aux(510) s(4165) =< aux(510) s(4165) =< s(4164) s(4167) =< aux(510)+2 s(4168) =< aux(510)+1 s(4169) =< aux(510) s(4170) =< s(4166)*s(4167) s(4171) =< s(4166)*s(4168) s(4172) =< s(4165)*s(4168) s(4173) =< s(4165)*s(4169) s(4174) =< s(4165)*s(4167) s(4175) =< s(4165)*s(4169) s(4176) =< s(4171) s(4177) =< s(4170) s(4178) =< s(4170) s(4179) =< s(4170) s(4178) =< aux(510)+s(4170) s(4179) =< aux(510)+s(4170) s(4180) =< s(4178) s(4181) =< s(4170) s(4182) =< s(4170) s(4181) =< aux(510)+s(4171) s(4182) =< aux(510)+s(4171) s(4183) =< s(4181) s(4184) =< s(4170) s(4185) =< s(4170) s(4186) =< s(4167) s(4187) =< s(4168) s(4188) =< s(4167)-1 s(4184) =< s(4171)+s(4171)+s(4170) s(4185) =< s(4171)+s(4171)+s(4170) s(4189) =< s(4177)*s(4167) s(4190) =< s(4171)+s(4171)+s(4170) s(4191) =< s(4171)+s(4171)+s(4170) s(4192) =< s(4177)*s(4186) s(4193) =< s(4177)*s(4186) s(4194) =< s(4185)*s(4186) s(4195) =< s(4185)*s(4187) s(4191) =< s(4185)*s(4186) s(4196) =< s(4185)*s(4187) s(4197) =< s(4184) s(4198) =< s(4185)*s(4188) s(4190) =< s(4185)*s(4168) s(4199) =< s(4194) s(4200) =< s(4195) s(4201) =< s(4191) s(4202) =< s(4192) s(4203) =< s(4190) s(4204) =< s(4170) s(4205) =< s(4170) s(4206) =< s(4171) s(4206) =< s(4170) s(4204) =< s(4206)+s(4206)+s(4170) s(4205) =< s(4206)+s(4206)+s(4170) s(4207) =< s(4206)+s(4206)+s(4170) s(4208) =< s(4206)+s(4206)+s(4170) s(4209) =< s(4205)*s(4186) s(4210) =< s(4205)*s(4187) s(4208) =< s(4205)*s(4186) s(4211) =< s(4205)*s(4187) s(4212) =< s(4204) s(4213) =< s(4205)*s(4188) s(4207) =< s(4205)*s(4168) s(4214) =< s(4209) s(4215) =< s(4210) s(4216) =< s(4208) s(4217) =< s(4207) s(4218) =< s(4170) s(4219) =< s(4170) s(4218) =< s(4170)+s(4170) s(4219) =< s(4170)+s(4170) s(4220) =< s(4218) s(4221) =< s(4170) s(4222) =< s(4170) s(4221) =< s(4171)+s(4170) s(4222) =< s(4171)+s(4170) s(4223) =< s(4221) s(4224) =< s(4171) s(4225) =< s(4171) s(4224) =< aux(510)+s(4171) s(4225) =< aux(510)+s(4171) s(4226) =< s(4224) s(4227) =< s(4173) s(4228) =< s(4164) s(4229) =< s(4172) s(4230) =< s(4172) s(4231) =< s(4172) s(4230) =< s(4164)+s(4172) s(4231) =< s(4164)+s(4172) s(4232) =< s(4230) s(4233) =< s(4172) s(4234) =< s(4172) s(4233) =< s(4164)+s(4173) s(4234) =< s(4164)+s(4173) s(4235) =< s(4233) s(4236) =< s(4174) s(4237) =< s(4174) s(4238) =< s(4174) s(4236) =< s(4173)+s(4173)+s(4172) s(4237) =< s(4173)+s(4173)+s(4172) s(4239) =< s(4238)*s(4167) s(4240) =< s(4173)+s(4173)+s(4172) s(4241) =< s(4173)+s(4173)+s(4172) s(4242) =< s(4238)*s(4186) s(4243) =< s(4238)*s(4186) s(4244) =< s(4237)*s(4186) s(4245) =< s(4237)*s(4169) s(4241) =< s(4237)*s(4186) s(4246) =< s(4237)*s(4169) s(4247) =< s(4236) s(4248) =< s(4237)*s(4188) s(4240) =< s(4237)*aux(510) s(4249) =< s(4244) s(4250) =< s(4245) s(4251) =< s(4241) s(4252) =< s(4242) s(4253) =< s(4240) s(4254) =< s(4174) s(4255) =< s(4174) s(4254) =< s(4164)+s(4174) s(4255) =< s(4164)+s(4174) s(4256) =< s(4254) s(4257) =< s(4174) s(4258) =< s(4174) s(4259) =< s(4173) s(4259) =< s(4172) s(4257) =< s(4259)+s(4259)+s(4172) s(4258) =< s(4259)+s(4259)+s(4172) s(4260) =< s(4259)+s(4259)+s(4172) s(4261) =< s(4259)+s(4259)+s(4172) s(4262) =< s(4258)*s(4186) s(4263) =< s(4258)*s(4169) s(4261) =< s(4258)*s(4186) s(4264) =< s(4258)*s(4169) s(4265) =< s(4257) s(4266) =< s(4258)*s(4188) s(4260) =< s(4258)*aux(510) s(4267) =< s(4262) s(4268) =< s(4263) s(4269) =< s(4261) s(4270) =< s(4260) s(4271) =< s(4174) s(4272) =< s(4174) s(4271) =< s(4174)+s(4174) s(4272) =< s(4174)+s(4174) s(4273) =< s(4271) s(4274) =< s(4174) s(4275) =< s(4174) s(4274) =< s(4173)+s(4172) s(4275) =< s(4173)+s(4172) s(4276) =< s(4274) s(4277) =< s(4173) s(4278) =< s(4173) s(4277) =< s(4164)+s(4173) s(4278) =< s(4164)+s(4173) s(4279) =< s(4277) s(4280) =< s(4174) s(4281) =< s(4174) s(4280) =< s(4172)+s(4172)+s(4173) s(4281) =< s(4172)+s(4172)+s(4173) s(4282) =< s(4172)+s(4172)+s(4173) s(4283) =< s(4172)+s(4172)+s(4173) s(4284) =< s(4281)*s(4186) s(4285) =< s(4281)*s(4187) s(4283) =< s(4281)*s(4186) s(4286) =< s(4281)*s(4187) s(4287) =< s(4280) s(4288) =< s(4281)*s(4188) s(4282) =< s(4281)*s(4168) s(4289) =< s(4284) s(4290) =< s(4285) s(4291) =< s(4283) s(4292) =< s(4282) s(4035) =< s(4033) s(4036) =< s(4033) s(4035) =< s(4034) s(4037) =< s(4033)+2 s(4038) =< s(4033)+1 s(4039) =< s(4033) s(4040) =< s(4036)*s(4037) s(4041) =< s(4036)*s(4038) s(4042) =< s(4035)*s(4038) s(4043) =< s(4035)*s(4039) s(4044) =< s(4035)*s(4037) s(4045) =< s(4035)*s(4039) s(4046) =< s(4041) s(4047) =< s(4040) s(4048) =< s(4040) s(4049) =< s(4040) s(4048) =< s(4033)+s(4040) s(4049) =< s(4033)+s(4040) s(4050) =< s(4048) s(4051) =< s(4040) s(4052) =< s(4040) s(4051) =< s(4033)+s(4041) s(4052) =< s(4033)+s(4041) s(4053) =< s(4051) s(4054) =< s(4040) s(4055) =< s(4040) s(4056) =< s(4037) s(4057) =< s(4038) s(4058) =< s(4037)-1 s(4054) =< s(4041)+s(4041)+s(4040) s(4055) =< s(4041)+s(4041)+s(4040) s(4059) =< s(4047)*s(4037) s(4060) =< s(4041)+s(4041)+s(4040) s(4061) =< s(4041)+s(4041)+s(4040) s(4062) =< s(4047)*s(4056) s(4063) =< s(4047)*s(4056) s(4064) =< s(4055)*s(4056) s(4065) =< s(4055)*s(4057) s(4061) =< s(4055)*s(4056) s(4066) =< s(4055)*s(4057) s(4067) =< s(4054) s(4068) =< s(4055)*s(4058) s(4060) =< s(4055)*s(4038) s(4069) =< s(4064) s(4070) =< s(4065) s(4071) =< s(4061) s(4072) =< s(4062) s(4073) =< s(4060) s(4074) =< s(4040) s(4075) =< s(4040) s(4076) =< s(4041) s(4076) =< s(4040) s(4074) =< s(4076)+s(4076)+s(4040) s(4075) =< s(4076)+s(4076)+s(4040) s(4077) =< s(4076)+s(4076)+s(4040) s(4078) =< s(4076)+s(4076)+s(4040) s(4079) =< s(4075)*s(4056) s(4080) =< s(4075)*s(4057) s(4078) =< s(4075)*s(4056) s(4081) =< s(4075)*s(4057) s(4082) =< s(4074) s(4083) =< s(4075)*s(4058) s(4077) =< s(4075)*s(4038) s(4084) =< s(4079) s(4085) =< s(4080) s(4086) =< s(4078) s(4087) =< s(4077) s(4088) =< s(4040) s(4089) =< s(4040) s(4088) =< s(4040)+s(4040) s(4089) =< s(4040)+s(4040) s(4090) =< s(4088) s(4091) =< s(4040) s(4092) =< s(4040) s(4091) =< s(4041)+s(4040) s(4092) =< s(4041)+s(4040) s(4093) =< s(4091) s(4094) =< s(4041) s(4095) =< s(4041) s(4094) =< s(4033)+s(4041) s(4095) =< s(4033)+s(4041) s(4096) =< s(4094) s(4097) =< s(4043) s(4098) =< s(4034) s(4099) =< s(4042) s(4100) =< s(4042) s(4101) =< s(4042) s(4100) =< s(4034)+s(4042) s(4101) =< s(4034)+s(4042) s(4102) =< s(4100) s(4103) =< s(4042) s(4104) =< s(4042) s(4103) =< s(4034)+s(4043) s(4104) =< s(4034)+s(4043) s(4105) =< s(4103) s(4106) =< s(4044) s(4107) =< s(4044) s(4108) =< s(4044) s(4106) =< s(4043)+s(4043)+s(4042) s(4107) =< s(4043)+s(4043)+s(4042) s(4109) =< s(4108)*s(4037) s(4110) =< s(4043)+s(4043)+s(4042) s(4111) =< s(4043)+s(4043)+s(4042) s(4112) =< s(4108)*s(4056) s(4113) =< s(4108)*s(4056) s(4114) =< s(4107)*s(4056) s(4115) =< s(4107)*s(4039) s(4111) =< s(4107)*s(4056) s(4116) =< s(4107)*s(4039) s(4117) =< s(4106) s(4118) =< s(4107)*s(4058) s(4110) =< s(4107)*s(4033) s(4119) =< s(4114) s(4120) =< s(4115) s(4121) =< s(4111) s(4122) =< s(4112) s(4123) =< s(4110) s(4124) =< s(4044) s(4125) =< s(4044) s(4124) =< s(4034)+s(4044) s(4125) =< s(4034)+s(4044) s(4126) =< s(4124) s(4127) =< s(4044) s(4128) =< s(4044) s(4129) =< s(4043) s(4129) =< s(4042) s(4127) =< s(4129)+s(4129)+s(4042) s(4128) =< s(4129)+s(4129)+s(4042) s(4130) =< s(4129)+s(4129)+s(4042) s(4131) =< s(4129)+s(4129)+s(4042) s(4132) =< s(4128)*s(4056) s(4133) =< s(4128)*s(4039) s(4131) =< s(4128)*s(4056) s(4134) =< s(4128)*s(4039) s(4135) =< s(4127) s(4136) =< s(4128)*s(4058) s(4130) =< s(4128)*s(4033) s(4137) =< s(4132) s(4138) =< s(4133) s(4139) =< s(4131) s(4140) =< s(4130) s(4141) =< s(4044) s(4142) =< s(4044) s(4141) =< s(4044)+s(4044) s(4142) =< s(4044)+s(4044) s(4143) =< s(4141) s(4144) =< s(4044) s(4145) =< s(4044) s(4144) =< s(4043)+s(4042) s(4145) =< s(4043)+s(4042) s(4146) =< s(4144) s(4147) =< s(4043) s(4148) =< s(4043) s(4147) =< s(4034)+s(4043) s(4148) =< s(4034)+s(4043) s(4149) =< s(4147) s(4150) =< s(4044) s(4151) =< s(4044) s(4150) =< s(4042)+s(4042)+s(4043) s(4151) =< s(4042)+s(4042)+s(4043) s(4152) =< s(4042)+s(4042)+s(4043) s(4153) =< s(4042)+s(4042)+s(4043) s(4154) =< s(4151)*s(4056) s(4155) =< s(4151)*s(4057) s(4153) =< s(4151)*s(4056) s(4156) =< s(4151)*s(4057) s(4157) =< s(4150) s(4158) =< s(4151)*s(4058) s(4152) =< s(4151)*s(4038) s(4159) =< s(4154) s(4160) =< s(4155) s(4161) =< s(4153) s(4162) =< s(4152) with precondition: [Out>=1,V1>=Out,V>=Out] #### Cost of chains of fun2(V1,Out): * Chain [67]: 0 with precondition: [Out=0,V1>=0] * Chain [66]: 0 with precondition: [Out=1,V1>=0] * Chain [65]: 13*s(4297)+478*s(4298)+3*s(4307)+162*s(4308)+1147*s(4309)+135*s(4311)+27*s(4312)+30*s(4314)+6*s(4315)+648*s(4317)+42*s(4321)+42*s(4325)+72*s(4328)+216*s(4329)+36*s(4330)+1008*s(4331)+288*s(4332)+108*s(4333)+168*s(4334)+108*s(4335)+108*s(4337)+12*s(4343)+36*s(4344)+6*s(4345)+168*s(4346)+48*s(4347)+18*s(4348)+18*s(4349)+15*s(4351)+3*s(4352)+15*s(4354)+3*s(4355)+15*s(4357)+3*s(4358)+150*s(4359)+461*s(4360)+232*s(4361)+45*s(4363)+9*s(4364)+30*s(4366)+6*s(4367)+558*s(4369)+881*s(4370)+39*s(4371)+39*s(4375)+62*s(4378)+186*s(4379)+31*s(4380)+868*s(4381)+248*s(4382)+93*s(4383)+156*s(4384)+93*s(4385)+90*s(4387)+18*s(4388)+108*s(4390)+12*s(4396)+36*s(4397)+6*s(4398)+168*s(4399)+48*s(4400)+18*s(4401)+18*s(4402)+15*s(4404)+3*s(4405)+15*s(4407)+3*s(4408)+15*s(4410)+3*s(4411)+36*s(4413)+4*s(4418)+12*s(4419)+2*s(4420)+56*s(4421)+16*s(4422)+6*s(4423)+6*s(4424)+0 Such that:s(4295) =< V1 s(4296) =< V1/2 s(4297) =< s(4295) s(4298) =< s(4295) s(4297) =< s(4296) s(4299) =< s(4295)+2 s(4300) =< s(4295)+1 s(4301) =< s(4295) s(4302) =< s(4298)*s(4299) s(4303) =< s(4298)*s(4300) s(4304) =< s(4297)*s(4300) s(4305) =< s(4297)*s(4301) s(4306) =< s(4297)*s(4299) s(4307) =< s(4297)*s(4301) s(4308) =< s(4303) s(4309) =< s(4302) s(4310) =< s(4302) s(4311) =< s(4302) s(4310) =< s(4295)+s(4302) s(4311) =< s(4295)+s(4302) s(4312) =< s(4310) s(4313) =< s(4302) s(4314) =< s(4302) s(4313) =< s(4295)+s(4303) s(4314) =< s(4295)+s(4303) s(4315) =< s(4313) s(4316) =< s(4302) s(4317) =< s(4302) s(4318) =< s(4299) s(4319) =< s(4300) s(4320) =< s(4299)-1 s(4316) =< s(4303)+s(4303)+s(4302) s(4317) =< s(4303)+s(4303)+s(4302) s(4321) =< s(4309)*s(4299) s(4322) =< s(4303)+s(4303)+s(4302) s(4323) =< s(4303)+s(4303)+s(4302) s(4324) =< s(4309)*s(4318) s(4325) =< s(4309)*s(4318) s(4326) =< s(4317)*s(4318) s(4327) =< s(4317)*s(4319) s(4323) =< s(4317)*s(4318) s(4328) =< s(4317)*s(4319) s(4329) =< s(4316) s(4330) =< s(4317)*s(4320) s(4322) =< s(4317)*s(4300) s(4331) =< s(4326) s(4332) =< s(4327) s(4333) =< s(4323) s(4334) =< s(4324) s(4335) =< s(4322) s(4336) =< s(4302) s(4337) =< s(4302) s(4338) =< s(4303) s(4338) =< s(4302) s(4336) =< s(4338)+s(4338)+s(4302) s(4337) =< s(4338)+s(4338)+s(4302) s(4339) =< s(4338)+s(4338)+s(4302) s(4340) =< s(4338)+s(4338)+s(4302) s(4341) =< s(4337)*s(4318) s(4342) =< s(4337)*s(4319) s(4340) =< s(4337)*s(4318) s(4343) =< s(4337)*s(4319) s(4344) =< s(4336) s(4345) =< s(4337)*s(4320) s(4339) =< s(4337)*s(4300) s(4346) =< s(4341) s(4347) =< s(4342) s(4348) =< s(4340) s(4349) =< s(4339) s(4350) =< s(4302) s(4351) =< s(4302) s(4350) =< s(4302)+s(4302) s(4351) =< s(4302)+s(4302) s(4352) =< s(4350) s(4353) =< s(4302) s(4354) =< s(4302) s(4353) =< s(4303)+s(4302) s(4354) =< s(4303)+s(4302) s(4355) =< s(4353) s(4356) =< s(4303) s(4357) =< s(4303) s(4356) =< s(4295)+s(4303) s(4357) =< s(4295)+s(4303) s(4358) =< s(4356) s(4359) =< s(4305) s(4360) =< s(4296) s(4361) =< s(4304) s(4362) =< s(4304) s(4363) =< s(4304) s(4362) =< s(4296)+s(4304) s(4363) =< s(4296)+s(4304) s(4364) =< s(4362) s(4365) =< s(4304) s(4366) =< s(4304) s(4365) =< s(4296)+s(4305) s(4366) =< s(4296)+s(4305) s(4367) =< s(4365) s(4368) =< s(4306) s(4369) =< s(4306) s(4370) =< s(4306) s(4368) =< s(4305)+s(4305)+s(4304) s(4369) =< s(4305)+s(4305)+s(4304) s(4371) =< s(4370)*s(4299) s(4372) =< s(4305)+s(4305)+s(4304) s(4373) =< s(4305)+s(4305)+s(4304) s(4374) =< s(4370)*s(4318) s(4375) =< s(4370)*s(4318) s(4376) =< s(4369)*s(4318) s(4377) =< s(4369)*s(4301) s(4373) =< s(4369)*s(4318) s(4378) =< s(4369)*s(4301) s(4379) =< s(4368) s(4380) =< s(4369)*s(4320) s(4372) =< s(4369)*s(4295) s(4381) =< s(4376) s(4382) =< s(4377) s(4383) =< s(4373) s(4384) =< s(4374) s(4385) =< s(4372) s(4386) =< s(4306) s(4387) =< s(4306) s(4386) =< s(4296)+s(4306) s(4387) =< s(4296)+s(4306) s(4388) =< s(4386) s(4389) =< s(4306) s(4390) =< s(4306) s(4391) =< s(4305) s(4391) =< s(4304) s(4389) =< s(4391)+s(4391)+s(4304) s(4390) =< s(4391)+s(4391)+s(4304) s(4392) =< s(4391)+s(4391)+s(4304) s(4393) =< s(4391)+s(4391)+s(4304) s(4394) =< s(4390)*s(4318) s(4395) =< s(4390)*s(4301) s(4393) =< s(4390)*s(4318) s(4396) =< s(4390)*s(4301) s(4397) =< s(4389) s(4398) =< s(4390)*s(4320) s(4392) =< s(4390)*s(4295) s(4399) =< s(4394) s(4400) =< s(4395) s(4401) =< s(4393) s(4402) =< s(4392) s(4403) =< s(4306) s(4404) =< s(4306) s(4403) =< s(4306)+s(4306) s(4404) =< s(4306)+s(4306) s(4405) =< s(4403) s(4406) =< s(4306) s(4407) =< s(4306) s(4406) =< s(4305)+s(4304) s(4407) =< s(4305)+s(4304) s(4408) =< s(4406) s(4409) =< s(4305) s(4410) =< s(4305) s(4409) =< s(4296)+s(4305) s(4410) =< s(4296)+s(4305) s(4411) =< s(4409) s(4412) =< s(4306) s(4413) =< s(4306) s(4412) =< s(4304)+s(4304)+s(4305) s(4413) =< s(4304)+s(4304)+s(4305) s(4414) =< s(4304)+s(4304)+s(4305) s(4415) =< s(4304)+s(4304)+s(4305) s(4416) =< s(4413)*s(4318) s(4417) =< s(4413)*s(4319) s(4415) =< s(4413)*s(4318) s(4418) =< s(4413)*s(4319) s(4419) =< s(4412) s(4420) =< s(4413)*s(4320) s(4414) =< s(4413)*s(4300) s(4421) =< s(4416) s(4422) =< s(4417) s(4423) =< s(4415) s(4424) =< s(4414) with precondition: [V1>=1,Out>=1,V1+1>=Out] #### Cost of chains of fun3(V1,V,Out): * Chain [70]: 39*s(4427)+1434*s(4428)+9*s(4437)+486*s(4438)+3441*s(4439)+405*s(4441)+81*s(4442)+90*s(4444)+18*s(4445)+1944*s(4447)+126*s(4451)+126*s(4455)+216*s(4458)+648*s(4459)+108*s(4460)+3024*s(4461)+864*s(4462)+324*s(4463)+504*s(4464)+324*s(4465)+324*s(4467)+36*s(4473)+108*s(4474)+18*s(4475)+504*s(4476)+144*s(4477)+54*s(4478)+54*s(4479)+45*s(4481)+9*s(4482)+45*s(4484)+9*s(4485)+45*s(4487)+9*s(4488)+450*s(4489)+1383*s(4490)+696*s(4491)+135*s(4493)+27*s(4494)+90*s(4496)+18*s(4497)+1674*s(4499)+2643*s(4500)+117*s(4501)+117*s(4505)+186*s(4508)+558*s(4509)+93*s(4510)+2604*s(4511)+744*s(4512)+279*s(4513)+468*s(4514)+279*s(4515)+270*s(4517)+54*s(4518)+324*s(4520)+36*s(4526)+108*s(4527)+18*s(4528)+504*s(4529)+144*s(4530)+54*s(4531)+54*s(4532)+45*s(4534)+9*s(4535)+45*s(4537)+9*s(4538)+45*s(4540)+9*s(4541)+108*s(4543)+12*s(4548)+36*s(4549)+6*s(4550)+168*s(4551)+48*s(4552)+18*s(4553)+18*s(4554)+39*s(4687)+1434*s(4688)+9*s(4697)+486*s(4698)+3441*s(4699)+405*s(4701)+81*s(4702)+90*s(4704)+18*s(4705)+1944*s(4707)+126*s(4711)+126*s(4715)+216*s(4718)+648*s(4719)+108*s(4720)+3024*s(4721)+864*s(4722)+324*s(4723)+504*s(4724)+324*s(4725)+324*s(4727)+36*s(4733)+108*s(4734)+18*s(4735)+504*s(4736)+144*s(4737)+54*s(4738)+54*s(4739)+45*s(4741)+9*s(4742)+45*s(4744)+9*s(4745)+45*s(4747)+9*s(4748)+450*s(4749)+1383*s(4750)+696*s(4751)+135*s(4753)+27*s(4754)+90*s(4756)+18*s(4757)+1674*s(4759)+2643*s(4760)+117*s(4761)+117*s(4765)+186*s(4768)+558*s(4769)+93*s(4770)+2604*s(4771)+744*s(4772)+279*s(4773)+468*s(4774)+279*s(4775)+270*s(4777)+54*s(4778)+324*s(4780)+36*s(4786)+108*s(4787)+18*s(4788)+504*s(4789)+144*s(4790)+54*s(4791)+54*s(4792)+45*s(4794)+9*s(4795)+45*s(4797)+9*s(4798)+45*s(4800)+9*s(4801)+108*s(4803)+12*s(4808)+36*s(4809)+6*s(4810)+168*s(4811)+48*s(4812)+18*s(4813)+18*s(4814)+1 Such that:aux(511) =< V1 aux(512) =< V1/2 aux(513) =< V aux(514) =< V/2 s(4687) =< aux(511) s(4688) =< aux(511) s(4687) =< aux(512) s(4689) =< aux(511)+2 s(4690) =< aux(511)+1 s(4691) =< aux(511) s(4692) =< s(4688)*s(4689) s(4693) =< s(4688)*s(4690) s(4694) =< s(4687)*s(4690) s(4695) =< s(4687)*s(4691) s(4696) =< s(4687)*s(4689) s(4697) =< s(4687)*s(4691) s(4698) =< s(4693) s(4699) =< s(4692) s(4700) =< s(4692) s(4701) =< s(4692) s(4700) =< aux(511)+s(4692) s(4701) =< aux(511)+s(4692) s(4702) =< s(4700) s(4703) =< s(4692) s(4704) =< s(4692) s(4703) =< aux(511)+s(4693) s(4704) =< aux(511)+s(4693) s(4705) =< s(4703) s(4706) =< s(4692) s(4707) =< s(4692) s(4708) =< s(4689) s(4709) =< s(4690) s(4710) =< s(4689)-1 s(4706) =< s(4693)+s(4693)+s(4692) s(4707) =< s(4693)+s(4693)+s(4692) s(4711) =< s(4699)*s(4689) s(4712) =< s(4693)+s(4693)+s(4692) s(4713) =< s(4693)+s(4693)+s(4692) s(4714) =< s(4699)*s(4708) s(4715) =< s(4699)*s(4708) s(4716) =< s(4707)*s(4708) s(4717) =< s(4707)*s(4709) s(4713) =< s(4707)*s(4708) s(4718) =< s(4707)*s(4709) s(4719) =< s(4706) s(4720) =< s(4707)*s(4710) s(4712) =< s(4707)*s(4690) s(4721) =< s(4716) s(4722) =< s(4717) s(4723) =< s(4713) s(4724) =< s(4714) s(4725) =< s(4712) s(4726) =< s(4692) s(4727) =< s(4692) s(4728) =< s(4693) s(4728) =< s(4692) s(4726) =< s(4728)+s(4728)+s(4692) s(4727) =< s(4728)+s(4728)+s(4692) s(4729) =< s(4728)+s(4728)+s(4692) s(4730) =< s(4728)+s(4728)+s(4692) s(4731) =< s(4727)*s(4708) s(4732) =< s(4727)*s(4709) s(4730) =< s(4727)*s(4708) s(4733) =< s(4727)*s(4709) s(4734) =< s(4726) s(4735) =< s(4727)*s(4710) s(4729) =< s(4727)*s(4690) s(4736) =< s(4731) s(4737) =< s(4732) s(4738) =< s(4730) s(4739) =< s(4729) s(4740) =< s(4692) s(4741) =< s(4692) s(4740) =< s(4692)+s(4692) s(4741) =< s(4692)+s(4692) s(4742) =< s(4740) s(4743) =< s(4692) s(4744) =< s(4692) s(4743) =< s(4693)+s(4692) s(4744) =< s(4693)+s(4692) s(4745) =< s(4743) s(4746) =< s(4693) s(4747) =< s(4693) s(4746) =< aux(511)+s(4693) s(4747) =< aux(511)+s(4693) s(4748) =< s(4746) s(4749) =< s(4695) s(4750) =< aux(512) s(4751) =< s(4694) s(4752) =< s(4694) s(4753) =< s(4694) s(4752) =< aux(512)+s(4694) s(4753) =< aux(512)+s(4694) s(4754) =< s(4752) s(4755) =< s(4694) s(4756) =< s(4694) s(4755) =< aux(512)+s(4695) s(4756) =< aux(512)+s(4695) s(4757) =< s(4755) s(4758) =< s(4696) s(4759) =< s(4696) s(4760) =< s(4696) s(4758) =< s(4695)+s(4695)+s(4694) s(4759) =< s(4695)+s(4695)+s(4694) s(4761) =< s(4760)*s(4689) s(4762) =< s(4695)+s(4695)+s(4694) s(4763) =< s(4695)+s(4695)+s(4694) s(4764) =< s(4760)*s(4708) s(4765) =< s(4760)*s(4708) s(4766) =< s(4759)*s(4708) s(4767) =< s(4759)*s(4691) s(4763) =< s(4759)*s(4708) s(4768) =< s(4759)*s(4691) s(4769) =< s(4758) s(4770) =< s(4759)*s(4710) s(4762) =< s(4759)*aux(511) s(4771) =< s(4766) s(4772) =< s(4767) s(4773) =< s(4763) s(4774) =< s(4764) s(4775) =< s(4762) s(4776) =< s(4696) s(4777) =< s(4696) s(4776) =< aux(512)+s(4696) s(4777) =< aux(512)+s(4696) s(4778) =< s(4776) s(4779) =< s(4696) s(4780) =< s(4696) s(4781) =< s(4695) s(4781) =< s(4694) s(4779) =< s(4781)+s(4781)+s(4694) s(4780) =< s(4781)+s(4781)+s(4694) s(4782) =< s(4781)+s(4781)+s(4694) s(4783) =< s(4781)+s(4781)+s(4694) s(4784) =< s(4780)*s(4708) s(4785) =< s(4780)*s(4691) s(4783) =< s(4780)*s(4708) s(4786) =< s(4780)*s(4691) s(4787) =< s(4779) s(4788) =< s(4780)*s(4710) s(4782) =< s(4780)*aux(511) s(4789) =< s(4784) s(4790) =< s(4785) s(4791) =< s(4783) s(4792) =< s(4782) s(4793) =< s(4696) s(4794) =< s(4696) s(4793) =< s(4696)+s(4696) s(4794) =< s(4696)+s(4696) s(4795) =< s(4793) s(4796) =< s(4696) s(4797) =< s(4696) s(4796) =< s(4695)+s(4694) s(4797) =< s(4695)+s(4694) s(4798) =< s(4796) s(4799) =< s(4695) s(4800) =< s(4695) s(4799) =< aux(512)+s(4695) s(4800) =< aux(512)+s(4695) s(4801) =< s(4799) s(4802) =< s(4696) s(4803) =< s(4696) s(4802) =< s(4694)+s(4694)+s(4695) s(4803) =< s(4694)+s(4694)+s(4695) s(4804) =< s(4694)+s(4694)+s(4695) s(4805) =< s(4694)+s(4694)+s(4695) s(4806) =< s(4803)*s(4708) s(4807) =< s(4803)*s(4709) s(4805) =< s(4803)*s(4708) s(4808) =< s(4803)*s(4709) s(4809) =< s(4802) s(4810) =< s(4803)*s(4710) s(4804) =< s(4803)*s(4690) s(4811) =< s(4806) s(4812) =< s(4807) s(4813) =< s(4805) s(4814) =< s(4804) s(4427) =< aux(513) s(4428) =< aux(513) s(4427) =< aux(514) s(4429) =< aux(513)+2 s(4430) =< aux(513)+1 s(4431) =< aux(513) s(4432) =< s(4428)*s(4429) s(4433) =< s(4428)*s(4430) s(4434) =< s(4427)*s(4430) s(4435) =< s(4427)*s(4431) s(4436) =< s(4427)*s(4429) s(4437) =< s(4427)*s(4431) s(4438) =< s(4433) s(4439) =< s(4432) s(4440) =< s(4432) s(4441) =< s(4432) s(4440) =< aux(513)+s(4432) s(4441) =< aux(513)+s(4432) s(4442) =< s(4440) s(4443) =< s(4432) s(4444) =< s(4432) s(4443) =< aux(513)+s(4433) s(4444) =< aux(513)+s(4433) s(4445) =< s(4443) s(4446) =< s(4432) s(4447) =< s(4432) s(4448) =< s(4429) s(4449) =< s(4430) s(4450) =< s(4429)-1 s(4446) =< s(4433)+s(4433)+s(4432) s(4447) =< s(4433)+s(4433)+s(4432) s(4451) =< s(4439)*s(4429) s(4452) =< s(4433)+s(4433)+s(4432) s(4453) =< s(4433)+s(4433)+s(4432) s(4454) =< s(4439)*s(4448) s(4455) =< s(4439)*s(4448) s(4456) =< s(4447)*s(4448) s(4457) =< s(4447)*s(4449) s(4453) =< s(4447)*s(4448) s(4458) =< s(4447)*s(4449) s(4459) =< s(4446) s(4460) =< s(4447)*s(4450) s(4452) =< s(4447)*s(4430) s(4461) =< s(4456) s(4462) =< s(4457) s(4463) =< s(4453) s(4464) =< s(4454) s(4465) =< s(4452) s(4466) =< s(4432) s(4467) =< s(4432) s(4468) =< s(4433) s(4468) =< s(4432) s(4466) =< s(4468)+s(4468)+s(4432) s(4467) =< s(4468)+s(4468)+s(4432) s(4469) =< s(4468)+s(4468)+s(4432) s(4470) =< s(4468)+s(4468)+s(4432) s(4471) =< s(4467)*s(4448) s(4472) =< s(4467)*s(4449) s(4470) =< s(4467)*s(4448) s(4473) =< s(4467)*s(4449) s(4474) =< s(4466) s(4475) =< s(4467)*s(4450) s(4469) =< s(4467)*s(4430) s(4476) =< s(4471) s(4477) =< s(4472) s(4478) =< s(4470) s(4479) =< s(4469) s(4480) =< s(4432) s(4481) =< s(4432) s(4480) =< s(4432)+s(4432) s(4481) =< s(4432)+s(4432) s(4482) =< s(4480) s(4483) =< s(4432) s(4484) =< s(4432) s(4483) =< s(4433)+s(4432) s(4484) =< s(4433)+s(4432) s(4485) =< s(4483) s(4486) =< s(4433) s(4487) =< s(4433) s(4486) =< aux(513)+s(4433) s(4487) =< aux(513)+s(4433) s(4488) =< s(4486) s(4489) =< s(4435) s(4490) =< aux(514) s(4491) =< s(4434) s(4492) =< s(4434) s(4493) =< s(4434) s(4492) =< aux(514)+s(4434) s(4493) =< aux(514)+s(4434) s(4494) =< s(4492) s(4495) =< s(4434) s(4496) =< s(4434) s(4495) =< aux(514)+s(4435) s(4496) =< aux(514)+s(4435) s(4497) =< s(4495) s(4498) =< s(4436) s(4499) =< s(4436) s(4500) =< s(4436) s(4498) =< s(4435)+s(4435)+s(4434) s(4499) =< s(4435)+s(4435)+s(4434) s(4501) =< s(4500)*s(4429) s(4502) =< s(4435)+s(4435)+s(4434) s(4503) =< s(4435)+s(4435)+s(4434) s(4504) =< s(4500)*s(4448) s(4505) =< s(4500)*s(4448) s(4506) =< s(4499)*s(4448) s(4507) =< s(4499)*s(4431) s(4503) =< s(4499)*s(4448) s(4508) =< s(4499)*s(4431) s(4509) =< s(4498) s(4510) =< s(4499)*s(4450) s(4502) =< s(4499)*aux(513) s(4511) =< s(4506) s(4512) =< s(4507) s(4513) =< s(4503) s(4514) =< s(4504) s(4515) =< s(4502) s(4516) =< s(4436) s(4517) =< s(4436) s(4516) =< aux(514)+s(4436) s(4517) =< aux(514)+s(4436) s(4518) =< s(4516) s(4519) =< s(4436) s(4520) =< s(4436) s(4521) =< s(4435) s(4521) =< s(4434) s(4519) =< s(4521)+s(4521)+s(4434) s(4520) =< s(4521)+s(4521)+s(4434) s(4522) =< s(4521)+s(4521)+s(4434) s(4523) =< s(4521)+s(4521)+s(4434) s(4524) =< s(4520)*s(4448) s(4525) =< s(4520)*s(4431) s(4523) =< s(4520)*s(4448) s(4526) =< s(4520)*s(4431) s(4527) =< s(4519) s(4528) =< s(4520)*s(4450) s(4522) =< s(4520)*aux(513) s(4529) =< s(4524) s(4530) =< s(4525) s(4531) =< s(4523) s(4532) =< s(4522) s(4533) =< s(4436) s(4534) =< s(4436) s(4533) =< s(4436)+s(4436) s(4534) =< s(4436)+s(4436) s(4535) =< s(4533) s(4536) =< s(4436) s(4537) =< s(4436) s(4536) =< s(4435)+s(4434) s(4537) =< s(4435)+s(4434) s(4538) =< s(4536) s(4539) =< s(4435) s(4540) =< s(4435) s(4539) =< aux(514)+s(4435) s(4540) =< aux(514)+s(4435) s(4541) =< s(4539) s(4542) =< s(4436) s(4543) =< s(4436) s(4542) =< s(4434)+s(4434)+s(4435) s(4543) =< s(4434)+s(4434)+s(4435) s(4544) =< s(4434)+s(4434)+s(4435) s(4545) =< s(4434)+s(4434)+s(4435) s(4546) =< s(4543)*s(4448) s(4547) =< s(4543)*s(4449) s(4545) =< s(4543)*s(4448) s(4548) =< s(4543)*s(4449) s(4549) =< s(4542) s(4550) =< s(4543)*s(4450) s(4544) =< s(4543)*s(4430) s(4551) =< s(4546) s(4552) =< s(4547) s(4553) =< s(4545) s(4554) =< s(4544) with precondition: [Out=0,V1>=0,V>=0] * Chain [69]: 52*s(5207)+1914*s(5208)+12*s(5217)+648*s(5218)+4588*s(5219)+540*s(5221)+108*s(5222)+120*s(5224)+24*s(5225)+2592*s(5227)+168*s(5231)+168*s(5235)+288*s(5238)+864*s(5239)+144*s(5240)+4032*s(5241)+1152*s(5242)+432*s(5243)+672*s(5244)+432*s(5245)+432*s(5247)+48*s(5253)+144*s(5254)+24*s(5255)+672*s(5256)+192*s(5257)+72*s(5258)+72*s(5259)+60*s(5261)+12*s(5262)+60*s(5264)+12*s(5265)+60*s(5267)+12*s(5268)+600*s(5269)+1844*s(5270)+928*s(5271)+180*s(5273)+36*s(5274)+120*s(5276)+24*s(5277)+2232*s(5279)+3524*s(5280)+156*s(5281)+156*s(5285)+248*s(5288)+744*s(5289)+124*s(5290)+3472*s(5291)+992*s(5292)+372*s(5293)+624*s(5294)+372*s(5295)+360*s(5297)+72*s(5298)+432*s(5300)+48*s(5306)+144*s(5307)+24*s(5308)+672*s(5309)+192*s(5310)+72*s(5311)+72*s(5312)+60*s(5314)+12*s(5315)+60*s(5317)+12*s(5318)+60*s(5320)+12*s(5321)+144*s(5323)+16*s(5328)+48*s(5329)+8*s(5330)+224*s(5331)+64*s(5332)+24*s(5333)+24*s(5334)+39*s(5337)+1434*s(5338)+9*s(5347)+486*s(5348)+3441*s(5349)+405*s(5351)+81*s(5352)+90*s(5354)+18*s(5355)+1944*s(5357)+126*s(5361)+126*s(5365)+216*s(5368)+648*s(5369)+108*s(5370)+3024*s(5371)+864*s(5372)+324*s(5373)+504*s(5374)+324*s(5375)+324*s(5377)+36*s(5383)+108*s(5384)+18*s(5385)+504*s(5386)+144*s(5387)+54*s(5388)+54*s(5389)+45*s(5391)+9*s(5392)+45*s(5394)+9*s(5395)+45*s(5397)+9*s(5398)+450*s(5399)+1383*s(5400)+696*s(5401)+135*s(5403)+27*s(5404)+90*s(5406)+18*s(5407)+1674*s(5409)+2643*s(5410)+117*s(5411)+117*s(5415)+186*s(5418)+558*s(5419)+93*s(5420)+2604*s(5421)+744*s(5422)+279*s(5423)+468*s(5424)+279*s(5425)+270*s(5427)+54*s(5428)+324*s(5430)+36*s(5436)+108*s(5437)+18*s(5438)+504*s(5439)+144*s(5440)+54*s(5441)+54*s(5442)+45*s(5444)+9*s(5445)+45*s(5447)+9*s(5448)+45*s(5450)+9*s(5451)+108*s(5453)+12*s(5458)+36*s(5459)+6*s(5460)+168*s(5461)+48*s(5462)+18*s(5463)+18*s(5464)+1 Such that:aux(517) =< V1 aux(518) =< V1/2 aux(519) =< V aux(520) =< V/2 s(5207) =< aux(519) s(5208) =< aux(519) s(5207) =< aux(520) s(5209) =< aux(519)+2 s(5210) =< aux(519)+1 s(5211) =< aux(519) s(5212) =< s(5208)*s(5209) s(5213) =< s(5208)*s(5210) s(5214) =< s(5207)*s(5210) s(5215) =< s(5207)*s(5211) s(5216) =< s(5207)*s(5209) s(5217) =< s(5207)*s(5211) s(5218) =< s(5213) s(5219) =< s(5212) s(5220) =< s(5212) s(5221) =< s(5212) s(5220) =< aux(519)+s(5212) s(5221) =< aux(519)+s(5212) s(5222) =< s(5220) s(5223) =< s(5212) s(5224) =< s(5212) s(5223) =< aux(519)+s(5213) s(5224) =< aux(519)+s(5213) s(5225) =< s(5223) s(5226) =< s(5212) s(5227) =< s(5212) s(5228) =< s(5209) s(5229) =< s(5210) s(5230) =< s(5209)-1 s(5226) =< s(5213)+s(5213)+s(5212) s(5227) =< s(5213)+s(5213)+s(5212) s(5231) =< s(5219)*s(5209) s(5232) =< s(5213)+s(5213)+s(5212) s(5233) =< s(5213)+s(5213)+s(5212) s(5234) =< s(5219)*s(5228) s(5235) =< s(5219)*s(5228) s(5236) =< s(5227)*s(5228) s(5237) =< s(5227)*s(5229) s(5233) =< s(5227)*s(5228) s(5238) =< s(5227)*s(5229) s(5239) =< s(5226) s(5240) =< s(5227)*s(5230) s(5232) =< s(5227)*s(5210) s(5241) =< s(5236) s(5242) =< s(5237) s(5243) =< s(5233) s(5244) =< s(5234) s(5245) =< s(5232) s(5246) =< s(5212) s(5247) =< s(5212) s(5248) =< s(5213) s(5248) =< s(5212) s(5246) =< s(5248)+s(5248)+s(5212) s(5247) =< s(5248)+s(5248)+s(5212) s(5249) =< s(5248)+s(5248)+s(5212) s(5250) =< s(5248)+s(5248)+s(5212) s(5251) =< s(5247)*s(5228) s(5252) =< s(5247)*s(5229) s(5250) =< s(5247)*s(5228) s(5253) =< s(5247)*s(5229) s(5254) =< s(5246) s(5255) =< s(5247)*s(5230) s(5249) =< s(5247)*s(5210) s(5256) =< s(5251) s(5257) =< s(5252) s(5258) =< s(5250) s(5259) =< s(5249) s(5260) =< s(5212) s(5261) =< s(5212) s(5260) =< s(5212)+s(5212) s(5261) =< s(5212)+s(5212) s(5262) =< s(5260) s(5263) =< s(5212) s(5264) =< s(5212) s(5263) =< s(5213)+s(5212) s(5264) =< s(5213)+s(5212) s(5265) =< s(5263) s(5266) =< s(5213) s(5267) =< s(5213) s(5266) =< aux(519)+s(5213) s(5267) =< aux(519)+s(5213) s(5268) =< s(5266) s(5269) =< s(5215) s(5270) =< aux(520) s(5271) =< s(5214) s(5272) =< s(5214) s(5273) =< s(5214) s(5272) =< aux(520)+s(5214) s(5273) =< aux(520)+s(5214) s(5274) =< s(5272) s(5275) =< s(5214) s(5276) =< s(5214) s(5275) =< aux(520)+s(5215) s(5276) =< aux(520)+s(5215) s(5277) =< s(5275) s(5278) =< s(5216) s(5279) =< s(5216) s(5280) =< s(5216) s(5278) =< s(5215)+s(5215)+s(5214) s(5279) =< s(5215)+s(5215)+s(5214) s(5281) =< s(5280)*s(5209) s(5282) =< s(5215)+s(5215)+s(5214) s(5283) =< s(5215)+s(5215)+s(5214) s(5284) =< s(5280)*s(5228) s(5285) =< s(5280)*s(5228) s(5286) =< s(5279)*s(5228) s(5287) =< s(5279)*s(5211) s(5283) =< s(5279)*s(5228) s(5288) =< s(5279)*s(5211) s(5289) =< s(5278) s(5290) =< s(5279)*s(5230) s(5282) =< s(5279)*aux(519) s(5291) =< s(5286) s(5292) =< s(5287) s(5293) =< s(5283) s(5294) =< s(5284) s(5295) =< s(5282) s(5296) =< s(5216) s(5297) =< s(5216) s(5296) =< aux(520)+s(5216) s(5297) =< aux(520)+s(5216) s(5298) =< s(5296) s(5299) =< s(5216) s(5300) =< s(5216) s(5301) =< s(5215) s(5301) =< s(5214) s(5299) =< s(5301)+s(5301)+s(5214) s(5300) =< s(5301)+s(5301)+s(5214) s(5302) =< s(5301)+s(5301)+s(5214) s(5303) =< s(5301)+s(5301)+s(5214) s(5304) =< s(5300)*s(5228) s(5305) =< s(5300)*s(5211) s(5303) =< s(5300)*s(5228) s(5306) =< s(5300)*s(5211) s(5307) =< s(5299) s(5308) =< s(5300)*s(5230) s(5302) =< s(5300)*aux(519) s(5309) =< s(5304) s(5310) =< s(5305) s(5311) =< s(5303) s(5312) =< s(5302) s(5313) =< s(5216) s(5314) =< s(5216) s(5313) =< s(5216)+s(5216) s(5314) =< s(5216)+s(5216) s(5315) =< s(5313) s(5316) =< s(5216) s(5317) =< s(5216) s(5316) =< s(5215)+s(5214) s(5317) =< s(5215)+s(5214) s(5318) =< s(5316) s(5319) =< s(5215) s(5320) =< s(5215) s(5319) =< aux(520)+s(5215) s(5320) =< aux(520)+s(5215) s(5321) =< s(5319) s(5322) =< s(5216) s(5323) =< s(5216) s(5322) =< s(5214)+s(5214)+s(5215) s(5323) =< s(5214)+s(5214)+s(5215) s(5324) =< s(5214)+s(5214)+s(5215) s(5325) =< s(5214)+s(5214)+s(5215) s(5326) =< s(5323)*s(5228) s(5327) =< s(5323)*s(5229) s(5325) =< s(5323)*s(5228) s(5328) =< s(5323)*s(5229) s(5329) =< s(5322) s(5330) =< s(5323)*s(5230) s(5324) =< s(5323)*s(5210) s(5331) =< s(5326) s(5332) =< s(5327) s(5333) =< s(5325) s(5334) =< s(5324) s(5337) =< aux(517) s(5338) =< aux(517) s(5337) =< aux(518) s(5339) =< aux(517)+2 s(5340) =< aux(517)+1 s(5341) =< aux(517) s(5342) =< s(5338)*s(5339) s(5343) =< s(5338)*s(5340) s(5344) =< s(5337)*s(5340) s(5345) =< s(5337)*s(5341) s(5346) =< s(5337)*s(5339) s(5347) =< s(5337)*s(5341) s(5348) =< s(5343) s(5349) =< s(5342) s(5350) =< s(5342) s(5351) =< s(5342) s(5350) =< aux(517)+s(5342) s(5351) =< aux(517)+s(5342) s(5352) =< s(5350) s(5353) =< s(5342) s(5354) =< s(5342) s(5353) =< aux(517)+s(5343) s(5354) =< aux(517)+s(5343) s(5355) =< s(5353) s(5356) =< s(5342) s(5357) =< s(5342) s(5358) =< s(5339) s(5359) =< s(5340) s(5360) =< s(5339)-1 s(5356) =< s(5343)+s(5343)+s(5342) s(5357) =< s(5343)+s(5343)+s(5342) s(5361) =< s(5349)*s(5339) s(5362) =< s(5343)+s(5343)+s(5342) s(5363) =< s(5343)+s(5343)+s(5342) s(5364) =< s(5349)*s(5358) s(5365) =< s(5349)*s(5358) s(5366) =< s(5357)*s(5358) s(5367) =< s(5357)*s(5359) s(5363) =< s(5357)*s(5358) s(5368) =< s(5357)*s(5359) s(5369) =< s(5356) s(5370) =< s(5357)*s(5360) s(5362) =< s(5357)*s(5340) s(5371) =< s(5366) s(5372) =< s(5367) s(5373) =< s(5363) s(5374) =< s(5364) s(5375) =< s(5362) s(5376) =< s(5342) s(5377) =< s(5342) s(5378) =< s(5343) s(5378) =< s(5342) s(5376) =< s(5378)+s(5378)+s(5342) s(5377) =< s(5378)+s(5378)+s(5342) s(5379) =< s(5378)+s(5378)+s(5342) s(5380) =< s(5378)+s(5378)+s(5342) s(5381) =< s(5377)*s(5358) s(5382) =< s(5377)*s(5359) s(5380) =< s(5377)*s(5358) s(5383) =< s(5377)*s(5359) s(5384) =< s(5376) s(5385) =< s(5377)*s(5360) s(5379) =< s(5377)*s(5340) s(5386) =< s(5381) s(5387) =< s(5382) s(5388) =< s(5380) s(5389) =< s(5379) s(5390) =< s(5342) s(5391) =< s(5342) s(5390) =< s(5342)+s(5342) s(5391) =< s(5342)+s(5342) s(5392) =< s(5390) s(5393) =< s(5342) s(5394) =< s(5342) s(5393) =< s(5343)+s(5342) s(5394) =< s(5343)+s(5342) s(5395) =< s(5393) s(5396) =< s(5343) s(5397) =< s(5343) s(5396) =< aux(517)+s(5343) s(5397) =< aux(517)+s(5343) s(5398) =< s(5396) s(5399) =< s(5345) s(5400) =< aux(518) s(5401) =< s(5344) s(5402) =< s(5344) s(5403) =< s(5344) s(5402) =< aux(518)+s(5344) s(5403) =< aux(518)+s(5344) s(5404) =< s(5402) s(5405) =< s(5344) s(5406) =< s(5344) s(5405) =< aux(518)+s(5345) s(5406) =< aux(518)+s(5345) s(5407) =< s(5405) s(5408) =< s(5346) s(5409) =< s(5346) s(5410) =< s(5346) s(5408) =< s(5345)+s(5345)+s(5344) s(5409) =< s(5345)+s(5345)+s(5344) s(5411) =< s(5410)*s(5339) s(5412) =< s(5345)+s(5345)+s(5344) s(5413) =< s(5345)+s(5345)+s(5344) s(5414) =< s(5410)*s(5358) s(5415) =< s(5410)*s(5358) s(5416) =< s(5409)*s(5358) s(5417) =< s(5409)*s(5341) s(5413) =< s(5409)*s(5358) s(5418) =< s(5409)*s(5341) s(5419) =< s(5408) s(5420) =< s(5409)*s(5360) s(5412) =< s(5409)*aux(517) s(5421) =< s(5416) s(5422) =< s(5417) s(5423) =< s(5413) s(5424) =< s(5414) s(5425) =< s(5412) s(5426) =< s(5346) s(5427) =< s(5346) s(5426) =< aux(518)+s(5346) s(5427) =< aux(518)+s(5346) s(5428) =< s(5426) s(5429) =< s(5346) s(5430) =< s(5346) s(5431) =< s(5345) s(5431) =< s(5344) s(5429) =< s(5431)+s(5431)+s(5344) s(5430) =< s(5431)+s(5431)+s(5344) s(5432) =< s(5431)+s(5431)+s(5344) s(5433) =< s(5431)+s(5431)+s(5344) s(5434) =< s(5430)*s(5358) s(5435) =< s(5430)*s(5341) s(5433) =< s(5430)*s(5358) s(5436) =< s(5430)*s(5341) s(5437) =< s(5429) s(5438) =< s(5430)*s(5360) s(5432) =< s(5430)*aux(517) s(5439) =< s(5434) s(5440) =< s(5435) s(5441) =< s(5433) s(5442) =< s(5432) s(5443) =< s(5346) s(5444) =< s(5346) s(5443) =< s(5346)+s(5346) s(5444) =< s(5346)+s(5346) s(5445) =< s(5443) s(5446) =< s(5346) s(5447) =< s(5346) s(5446) =< s(5345)+s(5344) s(5447) =< s(5345)+s(5344) s(5448) =< s(5446) s(5449) =< s(5345) s(5450) =< s(5345) s(5449) =< aux(518)+s(5345) s(5450) =< aux(518)+s(5345) s(5451) =< s(5449) s(5452) =< s(5346) s(5453) =< s(5346) s(5452) =< s(5344)+s(5344)+s(5345) s(5453) =< s(5344)+s(5344)+s(5345) s(5454) =< s(5344)+s(5344)+s(5345) s(5455) =< s(5344)+s(5344)+s(5345) s(5456) =< s(5453)*s(5358) s(5457) =< s(5453)*s(5359) s(5455) =< s(5453)*s(5358) s(5458) =< s(5453)*s(5359) s(5459) =< s(5452) s(5460) =< s(5453)*s(5360) s(5454) =< s(5453)*s(5340) s(5461) =< s(5456) s(5462) =< s(5457) s(5463) =< s(5455) s(5464) =< s(5454) with precondition: [V1>=0,V>=1,Out>=0,V>=Out] * Chain [68]: 39*s(6119)+1434*s(6120)+9*s(6129)+486*s(6130)+3441*s(6131)+405*s(6133)+81*s(6134)+90*s(6136)+18*s(6137)+1944*s(6139)+126*s(6143)+126*s(6147)+216*s(6150)+648*s(6151)+108*s(6152)+3024*s(6153)+864*s(6154)+324*s(6155)+504*s(6156)+324*s(6157)+324*s(6159)+36*s(6165)+108*s(6166)+18*s(6167)+504*s(6168)+144*s(6169)+54*s(6170)+54*s(6171)+45*s(6173)+9*s(6174)+45*s(6176)+9*s(6177)+45*s(6179)+9*s(6180)+450*s(6181)+1383*s(6182)+696*s(6183)+135*s(6185)+27*s(6186)+90*s(6188)+18*s(6189)+1674*s(6191)+2643*s(6192)+117*s(6193)+117*s(6197)+186*s(6200)+558*s(6201)+93*s(6202)+2604*s(6203)+744*s(6204)+279*s(6205)+468*s(6206)+279*s(6207)+270*s(6209)+54*s(6210)+324*s(6212)+36*s(6218)+108*s(6219)+18*s(6220)+504*s(6221)+144*s(6222)+54*s(6223)+54*s(6224)+45*s(6226)+9*s(6227)+45*s(6229)+9*s(6230)+45*s(6232)+9*s(6233)+108*s(6235)+12*s(6240)+36*s(6241)+6*s(6242)+168*s(6243)+48*s(6244)+18*s(6245)+18*s(6246)+26*s(6379)+957*s(6380)+6*s(6389)+324*s(6390)+2294*s(6391)+270*s(6393)+54*s(6394)+60*s(6396)+12*s(6397)+1296*s(6399)+84*s(6403)+84*s(6407)+144*s(6410)+432*s(6411)+72*s(6412)+2016*s(6413)+576*s(6414)+216*s(6415)+336*s(6416)+216*s(6417)+216*s(6419)+24*s(6425)+72*s(6426)+12*s(6427)+336*s(6428)+96*s(6429)+36*s(6430)+36*s(6431)+30*s(6433)+6*s(6434)+30*s(6436)+6*s(6437)+30*s(6439)+6*s(6440)+300*s(6441)+922*s(6442)+464*s(6443)+90*s(6445)+18*s(6446)+60*s(6448)+12*s(6449)+1116*s(6451)+1762*s(6452)+78*s(6453)+78*s(6457)+124*s(6460)+372*s(6461)+62*s(6462)+1736*s(6463)+496*s(6464)+186*s(6465)+312*s(6466)+186*s(6467)+180*s(6469)+36*s(6470)+216*s(6472)+24*s(6478)+72*s(6479)+12*s(6480)+336*s(6481)+96*s(6482)+36*s(6483)+36*s(6484)+30*s(6486)+6*s(6487)+30*s(6489)+6*s(6490)+30*s(6492)+6*s(6493)+72*s(6495)+8*s(6500)+24*s(6501)+4*s(6502)+112*s(6503)+32*s(6504)+12*s(6505)+12*s(6506)+1 Such that:aux(522) =< V1 aux(523) =< V1/2 aux(524) =< V aux(525) =< V/2 s(6119) =< aux(522) s(6120) =< aux(522) s(6119) =< aux(523) s(6121) =< aux(522)+2 s(6122) =< aux(522)+1 s(6123) =< aux(522) s(6124) =< s(6120)*s(6121) s(6125) =< s(6120)*s(6122) s(6126) =< s(6119)*s(6122) s(6127) =< s(6119)*s(6123) s(6128) =< s(6119)*s(6121) s(6129) =< s(6119)*s(6123) s(6130) =< s(6125) s(6131) =< s(6124) s(6132) =< s(6124) s(6133) =< s(6124) s(6132) =< aux(522)+s(6124) s(6133) =< aux(522)+s(6124) s(6134) =< s(6132) s(6135) =< s(6124) s(6136) =< s(6124) s(6135) =< aux(522)+s(6125) s(6136) =< aux(522)+s(6125) s(6137) =< s(6135) s(6138) =< s(6124) s(6139) =< s(6124) s(6140) =< s(6121) s(6141) =< s(6122) s(6142) =< s(6121)-1 s(6138) =< s(6125)+s(6125)+s(6124) s(6139) =< s(6125)+s(6125)+s(6124) s(6143) =< s(6131)*s(6121) s(6144) =< s(6125)+s(6125)+s(6124) s(6145) =< s(6125)+s(6125)+s(6124) s(6146) =< s(6131)*s(6140) s(6147) =< s(6131)*s(6140) s(6148) =< s(6139)*s(6140) s(6149) =< s(6139)*s(6141) s(6145) =< s(6139)*s(6140) s(6150) =< s(6139)*s(6141) s(6151) =< s(6138) s(6152) =< s(6139)*s(6142) s(6144) =< s(6139)*s(6122) s(6153) =< s(6148) s(6154) =< s(6149) s(6155) =< s(6145) s(6156) =< s(6146) s(6157) =< s(6144) s(6158) =< s(6124) s(6159) =< s(6124) s(6160) =< s(6125) s(6160) =< s(6124) s(6158) =< s(6160)+s(6160)+s(6124) s(6159) =< s(6160)+s(6160)+s(6124) s(6161) =< s(6160)+s(6160)+s(6124) s(6162) =< s(6160)+s(6160)+s(6124) s(6163) =< s(6159)*s(6140) s(6164) =< s(6159)*s(6141) s(6162) =< s(6159)*s(6140) s(6165) =< s(6159)*s(6141) s(6166) =< s(6158) s(6167) =< s(6159)*s(6142) s(6161) =< s(6159)*s(6122) s(6168) =< s(6163) s(6169) =< s(6164) s(6170) =< s(6162) s(6171) =< s(6161) s(6172) =< s(6124) s(6173) =< s(6124) s(6172) =< s(6124)+s(6124) s(6173) =< s(6124)+s(6124) s(6174) =< s(6172) s(6175) =< s(6124) s(6176) =< s(6124) s(6175) =< s(6125)+s(6124) s(6176) =< s(6125)+s(6124) s(6177) =< s(6175) s(6178) =< s(6125) s(6179) =< s(6125) s(6178) =< aux(522)+s(6125) s(6179) =< aux(522)+s(6125) s(6180) =< s(6178) s(6181) =< s(6127) s(6182) =< aux(523) s(6183) =< s(6126) s(6184) =< s(6126) s(6185) =< s(6126) s(6184) =< aux(523)+s(6126) s(6185) =< aux(523)+s(6126) s(6186) =< s(6184) s(6187) =< s(6126) s(6188) =< s(6126) s(6187) =< aux(523)+s(6127) s(6188) =< aux(523)+s(6127) s(6189) =< s(6187) s(6190) =< s(6128) s(6191) =< s(6128) s(6192) =< s(6128) s(6190) =< s(6127)+s(6127)+s(6126) s(6191) =< s(6127)+s(6127)+s(6126) s(6193) =< s(6192)*s(6121) s(6194) =< s(6127)+s(6127)+s(6126) s(6195) =< s(6127)+s(6127)+s(6126) s(6196) =< s(6192)*s(6140) s(6197) =< s(6192)*s(6140) s(6198) =< s(6191)*s(6140) s(6199) =< s(6191)*s(6123) s(6195) =< s(6191)*s(6140) s(6200) =< s(6191)*s(6123) s(6201) =< s(6190) s(6202) =< s(6191)*s(6142) s(6194) =< s(6191)*aux(522) s(6203) =< s(6198) s(6204) =< s(6199) s(6205) =< s(6195) s(6206) =< s(6196) s(6207) =< s(6194) s(6208) =< s(6128) s(6209) =< s(6128) s(6208) =< aux(523)+s(6128) s(6209) =< aux(523)+s(6128) s(6210) =< s(6208) s(6211) =< s(6128) s(6212) =< s(6128) s(6213) =< s(6127) s(6213) =< s(6126) s(6211) =< s(6213)+s(6213)+s(6126) s(6212) =< s(6213)+s(6213)+s(6126) s(6214) =< s(6213)+s(6213)+s(6126) s(6215) =< s(6213)+s(6213)+s(6126) s(6216) =< s(6212)*s(6140) s(6217) =< s(6212)*s(6123) s(6215) =< s(6212)*s(6140) s(6218) =< s(6212)*s(6123) s(6219) =< s(6211) s(6220) =< s(6212)*s(6142) s(6214) =< s(6212)*aux(522) s(6221) =< s(6216) s(6222) =< s(6217) s(6223) =< s(6215) s(6224) =< s(6214) s(6225) =< s(6128) s(6226) =< s(6128) s(6225) =< s(6128)+s(6128) s(6226) =< s(6128)+s(6128) s(6227) =< s(6225) s(6228) =< s(6128) s(6229) =< s(6128) s(6228) =< s(6127)+s(6126) s(6229) =< s(6127)+s(6126) s(6230) =< s(6228) s(6231) =< s(6127) s(6232) =< s(6127) s(6231) =< aux(523)+s(6127) s(6232) =< aux(523)+s(6127) s(6233) =< s(6231) s(6234) =< s(6128) s(6235) =< s(6128) s(6234) =< s(6126)+s(6126)+s(6127) s(6235) =< s(6126)+s(6126)+s(6127) s(6236) =< s(6126)+s(6126)+s(6127) s(6237) =< s(6126)+s(6126)+s(6127) s(6238) =< s(6235)*s(6140) s(6239) =< s(6235)*s(6141) s(6237) =< s(6235)*s(6140) s(6240) =< s(6235)*s(6141) s(6241) =< s(6234) s(6242) =< s(6235)*s(6142) s(6236) =< s(6235)*s(6122) s(6243) =< s(6238) s(6244) =< s(6239) s(6245) =< s(6237) s(6246) =< s(6236) s(6379) =< aux(524) s(6380) =< aux(524) s(6379) =< aux(525) s(6381) =< aux(524)+2 s(6382) =< aux(524)+1 s(6383) =< aux(524) s(6384) =< s(6380)*s(6381) s(6385) =< s(6380)*s(6382) s(6386) =< s(6379)*s(6382) s(6387) =< s(6379)*s(6383) s(6388) =< s(6379)*s(6381) s(6389) =< s(6379)*s(6383) s(6390) =< s(6385) s(6391) =< s(6384) s(6392) =< s(6384) s(6393) =< s(6384) s(6392) =< aux(524)+s(6384) s(6393) =< aux(524)+s(6384) s(6394) =< s(6392) s(6395) =< s(6384) s(6396) =< s(6384) s(6395) =< aux(524)+s(6385) s(6396) =< aux(524)+s(6385) s(6397) =< s(6395) s(6398) =< s(6384) s(6399) =< s(6384) s(6400) =< s(6381) s(6401) =< s(6382) s(6402) =< s(6381)-1 s(6398) =< s(6385)+s(6385)+s(6384) s(6399) =< s(6385)+s(6385)+s(6384) s(6403) =< s(6391)*s(6381) s(6404) =< s(6385)+s(6385)+s(6384) s(6405) =< s(6385)+s(6385)+s(6384) s(6406) =< s(6391)*s(6400) s(6407) =< s(6391)*s(6400) s(6408) =< s(6399)*s(6400) s(6409) =< s(6399)*s(6401) s(6405) =< s(6399)*s(6400) s(6410) =< s(6399)*s(6401) s(6411) =< s(6398) s(6412) =< s(6399)*s(6402) s(6404) =< s(6399)*s(6382) s(6413) =< s(6408) s(6414) =< s(6409) s(6415) =< s(6405) s(6416) =< s(6406) s(6417) =< s(6404) s(6418) =< s(6384) s(6419) =< s(6384) s(6420) =< s(6385) s(6420) =< s(6384) s(6418) =< s(6420)+s(6420)+s(6384) s(6419) =< s(6420)+s(6420)+s(6384) s(6421) =< s(6420)+s(6420)+s(6384) s(6422) =< s(6420)+s(6420)+s(6384) s(6423) =< s(6419)*s(6400) s(6424) =< s(6419)*s(6401) s(6422) =< s(6419)*s(6400) s(6425) =< s(6419)*s(6401) s(6426) =< s(6418) s(6427) =< s(6419)*s(6402) s(6421) =< s(6419)*s(6382) s(6428) =< s(6423) s(6429) =< s(6424) s(6430) =< s(6422) s(6431) =< s(6421) s(6432) =< s(6384) s(6433) =< s(6384) s(6432) =< s(6384)+s(6384) s(6433) =< s(6384)+s(6384) s(6434) =< s(6432) s(6435) =< s(6384) s(6436) =< s(6384) s(6435) =< s(6385)+s(6384) s(6436) =< s(6385)+s(6384) s(6437) =< s(6435) s(6438) =< s(6385) s(6439) =< s(6385) s(6438) =< aux(524)+s(6385) s(6439) =< aux(524)+s(6385) s(6440) =< s(6438) s(6441) =< s(6387) s(6442) =< aux(525) s(6443) =< s(6386) s(6444) =< s(6386) s(6445) =< s(6386) s(6444) =< aux(525)+s(6386) s(6445) =< aux(525)+s(6386) s(6446) =< s(6444) s(6447) =< s(6386) s(6448) =< s(6386) s(6447) =< aux(525)+s(6387) s(6448) =< aux(525)+s(6387) s(6449) =< s(6447) s(6450) =< s(6388) s(6451) =< s(6388) s(6452) =< s(6388) s(6450) =< s(6387)+s(6387)+s(6386) s(6451) =< s(6387)+s(6387)+s(6386) s(6453) =< s(6452)*s(6381) s(6454) =< s(6387)+s(6387)+s(6386) s(6455) =< s(6387)+s(6387)+s(6386) s(6456) =< s(6452)*s(6400) s(6457) =< s(6452)*s(6400) s(6458) =< s(6451)*s(6400) s(6459) =< s(6451)*s(6383) s(6455) =< s(6451)*s(6400) s(6460) =< s(6451)*s(6383) s(6461) =< s(6450) s(6462) =< s(6451)*s(6402) s(6454) =< s(6451)*aux(524) s(6463) =< s(6458) s(6464) =< s(6459) s(6465) =< s(6455) s(6466) =< s(6456) s(6467) =< s(6454) s(6468) =< s(6388) s(6469) =< s(6388) s(6468) =< aux(525)+s(6388) s(6469) =< aux(525)+s(6388) s(6470) =< s(6468) s(6471) =< s(6388) s(6472) =< s(6388) s(6473) =< s(6387) s(6473) =< s(6386) s(6471) =< s(6473)+s(6473)+s(6386) s(6472) =< s(6473)+s(6473)+s(6386) s(6474) =< s(6473)+s(6473)+s(6386) s(6475) =< s(6473)+s(6473)+s(6386) s(6476) =< s(6472)*s(6400) s(6477) =< s(6472)*s(6383) s(6475) =< s(6472)*s(6400) s(6478) =< s(6472)*s(6383) s(6479) =< s(6471) s(6480) =< s(6472)*s(6402) s(6474) =< s(6472)*aux(524) s(6481) =< s(6476) s(6482) =< s(6477) s(6483) =< s(6475) s(6484) =< s(6474) s(6485) =< s(6388) s(6486) =< s(6388) s(6485) =< s(6388)+s(6388) s(6486) =< s(6388)+s(6388) s(6487) =< s(6485) s(6488) =< s(6388) s(6489) =< s(6388) s(6488) =< s(6387)+s(6386) s(6489) =< s(6387)+s(6386) s(6490) =< s(6488) s(6491) =< s(6387) s(6492) =< s(6387) s(6491) =< aux(525)+s(6387) s(6492) =< aux(525)+s(6387) s(6493) =< s(6491) s(6494) =< s(6388) s(6495) =< s(6388) s(6494) =< s(6386)+s(6386)+s(6387) s(6495) =< s(6386)+s(6386)+s(6387) s(6496) =< s(6386)+s(6386)+s(6387) s(6497) =< s(6386)+s(6386)+s(6387) s(6498) =< s(6495)*s(6400) s(6499) =< s(6495)*s(6401) s(6497) =< s(6495)*s(6400) s(6500) =< s(6495)*s(6401) s(6501) =< s(6494) s(6502) =< s(6495)*s(6402) s(6496) =< s(6495)*s(6382) s(6503) =< s(6498) s(6504) =< s(6499) s(6505) =< s(6497) s(6506) =< s(6496) with precondition: [V1>=1,V>=0,Out>=0,V1>=Out] #### Cost of chains of fun4(V1,V,Out): * Chain [72]: 39*s(6771)+1436*s(6772)+9*s(6781)+486*s(6782)+3441*s(6783)+405*s(6785)+81*s(6786)+90*s(6788)+18*s(6789)+1944*s(6791)+126*s(6795)+126*s(6799)+216*s(6802)+648*s(6803)+108*s(6804)+3024*s(6805)+864*s(6806)+324*s(6807)+504*s(6808)+324*s(6809)+324*s(6811)+36*s(6817)+108*s(6818)+18*s(6819)+504*s(6820)+144*s(6821)+54*s(6822)+54*s(6823)+45*s(6825)+9*s(6826)+45*s(6828)+9*s(6829)+45*s(6831)+9*s(6832)+450*s(6833)+1383*s(6834)+696*s(6835)+135*s(6837)+27*s(6838)+90*s(6840)+18*s(6841)+1674*s(6843)+2643*s(6844)+117*s(6845)+117*s(6849)+186*s(6852)+558*s(6853)+93*s(6854)+2604*s(6855)+744*s(6856)+279*s(6857)+468*s(6858)+279*s(6859)+270*s(6861)+54*s(6862)+324*s(6864)+36*s(6870)+108*s(6871)+18*s(6872)+504*s(6873)+144*s(6874)+54*s(6875)+54*s(6876)+45*s(6878)+9*s(6879)+45*s(6881)+9*s(6882)+45*s(6884)+9*s(6885)+108*s(6887)+12*s(6892)+36*s(6893)+6*s(6894)+168*s(6895)+48*s(6896)+18*s(6897)+18*s(6898)+26*s(7032)+956*s(7033)+6*s(7042)+324*s(7043)+2294*s(7044)+270*s(7046)+54*s(7047)+60*s(7049)+12*s(7050)+1296*s(7052)+84*s(7056)+84*s(7060)+144*s(7063)+432*s(7064)+72*s(7065)+2016*s(7066)+576*s(7067)+216*s(7068)+336*s(7069)+216*s(7070)+216*s(7072)+24*s(7078)+72*s(7079)+12*s(7080)+336*s(7081)+96*s(7082)+36*s(7083)+36*s(7084)+30*s(7086)+6*s(7087)+30*s(7089)+6*s(7090)+30*s(7092)+6*s(7093)+300*s(7094)+922*s(7095)+464*s(7096)+90*s(7098)+18*s(7099)+60*s(7101)+12*s(7102)+1116*s(7104)+1762*s(7105)+78*s(7106)+78*s(7110)+124*s(7113)+372*s(7114)+62*s(7115)+1736*s(7116)+496*s(7117)+186*s(7118)+312*s(7119)+186*s(7120)+180*s(7122)+36*s(7123)+216*s(7125)+24*s(7131)+72*s(7132)+12*s(7133)+336*s(7134)+96*s(7135)+36*s(7136)+36*s(7137)+30*s(7139)+6*s(7140)+30*s(7142)+6*s(7143)+30*s(7145)+6*s(7146)+72*s(7148)+8*s(7153)+24*s(7154)+4*s(7155)+112*s(7156)+32*s(7157)+12*s(7158)+12*s(7159)+1 Such that:aux(528) =< V1 aux(529) =< V1/2 aux(530) =< V aux(531) =< V/2 s(7032) =< aux(528) s(7033) =< aux(528) s(7032) =< aux(529) s(7034) =< aux(528)+2 s(7035) =< aux(528)+1 s(7036) =< aux(528) s(7037) =< s(7033)*s(7034) s(7038) =< s(7033)*s(7035) s(7039) =< s(7032)*s(7035) s(7040) =< s(7032)*s(7036) s(7041) =< s(7032)*s(7034) s(7042) =< s(7032)*s(7036) s(7043) =< s(7038) s(7044) =< s(7037) s(7045) =< s(7037) s(7046) =< s(7037) s(7045) =< aux(528)+s(7037) s(7046) =< aux(528)+s(7037) s(7047) =< s(7045) s(7048) =< s(7037) s(7049) =< s(7037) s(7048) =< aux(528)+s(7038) s(7049) =< aux(528)+s(7038) s(7050) =< s(7048) s(7051) =< s(7037) s(7052) =< s(7037) s(7053) =< s(7034) s(7054) =< s(7035) s(7055) =< s(7034)-1 s(7051) =< s(7038)+s(7038)+s(7037) s(7052) =< s(7038)+s(7038)+s(7037) s(7056) =< s(7044)*s(7034) s(7057) =< s(7038)+s(7038)+s(7037) s(7058) =< s(7038)+s(7038)+s(7037) s(7059) =< s(7044)*s(7053) s(7060) =< s(7044)*s(7053) s(7061) =< s(7052)*s(7053) s(7062) =< s(7052)*s(7054) s(7058) =< s(7052)*s(7053) s(7063) =< s(7052)*s(7054) s(7064) =< s(7051) s(7065) =< s(7052)*s(7055) s(7057) =< s(7052)*s(7035) s(7066) =< s(7061) s(7067) =< s(7062) s(7068) =< s(7058) s(7069) =< s(7059) s(7070) =< s(7057) s(7071) =< s(7037) s(7072) =< s(7037) s(7073) =< s(7038) s(7073) =< s(7037) s(7071) =< s(7073)+s(7073)+s(7037) s(7072) =< s(7073)+s(7073)+s(7037) s(7074) =< s(7073)+s(7073)+s(7037) s(7075) =< s(7073)+s(7073)+s(7037) s(7076) =< s(7072)*s(7053) s(7077) =< s(7072)*s(7054) s(7075) =< s(7072)*s(7053) s(7078) =< s(7072)*s(7054) s(7079) =< s(7071) s(7080) =< s(7072)*s(7055) s(7074) =< s(7072)*s(7035) s(7081) =< s(7076) s(7082) =< s(7077) s(7083) =< s(7075) s(7084) =< s(7074) s(7085) =< s(7037) s(7086) =< s(7037) s(7085) =< s(7037)+s(7037) s(7086) =< s(7037)+s(7037) s(7087) =< s(7085) s(7088) =< s(7037) s(7089) =< s(7037) s(7088) =< s(7038)+s(7037) s(7089) =< s(7038)+s(7037) s(7090) =< s(7088) s(7091) =< s(7038) s(7092) =< s(7038) s(7091) =< aux(528)+s(7038) s(7092) =< aux(528)+s(7038) s(7093) =< s(7091) s(7094) =< s(7040) s(7095) =< aux(529) s(7096) =< s(7039) s(7097) =< s(7039) s(7098) =< s(7039) s(7097) =< aux(529)+s(7039) s(7098) =< aux(529)+s(7039) s(7099) =< s(7097) s(7100) =< s(7039) s(7101) =< s(7039) s(7100) =< aux(529)+s(7040) s(7101) =< aux(529)+s(7040) s(7102) =< s(7100) s(7103) =< s(7041) s(7104) =< s(7041) s(7105) =< s(7041) s(7103) =< s(7040)+s(7040)+s(7039) s(7104) =< s(7040)+s(7040)+s(7039) s(7106) =< s(7105)*s(7034) s(7107) =< s(7040)+s(7040)+s(7039) s(7108) =< s(7040)+s(7040)+s(7039) s(7109) =< s(7105)*s(7053) s(7110) =< s(7105)*s(7053) s(7111) =< s(7104)*s(7053) s(7112) =< s(7104)*s(7036) s(7108) =< s(7104)*s(7053) s(7113) =< s(7104)*s(7036) s(7114) =< s(7103) s(7115) =< s(7104)*s(7055) s(7107) =< s(7104)*aux(528) s(7116) =< s(7111) s(7117) =< s(7112) s(7118) =< s(7108) s(7119) =< s(7109) s(7120) =< s(7107) s(7121) =< s(7041) s(7122) =< s(7041) s(7121) =< aux(529)+s(7041) s(7122) =< aux(529)+s(7041) s(7123) =< s(7121) s(7124) =< s(7041) s(7125) =< s(7041) s(7126) =< s(7040) s(7126) =< s(7039) s(7124) =< s(7126)+s(7126)+s(7039) s(7125) =< s(7126)+s(7126)+s(7039) s(7127) =< s(7126)+s(7126)+s(7039) s(7128) =< s(7126)+s(7126)+s(7039) s(7129) =< s(7125)*s(7053) s(7130) =< s(7125)*s(7036) s(7128) =< s(7125)*s(7053) s(7131) =< s(7125)*s(7036) s(7132) =< s(7124) s(7133) =< s(7125)*s(7055) s(7127) =< s(7125)*aux(528) s(7134) =< s(7129) s(7135) =< s(7130) s(7136) =< s(7128) s(7137) =< s(7127) s(7138) =< s(7041) s(7139) =< s(7041) s(7138) =< s(7041)+s(7041) s(7139) =< s(7041)+s(7041) s(7140) =< s(7138) s(7141) =< s(7041) s(7142) =< s(7041) s(7141) =< s(7040)+s(7039) s(7142) =< s(7040)+s(7039) s(7143) =< s(7141) s(7144) =< s(7040) s(7145) =< s(7040) s(7144) =< aux(529)+s(7040) s(7145) =< aux(529)+s(7040) s(7146) =< s(7144) s(7147) =< s(7041) s(7148) =< s(7041) s(7147) =< s(7039)+s(7039)+s(7040) s(7148) =< s(7039)+s(7039)+s(7040) s(7149) =< s(7039)+s(7039)+s(7040) s(7150) =< s(7039)+s(7039)+s(7040) s(7151) =< s(7148)*s(7053) s(7152) =< s(7148)*s(7054) s(7150) =< s(7148)*s(7053) s(7153) =< s(7148)*s(7054) s(7154) =< s(7147) s(7155) =< s(7148)*s(7055) s(7149) =< s(7148)*s(7035) s(7156) =< s(7151) s(7157) =< s(7152) s(7158) =< s(7150) s(7159) =< s(7149) s(6772) =< aux(530) s(6771) =< aux(530) s(6771) =< aux(531) s(6773) =< aux(530)+2 s(6774) =< aux(530)+1 s(6775) =< aux(530) s(6776) =< s(6772)*s(6773) s(6777) =< s(6772)*s(6774) s(6778) =< s(6771)*s(6774) s(6779) =< s(6771)*s(6775) s(6780) =< s(6771)*s(6773) s(6781) =< s(6771)*s(6775) s(6782) =< s(6777) s(6783) =< s(6776) s(6784) =< s(6776) s(6785) =< s(6776) s(6784) =< aux(530)+s(6776) s(6785) =< aux(530)+s(6776) s(6786) =< s(6784) s(6787) =< s(6776) s(6788) =< s(6776) s(6787) =< aux(530)+s(6777) s(6788) =< aux(530)+s(6777) s(6789) =< s(6787) s(6790) =< s(6776) s(6791) =< s(6776) s(6792) =< s(6773) s(6793) =< s(6774) s(6794) =< s(6773)-1 s(6790) =< s(6777)+s(6777)+s(6776) s(6791) =< s(6777)+s(6777)+s(6776) s(6795) =< s(6783)*s(6773) s(6796) =< s(6777)+s(6777)+s(6776) s(6797) =< s(6777)+s(6777)+s(6776) s(6798) =< s(6783)*s(6792) s(6799) =< s(6783)*s(6792) s(6800) =< s(6791)*s(6792) s(6801) =< s(6791)*s(6793) s(6797) =< s(6791)*s(6792) s(6802) =< s(6791)*s(6793) s(6803) =< s(6790) s(6804) =< s(6791)*s(6794) s(6796) =< s(6791)*s(6774) s(6805) =< s(6800) s(6806) =< s(6801) s(6807) =< s(6797) s(6808) =< s(6798) s(6809) =< s(6796) s(6810) =< s(6776) s(6811) =< s(6776) s(6812) =< s(6777) s(6812) =< s(6776) s(6810) =< s(6812)+s(6812)+s(6776) s(6811) =< s(6812)+s(6812)+s(6776) s(6813) =< s(6812)+s(6812)+s(6776) s(6814) =< s(6812)+s(6812)+s(6776) s(6815) =< s(6811)*s(6792) s(6816) =< s(6811)*s(6793) s(6814) =< s(6811)*s(6792) s(6817) =< s(6811)*s(6793) s(6818) =< s(6810) s(6819) =< s(6811)*s(6794) s(6813) =< s(6811)*s(6774) s(6820) =< s(6815) s(6821) =< s(6816) s(6822) =< s(6814) s(6823) =< s(6813) s(6824) =< s(6776) s(6825) =< s(6776) s(6824) =< s(6776)+s(6776) s(6825) =< s(6776)+s(6776) s(6826) =< s(6824) s(6827) =< s(6776) s(6828) =< s(6776) s(6827) =< s(6777)+s(6776) s(6828) =< s(6777)+s(6776) s(6829) =< s(6827) s(6830) =< s(6777) s(6831) =< s(6777) s(6830) =< aux(530)+s(6777) s(6831) =< aux(530)+s(6777) s(6832) =< s(6830) s(6833) =< s(6779) s(6834) =< aux(531) s(6835) =< s(6778) s(6836) =< s(6778) s(6837) =< s(6778) s(6836) =< aux(531)+s(6778) s(6837) =< aux(531)+s(6778) s(6838) =< s(6836) s(6839) =< s(6778) s(6840) =< s(6778) s(6839) =< aux(531)+s(6779) s(6840) =< aux(531)+s(6779) s(6841) =< s(6839) s(6842) =< s(6780) s(6843) =< s(6780) s(6844) =< s(6780) s(6842) =< s(6779)+s(6779)+s(6778) s(6843) =< s(6779)+s(6779)+s(6778) s(6845) =< s(6844)*s(6773) s(6846) =< s(6779)+s(6779)+s(6778) s(6847) =< s(6779)+s(6779)+s(6778) s(6848) =< s(6844)*s(6792) s(6849) =< s(6844)*s(6792) s(6850) =< s(6843)*s(6792) s(6851) =< s(6843)*s(6775) s(6847) =< s(6843)*s(6792) s(6852) =< s(6843)*s(6775) s(6853) =< s(6842) s(6854) =< s(6843)*s(6794) s(6846) =< s(6843)*aux(530) s(6855) =< s(6850) s(6856) =< s(6851) s(6857) =< s(6847) s(6858) =< s(6848) s(6859) =< s(6846) s(6860) =< s(6780) s(6861) =< s(6780) s(6860) =< aux(531)+s(6780) s(6861) =< aux(531)+s(6780) s(6862) =< s(6860) s(6863) =< s(6780) s(6864) =< s(6780) s(6865) =< s(6779) s(6865) =< s(6778) s(6863) =< s(6865)+s(6865)+s(6778) s(6864) =< s(6865)+s(6865)+s(6778) s(6866) =< s(6865)+s(6865)+s(6778) s(6867) =< s(6865)+s(6865)+s(6778) s(6868) =< s(6864)*s(6792) s(6869) =< s(6864)*s(6775) s(6867) =< s(6864)*s(6792) s(6870) =< s(6864)*s(6775) s(6871) =< s(6863) s(6872) =< s(6864)*s(6794) s(6866) =< s(6864)*aux(530) s(6873) =< s(6868) s(6874) =< s(6869) s(6875) =< s(6867) s(6876) =< s(6866) s(6877) =< s(6780) s(6878) =< s(6780) s(6877) =< s(6780)+s(6780) s(6878) =< s(6780)+s(6780) s(6879) =< s(6877) s(6880) =< s(6780) s(6881) =< s(6780) s(6880) =< s(6779)+s(6778) s(6881) =< s(6779)+s(6778) s(6882) =< s(6880) s(6883) =< s(6779) s(6884) =< s(6779) s(6883) =< aux(531)+s(6779) s(6884) =< aux(531)+s(6779) s(6885) =< s(6883) s(6886) =< s(6780) s(6887) =< s(6780) s(6886) =< s(6778)+s(6778)+s(6779) s(6887) =< s(6778)+s(6778)+s(6779) s(6888) =< s(6778)+s(6778)+s(6779) s(6889) =< s(6778)+s(6778)+s(6779) s(6890) =< s(6887)*s(6792) s(6891) =< s(6887)*s(6793) s(6889) =< s(6887)*s(6792) s(6892) =< s(6887)*s(6793) s(6893) =< s(6886) s(6894) =< s(6887)*s(6794) s(6888) =< s(6887)*s(6774) s(6895) =< s(6890) s(6896) =< s(6891) s(6897) =< s(6889) s(6898) =< s(6888) with precondition: [Out=0,V1>=0,V>=0] * Chain [71]: 39*s(7424)+1434*s(7425)+9*s(7434)+486*s(7435)+3441*s(7436)+405*s(7438)+81*s(7439)+90*s(7441)+18*s(7442)+1944*s(7444)+126*s(7448)+126*s(7452)+216*s(7455)+648*s(7456)+108*s(7457)+3024*s(7458)+864*s(7459)+324*s(7460)+504*s(7461)+324*s(7462)+324*s(7464)+36*s(7470)+108*s(7471)+18*s(7472)+504*s(7473)+144*s(7474)+54*s(7475)+54*s(7476)+45*s(7478)+9*s(7479)+45*s(7481)+9*s(7482)+45*s(7484)+9*s(7485)+450*s(7486)+1383*s(7487)+696*s(7488)+135*s(7490)+27*s(7491)+90*s(7493)+18*s(7494)+1674*s(7496)+2643*s(7497)+117*s(7498)+117*s(7502)+186*s(7505)+558*s(7506)+93*s(7507)+2604*s(7508)+744*s(7509)+279*s(7510)+468*s(7511)+279*s(7512)+270*s(7514)+54*s(7515)+324*s(7517)+36*s(7523)+108*s(7524)+18*s(7525)+504*s(7526)+144*s(7527)+54*s(7528)+54*s(7529)+45*s(7531)+9*s(7532)+45*s(7534)+9*s(7535)+45*s(7537)+9*s(7538)+108*s(7540)+12*s(7545)+36*s(7546)+6*s(7547)+168*s(7548)+48*s(7549)+18*s(7550)+18*s(7551)+26*s(7684)+957*s(7685)+6*s(7694)+324*s(7695)+2294*s(7696)+270*s(7698)+54*s(7699)+60*s(7701)+12*s(7702)+1296*s(7704)+84*s(7708)+84*s(7712)+144*s(7715)+432*s(7716)+72*s(7717)+2016*s(7718)+576*s(7719)+216*s(7720)+336*s(7721)+216*s(7722)+216*s(7724)+24*s(7730)+72*s(7731)+12*s(7732)+336*s(7733)+96*s(7734)+36*s(7735)+36*s(7736)+30*s(7738)+6*s(7739)+30*s(7741)+6*s(7742)+30*s(7744)+6*s(7745)+300*s(7746)+922*s(7747)+464*s(7748)+90*s(7750)+18*s(7751)+60*s(7753)+12*s(7754)+1116*s(7756)+1762*s(7757)+78*s(7758)+78*s(7762)+124*s(7765)+372*s(7766)+62*s(7767)+1736*s(7768)+496*s(7769)+186*s(7770)+312*s(7771)+186*s(7772)+180*s(7774)+36*s(7775)+216*s(7777)+24*s(7783)+72*s(7784)+12*s(7785)+336*s(7786)+96*s(7787)+36*s(7788)+36*s(7789)+30*s(7791)+6*s(7792)+30*s(7794)+6*s(7795)+30*s(7797)+6*s(7798)+72*s(7800)+8*s(7805)+24*s(7806)+4*s(7807)+112*s(7808)+32*s(7809)+12*s(7810)+12*s(7811)+1 Such that:aux(533) =< V1 aux(534) =< V1/2 aux(535) =< V aux(536) =< V/2 s(7424) =< aux(533) s(7425) =< aux(533) s(7424) =< aux(534) s(7426) =< aux(533)+2 s(7427) =< aux(533)+1 s(7428) =< aux(533) s(7429) =< s(7425)*s(7426) s(7430) =< s(7425)*s(7427) s(7431) =< s(7424)*s(7427) s(7432) =< s(7424)*s(7428) s(7433) =< s(7424)*s(7426) s(7434) =< s(7424)*s(7428) s(7435) =< s(7430) s(7436) =< s(7429) s(7437) =< s(7429) s(7438) =< s(7429) s(7437) =< aux(533)+s(7429) s(7438) =< aux(533)+s(7429) s(7439) =< s(7437) s(7440) =< s(7429) s(7441) =< s(7429) s(7440) =< aux(533)+s(7430) s(7441) =< aux(533)+s(7430) s(7442) =< s(7440) s(7443) =< s(7429) s(7444) =< s(7429) s(7445) =< s(7426) s(7446) =< s(7427) s(7447) =< s(7426)-1 s(7443) =< s(7430)+s(7430)+s(7429) s(7444) =< s(7430)+s(7430)+s(7429) s(7448) =< s(7436)*s(7426) s(7449) =< s(7430)+s(7430)+s(7429) s(7450) =< s(7430)+s(7430)+s(7429) s(7451) =< s(7436)*s(7445) s(7452) =< s(7436)*s(7445) s(7453) =< s(7444)*s(7445) s(7454) =< s(7444)*s(7446) s(7450) =< s(7444)*s(7445) s(7455) =< s(7444)*s(7446) s(7456) =< s(7443) s(7457) =< s(7444)*s(7447) s(7449) =< s(7444)*s(7427) s(7458) =< s(7453) s(7459) =< s(7454) s(7460) =< s(7450) s(7461) =< s(7451) s(7462) =< s(7449) s(7463) =< s(7429) s(7464) =< s(7429) s(7465) =< s(7430) s(7465) =< s(7429) s(7463) =< s(7465)+s(7465)+s(7429) s(7464) =< s(7465)+s(7465)+s(7429) s(7466) =< s(7465)+s(7465)+s(7429) s(7467) =< s(7465)+s(7465)+s(7429) s(7468) =< s(7464)*s(7445) s(7469) =< s(7464)*s(7446) s(7467) =< s(7464)*s(7445) s(7470) =< s(7464)*s(7446) s(7471) =< s(7463) s(7472) =< s(7464)*s(7447) s(7466) =< s(7464)*s(7427) s(7473) =< s(7468) s(7474) =< s(7469) s(7475) =< s(7467) s(7476) =< s(7466) s(7477) =< s(7429) s(7478) =< s(7429) s(7477) =< s(7429)+s(7429) s(7478) =< s(7429)+s(7429) s(7479) =< s(7477) s(7480) =< s(7429) s(7481) =< s(7429) s(7480) =< s(7430)+s(7429) s(7481) =< s(7430)+s(7429) s(7482) =< s(7480) s(7483) =< s(7430) s(7484) =< s(7430) s(7483) =< aux(533)+s(7430) s(7484) =< aux(533)+s(7430) s(7485) =< s(7483) s(7486) =< s(7432) s(7487) =< aux(534) s(7488) =< s(7431) s(7489) =< s(7431) s(7490) =< s(7431) s(7489) =< aux(534)+s(7431) s(7490) =< aux(534)+s(7431) s(7491) =< s(7489) s(7492) =< s(7431) s(7493) =< s(7431) s(7492) =< aux(534)+s(7432) s(7493) =< aux(534)+s(7432) s(7494) =< s(7492) s(7495) =< s(7433) s(7496) =< s(7433) s(7497) =< s(7433) s(7495) =< s(7432)+s(7432)+s(7431) s(7496) =< s(7432)+s(7432)+s(7431) s(7498) =< s(7497)*s(7426) s(7499) =< s(7432)+s(7432)+s(7431) s(7500) =< s(7432)+s(7432)+s(7431) s(7501) =< s(7497)*s(7445) s(7502) =< s(7497)*s(7445) s(7503) =< s(7496)*s(7445) s(7504) =< s(7496)*s(7428) s(7500) =< s(7496)*s(7445) s(7505) =< s(7496)*s(7428) s(7506) =< s(7495) s(7507) =< s(7496)*s(7447) s(7499) =< s(7496)*aux(533) s(7508) =< s(7503) s(7509) =< s(7504) s(7510) =< s(7500) s(7511) =< s(7501) s(7512) =< s(7499) s(7513) =< s(7433) s(7514) =< s(7433) s(7513) =< aux(534)+s(7433) s(7514) =< aux(534)+s(7433) s(7515) =< s(7513) s(7516) =< s(7433) s(7517) =< s(7433) s(7518) =< s(7432) s(7518) =< s(7431) s(7516) =< s(7518)+s(7518)+s(7431) s(7517) =< s(7518)+s(7518)+s(7431) s(7519) =< s(7518)+s(7518)+s(7431) s(7520) =< s(7518)+s(7518)+s(7431) s(7521) =< s(7517)*s(7445) s(7522) =< s(7517)*s(7428) s(7520) =< s(7517)*s(7445) s(7523) =< s(7517)*s(7428) s(7524) =< s(7516) s(7525) =< s(7517)*s(7447) s(7519) =< s(7517)*aux(533) s(7526) =< s(7521) s(7527) =< s(7522) s(7528) =< s(7520) s(7529) =< s(7519) s(7530) =< s(7433) s(7531) =< s(7433) s(7530) =< s(7433)+s(7433) s(7531) =< s(7433)+s(7433) s(7532) =< s(7530) s(7533) =< s(7433) s(7534) =< s(7433) s(7533) =< s(7432)+s(7431) s(7534) =< s(7432)+s(7431) s(7535) =< s(7533) s(7536) =< s(7432) s(7537) =< s(7432) s(7536) =< aux(534)+s(7432) s(7537) =< aux(534)+s(7432) s(7538) =< s(7536) s(7539) =< s(7433) s(7540) =< s(7433) s(7539) =< s(7431)+s(7431)+s(7432) s(7540) =< s(7431)+s(7431)+s(7432) s(7541) =< s(7431)+s(7431)+s(7432) s(7542) =< s(7431)+s(7431)+s(7432) s(7543) =< s(7540)*s(7445) s(7544) =< s(7540)*s(7446) s(7542) =< s(7540)*s(7445) s(7545) =< s(7540)*s(7446) s(7546) =< s(7539) s(7547) =< s(7540)*s(7447) s(7541) =< s(7540)*s(7427) s(7548) =< s(7543) s(7549) =< s(7544) s(7550) =< s(7542) s(7551) =< s(7541) s(7684) =< aux(535) s(7685) =< aux(535) s(7684) =< aux(536) s(7686) =< aux(535)+2 s(7687) =< aux(535)+1 s(7688) =< aux(535) s(7689) =< s(7685)*s(7686) s(7690) =< s(7685)*s(7687) s(7691) =< s(7684)*s(7687) s(7692) =< s(7684)*s(7688) s(7693) =< s(7684)*s(7686) s(7694) =< s(7684)*s(7688) s(7695) =< s(7690) s(7696) =< s(7689) s(7697) =< s(7689) s(7698) =< s(7689) s(7697) =< aux(535)+s(7689) s(7698) =< aux(535)+s(7689) s(7699) =< s(7697) s(7700) =< s(7689) s(7701) =< s(7689) s(7700) =< aux(535)+s(7690) s(7701) =< aux(535)+s(7690) s(7702) =< s(7700) s(7703) =< s(7689) s(7704) =< s(7689) s(7705) =< s(7686) s(7706) =< s(7687) s(7707) =< s(7686)-1 s(7703) =< s(7690)+s(7690)+s(7689) s(7704) =< s(7690)+s(7690)+s(7689) s(7708) =< s(7696)*s(7686) s(7709) =< s(7690)+s(7690)+s(7689) s(7710) =< s(7690)+s(7690)+s(7689) s(7711) =< s(7696)*s(7705) s(7712) =< s(7696)*s(7705) s(7713) =< s(7704)*s(7705) s(7714) =< s(7704)*s(7706) s(7710) =< s(7704)*s(7705) s(7715) =< s(7704)*s(7706) s(7716) =< s(7703) s(7717) =< s(7704)*s(7707) s(7709) =< s(7704)*s(7687) s(7718) =< s(7713) s(7719) =< s(7714) s(7720) =< s(7710) s(7721) =< s(7711) s(7722) =< s(7709) s(7723) =< s(7689) s(7724) =< s(7689) s(7725) =< s(7690) s(7725) =< s(7689) s(7723) =< s(7725)+s(7725)+s(7689) s(7724) =< s(7725)+s(7725)+s(7689) s(7726) =< s(7725)+s(7725)+s(7689) s(7727) =< s(7725)+s(7725)+s(7689) s(7728) =< s(7724)*s(7705) s(7729) =< s(7724)*s(7706) s(7727) =< s(7724)*s(7705) s(7730) =< s(7724)*s(7706) s(7731) =< s(7723) s(7732) =< s(7724)*s(7707) s(7726) =< s(7724)*s(7687) s(7733) =< s(7728) s(7734) =< s(7729) s(7735) =< s(7727) s(7736) =< s(7726) s(7737) =< s(7689) s(7738) =< s(7689) s(7737) =< s(7689)+s(7689) s(7738) =< s(7689)+s(7689) s(7739) =< s(7737) s(7740) =< s(7689) s(7741) =< s(7689) s(7740) =< s(7690)+s(7689) s(7741) =< s(7690)+s(7689) s(7742) =< s(7740) s(7743) =< s(7690) s(7744) =< s(7690) s(7743) =< aux(535)+s(7690) s(7744) =< aux(535)+s(7690) s(7745) =< s(7743) s(7746) =< s(7692) s(7747) =< aux(536) s(7748) =< s(7691) s(7749) =< s(7691) s(7750) =< s(7691) s(7749) =< aux(536)+s(7691) s(7750) =< aux(536)+s(7691) s(7751) =< s(7749) s(7752) =< s(7691) s(7753) =< s(7691) s(7752) =< aux(536)+s(7692) s(7753) =< aux(536)+s(7692) s(7754) =< s(7752) s(7755) =< s(7693) s(7756) =< s(7693) s(7757) =< s(7693) s(7755) =< s(7692)+s(7692)+s(7691) s(7756) =< s(7692)+s(7692)+s(7691) s(7758) =< s(7757)*s(7686) s(7759) =< s(7692)+s(7692)+s(7691) s(7760) =< s(7692)+s(7692)+s(7691) s(7761) =< s(7757)*s(7705) s(7762) =< s(7757)*s(7705) s(7763) =< s(7756)*s(7705) s(7764) =< s(7756)*s(7688) s(7760) =< s(7756)*s(7705) s(7765) =< s(7756)*s(7688) s(7766) =< s(7755) s(7767) =< s(7756)*s(7707) s(7759) =< s(7756)*aux(535) s(7768) =< s(7763) s(7769) =< s(7764) s(7770) =< s(7760) s(7771) =< s(7761) s(7772) =< s(7759) s(7773) =< s(7693) s(7774) =< s(7693) s(7773) =< aux(536)+s(7693) s(7774) =< aux(536)+s(7693) s(7775) =< s(7773) s(7776) =< s(7693) s(7777) =< s(7693) s(7778) =< s(7692) s(7778) =< s(7691) s(7776) =< s(7778)+s(7778)+s(7691) s(7777) =< s(7778)+s(7778)+s(7691) s(7779) =< s(7778)+s(7778)+s(7691) s(7780) =< s(7778)+s(7778)+s(7691) s(7781) =< s(7777)*s(7705) s(7782) =< s(7777)*s(7688) s(7780) =< s(7777)*s(7705) s(7783) =< s(7777)*s(7688) s(7784) =< s(7776) s(7785) =< s(7777)*s(7707) s(7779) =< s(7777)*aux(535) s(7786) =< s(7781) s(7787) =< s(7782) s(7788) =< s(7780) s(7789) =< s(7779) s(7790) =< s(7693) s(7791) =< s(7693) s(7790) =< s(7693)+s(7693) s(7791) =< s(7693)+s(7693) s(7792) =< s(7790) s(7793) =< s(7693) s(7794) =< s(7693) s(7793) =< s(7692)+s(7691) s(7794) =< s(7692)+s(7691) s(7795) =< s(7793) s(7796) =< s(7692) s(7797) =< s(7692) s(7796) =< aux(536)+s(7692) s(7797) =< aux(536)+s(7692) s(7798) =< s(7796) s(7799) =< s(7693) s(7800) =< s(7693) s(7799) =< s(7691)+s(7691)+s(7692) s(7800) =< s(7691)+s(7691)+s(7692) s(7801) =< s(7691)+s(7691)+s(7692) s(7802) =< s(7691)+s(7691)+s(7692) s(7803) =< s(7800)*s(7705) s(7804) =< s(7800)*s(7706) s(7802) =< s(7800)*s(7705) s(7805) =< s(7800)*s(7706) s(7806) =< s(7799) s(7807) =< s(7800)*s(7707) s(7801) =< s(7800)*s(7687) s(7808) =< s(7803) s(7809) =< s(7804) s(7810) =< s(7802) s(7811) =< s(7801) with precondition: [V1>=1,V>=0,Out>=0,V1>=Out] #### Cost of chains of fun5(V1,V,Out): * Chain [75]: 2288*s(8080)+26*s(8180)+2057*s(8181)+6*s(8190)+324*s(8191)+2294*s(8192)+270*s(8194)+54*s(8195)+60*s(8197)+12*s(8198)+1296*s(8200)+84*s(8204)+84*s(8208)+144*s(8211)+432*s(8212)+72*s(8213)+2016*s(8214)+576*s(8215)+216*s(8216)+336*s(8217)+216*s(8218)+216*s(8220)+24*s(8226)+72*s(8227)+12*s(8228)+336*s(8229)+96*s(8230)+36*s(8231)+36*s(8232)+30*s(8234)+6*s(8235)+30*s(8237)+6*s(8238)+30*s(8240)+6*s(8241)+300*s(8242)+922*s(8243)+464*s(8244)+90*s(8246)+18*s(8247)+60*s(8249)+12*s(8250)+1116*s(8252)+1762*s(8253)+78*s(8254)+78*s(8258)+124*s(8261)+372*s(8262)+62*s(8263)+1736*s(8264)+496*s(8265)+186*s(8266)+312*s(8267)+186*s(8268)+180*s(8270)+36*s(8271)+216*s(8273)+24*s(8279)+72*s(8280)+12*s(8281)+336*s(8282)+96*s(8283)+36*s(8284)+36*s(8285)+30*s(8287)+6*s(8288)+30*s(8290)+6*s(8291)+30*s(8293)+6*s(8294)+72*s(8296)+8*s(8301)+24*s(8302)+4*s(8303)+112*s(8304)+32*s(8305)+12*s(8306)+12*s(8307)+90*s(8323)+204*s(8324)+18*s(8325)+609*s(8330)+36*s(8335)+36*s(8339)+66*s(8342)+201*s(8343)+33*s(8344)+1188*s(8345)+99*s(8347)+144*s(8348)+99*s(8349)+54*s(8356)+60*s(8357)+24*s(8358)+6*s(8359)+6*s(8363)+6*s(8366)+18*s(8367)+3*s(8368)+108*s(8369)+9*s(8371)+24*s(8372)+9*s(8373)+54*s(8375)+6*s(8381)+18*s(8382)+3*s(8383)+108*s(8384)+9*s(8386)+9*s(8387)+90*s(8389)+18*s(8390)+54*s(8392)+6*s(8397)+18*s(8398)+3*s(8399)+108*s(8400)+9*s(8402)+9*s(8403)+26*s(8415)+2849*s(8416)+6*s(8425)+324*s(8426)+2294*s(8427)+270*s(8429)+54*s(8430)+60*s(8432)+12*s(8433)+1296*s(8435)+84*s(8439)+84*s(8443)+144*s(8446)+432*s(8447)+72*s(8448)+2016*s(8449)+576*s(8450)+216*s(8451)+336*s(8452)+216*s(8453)+216*s(8455)+24*s(8461)+72*s(8462)+12*s(8463)+336*s(8464)+96*s(8465)+36*s(8466)+36*s(8467)+30*s(8469)+6*s(8470)+30*s(8472)+6*s(8473)+30*s(8475)+6*s(8476)+300*s(8477)+922*s(8478)+464*s(8479)+90*s(8481)+18*s(8482)+60*s(8484)+12*s(8485)+1116*s(8487)+1762*s(8488)+78*s(8489)+78*s(8493)+124*s(8496)+372*s(8497)+62*s(8498)+1736*s(8499)+496*s(8500)+186*s(8501)+312*s(8502)+186*s(8503)+180*s(8505)+36*s(8506)+216*s(8508)+24*s(8514)+72*s(8515)+12*s(8516)+336*s(8517)+96*s(8518)+36*s(8519)+36*s(8520)+30*s(8522)+6*s(8523)+30*s(8525)+6*s(8526)+30*s(8528)+6*s(8529)+72*s(8531)+8*s(8536)+24*s(8537)+4*s(8538)+112*s(8539)+32*s(8540)+12*s(8541)+12*s(8542)+60*s(8554)+150*s(8555)+12*s(8556)+120*s(8562)+24*s(8563)+36*s(8570)+36*s(8574)+36*s(8579)+1152*s(8580)+108*s(8582)+168*s(8591)+60*s(8593)+6*s(8594)+6*s(8598)+6*s(8603)+192*s(8604)+18*s(8606)+15*s(8640)+3*s(8641)+594*s(8930)+761*s(8931)+36*s(8935)+36*s(8939)+66*s(8942)+198*s(8943)+33*s(8944)+924*s(8945)+264*s(8946)+99*s(8947)+144*s(8948)+99*s(8949)+78*s(8950)+30*s(8952)+6*s(8953)+54*s(8956)+60*s(8957)+24*s(8958)+6*s(8959)+6*s(8963)+6*s(8966)+18*s(8967)+3*s(8968)+84*s(8969)+24*s(8970)+9*s(8971)+24*s(8972)+9*s(8973)+54*s(8975)+6*s(8981)+18*s(8982)+3*s(8983)+84*s(8984)+24*s(8985)+9*s(8986)+9*s(8987)+60*s(8989)+12*s(8990)+54*s(8992)+6*s(8997)+18*s(8998)+3*s(8999)+84*s(9000)+24*s(9001)+9*s(9002)+9*s(9003)+15*s(9005)+3*s(9006)+15*s(9008)+3*s(9009)+9 Such that:s(8911) =< V1+V s(8912) =< V1+V+1 aux(547) =< 1 aux(548) =< V1 aux(549) =< V1+1 aux(550) =< V1/2 aux(551) =< V aux(552) =< V+1 aux(553) =< V/2 s(8080) =< aux(547) s(8416) =< aux(548) s(8181) =< aux(551) s(8553) =< aux(549) s(8554) =< aux(549) s(8555) =< aux(549) s(8553) =< aux(547)+aux(548) s(8554) =< aux(547)+aux(548) s(8556) =< s(8553) s(8322) =< aux(552) s(8323) =< aux(552) s(8324) =< aux(552) s(8322) =< aux(547)+aux(551) s(8323) =< aux(547)+aux(551) s(8325) =< s(8322) s(8561) =< aux(548) s(8562) =< aux(548) s(8561) =< aux(547)+aux(548) s(8562) =< aux(547)+aux(548) s(8563) =< s(8561) s(8929) =< s(8911) s(8930) =< s(8911) s(8931) =< s(8911) s(8932) =< s(8911) s(8184) =< aux(551) s(8934) =< s(8911)-1 s(8929) =< aux(551)+aux(551)+aux(548) s(8930) =< aux(551)+aux(551)+aux(548) s(8935) =< s(8931)*s(8911) s(8936) =< aux(551)+aux(551)+aux(548) s(8937) =< aux(551)+aux(551)+aux(548) s(8938) =< s(8931)*s(8932) s(8939) =< s(8931)*s(8932) s(8940) =< s(8930)*s(8932) s(8941) =< s(8930)*s(8184) s(8937) =< s(8930)*s(8932) s(8942) =< s(8930)*s(8184) s(8943) =< s(8929) s(8944) =< s(8930)*s(8934) s(8936) =< s(8930)*aux(551) s(8945) =< s(8940) s(8946) =< s(8941) s(8947) =< s(8937) s(8948) =< s(8938) s(8949) =< s(8936) s(8950) =< s(8912) s(8951) =< s(8912) s(8952) =< s(8912) s(8951) =< aux(547)+s(8911) s(8952) =< aux(547)+s(8911) s(8953) =< s(8951) s(8954) =< s(8911) s(8955) =< s(8911) s(8956) =< s(8911) s(8957) =< s(8911) s(8954) =< s(8912) s(8955) =< s(8912) s(8956) =< s(8912) s(8957) =< s(8912) s(8954) =< aux(551)+aux(551)+aux(548) s(8956) =< aux(551)+aux(551)+aux(548) s(8958) =< s(8955) s(8959) =< s(8957)*s(8911) s(8960) =< aux(551)+aux(551)+aux(548) s(8961) =< aux(551)+aux(551)+aux(548) s(8962) =< s(8957)*s(8932) s(8963) =< s(8957)*s(8932) s(8964) =< s(8956)*s(8932) s(8965) =< s(8956)*s(8184) s(8961) =< s(8956)*s(8932) s(8966) =< s(8956)*s(8184) s(8967) =< s(8954) s(8968) =< s(8956)*s(8934) s(8960) =< s(8956)*aux(551) s(8969) =< s(8964) s(8970) =< s(8965) s(8971) =< s(8961) s(8972) =< s(8962) s(8973) =< s(8960) s(8974) =< s(8911) s(8975) =< s(8911) s(8974) =< s(8912) s(8975) =< s(8912) s(8355) =< aux(551) s(8355) =< aux(552) s(8974) =< s(8355)+s(8355)+aux(548) s(8975) =< s(8355)+s(8355)+aux(548) s(8977) =< s(8355)+s(8355)+aux(548) s(8978) =< s(8355)+s(8355)+aux(548) s(8979) =< s(8975)*s(8932) s(8980) =< s(8975)*s(8184) s(8978) =< s(8975)*s(8932) s(8981) =< s(8975)*s(8184) s(8982) =< s(8974) s(8983) =< s(8975)*s(8934) s(8977) =< s(8975)*aux(551) s(8984) =< s(8979) s(8985) =< s(8980) s(8986) =< s(8978) s(8987) =< s(8977) s(8988) =< s(8911) s(8989) =< s(8911) s(8988) =< aux(547)+s(8911) s(8989) =< aux(547)+s(8911) s(8990) =< s(8988) s(8991) =< s(8911) s(8992) =< s(8911) s(8991) =< s(8355)+s(8355)+aux(548) s(8992) =< s(8355)+s(8355)+aux(548) s(8993) =< s(8355)+s(8355)+aux(548) s(8994) =< s(8355)+s(8355)+aux(548) s(8995) =< s(8992)*s(8932) s(8996) =< s(8992)*s(8184) s(8994) =< s(8992)*s(8932) s(8997) =< s(8992)*s(8184) s(8998) =< s(8991) s(8999) =< s(8992)*s(8934) s(8993) =< s(8992)*aux(551) s(9000) =< s(8995) s(9001) =< s(8996) s(9002) =< s(8994) s(9003) =< s(8993) s(9004) =< s(8911) s(9005) =< s(8911) s(9004) =< s(8911)+s(8911) s(9005) =< s(8911)+s(8911) s(9006) =< s(9004) s(9007) =< s(8911) s(9008) =< s(8911) s(9007) =< aux(551)+aux(548) s(9008) =< aux(551)+aux(548) s(9009) =< s(9007) s(8388) =< aux(551) s(8389) =< aux(551) s(8388) =< aux(547)+aux(551) s(8389) =< aux(547)+aux(551) s(8390) =< s(8388) s(8180) =< aux(551) s(8180) =< aux(553) s(8182) =< aux(551)+2 s(8183) =< aux(551)+1 s(8185) =< s(8181)*s(8182) s(8186) =< s(8181)*s(8183) s(8187) =< s(8180)*s(8183) s(8188) =< s(8180)*s(8184) s(8189) =< s(8180)*s(8182) s(8190) =< s(8180)*s(8184) s(8191) =< s(8186) s(8192) =< s(8185) s(8193) =< s(8185) s(8194) =< s(8185) s(8193) =< aux(551)+s(8185) s(8194) =< aux(551)+s(8185) s(8195) =< s(8193) s(8196) =< s(8185) s(8197) =< s(8185) s(8196) =< aux(551)+s(8186) s(8197) =< aux(551)+s(8186) s(8198) =< s(8196) s(8199) =< s(8185) s(8200) =< s(8185) s(8201) =< s(8182) s(8202) =< s(8183) s(8203) =< s(8182)-1 s(8199) =< s(8186)+s(8186)+s(8185) s(8200) =< s(8186)+s(8186)+s(8185) s(8204) =< s(8192)*s(8182) s(8205) =< s(8186)+s(8186)+s(8185) s(8206) =< s(8186)+s(8186)+s(8185) s(8207) =< s(8192)*s(8201) s(8208) =< s(8192)*s(8201) s(8209) =< s(8200)*s(8201) s(8210) =< s(8200)*s(8202) s(8206) =< s(8200)*s(8201) s(8211) =< s(8200)*s(8202) s(8212) =< s(8199) s(8213) =< s(8200)*s(8203) s(8205) =< s(8200)*s(8183) s(8214) =< s(8209) s(8215) =< s(8210) s(8216) =< s(8206) s(8217) =< s(8207) s(8218) =< s(8205) s(8219) =< s(8185) s(8220) =< s(8185) s(8221) =< s(8186) s(8221) =< s(8185) s(8219) =< s(8221)+s(8221)+s(8185) s(8220) =< s(8221)+s(8221)+s(8185) s(8222) =< s(8221)+s(8221)+s(8185) s(8223) =< s(8221)+s(8221)+s(8185) s(8224) =< s(8220)*s(8201) s(8225) =< s(8220)*s(8202) s(8223) =< s(8220)*s(8201) s(8226) =< s(8220)*s(8202) s(8227) =< s(8219) s(8228) =< s(8220)*s(8203) s(8222) =< s(8220)*s(8183) s(8229) =< s(8224) s(8230) =< s(8225) s(8231) =< s(8223) s(8232) =< s(8222) s(8233) =< s(8185) s(8234) =< s(8185) s(8233) =< s(8185)+s(8185) s(8234) =< s(8185)+s(8185) s(8235) =< s(8233) s(8236) =< s(8185) s(8237) =< s(8185) s(8236) =< s(8186)+s(8185) s(8237) =< s(8186)+s(8185) s(8238) =< s(8236) s(8239) =< s(8186) s(8240) =< s(8186) s(8239) =< aux(551)+s(8186) s(8240) =< aux(551)+s(8186) s(8241) =< s(8239) s(8242) =< s(8188) s(8243) =< aux(553) s(8244) =< s(8187) s(8245) =< s(8187) s(8246) =< s(8187) s(8245) =< aux(553)+s(8187) s(8246) =< aux(553)+s(8187) s(8247) =< s(8245) s(8248) =< s(8187) s(8249) =< s(8187) s(8248) =< aux(553)+s(8188) s(8249) =< aux(553)+s(8188) s(8250) =< s(8248) s(8251) =< s(8189) s(8252) =< s(8189) s(8253) =< s(8189) s(8251) =< s(8188)+s(8188)+s(8187) s(8252) =< s(8188)+s(8188)+s(8187) s(8254) =< s(8253)*s(8182) s(8255) =< s(8188)+s(8188)+s(8187) s(8256) =< s(8188)+s(8188)+s(8187) s(8257) =< s(8253)*s(8201) s(8258) =< s(8253)*s(8201) s(8259) =< s(8252)*s(8201) s(8260) =< s(8252)*s(8184) s(8256) =< s(8252)*s(8201) s(8261) =< s(8252)*s(8184) s(8262) =< s(8251) s(8263) =< s(8252)*s(8203) s(8255) =< s(8252)*aux(551) s(8264) =< s(8259) s(8265) =< s(8260) s(8266) =< s(8256) s(8267) =< s(8257) s(8268) =< s(8255) s(8269) =< s(8189) s(8270) =< s(8189) s(8269) =< aux(553)+s(8189) s(8270) =< aux(553)+s(8189) s(8271) =< s(8269) s(8272) =< s(8189) s(8273) =< s(8189) s(8274) =< s(8188) s(8274) =< s(8187) s(8272) =< s(8274)+s(8274)+s(8187) s(8273) =< s(8274)+s(8274)+s(8187) s(8275) =< s(8274)+s(8274)+s(8187) s(8276) =< s(8274)+s(8274)+s(8187) s(8277) =< s(8273)*s(8201) s(8278) =< s(8273)*s(8184) s(8276) =< s(8273)*s(8201) s(8279) =< s(8273)*s(8184) s(8280) =< s(8272) s(8281) =< s(8273)*s(8203) s(8275) =< s(8273)*aux(551) s(8282) =< s(8277) s(8283) =< s(8278) s(8284) =< s(8276) s(8285) =< s(8275) s(8286) =< s(8189) s(8287) =< s(8189) s(8286) =< s(8189)+s(8189) s(8287) =< s(8189)+s(8189) s(8288) =< s(8286) s(8289) =< s(8189) s(8290) =< s(8189) s(8289) =< s(8188)+s(8187) s(8290) =< s(8188)+s(8187) s(8291) =< s(8289) s(8292) =< s(8188) s(8293) =< s(8188) s(8292) =< aux(553)+s(8188) s(8293) =< aux(553)+s(8188) s(8294) =< s(8292) s(8295) =< s(8189) s(8296) =< s(8189) s(8295) =< s(8187)+s(8187)+s(8188) s(8296) =< s(8187)+s(8187)+s(8188) s(8297) =< s(8187)+s(8187)+s(8188) s(8298) =< s(8187)+s(8187)+s(8188) s(8299) =< s(8296)*s(8201) s(8300) =< s(8296)*s(8202) s(8298) =< s(8296)*s(8201) s(8301) =< s(8296)*s(8202) s(8302) =< s(8295) s(8303) =< s(8296)*s(8203) s(8297) =< s(8296)*s(8183) s(8304) =< s(8299) s(8305) =< s(8300) s(8306) =< s(8298) s(8307) =< s(8297) s(8415) =< aux(548) s(8415) =< aux(550) s(8417) =< aux(548)+2 s(8418) =< aux(548)+1 s(8419) =< aux(548) s(8420) =< s(8416)*s(8417) s(8421) =< s(8416)*s(8418) s(8422) =< s(8415)*s(8418) s(8423) =< s(8415)*s(8419) s(8424) =< s(8415)*s(8417) s(8425) =< s(8415)*s(8419) s(8426) =< s(8421) s(8427) =< s(8420) s(8428) =< s(8420) s(8429) =< s(8420) s(8428) =< aux(548)+s(8420) s(8429) =< aux(548)+s(8420) s(8430) =< s(8428) s(8431) =< s(8420) s(8432) =< s(8420) s(8431) =< aux(548)+s(8421) s(8432) =< aux(548)+s(8421) s(8433) =< s(8431) s(8434) =< s(8420) s(8435) =< s(8420) s(8436) =< s(8417) s(8437) =< s(8418) s(8438) =< s(8417)-1 s(8434) =< s(8421)+s(8421)+s(8420) s(8435) =< s(8421)+s(8421)+s(8420) s(8439) =< s(8427)*s(8417) s(8440) =< s(8421)+s(8421)+s(8420) s(8441) =< s(8421)+s(8421)+s(8420) s(8442) =< s(8427)*s(8436) s(8443) =< s(8427)*s(8436) s(8444) =< s(8435)*s(8436) s(8445) =< s(8435)*s(8437) s(8441) =< s(8435)*s(8436) s(8446) =< s(8435)*s(8437) s(8447) =< s(8434) s(8448) =< s(8435)*s(8438) s(8440) =< s(8435)*s(8418) s(8449) =< s(8444) s(8450) =< s(8445) s(8451) =< s(8441) s(8452) =< s(8442) s(8453) =< s(8440) s(8454) =< s(8420) s(8455) =< s(8420) s(8456) =< s(8421) s(8456) =< s(8420) s(8454) =< s(8456)+s(8456)+s(8420) s(8455) =< s(8456)+s(8456)+s(8420) s(8457) =< s(8456)+s(8456)+s(8420) s(8458) =< s(8456)+s(8456)+s(8420) s(8459) =< s(8455)*s(8436) s(8460) =< s(8455)*s(8437) s(8458) =< s(8455)*s(8436) s(8461) =< s(8455)*s(8437) s(8462) =< s(8454) s(8463) =< s(8455)*s(8438) s(8457) =< s(8455)*s(8418) s(8464) =< s(8459) s(8465) =< s(8460) s(8466) =< s(8458) s(8467) =< s(8457) s(8468) =< s(8420) s(8469) =< s(8420) s(8468) =< s(8420)+s(8420) s(8469) =< s(8420)+s(8420) s(8470) =< s(8468) s(8471) =< s(8420) s(8472) =< s(8420) s(8471) =< s(8421)+s(8420) s(8472) =< s(8421)+s(8420) s(8473) =< s(8471) s(8474) =< s(8421) s(8475) =< s(8421) s(8474) =< aux(548)+s(8421) s(8475) =< aux(548)+s(8421) s(8476) =< s(8474) s(8477) =< s(8423) s(8478) =< aux(550) s(8479) =< s(8422) s(8480) =< s(8422) s(8481) =< s(8422) s(8480) =< aux(550)+s(8422) s(8481) =< aux(550)+s(8422) s(8482) =< s(8480) s(8483) =< s(8422) s(8484) =< s(8422) s(8483) =< aux(550)+s(8423) s(8484) =< aux(550)+s(8423) s(8485) =< s(8483) s(8486) =< s(8424) s(8487) =< s(8424) s(8488) =< s(8424) s(8486) =< s(8423)+s(8423)+s(8422) s(8487) =< s(8423)+s(8423)+s(8422) s(8489) =< s(8488)*s(8417) s(8490) =< s(8423)+s(8423)+s(8422) s(8491) =< s(8423)+s(8423)+s(8422) s(8492) =< s(8488)*s(8436) s(8493) =< s(8488)*s(8436) s(8494) =< s(8487)*s(8436) s(8495) =< s(8487)*s(8419) s(8491) =< s(8487)*s(8436) s(8496) =< s(8487)*s(8419) s(8497) =< s(8486) s(8498) =< s(8487)*s(8438) s(8490) =< s(8487)*aux(548) s(8499) =< s(8494) s(8500) =< s(8495) s(8501) =< s(8491) s(8502) =< s(8492) s(8503) =< s(8490) s(8504) =< s(8424) s(8505) =< s(8424) s(8504) =< aux(550)+s(8424) s(8505) =< aux(550)+s(8424) s(8506) =< s(8504) s(8507) =< s(8424) s(8508) =< s(8424) s(8509) =< s(8423) s(8509) =< s(8422) s(8507) =< s(8509)+s(8509)+s(8422) s(8508) =< s(8509)+s(8509)+s(8422) s(8510) =< s(8509)+s(8509)+s(8422) s(8511) =< s(8509)+s(8509)+s(8422) s(8512) =< s(8508)*s(8436) s(8513) =< s(8508)*s(8419) s(8511) =< s(8508)*s(8436) s(8514) =< s(8508)*s(8419) s(8515) =< s(8507) s(8516) =< s(8508)*s(8438) s(8510) =< s(8508)*aux(548) s(8517) =< s(8512) s(8518) =< s(8513) s(8519) =< s(8511) s(8520) =< s(8510) s(8521) =< s(8424) s(8522) =< s(8424) s(8521) =< s(8424)+s(8424) s(8522) =< s(8424)+s(8424) s(8523) =< s(8521) s(8524) =< s(8424) s(8525) =< s(8424) s(8524) =< s(8423)+s(8422) s(8525) =< s(8423)+s(8422) s(8526) =< s(8524) s(8527) =< s(8423) s(8528) =< s(8423) s(8527) =< aux(550)+s(8423) s(8528) =< aux(550)+s(8423) s(8529) =< s(8527) s(8530) =< s(8424) s(8531) =< s(8424) s(8530) =< s(8422)+s(8422)+s(8423) s(8531) =< s(8422)+s(8422)+s(8423) s(8532) =< s(8422)+s(8422)+s(8423) s(8533) =< s(8422)+s(8422)+s(8423) s(8534) =< s(8531)*s(8436) s(8535) =< s(8531)*s(8437) s(8533) =< s(8531)*s(8436) s(8536) =< s(8531)*s(8437) s(8537) =< s(8530) s(8538) =< s(8531)*s(8438) s(8532) =< s(8531)*s(8418) s(8539) =< s(8534) s(8540) =< s(8535) s(8541) =< s(8533) s(8542) =< s(8532) s(8569) =< aux(548)-1 s(8570) =< s(8416)*aux(548) s(8572) =< aux(548) s(8573) =< s(8416)*s(8419) s(8574) =< s(8416)*s(8419) s(8572) =< s(8416)*s(8419) s(8579) =< s(8416)*s(8569) s(8580) =< s(8573) s(8582) =< s(8572) s(8589) =< aux(548) s(8591) =< aux(548) s(8589) =< aux(549) s(8591) =< aux(549) s(8593) =< s(8589) s(8594) =< s(8591)*aux(548) s(8596) =< aux(548) s(8597) =< s(8591)*s(8419) s(8598) =< s(8591)*s(8419) s(8596) =< s(8591)*s(8419) s(8603) =< s(8591)*s(8569) s(8604) =< s(8597) s(8606) =< s(8596) s(8639) =< aux(548) s(8640) =< aux(548) s(8639) =< aux(548)+aux(548) s(8640) =< aux(548)+aux(548) s(8641) =< s(8639) s(8329) =< aux(551) s(8330) =< aux(551) s(8334) =< aux(551)-1 s(8329) =< aux(551)+aux(551) s(8330) =< aux(551)+aux(551) s(8335) =< s(8181)*aux(551) s(8336) =< aux(551)+aux(551) s(8337) =< aux(551)+aux(551) s(8338) =< s(8181)*s(8184) s(8339) =< s(8181)*s(8184) s(8340) =< s(8330)*s(8184) s(8337) =< s(8330)*s(8184) s(8342) =< s(8330)*s(8184) s(8343) =< s(8329) s(8344) =< s(8330)*s(8334) s(8336) =< s(8330)*aux(551) s(8345) =< s(8340) s(8347) =< s(8337) s(8348) =< s(8338) s(8349) =< s(8336) s(8354) =< aux(551) s(8356) =< aux(551) s(8357) =< aux(551) s(8354) =< aux(552) s(8356) =< aux(552) s(8357) =< aux(552) s(8354) =< aux(551)+aux(551) s(8356) =< aux(551)+aux(551) s(8358) =< s(8355) s(8359) =< s(8357)*aux(551) s(8360) =< aux(551)+aux(551) s(8361) =< aux(551)+aux(551) s(8362) =< s(8357)*s(8184) s(8363) =< s(8357)*s(8184) s(8364) =< s(8356)*s(8184) s(8361) =< s(8356)*s(8184) s(8366) =< s(8356)*s(8184) s(8367) =< s(8354) s(8368) =< s(8356)*s(8334) s(8360) =< s(8356)*aux(551) s(8369) =< s(8364) s(8371) =< s(8361) s(8372) =< s(8362) s(8373) =< s(8360) s(8374) =< aux(551) s(8375) =< aux(551) s(8374) =< aux(552) s(8375) =< aux(552) s(8374) =< s(8355)+s(8355) s(8375) =< s(8355)+s(8355) s(8377) =< s(8355)+s(8355) s(8378) =< s(8355)+s(8355) s(8379) =< s(8375)*s(8184) s(8378) =< s(8375)*s(8184) s(8381) =< s(8375)*s(8184) s(8382) =< s(8374) s(8383) =< s(8375)*s(8334) s(8377) =< s(8375)*aux(551) s(8384) =< s(8379) s(8386) =< s(8378) s(8387) =< s(8377) s(8391) =< aux(551) s(8392) =< aux(551) s(8391) =< s(8355)+s(8355) s(8392) =< s(8355)+s(8355) s(8393) =< s(8355)+s(8355) s(8394) =< s(8355)+s(8355) s(8395) =< s(8392)*s(8184) s(8394) =< s(8392)*s(8184) s(8397) =< s(8392)*s(8184) s(8398) =< s(8391) s(8399) =< s(8392)*s(8334) s(8393) =< s(8392)*aux(551) s(8400) =< s(8395) s(8402) =< s(8394) s(8403) =< s(8393) with precondition: [Out=0,V1>=0,V>=0] * Chain [74]: 65*s(9015)+2547*s(9016)+15*s(9025)+810*s(9026)+5735*s(9027)+675*s(9029)+135*s(9030)+150*s(9032)+30*s(9033)+3240*s(9035)+210*s(9039)+210*s(9043)+360*s(9046)+1080*s(9047)+180*s(9048)+5040*s(9049)+1440*s(9050)+540*s(9051)+840*s(9052)+540*s(9053)+540*s(9055)+60*s(9061)+180*s(9062)+30*s(9063)+840*s(9064)+240*s(9065)+90*s(9066)+90*s(9067)+75*s(9069)+15*s(9070)+75*s(9072)+15*s(9073)+75*s(9075)+15*s(9076)+750*s(9077)+2305*s(9078)+1160*s(9079)+225*s(9081)+45*s(9082)+150*s(9084)+30*s(9085)+2790*s(9087)+4405*s(9088)+195*s(9089)+195*s(9093)+310*s(9096)+930*s(9097)+155*s(9098)+4340*s(9099)+1240*s(9100)+465*s(9101)+780*s(9102)+465*s(9103)+450*s(9105)+90*s(9106)+540*s(9108)+60*s(9114)+180*s(9115)+30*s(9116)+840*s(9117)+240*s(9118)+90*s(9119)+90*s(9120)+75*s(9122)+15*s(9123)+75*s(9125)+15*s(9126)+75*s(9128)+15*s(9129)+180*s(9131)+20*s(9136)+60*s(9137)+10*s(9138)+280*s(9139)+80*s(9140)+30*s(9141)+30*s(9142)+52*s(9145)+2035*s(9146)+12*s(9155)+648*s(9156)+4588*s(9157)+540*s(9159)+108*s(9160)+120*s(9162)+24*s(9163)+2592*s(9165)+168*s(9169)+168*s(9173)+288*s(9176)+864*s(9177)+144*s(9178)+4032*s(9179)+1152*s(9180)+432*s(9181)+672*s(9182)+432*s(9183)+432*s(9185)+48*s(9191)+144*s(9192)+24*s(9193)+672*s(9194)+192*s(9195)+72*s(9196)+72*s(9197)+60*s(9199)+12*s(9200)+60*s(9202)+12*s(9203)+60*s(9205)+12*s(9206)+600*s(9207)+1844*s(9208)+928*s(9209)+180*s(9211)+36*s(9212)+120*s(9214)+24*s(9215)+2232*s(9217)+3524*s(9218)+156*s(9219)+156*s(9223)+248*s(9226)+744*s(9227)+124*s(9228)+3472*s(9229)+992*s(9230)+372*s(9231)+624*s(9232)+372*s(9233)+360*s(9235)+72*s(9236)+432*s(9238)+48*s(9244)+144*s(9245)+24*s(9246)+672*s(9247)+192*s(9248)+72*s(9249)+72*s(9250)+60*s(9252)+12*s(9253)+60*s(9255)+12*s(9256)+60*s(9258)+12*s(9259)+144*s(9261)+16*s(9266)+48*s(9267)+8*s(9268)+224*s(9269)+64*s(9270)+24*s(9271)+24*s(9272)+461*s(9670)+15*s(9674)+36*s(9675)+3*s(9676)+30*s(9678)+63*s(9679)+6*s(9680)+30*s(9682)+6*s(9683)+540*s(9685)+719*s(9686)+33*s(9690)+33*s(9694)+60*s(9697)+180*s(9698)+30*s(9699)+840*s(9700)+240*s(9701)+90*s(9702)+132*s(9703)+90*s(9704)+78*s(9705)+30*s(9707)+6*s(9708)+54*s(9711)+60*s(9712)+24*s(9713)+6*s(9714)+6*s(9718)+6*s(9721)+18*s(9722)+3*s(9723)+84*s(9724)+24*s(9725)+9*s(9726)+24*s(9727)+9*s(9728)+54*s(9730)+6*s(9736)+18*s(9737)+3*s(9738)+84*s(9739)+24*s(9740)+9*s(9741)+9*s(9742)+60*s(9744)+12*s(9745)+54*s(9747)+6*s(9752)+18*s(9753)+3*s(9754)+84*s(9755)+24*s(9756)+9*s(9757)+9*s(9758)+15*s(9760)+3*s(9761)+15*s(9763)+3*s(9764)+15*s(9766)+3*s(9767)+10 Such that:s(9665) =< V1+1 s(9667) =< V1+V+1 s(9669) =< V+1 aux(560) =< 1 aux(561) =< V1 aux(562) =< V1+V aux(563) =< V1/2 aux(564) =< V aux(565) =< V/2 s(9670) =< aux(560) s(9146) =< aux(561) s(9016) =< aux(564) s(9673) =< s(9665) s(9674) =< s(9665) s(9675) =< s(9665) s(9673) =< aux(560)+aux(561) s(9674) =< aux(560)+aux(561) s(9676) =< s(9673) s(9677) =< s(9669) s(9678) =< s(9669) s(9679) =< s(9669) s(9677) =< aux(560)+aux(564) s(9678) =< aux(560)+aux(564) s(9680) =< s(9677) s(9681) =< aux(561) s(9682) =< aux(561) s(9681) =< aux(560)+aux(561) s(9682) =< aux(560)+aux(561) s(9683) =< s(9681) s(9684) =< aux(562) s(9685) =< aux(562) s(9686) =< aux(562) s(9687) =< aux(562) s(9019) =< aux(564) s(9689) =< aux(562)-1 s(9684) =< aux(564)+aux(564)+aux(561) s(9685) =< aux(564)+aux(564)+aux(561) s(9690) =< s(9686)*aux(562) s(9691) =< aux(564)+aux(564)+aux(561) s(9692) =< aux(564)+aux(564)+aux(561) s(9693) =< s(9686)*s(9687) s(9694) =< s(9686)*s(9687) s(9695) =< s(9685)*s(9687) s(9696) =< s(9685)*s(9019) s(9692) =< s(9685)*s(9687) s(9697) =< s(9685)*s(9019) s(9698) =< s(9684) s(9699) =< s(9685)*s(9689) s(9691) =< s(9685)*aux(564) s(9700) =< s(9695) s(9701) =< s(9696) s(9702) =< s(9692) s(9703) =< s(9693) s(9704) =< s(9691) s(9705) =< s(9667) s(9706) =< s(9667) s(9707) =< s(9667) s(9706) =< aux(560)+aux(562) s(9707) =< aux(560)+aux(562) s(9708) =< s(9706) s(9709) =< aux(562) s(9710) =< aux(562) s(9711) =< aux(562) s(9712) =< aux(562) s(9709) =< s(9667) s(9710) =< s(9667) s(9711) =< s(9667) s(9712) =< s(9667) s(9709) =< aux(564)+aux(564)+aux(561) s(9711) =< aux(564)+aux(564)+aux(561) s(9713) =< s(9710) s(9714) =< s(9712)*aux(562) s(9715) =< aux(564)+aux(564)+aux(561) s(9716) =< aux(564)+aux(564)+aux(561) s(9717) =< s(9712)*s(9687) s(9718) =< s(9712)*s(9687) s(9719) =< s(9711)*s(9687) s(9720) =< s(9711)*s(9019) s(9716) =< s(9711)*s(9687) s(9721) =< s(9711)*s(9019) s(9722) =< s(9709) s(9723) =< s(9711)*s(9689) s(9715) =< s(9711)*aux(564) s(9724) =< s(9719) s(9725) =< s(9720) s(9726) =< s(9716) s(9727) =< s(9717) s(9728) =< s(9715) s(9729) =< aux(562) s(9730) =< aux(562) s(9729) =< s(9667) s(9730) =< s(9667) s(9731) =< aux(564) s(9731) =< s(9669) s(9729) =< s(9731)+s(9731)+aux(561) s(9730) =< s(9731)+s(9731)+aux(561) s(9732) =< s(9731)+s(9731)+aux(561) s(9733) =< s(9731)+s(9731)+aux(561) s(9734) =< s(9730)*s(9687) s(9735) =< s(9730)*s(9019) s(9733) =< s(9730)*s(9687) s(9736) =< s(9730)*s(9019) s(9737) =< s(9729) s(9738) =< s(9730)*s(9689) s(9732) =< s(9730)*aux(564) s(9739) =< s(9734) s(9740) =< s(9735) s(9741) =< s(9733) s(9742) =< s(9732) s(9743) =< aux(562) s(9744) =< aux(562) s(9743) =< aux(560)+aux(562) s(9744) =< aux(560)+aux(562) s(9745) =< s(9743) s(9746) =< aux(562) s(9747) =< aux(562) s(9746) =< s(9731)+s(9731)+aux(561) s(9747) =< s(9731)+s(9731)+aux(561) s(9748) =< s(9731)+s(9731)+aux(561) s(9749) =< s(9731)+s(9731)+aux(561) s(9750) =< s(9747)*s(9687) s(9751) =< s(9747)*s(9019) s(9749) =< s(9747)*s(9687) s(9752) =< s(9747)*s(9019) s(9753) =< s(9746) s(9754) =< s(9747)*s(9689) s(9748) =< s(9747)*aux(564) s(9755) =< s(9750) s(9756) =< s(9751) s(9757) =< s(9749) s(9758) =< s(9748) s(9759) =< aux(562) s(9760) =< aux(562) s(9759) =< aux(562)+aux(562) s(9760) =< aux(562)+aux(562) s(9761) =< s(9759) s(9762) =< aux(562) s(9763) =< aux(562) s(9762) =< aux(564)+aux(561) s(9763) =< aux(564)+aux(561) s(9764) =< s(9762) s(9765) =< aux(564) s(9766) =< aux(564) s(9765) =< aux(560)+aux(564) s(9766) =< aux(560)+aux(564) s(9767) =< s(9765) s(9015) =< aux(564) s(9015) =< aux(565) s(9017) =< aux(564)+2 s(9018) =< aux(564)+1 s(9020) =< s(9016)*s(9017) s(9021) =< s(9016)*s(9018) s(9022) =< s(9015)*s(9018) s(9023) =< s(9015)*s(9019) s(9024) =< s(9015)*s(9017) s(9025) =< s(9015)*s(9019) s(9026) =< s(9021) s(9027) =< s(9020) s(9028) =< s(9020) s(9029) =< s(9020) s(9028) =< aux(564)+s(9020) s(9029) =< aux(564)+s(9020) s(9030) =< s(9028) s(9031) =< s(9020) s(9032) =< s(9020) s(9031) =< aux(564)+s(9021) s(9032) =< aux(564)+s(9021) s(9033) =< s(9031) s(9034) =< s(9020) s(9035) =< s(9020) s(9036) =< s(9017) s(9037) =< s(9018) s(9038) =< s(9017)-1 s(9034) =< s(9021)+s(9021)+s(9020) s(9035) =< s(9021)+s(9021)+s(9020) s(9039) =< s(9027)*s(9017) s(9040) =< s(9021)+s(9021)+s(9020) s(9041) =< s(9021)+s(9021)+s(9020) s(9042) =< s(9027)*s(9036) s(9043) =< s(9027)*s(9036) s(9044) =< s(9035)*s(9036) s(9045) =< s(9035)*s(9037) s(9041) =< s(9035)*s(9036) s(9046) =< s(9035)*s(9037) s(9047) =< s(9034) s(9048) =< s(9035)*s(9038) s(9040) =< s(9035)*s(9018) s(9049) =< s(9044) s(9050) =< s(9045) s(9051) =< s(9041) s(9052) =< s(9042) s(9053) =< s(9040) s(9054) =< s(9020) s(9055) =< s(9020) s(9056) =< s(9021) s(9056) =< s(9020) s(9054) =< s(9056)+s(9056)+s(9020) s(9055) =< s(9056)+s(9056)+s(9020) s(9057) =< s(9056)+s(9056)+s(9020) s(9058) =< s(9056)+s(9056)+s(9020) s(9059) =< s(9055)*s(9036) s(9060) =< s(9055)*s(9037) s(9058) =< s(9055)*s(9036) s(9061) =< s(9055)*s(9037) s(9062) =< s(9054) s(9063) =< s(9055)*s(9038) s(9057) =< s(9055)*s(9018) s(9064) =< s(9059) s(9065) =< s(9060) s(9066) =< s(9058) s(9067) =< s(9057) s(9068) =< s(9020) s(9069) =< s(9020) s(9068) =< s(9020)+s(9020) s(9069) =< s(9020)+s(9020) s(9070) =< s(9068) s(9071) =< s(9020) s(9072) =< s(9020) s(9071) =< s(9021)+s(9020) s(9072) =< s(9021)+s(9020) s(9073) =< s(9071) s(9074) =< s(9021) s(9075) =< s(9021) s(9074) =< aux(564)+s(9021) s(9075) =< aux(564)+s(9021) s(9076) =< s(9074) s(9077) =< s(9023) s(9078) =< aux(565) s(9079) =< s(9022) s(9080) =< s(9022) s(9081) =< s(9022) s(9080) =< aux(565)+s(9022) s(9081) =< aux(565)+s(9022) s(9082) =< s(9080) s(9083) =< s(9022) s(9084) =< s(9022) s(9083) =< aux(565)+s(9023) s(9084) =< aux(565)+s(9023) s(9085) =< s(9083) s(9086) =< s(9024) s(9087) =< s(9024) s(9088) =< s(9024) s(9086) =< s(9023)+s(9023)+s(9022) s(9087) =< s(9023)+s(9023)+s(9022) s(9089) =< s(9088)*s(9017) s(9090) =< s(9023)+s(9023)+s(9022) s(9091) =< s(9023)+s(9023)+s(9022) s(9092) =< s(9088)*s(9036) s(9093) =< s(9088)*s(9036) s(9094) =< s(9087)*s(9036) s(9095) =< s(9087)*s(9019) s(9091) =< s(9087)*s(9036) s(9096) =< s(9087)*s(9019) s(9097) =< s(9086) s(9098) =< s(9087)*s(9038) s(9090) =< s(9087)*aux(564) s(9099) =< s(9094) s(9100) =< s(9095) s(9101) =< s(9091) s(9102) =< s(9092) s(9103) =< s(9090) s(9104) =< s(9024) s(9105) =< s(9024) s(9104) =< aux(565)+s(9024) s(9105) =< aux(565)+s(9024) s(9106) =< s(9104) s(9107) =< s(9024) s(9108) =< s(9024) s(9109) =< s(9023) s(9109) =< s(9022) s(9107) =< s(9109)+s(9109)+s(9022) s(9108) =< s(9109)+s(9109)+s(9022) s(9110) =< s(9109)+s(9109)+s(9022) s(9111) =< s(9109)+s(9109)+s(9022) s(9112) =< s(9108)*s(9036) s(9113) =< s(9108)*s(9019) s(9111) =< s(9108)*s(9036) s(9114) =< s(9108)*s(9019) s(9115) =< s(9107) s(9116) =< s(9108)*s(9038) s(9110) =< s(9108)*aux(564) s(9117) =< s(9112) s(9118) =< s(9113) s(9119) =< s(9111) s(9120) =< s(9110) s(9121) =< s(9024) s(9122) =< s(9024) s(9121) =< s(9024)+s(9024) s(9122) =< s(9024)+s(9024) s(9123) =< s(9121) s(9124) =< s(9024) s(9125) =< s(9024) s(9124) =< s(9023)+s(9022) s(9125) =< s(9023)+s(9022) s(9126) =< s(9124) s(9127) =< s(9023) s(9128) =< s(9023) s(9127) =< aux(565)+s(9023) s(9128) =< aux(565)+s(9023) s(9129) =< s(9127) s(9130) =< s(9024) s(9131) =< s(9024) s(9130) =< s(9022)+s(9022)+s(9023) s(9131) =< s(9022)+s(9022)+s(9023) s(9132) =< s(9022)+s(9022)+s(9023) s(9133) =< s(9022)+s(9022)+s(9023) s(9134) =< s(9131)*s(9036) s(9135) =< s(9131)*s(9037) s(9133) =< s(9131)*s(9036) s(9136) =< s(9131)*s(9037) s(9137) =< s(9130) s(9138) =< s(9131)*s(9038) s(9132) =< s(9131)*s(9018) s(9139) =< s(9134) s(9140) =< s(9135) s(9141) =< s(9133) s(9142) =< s(9132) s(9145) =< aux(561) s(9145) =< aux(563) s(9147) =< aux(561)+2 s(9148) =< aux(561)+1 s(9149) =< aux(561) s(9150) =< s(9146)*s(9147) s(9151) =< s(9146)*s(9148) s(9152) =< s(9145)*s(9148) s(9153) =< s(9145)*s(9149) s(9154) =< s(9145)*s(9147) s(9155) =< s(9145)*s(9149) s(9156) =< s(9151) s(9157) =< s(9150) s(9158) =< s(9150) s(9159) =< s(9150) s(9158) =< aux(561)+s(9150) s(9159) =< aux(561)+s(9150) s(9160) =< s(9158) s(9161) =< s(9150) s(9162) =< s(9150) s(9161) =< aux(561)+s(9151) s(9162) =< aux(561)+s(9151) s(9163) =< s(9161) s(9164) =< s(9150) s(9165) =< s(9150) s(9166) =< s(9147) s(9167) =< s(9148) s(9168) =< s(9147)-1 s(9164) =< s(9151)+s(9151)+s(9150) s(9165) =< s(9151)+s(9151)+s(9150) s(9169) =< s(9157)*s(9147) s(9170) =< s(9151)+s(9151)+s(9150) s(9171) =< s(9151)+s(9151)+s(9150) s(9172) =< s(9157)*s(9166) s(9173) =< s(9157)*s(9166) s(9174) =< s(9165)*s(9166) s(9175) =< s(9165)*s(9167) s(9171) =< s(9165)*s(9166) s(9176) =< s(9165)*s(9167) s(9177) =< s(9164) s(9178) =< s(9165)*s(9168) s(9170) =< s(9165)*s(9148) s(9179) =< s(9174) s(9180) =< s(9175) s(9181) =< s(9171) s(9182) =< s(9172) s(9183) =< s(9170) s(9184) =< s(9150) s(9185) =< s(9150) s(9186) =< s(9151) s(9186) =< s(9150) s(9184) =< s(9186)+s(9186)+s(9150) s(9185) =< s(9186)+s(9186)+s(9150) s(9187) =< s(9186)+s(9186)+s(9150) s(9188) =< s(9186)+s(9186)+s(9150) s(9189) =< s(9185)*s(9166) s(9190) =< s(9185)*s(9167) s(9188) =< s(9185)*s(9166) s(9191) =< s(9185)*s(9167) s(9192) =< s(9184) s(9193) =< s(9185)*s(9168) s(9187) =< s(9185)*s(9148) s(9194) =< s(9189) s(9195) =< s(9190) s(9196) =< s(9188) s(9197) =< s(9187) s(9198) =< s(9150) s(9199) =< s(9150) s(9198) =< s(9150)+s(9150) s(9199) =< s(9150)+s(9150) s(9200) =< s(9198) s(9201) =< s(9150) s(9202) =< s(9150) s(9201) =< s(9151)+s(9150) s(9202) =< s(9151)+s(9150) s(9203) =< s(9201) s(9204) =< s(9151) s(9205) =< s(9151) s(9204) =< aux(561)+s(9151) s(9205) =< aux(561)+s(9151) s(9206) =< s(9204) s(9207) =< s(9153) s(9208) =< aux(563) s(9209) =< s(9152) s(9210) =< s(9152) s(9211) =< s(9152) s(9210) =< aux(563)+s(9152) s(9211) =< aux(563)+s(9152) s(9212) =< s(9210) s(9213) =< s(9152) s(9214) =< s(9152) s(9213) =< aux(563)+s(9153) s(9214) =< aux(563)+s(9153) s(9215) =< s(9213) s(9216) =< s(9154) s(9217) =< s(9154) s(9218) =< s(9154) s(9216) =< s(9153)+s(9153)+s(9152) s(9217) =< s(9153)+s(9153)+s(9152) s(9219) =< s(9218)*s(9147) s(9220) =< s(9153)+s(9153)+s(9152) s(9221) =< s(9153)+s(9153)+s(9152) s(9222) =< s(9218)*s(9166) s(9223) =< s(9218)*s(9166) s(9224) =< s(9217)*s(9166) s(9225) =< s(9217)*s(9149) s(9221) =< s(9217)*s(9166) s(9226) =< s(9217)*s(9149) s(9227) =< s(9216) s(9228) =< s(9217)*s(9168) s(9220) =< s(9217)*aux(561) s(9229) =< s(9224) s(9230) =< s(9225) s(9231) =< s(9221) s(9232) =< s(9222) s(9233) =< s(9220) s(9234) =< s(9154) s(9235) =< s(9154) s(9234) =< aux(563)+s(9154) s(9235) =< aux(563)+s(9154) s(9236) =< s(9234) s(9237) =< s(9154) s(9238) =< s(9154) s(9239) =< s(9153) s(9239) =< s(9152) s(9237) =< s(9239)+s(9239)+s(9152) s(9238) =< s(9239)+s(9239)+s(9152) s(9240) =< s(9239)+s(9239)+s(9152) s(9241) =< s(9239)+s(9239)+s(9152) s(9242) =< s(9238)*s(9166) s(9243) =< s(9238)*s(9149) s(9241) =< s(9238)*s(9166) s(9244) =< s(9238)*s(9149) s(9245) =< s(9237) s(9246) =< s(9238)*s(9168) s(9240) =< s(9238)*aux(561) s(9247) =< s(9242) s(9248) =< s(9243) s(9249) =< s(9241) s(9250) =< s(9240) s(9251) =< s(9154) s(9252) =< s(9154) s(9251) =< s(9154)+s(9154) s(9252) =< s(9154)+s(9154) s(9253) =< s(9251) s(9254) =< s(9154) s(9255) =< s(9154) s(9254) =< s(9153)+s(9152) s(9255) =< s(9153)+s(9152) s(9256) =< s(9254) s(9257) =< s(9153) s(9258) =< s(9153) s(9257) =< aux(563)+s(9153) s(9258) =< aux(563)+s(9153) s(9259) =< s(9257) s(9260) =< s(9154) s(9261) =< s(9154) s(9260) =< s(9152)+s(9152)+s(9153) s(9261) =< s(9152)+s(9152)+s(9153) s(9262) =< s(9152)+s(9152)+s(9153) s(9263) =< s(9152)+s(9152)+s(9153) s(9264) =< s(9261)*s(9166) s(9265) =< s(9261)*s(9167) s(9263) =< s(9261)*s(9166) s(9266) =< s(9261)*s(9167) s(9267) =< s(9260) s(9268) =< s(9261)*s(9168) s(9262) =< s(9261)*s(9148) s(9269) =< s(9264) s(9270) =< s(9265) s(9271) =< s(9263) s(9272) =< s(9262) with precondition: [V1>=0,Out>=1,V>=Out] * Chain [73]: 26*s(10345)+956*s(10346)+6*s(10355)+324*s(10356)+2294*s(10357)+270*s(10359)+54*s(10360)+60*s(10362)+12*s(10363)+1296*s(10365)+84*s(10369)+84*s(10373)+144*s(10376)+432*s(10377)+72*s(10378)+2016*s(10379)+576*s(10380)+216*s(10381)+336*s(10382)+216*s(10383)+216*s(10385)+24*s(10391)+72*s(10392)+12*s(10393)+336*s(10394)+96*s(10395)+36*s(10396)+36*s(10397)+30*s(10399)+6*s(10400)+30*s(10402)+6*s(10403)+30*s(10405)+6*s(10406)+300*s(10407)+922*s(10408)+464*s(10409)+90*s(10411)+18*s(10412)+60*s(10414)+12*s(10415)+1116*s(10417)+1762*s(10418)+78*s(10419)+78*s(10423)+124*s(10426)+372*s(10427)+62*s(10428)+1736*s(10429)+496*s(10430)+186*s(10431)+312*s(10432)+186*s(10433)+180*s(10435)+36*s(10436)+216*s(10438)+24*s(10444)+72*s(10445)+12*s(10446)+336*s(10447)+96*s(10448)+36*s(10449)+36*s(10450)+30*s(10452)+6*s(10453)+30*s(10455)+6*s(10456)+30*s(10458)+6*s(10459)+72*s(10461)+8*s(10466)+24*s(10467)+4*s(10468)+112*s(10469)+32*s(10470)+12*s(10471)+12*s(10472)+13*s(10605)+478*s(10606)+3*s(10615)+162*s(10616)+1147*s(10617)+135*s(10619)+27*s(10620)+30*s(10622)+6*s(10623)+648*s(10625)+42*s(10629)+42*s(10633)+72*s(10636)+216*s(10637)+36*s(10638)+1008*s(10639)+288*s(10640)+108*s(10641)+168*s(10642)+108*s(10643)+108*s(10645)+12*s(10651)+36*s(10652)+6*s(10653)+168*s(10654)+48*s(10655)+18*s(10656)+18*s(10657)+15*s(10659)+3*s(10660)+15*s(10662)+3*s(10663)+15*s(10665)+3*s(10666)+150*s(10667)+461*s(10668)+232*s(10669)+45*s(10671)+9*s(10672)+30*s(10674)+6*s(10675)+558*s(10677)+881*s(10678)+39*s(10679)+39*s(10683)+62*s(10686)+186*s(10687)+31*s(10688)+868*s(10689)+248*s(10690)+93*s(10691)+156*s(10692)+93*s(10693)+90*s(10695)+18*s(10696)+108*s(10698)+12*s(10704)+36*s(10705)+6*s(10706)+168*s(10707)+48*s(10708)+18*s(10709)+18*s(10710)+15*s(10712)+3*s(10713)+15*s(10715)+3*s(10716)+15*s(10718)+3*s(10719)+36*s(10721)+4*s(10726)+12*s(10727)+2*s(10728)+56*s(10729)+16*s(10730)+6*s(10731)+6*s(10732)+1 Such that:s(10603) =< V s(10604) =< V/2 aux(566) =< V1 aux(567) =< V1/2 s(10345) =< aux(566) s(10346) =< aux(566) s(10345) =< aux(567) s(10347) =< aux(566)+2 s(10348) =< aux(566)+1 s(10349) =< aux(566) s(10350) =< s(10346)*s(10347) s(10351) =< s(10346)*s(10348) s(10352) =< s(10345)*s(10348) s(10353) =< s(10345)*s(10349) s(10354) =< s(10345)*s(10347) s(10355) =< s(10345)*s(10349) s(10356) =< s(10351) s(10357) =< s(10350) s(10358) =< s(10350) s(10359) =< s(10350) s(10358) =< aux(566)+s(10350) s(10359) =< aux(566)+s(10350) s(10360) =< s(10358) s(10361) =< s(10350) s(10362) =< s(10350) s(10361) =< aux(566)+s(10351) s(10362) =< aux(566)+s(10351) s(10363) =< s(10361) s(10364) =< s(10350) s(10365) =< s(10350) s(10366) =< s(10347) s(10367) =< s(10348) s(10368) =< s(10347)-1 s(10364) =< s(10351)+s(10351)+s(10350) s(10365) =< s(10351)+s(10351)+s(10350) s(10369) =< s(10357)*s(10347) s(10370) =< s(10351)+s(10351)+s(10350) s(10371) =< s(10351)+s(10351)+s(10350) s(10372) =< s(10357)*s(10366) s(10373) =< s(10357)*s(10366) s(10374) =< s(10365)*s(10366) s(10375) =< s(10365)*s(10367) s(10371) =< s(10365)*s(10366) s(10376) =< s(10365)*s(10367) s(10377) =< s(10364) s(10378) =< s(10365)*s(10368) s(10370) =< s(10365)*s(10348) s(10379) =< s(10374) s(10380) =< s(10375) s(10381) =< s(10371) s(10382) =< s(10372) s(10383) =< s(10370) s(10384) =< s(10350) s(10385) =< s(10350) s(10386) =< s(10351) s(10386) =< s(10350) s(10384) =< s(10386)+s(10386)+s(10350) s(10385) =< s(10386)+s(10386)+s(10350) s(10387) =< s(10386)+s(10386)+s(10350) s(10388) =< s(10386)+s(10386)+s(10350) s(10389) =< s(10385)*s(10366) s(10390) =< s(10385)*s(10367) s(10388) =< s(10385)*s(10366) s(10391) =< s(10385)*s(10367) s(10392) =< s(10384) s(10393) =< s(10385)*s(10368) s(10387) =< s(10385)*s(10348) s(10394) =< s(10389) s(10395) =< s(10390) s(10396) =< s(10388) s(10397) =< s(10387) s(10398) =< s(10350) s(10399) =< s(10350) s(10398) =< s(10350)+s(10350) s(10399) =< s(10350)+s(10350) s(10400) =< s(10398) s(10401) =< s(10350) s(10402) =< s(10350) s(10401) =< s(10351)+s(10350) s(10402) =< s(10351)+s(10350) s(10403) =< s(10401) s(10404) =< s(10351) s(10405) =< s(10351) s(10404) =< aux(566)+s(10351) s(10405) =< aux(566)+s(10351) s(10406) =< s(10404) s(10407) =< s(10353) s(10408) =< aux(567) s(10409) =< s(10352) s(10410) =< s(10352) s(10411) =< s(10352) s(10410) =< aux(567)+s(10352) s(10411) =< aux(567)+s(10352) s(10412) =< s(10410) s(10413) =< s(10352) s(10414) =< s(10352) s(10413) =< aux(567)+s(10353) s(10414) =< aux(567)+s(10353) s(10415) =< s(10413) s(10416) =< s(10354) s(10417) =< s(10354) s(10418) =< s(10354) s(10416) =< s(10353)+s(10353)+s(10352) s(10417) =< s(10353)+s(10353)+s(10352) s(10419) =< s(10418)*s(10347) s(10420) =< s(10353)+s(10353)+s(10352) s(10421) =< s(10353)+s(10353)+s(10352) s(10422) =< s(10418)*s(10366) s(10423) =< s(10418)*s(10366) s(10424) =< s(10417)*s(10366) s(10425) =< s(10417)*s(10349) s(10421) =< s(10417)*s(10366) s(10426) =< s(10417)*s(10349) s(10427) =< s(10416) s(10428) =< s(10417)*s(10368) s(10420) =< s(10417)*aux(566) s(10429) =< s(10424) s(10430) =< s(10425) s(10431) =< s(10421) s(10432) =< s(10422) s(10433) =< s(10420) s(10434) =< s(10354) s(10435) =< s(10354) s(10434) =< aux(567)+s(10354) s(10435) =< aux(567)+s(10354) s(10436) =< s(10434) s(10437) =< s(10354) s(10438) =< s(10354) s(10439) =< s(10353) s(10439) =< s(10352) s(10437) =< s(10439)+s(10439)+s(10352) s(10438) =< s(10439)+s(10439)+s(10352) s(10440) =< s(10439)+s(10439)+s(10352) s(10441) =< s(10439)+s(10439)+s(10352) s(10442) =< s(10438)*s(10366) s(10443) =< s(10438)*s(10349) s(10441) =< s(10438)*s(10366) s(10444) =< s(10438)*s(10349) s(10445) =< s(10437) s(10446) =< s(10438)*s(10368) s(10440) =< s(10438)*aux(566) s(10447) =< s(10442) s(10448) =< s(10443) s(10449) =< s(10441) s(10450) =< s(10440) s(10451) =< s(10354) s(10452) =< s(10354) s(10451) =< s(10354)+s(10354) s(10452) =< s(10354)+s(10354) s(10453) =< s(10451) s(10454) =< s(10354) s(10455) =< s(10354) s(10454) =< s(10353)+s(10352) s(10455) =< s(10353)+s(10352) s(10456) =< s(10454) s(10457) =< s(10353) s(10458) =< s(10353) s(10457) =< aux(567)+s(10353) s(10458) =< aux(567)+s(10353) s(10459) =< s(10457) s(10460) =< s(10354) s(10461) =< s(10354) s(10460) =< s(10352)+s(10352)+s(10353) s(10461) =< s(10352)+s(10352)+s(10353) s(10462) =< s(10352)+s(10352)+s(10353) s(10463) =< s(10352)+s(10352)+s(10353) s(10464) =< s(10461)*s(10366) s(10465) =< s(10461)*s(10367) s(10463) =< s(10461)*s(10366) s(10466) =< s(10461)*s(10367) s(10467) =< s(10460) s(10468) =< s(10461)*s(10368) s(10462) =< s(10461)*s(10348) s(10469) =< s(10464) s(10470) =< s(10465) s(10471) =< s(10463) s(10472) =< s(10462) s(10605) =< s(10603) s(10606) =< s(10603) s(10605) =< s(10604) s(10607) =< s(10603)+2 s(10608) =< s(10603)+1 s(10609) =< s(10603) s(10610) =< s(10606)*s(10607) s(10611) =< s(10606)*s(10608) s(10612) =< s(10605)*s(10608) s(10613) =< s(10605)*s(10609) s(10614) =< s(10605)*s(10607) s(10615) =< s(10605)*s(10609) s(10616) =< s(10611) s(10617) =< s(10610) s(10618) =< s(10610) s(10619) =< s(10610) s(10618) =< s(10603)+s(10610) s(10619) =< s(10603)+s(10610) s(10620) =< s(10618) s(10621) =< s(10610) s(10622) =< s(10610) s(10621) =< s(10603)+s(10611) s(10622) =< s(10603)+s(10611) s(10623) =< s(10621) s(10624) =< s(10610) s(10625) =< s(10610) s(10626) =< s(10607) s(10627) =< s(10608) s(10628) =< s(10607)-1 s(10624) =< s(10611)+s(10611)+s(10610) s(10625) =< s(10611)+s(10611)+s(10610) s(10629) =< s(10617)*s(10607) s(10630) =< s(10611)+s(10611)+s(10610) s(10631) =< s(10611)+s(10611)+s(10610) s(10632) =< s(10617)*s(10626) s(10633) =< s(10617)*s(10626) s(10634) =< s(10625)*s(10626) s(10635) =< s(10625)*s(10627) s(10631) =< s(10625)*s(10626) s(10636) =< s(10625)*s(10627) s(10637) =< s(10624) s(10638) =< s(10625)*s(10628) s(10630) =< s(10625)*s(10608) s(10639) =< s(10634) s(10640) =< s(10635) s(10641) =< s(10631) s(10642) =< s(10632) s(10643) =< s(10630) s(10644) =< s(10610) s(10645) =< s(10610) s(10646) =< s(10611) s(10646) =< s(10610) s(10644) =< s(10646)+s(10646)+s(10610) s(10645) =< s(10646)+s(10646)+s(10610) s(10647) =< s(10646)+s(10646)+s(10610) s(10648) =< s(10646)+s(10646)+s(10610) s(10649) =< s(10645)*s(10626) s(10650) =< s(10645)*s(10627) s(10648) =< s(10645)*s(10626) s(10651) =< s(10645)*s(10627) s(10652) =< s(10644) s(10653) =< s(10645)*s(10628) s(10647) =< s(10645)*s(10608) s(10654) =< s(10649) s(10655) =< s(10650) s(10656) =< s(10648) s(10657) =< s(10647) s(10658) =< s(10610) s(10659) =< s(10610) s(10658) =< s(10610)+s(10610) s(10659) =< s(10610)+s(10610) s(10660) =< s(10658) s(10661) =< s(10610) s(10662) =< s(10610) s(10661) =< s(10611)+s(10610) s(10662) =< s(10611)+s(10610) s(10663) =< s(10661) s(10664) =< s(10611) s(10665) =< s(10611) s(10664) =< s(10603)+s(10611) s(10665) =< s(10603)+s(10611) s(10666) =< s(10664) s(10667) =< s(10613) s(10668) =< s(10604) s(10669) =< s(10612) s(10670) =< s(10612) s(10671) =< s(10612) s(10670) =< s(10604)+s(10612) s(10671) =< s(10604)+s(10612) s(10672) =< s(10670) s(10673) =< s(10612) s(10674) =< s(10612) s(10673) =< s(10604)+s(10613) s(10674) =< s(10604)+s(10613) s(10675) =< s(10673) s(10676) =< s(10614) s(10677) =< s(10614) s(10678) =< s(10614) s(10676) =< s(10613)+s(10613)+s(10612) s(10677) =< s(10613)+s(10613)+s(10612) s(10679) =< s(10678)*s(10607) s(10680) =< s(10613)+s(10613)+s(10612) s(10681) =< s(10613)+s(10613)+s(10612) s(10682) =< s(10678)*s(10626) s(10683) =< s(10678)*s(10626) s(10684) =< s(10677)*s(10626) s(10685) =< s(10677)*s(10609) s(10681) =< s(10677)*s(10626) s(10686) =< s(10677)*s(10609) s(10687) =< s(10676) s(10688) =< s(10677)*s(10628) s(10680) =< s(10677)*s(10603) s(10689) =< s(10684) s(10690) =< s(10685) s(10691) =< s(10681) s(10692) =< s(10682) s(10693) =< s(10680) s(10694) =< s(10614) s(10695) =< s(10614) s(10694) =< s(10604)+s(10614) s(10695) =< s(10604)+s(10614) s(10696) =< s(10694) s(10697) =< s(10614) s(10698) =< s(10614) s(10699) =< s(10613) s(10699) =< s(10612) s(10697) =< s(10699)+s(10699)+s(10612) s(10698) =< s(10699)+s(10699)+s(10612) s(10700) =< s(10699)+s(10699)+s(10612) s(10701) =< s(10699)+s(10699)+s(10612) s(10702) =< s(10698)*s(10626) s(10703) =< s(10698)*s(10609) s(10701) =< s(10698)*s(10626) s(10704) =< s(10698)*s(10609) s(10705) =< s(10697) s(10706) =< s(10698)*s(10628) s(10700) =< s(10698)*s(10603) s(10707) =< s(10702) s(10708) =< s(10703) s(10709) =< s(10701) s(10710) =< s(10700) s(10711) =< s(10614) s(10712) =< s(10614) s(10711) =< s(10614)+s(10614) s(10712) =< s(10614)+s(10614) s(10713) =< s(10711) s(10714) =< s(10614) s(10715) =< s(10614) s(10714) =< s(10613)+s(10612) s(10715) =< s(10613)+s(10612) s(10716) =< s(10714) s(10717) =< s(10613) s(10718) =< s(10613) s(10717) =< s(10604)+s(10613) s(10718) =< s(10604)+s(10613) s(10719) =< s(10717) s(10720) =< s(10614) s(10721) =< s(10614) s(10720) =< s(10612)+s(10612)+s(10613) s(10721) =< s(10612)+s(10612)+s(10613) s(10722) =< s(10612)+s(10612)+s(10613) s(10723) =< s(10612)+s(10612)+s(10613) s(10724) =< s(10721)*s(10626) s(10725) =< s(10721)*s(10627) s(10723) =< s(10721)*s(10626) s(10726) =< s(10721)*s(10627) s(10727) =< s(10720) s(10728) =< s(10721)*s(10628) s(10722) =< s(10721)*s(10608) s(10729) =< s(10724) s(10730) =< s(10725) s(10731) =< s(10723) s(10732) =< s(10722) with precondition: [V>=0,Out>=1,V1>=Out] #### Cost of chains of start(V1,V): * Chain [76]: 13540*s(10734)+15163*s(10736)+3677*s(10747)+105*s(10751)+258*s(10752)+21*s(10753)+180*s(10755)+393*s(10756)+36*s(10757)+210*s(10759)+42*s(10760)+2268*s(10762)+2968*s(10763)+138*s(10767)+138*s(10771)+252*s(10774)+756*s(10775)+126*s(10776)+3528*s(10777)+1008*s(10778)+378*s(10779)+552*s(10780)+378*s(10781)+312*s(10782)+120*s(10784)+24*s(10785)+216*s(10788)+240*s(10789)+96*s(10790)+24*s(10791)+24*s(10795)+24*s(10798)+72*s(10799)+12*s(10800)+336*s(10801)+96*s(10802)+36*s(10803)+96*s(10804)+36*s(10805)+216*s(10807)+24*s(10813)+72*s(10814)+12*s(10815)+336*s(10816)+96*s(10817)+36*s(10818)+36*s(10819)+240*s(10821)+48*s(10822)+216*s(10824)+24*s(10829)+72*s(10830)+12*s(10831)+336*s(10832)+96*s(10833)+36*s(10834)+36*s(10835)+60*s(10837)+12*s(10838)+60*s(10840)+12*s(10841)+135*s(10843)+27*s(10844)+351*s(11007)+81*s(11017)+4374*s(11018)+30969*s(11019)+3645*s(11021)+729*s(11022)+810*s(11024)+162*s(11025)+17496*s(11027)+1134*s(11031)+1134*s(11035)+1944*s(11038)+5832*s(11039)+972*s(11040)+27216*s(11041)+7776*s(11042)+2916*s(11043)+4536*s(11044)+2916*s(11045)+2916*s(11047)+324*s(11053)+972*s(11054)+162*s(11055)+4536*s(11056)+1296*s(11057)+486*s(11058)+486*s(11059)+405*s(11061)+81*s(11062)+405*s(11064)+81*s(11065)+405*s(11067)+81*s(11068)+4050*s(11069)+12447*s(11070)+6264*s(11071)+1215*s(11073)+243*s(11074)+810*s(11076)+162*s(11077)+15066*s(11079)+23787*s(11080)+1053*s(11081)+1053*s(11085)+1674*s(11088)+5022*s(11089)+837*s(11090)+23436*s(11091)+6696*s(11092)+2511*s(11093)+4212*s(11094)+2511*s(11095)+2430*s(11097)+486*s(11098)+2916*s(11100)+324*s(11106)+972*s(11107)+162*s(11108)+4536*s(11109)+1296*s(11110)+486*s(11111)+486*s(11112)+405*s(11114)+81*s(11115)+405*s(11117)+81*s(11118)+405*s(11120)+81*s(11121)+972*s(11123)+108*s(11128)+324*s(11129)+54*s(11130)+1512*s(11131)+432*s(11132)+162*s(11133)+162*s(11134)+325*s(11267)+75*s(11277)+4050*s(11278)+28675*s(11279)+3375*s(11281)+675*s(11282)+750*s(11284)+150*s(11285)+16200*s(11287)+1050*s(11291)+1050*s(11295)+1800*s(11298)+5400*s(11299)+900*s(11300)+25200*s(11301)+7200*s(11302)+2700*s(11303)+4200*s(11304)+2700*s(11305)+2700*s(11307)+300*s(11313)+900*s(11314)+150*s(11315)+4200*s(11316)+1200*s(11317)+450*s(11318)+450*s(11319)+375*s(11321)+75*s(11322)+375*s(11324)+75*s(11325)+375*s(11327)+75*s(11328)+3750*s(11329)+11525*s(11330)+5800*s(11331)+1125*s(11333)+225*s(11334)+750*s(11336)+150*s(11337)+13950*s(11339)+22025*s(11340)+975*s(11341)+975*s(11345)+1550*s(11348)+4650*s(11349)+775*s(11350)+21700*s(11351)+6200*s(11352)+2325*s(11353)+3900*s(11354)+2325*s(11355)+2250*s(11357)+450*s(11358)+2700*s(11360)+300*s(11366)+900*s(11367)+150*s(11368)+4200*s(11369)+1200*s(11370)+450*s(11371)+450*s(11372)+375*s(11374)+75*s(11375)+375*s(11377)+75*s(11378)+375*s(11380)+75*s(11381)+900*s(11383)+100*s(11388)+300*s(11389)+50*s(11390)+1400*s(11391)+400*s(11392)+150*s(11393)+150*s(11394)+36*s(13446)+36*s(13449)+36*s(13450)+1152*s(13451)+108*s(13452)+168*s(13454)+60*s(13455)+6*s(13456)+6*s(13459)+6*s(13460)+192*s(13461)+18*s(13462)+15*s(13464)+3*s(13465)+609*s(13467)+36*s(13469)+36*s(13473)+66*s(13475)+201*s(13476)+33*s(13477)+1188*s(13478)+99*s(13479)+144*s(13480)+99*s(13481)+54*s(13483)+60*s(13484)+24*s(13485)+6*s(13486)+6*s(13490)+6*s(13492)+18*s(13493)+3*s(13494)+108*s(13495)+9*s(13496)+24*s(13497)+9*s(13498)+54*s(13500)+6*s(13504)+18*s(13505)+3*s(13506)+108*s(13507)+9*s(13508)+9*s(13509)+54*s(13511)+6*s(13515)+18*s(13516)+3*s(13517)+108*s(13518)+9*s(13519)+9*s(13520)+10 Such that:aux(571) =< 1 aux(572) =< V1 aux(573) =< V1+1 aux(574) =< V1+V aux(575) =< V1+V+1 aux(576) =< V1/2 aux(577) =< V aux(578) =< V+1 aux(579) =< V/2 s(10736) =< aux(572) s(10734) =< aux(577) s(10747) =< aux(571) s(10750) =< aux(573) s(10751) =< aux(573) s(10752) =< aux(573) s(10750) =< aux(571)+aux(572) s(10751) =< aux(571)+aux(572) s(10753) =< s(10750) s(10754) =< aux(578) s(10755) =< aux(578) s(10756) =< aux(578) s(10754) =< aux(571)+aux(577) s(10755) =< aux(571)+aux(577) s(10757) =< s(10754) s(10758) =< aux(572) s(10759) =< aux(572) s(10758) =< aux(571)+aux(572) s(10759) =< aux(571)+aux(572) s(10760) =< s(10758) s(10761) =< aux(574) s(10762) =< aux(574) s(10763) =< aux(574) s(10764) =< aux(574) s(10765) =< aux(577) s(10766) =< aux(574)-1 s(10761) =< aux(577)+aux(577)+aux(572) s(10762) =< aux(577)+aux(577)+aux(572) s(10767) =< s(10763)*aux(574) s(10768) =< aux(577)+aux(577)+aux(572) s(10769) =< aux(577)+aux(577)+aux(572) s(10770) =< s(10763)*s(10764) s(10771) =< s(10763)*s(10764) s(10772) =< s(10762)*s(10764) s(10773) =< s(10762)*s(10765) s(10769) =< s(10762)*s(10764) s(10774) =< s(10762)*s(10765) s(10775) =< s(10761) s(10776) =< s(10762)*s(10766) s(10768) =< s(10762)*aux(577) s(10777) =< s(10772) s(10778) =< s(10773) s(10779) =< s(10769) s(10780) =< s(10770) s(10781) =< s(10768) s(10782) =< aux(575) s(10783) =< aux(575) s(10784) =< aux(575) s(10783) =< aux(571)+aux(574) s(10784) =< aux(571)+aux(574) s(10785) =< s(10783) s(10786) =< aux(574) s(10787) =< aux(574) s(10788) =< aux(574) s(10789) =< aux(574) s(10786) =< aux(575) s(10787) =< aux(575) s(10788) =< aux(575) s(10789) =< aux(575) s(10786) =< aux(577)+aux(577)+aux(572) s(10788) =< aux(577)+aux(577)+aux(572) s(10790) =< s(10787) s(10791) =< s(10789)*aux(574) s(10792) =< aux(577)+aux(577)+aux(572) s(10793) =< aux(577)+aux(577)+aux(572) s(10794) =< s(10789)*s(10764) s(10795) =< s(10789)*s(10764) s(10796) =< s(10788)*s(10764) s(10797) =< s(10788)*s(10765) s(10793) =< s(10788)*s(10764) s(10798) =< s(10788)*s(10765) s(10799) =< s(10786) s(10800) =< s(10788)*s(10766) s(10792) =< s(10788)*aux(577) s(10801) =< s(10796) s(10802) =< s(10797) s(10803) =< s(10793) s(10804) =< s(10794) s(10805) =< s(10792) s(10806) =< aux(574) s(10807) =< aux(574) s(10806) =< aux(575) s(10807) =< aux(575) s(10808) =< aux(577) s(10808) =< aux(578) s(10806) =< s(10808)+s(10808)+aux(572) s(10807) =< s(10808)+s(10808)+aux(572) s(10809) =< s(10808)+s(10808)+aux(572) s(10810) =< s(10808)+s(10808)+aux(572) s(10811) =< s(10807)*s(10764) s(10812) =< s(10807)*s(10765) s(10810) =< s(10807)*s(10764) s(10813) =< s(10807)*s(10765) s(10814) =< s(10806) s(10815) =< s(10807)*s(10766) s(10809) =< s(10807)*aux(577) s(10816) =< s(10811) s(10817) =< s(10812) s(10818) =< s(10810) s(10819) =< s(10809) s(10820) =< aux(574) s(10821) =< aux(574) s(10820) =< aux(571)+aux(574) s(10821) =< aux(571)+aux(574) s(10822) =< s(10820) s(10823) =< aux(574) s(10824) =< aux(574) s(10823) =< s(10808)+s(10808)+aux(572) s(10824) =< s(10808)+s(10808)+aux(572) s(10825) =< s(10808)+s(10808)+aux(572) s(10826) =< s(10808)+s(10808)+aux(572) s(10827) =< s(10824)*s(10764) s(10828) =< s(10824)*s(10765) s(10826) =< s(10824)*s(10764) s(10829) =< s(10824)*s(10765) s(10830) =< s(10823) s(10831) =< s(10824)*s(10766) s(10825) =< s(10824)*aux(577) s(10832) =< s(10827) s(10833) =< s(10828) s(10834) =< s(10826) s(10835) =< s(10825) s(10836) =< aux(574) s(10837) =< aux(574) s(10836) =< aux(574)+aux(574) s(10837) =< aux(574)+aux(574) s(10838) =< s(10836) s(10839) =< aux(574) s(10840) =< aux(574) s(10839) =< aux(577)+aux(572) s(10840) =< aux(577)+aux(572) s(10841) =< s(10839) s(10842) =< aux(577) s(10843) =< aux(577) s(10842) =< aux(571)+aux(577) s(10843) =< aux(571)+aux(577) s(10844) =< s(10842) s(11267) =< aux(577) s(11267) =< aux(579) s(11269) =< aux(577)+2 s(11270) =< aux(577)+1 s(11272) =< s(10734)*s(11269) s(11273) =< s(10734)*s(11270) s(11274) =< s(11267)*s(11270) s(11275) =< s(11267)*s(10765) s(11276) =< s(11267)*s(11269) s(11277) =< s(11267)*s(10765) s(11278) =< s(11273) s(11279) =< s(11272) s(11280) =< s(11272) s(11281) =< s(11272) s(11280) =< aux(577)+s(11272) s(11281) =< aux(577)+s(11272) s(11282) =< s(11280) s(11283) =< s(11272) s(11284) =< s(11272) s(11283) =< aux(577)+s(11273) s(11284) =< aux(577)+s(11273) s(11285) =< s(11283) s(11286) =< s(11272) s(11287) =< s(11272) s(11288) =< s(11269) s(11289) =< s(11270) s(11290) =< s(11269)-1 s(11286) =< s(11273)+s(11273)+s(11272) s(11287) =< s(11273)+s(11273)+s(11272) s(11291) =< s(11279)*s(11269) s(11292) =< s(11273)+s(11273)+s(11272) s(11293) =< s(11273)+s(11273)+s(11272) s(11294) =< s(11279)*s(11288) s(11295) =< s(11279)*s(11288) s(11296) =< s(11287)*s(11288) s(11297) =< s(11287)*s(11289) s(11293) =< s(11287)*s(11288) s(11298) =< s(11287)*s(11289) s(11299) =< s(11286) s(11300) =< s(11287)*s(11290) s(11292) =< s(11287)*s(11270) s(11301) =< s(11296) s(11302) =< s(11297) s(11303) =< s(11293) s(11304) =< s(11294) s(11305) =< s(11292) s(11306) =< s(11272) s(11307) =< s(11272) s(11308) =< s(11273) s(11308) =< s(11272) s(11306) =< s(11308)+s(11308)+s(11272) s(11307) =< s(11308)+s(11308)+s(11272) s(11309) =< s(11308)+s(11308)+s(11272) s(11310) =< s(11308)+s(11308)+s(11272) s(11311) =< s(11307)*s(11288) s(11312) =< s(11307)*s(11289) s(11310) =< s(11307)*s(11288) s(11313) =< s(11307)*s(11289) s(11314) =< s(11306) s(11315) =< s(11307)*s(11290) s(11309) =< s(11307)*s(11270) s(11316) =< s(11311) s(11317) =< s(11312) s(11318) =< s(11310) s(11319) =< s(11309) s(11320) =< s(11272) s(11321) =< s(11272) s(11320) =< s(11272)+s(11272) s(11321) =< s(11272)+s(11272) s(11322) =< s(11320) s(11323) =< s(11272) s(11324) =< s(11272) s(11323) =< s(11273)+s(11272) s(11324) =< s(11273)+s(11272) s(11325) =< s(11323) s(11326) =< s(11273) s(11327) =< s(11273) s(11326) =< aux(577)+s(11273) s(11327) =< aux(577)+s(11273) s(11328) =< s(11326) s(11329) =< s(11275) s(11330) =< aux(579) s(11331) =< s(11274) s(11332) =< s(11274) s(11333) =< s(11274) s(11332) =< aux(579)+s(11274) s(11333) =< aux(579)+s(11274) s(11334) =< s(11332) s(11335) =< s(11274) s(11336) =< s(11274) s(11335) =< aux(579)+s(11275) s(11336) =< aux(579)+s(11275) s(11337) =< s(11335) s(11338) =< s(11276) s(11339) =< s(11276) s(11340) =< s(11276) s(11338) =< s(11275)+s(11275)+s(11274) s(11339) =< s(11275)+s(11275)+s(11274) s(11341) =< s(11340)*s(11269) s(11342) =< s(11275)+s(11275)+s(11274) s(11343) =< s(11275)+s(11275)+s(11274) s(11344) =< s(11340)*s(11288) s(11345) =< s(11340)*s(11288) s(11346) =< s(11339)*s(11288) s(11347) =< s(11339)*s(10765) s(11343) =< s(11339)*s(11288) s(11348) =< s(11339)*s(10765) s(11349) =< s(11338) s(11350) =< s(11339)*s(11290) s(11342) =< s(11339)*aux(577) s(11351) =< s(11346) s(11352) =< s(11347) s(11353) =< s(11343) s(11354) =< s(11344) s(11355) =< s(11342) s(11356) =< s(11276) s(11357) =< s(11276) s(11356) =< aux(579)+s(11276) s(11357) =< aux(579)+s(11276) s(11358) =< s(11356) s(11359) =< s(11276) s(11360) =< s(11276) s(11361) =< s(11275) s(11361) =< s(11274) s(11359) =< s(11361)+s(11361)+s(11274) s(11360) =< s(11361)+s(11361)+s(11274) s(11362) =< s(11361)+s(11361)+s(11274) s(11363) =< s(11361)+s(11361)+s(11274) s(11364) =< s(11360)*s(11288) s(11365) =< s(11360)*s(10765) s(11363) =< s(11360)*s(11288) s(11366) =< s(11360)*s(10765) s(11367) =< s(11359) s(11368) =< s(11360)*s(11290) s(11362) =< s(11360)*aux(577) s(11369) =< s(11364) s(11370) =< s(11365) s(11371) =< s(11363) s(11372) =< s(11362) s(11373) =< s(11276) s(11374) =< s(11276) s(11373) =< s(11276)+s(11276) s(11374) =< s(11276)+s(11276) s(11375) =< s(11373) s(11376) =< s(11276) s(11377) =< s(11276) s(11376) =< s(11275)+s(11274) s(11377) =< s(11275)+s(11274) s(11378) =< s(11376) s(11379) =< s(11275) s(11380) =< s(11275) s(11379) =< aux(579)+s(11275) s(11380) =< aux(579)+s(11275) s(11381) =< s(11379) s(11382) =< s(11276) s(11383) =< s(11276) s(11382) =< s(11274)+s(11274)+s(11275) s(11383) =< s(11274)+s(11274)+s(11275) s(11384) =< s(11274)+s(11274)+s(11275) s(11385) =< s(11274)+s(11274)+s(11275) s(11386) =< s(11383)*s(11288) s(11387) =< s(11383)*s(11289) s(11385) =< s(11383)*s(11288) s(11388) =< s(11383)*s(11289) s(11389) =< s(11382) s(11390) =< s(11383)*s(11290) s(11384) =< s(11383)*s(11270) s(11391) =< s(11386) s(11392) =< s(11387) s(11393) =< s(11385) s(11394) =< s(11384) s(11007) =< aux(572) s(11007) =< aux(576) s(11009) =< aux(572)+2 s(11010) =< aux(572)+1 s(11011) =< aux(572) s(11012) =< s(10736)*s(11009) s(11013) =< s(10736)*s(11010) s(11014) =< s(11007)*s(11010) s(11015) =< s(11007)*s(11011) s(11016) =< s(11007)*s(11009) s(11017) =< s(11007)*s(11011) s(11018) =< s(11013) s(11019) =< s(11012) s(11020) =< s(11012) s(11021) =< s(11012) s(11020) =< aux(572)+s(11012) s(11021) =< aux(572)+s(11012) s(11022) =< s(11020) s(11023) =< s(11012) s(11024) =< s(11012) s(11023) =< aux(572)+s(11013) s(11024) =< aux(572)+s(11013) s(11025) =< s(11023) s(11026) =< s(11012) s(11027) =< s(11012) s(11028) =< s(11009) s(11029) =< s(11010) s(11030) =< s(11009)-1 s(11026) =< s(11013)+s(11013)+s(11012) s(11027) =< s(11013)+s(11013)+s(11012) s(11031) =< s(11019)*s(11009) s(11032) =< s(11013)+s(11013)+s(11012) s(11033) =< s(11013)+s(11013)+s(11012) s(11034) =< s(11019)*s(11028) s(11035) =< s(11019)*s(11028) s(11036) =< s(11027)*s(11028) s(11037) =< s(11027)*s(11029) s(11033) =< s(11027)*s(11028) s(11038) =< s(11027)*s(11029) s(11039) =< s(11026) s(11040) =< s(11027)*s(11030) s(11032) =< s(11027)*s(11010) s(11041) =< s(11036) s(11042) =< s(11037) s(11043) =< s(11033) s(11044) =< s(11034) s(11045) =< s(11032) s(11046) =< s(11012) s(11047) =< s(11012) s(11048) =< s(11013) s(11048) =< s(11012) s(11046) =< s(11048)+s(11048)+s(11012) s(11047) =< s(11048)+s(11048)+s(11012) s(11049) =< s(11048)+s(11048)+s(11012) s(11050) =< s(11048)+s(11048)+s(11012) s(11051) =< s(11047)*s(11028) s(11052) =< s(11047)*s(11029) s(11050) =< s(11047)*s(11028) s(11053) =< s(11047)*s(11029) s(11054) =< s(11046) s(11055) =< s(11047)*s(11030) s(11049) =< s(11047)*s(11010) s(11056) =< s(11051) s(11057) =< s(11052) s(11058) =< s(11050) s(11059) =< s(11049) s(11060) =< s(11012) s(11061) =< s(11012) s(11060) =< s(11012)+s(11012) s(11061) =< s(11012)+s(11012) s(11062) =< s(11060) s(11063) =< s(11012) s(11064) =< s(11012) s(11063) =< s(11013)+s(11012) s(11064) =< s(11013)+s(11012) s(11065) =< s(11063) s(11066) =< s(11013) s(11067) =< s(11013) s(11066) =< aux(572)+s(11013) s(11067) =< aux(572)+s(11013) s(11068) =< s(11066) s(11069) =< s(11015) s(11070) =< aux(576) s(11071) =< s(11014) s(11072) =< s(11014) s(11073) =< s(11014) s(11072) =< aux(576)+s(11014) s(11073) =< aux(576)+s(11014) s(11074) =< s(11072) s(11075) =< s(11014) s(11076) =< s(11014) s(11075) =< aux(576)+s(11015) s(11076) =< aux(576)+s(11015) s(11077) =< s(11075) s(11078) =< s(11016) s(11079) =< s(11016) s(11080) =< s(11016) s(11078) =< s(11015)+s(11015)+s(11014) s(11079) =< s(11015)+s(11015)+s(11014) s(11081) =< s(11080)*s(11009) s(11082) =< s(11015)+s(11015)+s(11014) s(11083) =< s(11015)+s(11015)+s(11014) s(11084) =< s(11080)*s(11028) s(11085) =< s(11080)*s(11028) s(11086) =< s(11079)*s(11028) s(11087) =< s(11079)*s(11011) s(11083) =< s(11079)*s(11028) s(11088) =< s(11079)*s(11011) s(11089) =< s(11078) s(11090) =< s(11079)*s(11030) s(11082) =< s(11079)*aux(572) s(11091) =< s(11086) s(11092) =< s(11087) s(11093) =< s(11083) s(11094) =< s(11084) s(11095) =< s(11082) s(11096) =< s(11016) s(11097) =< s(11016) s(11096) =< aux(576)+s(11016) s(11097) =< aux(576)+s(11016) s(11098) =< s(11096) s(11099) =< s(11016) s(11100) =< s(11016) s(11101) =< s(11015) s(11101) =< s(11014) s(11099) =< s(11101)+s(11101)+s(11014) s(11100) =< s(11101)+s(11101)+s(11014) s(11102) =< s(11101)+s(11101)+s(11014) s(11103) =< s(11101)+s(11101)+s(11014) s(11104) =< s(11100)*s(11028) s(11105) =< s(11100)*s(11011) s(11103) =< s(11100)*s(11028) s(11106) =< s(11100)*s(11011) s(11107) =< s(11099) s(11108) =< s(11100)*s(11030) s(11102) =< s(11100)*aux(572) s(11109) =< s(11104) s(11110) =< s(11105) s(11111) =< s(11103) s(11112) =< s(11102) s(11113) =< s(11016) s(11114) =< s(11016) s(11113) =< s(11016)+s(11016) s(11114) =< s(11016)+s(11016) s(11115) =< s(11113) s(11116) =< s(11016) s(11117) =< s(11016) s(11116) =< s(11015)+s(11014) s(11117) =< s(11015)+s(11014) s(11118) =< s(11116) s(11119) =< s(11015) s(11120) =< s(11015) s(11119) =< aux(576)+s(11015) s(11120) =< aux(576)+s(11015) s(11121) =< s(11119) s(11122) =< s(11016) s(11123) =< s(11016) s(11122) =< s(11014)+s(11014)+s(11015) s(11123) =< s(11014)+s(11014)+s(11015) s(11124) =< s(11014)+s(11014)+s(11015) s(11125) =< s(11014)+s(11014)+s(11015) s(11126) =< s(11123)*s(11028) s(11127) =< s(11123)*s(11029) s(11125) =< s(11123)*s(11028) s(11128) =< s(11123)*s(11029) s(11129) =< s(11122) s(11130) =< s(11123)*s(11030) s(11124) =< s(11123)*s(11010) s(11131) =< s(11126) s(11132) =< s(11127) s(11133) =< s(11125) s(11134) =< s(11124) s(13445) =< aux(572)-1 s(13446) =< s(10736)*aux(572) s(13447) =< aux(572) s(13448) =< s(10736)*s(11011) s(13449) =< s(10736)*s(11011) s(13447) =< s(10736)*s(11011) s(13450) =< s(10736)*s(13445) s(13451) =< s(13448) s(13452) =< s(13447) s(13453) =< aux(572) s(13454) =< aux(572) s(13453) =< aux(573) s(13454) =< aux(573) s(13455) =< s(13453) s(13456) =< s(13454)*aux(572) s(13457) =< aux(572) s(13458) =< s(13454)*s(11011) s(13459) =< s(13454)*s(11011) s(13457) =< s(13454)*s(11011) s(13460) =< s(13454)*s(13445) s(13461) =< s(13458) s(13462) =< s(13457) s(13463) =< aux(572) s(13464) =< aux(572) s(13463) =< aux(572)+aux(572) s(13464) =< aux(572)+aux(572) s(13465) =< s(13463) s(13466) =< aux(577) s(13467) =< aux(577) s(13468) =< aux(577)-1 s(13466) =< aux(577)+aux(577) s(13467) =< aux(577)+aux(577) s(13469) =< s(10734)*aux(577) s(13470) =< aux(577)+aux(577) s(13471) =< aux(577)+aux(577) s(13472) =< s(10734)*s(10765) s(13473) =< s(10734)*s(10765) s(13474) =< s(13467)*s(10765) s(13471) =< s(13467)*s(10765) s(13475) =< s(13467)*s(10765) s(13476) =< s(13466) s(13477) =< s(13467)*s(13468) s(13470) =< s(13467)*aux(577) s(13478) =< s(13474) s(13479) =< s(13471) s(13480) =< s(13472) s(13481) =< s(13470) s(13482) =< aux(577) s(13483) =< aux(577) s(13484) =< aux(577) s(13482) =< aux(578) s(13483) =< aux(578) s(13484) =< aux(578) s(13482) =< aux(577)+aux(577) s(13483) =< aux(577)+aux(577) s(13485) =< s(10808) s(13486) =< s(13484)*aux(577) s(13487) =< aux(577)+aux(577) s(13488) =< aux(577)+aux(577) s(13489) =< s(13484)*s(10765) s(13490) =< s(13484)*s(10765) s(13491) =< s(13483)*s(10765) s(13488) =< s(13483)*s(10765) s(13492) =< s(13483)*s(10765) s(13493) =< s(13482) s(13494) =< s(13483)*s(13468) s(13487) =< s(13483)*aux(577) s(13495) =< s(13491) s(13496) =< s(13488) s(13497) =< s(13489) s(13498) =< s(13487) s(13499) =< aux(577) s(13500) =< aux(577) s(13499) =< aux(578) s(13500) =< aux(578) s(13499) =< s(10808)+s(10808) s(13500) =< s(10808)+s(10808) s(13501) =< s(10808)+s(10808) s(13502) =< s(10808)+s(10808) s(13503) =< s(13500)*s(10765) s(13502) =< s(13500)*s(10765) s(13504) =< s(13500)*s(10765) s(13505) =< s(13499) s(13506) =< s(13500)*s(13468) s(13501) =< s(13500)*aux(577) s(13507) =< s(13503) s(13508) =< s(13502) s(13509) =< s(13501) s(13510) =< aux(577) s(13511) =< aux(577) s(13510) =< s(10808)+s(10808) s(13511) =< s(10808)+s(10808) s(13512) =< s(10808)+s(10808) s(13513) =< s(10808)+s(10808) s(13514) =< s(13511)*s(10765) s(13513) =< s(13511)*s(10765) s(13515) =< s(13511)*s(10765) s(13516) =< s(13510) s(13517) =< s(13511)*s(13468) s(13512) =< s(13511)*aux(577) s(13518) =< s(13514) s(13519) =< s(13513) s(13520) =< s(13512) with precondition: [] Closed-form bounds of start(V1,V): ------------------------------------- * Chain [76] with precondition: [] - Upper bound: nat(V1)*624988+3687+nat(V1)*536028*nat(V1)+nat(V1)*98415*nat(V1)*nat(V1)+nat(V1)*42*nat(nat(V1)+ -1)+nat(V)*580435+nat(V)*496848*nat(V)+nat(V)*91125*nat(V)*nat(V)+nat(V)*42*nat(nat(V)+ -1)+nat(V)*1620*nat(V1+V)+nat(nat(V1+V)+ -1)*162*nat(V1+V)+nat(V1+V)*7624+nat(V1+V)*5508*nat(V1+V)+nat(V1+1)*384+nat(V+1)*609+nat(V1+V+1)*456+nat(V1/2)*12447+nat(V/2)*11525 - Complexity: n^3 ### Maximum cost of start(V1,V): nat(V1)*624988+3687+nat(V1)*536028*nat(V1)+nat(V1)*98415*nat(V1)*nat(V1)+nat(V1)*42*nat(nat(V1)+ -1)+nat(V)*580435+nat(V)*496848*nat(V)+nat(V)*91125*nat(V)*nat(V)+nat(V)*42*nat(nat(V)+ -1)+nat(V)*1620*nat(V1+V)+nat(nat(V1+V)+ -1)*162*nat(V1+V)+nat(V1+V)*7624+nat(V1+V)*5508*nat(V1+V)+nat(V1+1)*384+nat(V+1)*609+nat(V1+V+1)*456+nat(V1/2)*12447+nat(V/2)*11525 Asymptotic class: n^3 * Total analysis performed in 131316 ms. ---------------------------------------- (16) BOUNDS(1, n^3) ---------------------------------------- (17) RelTrsToDecreasingLoopProblemProof (LOWER BOUND(ID)) Transformed a relative TRS into a decreasing-loop problem. ---------------------------------------- (18) Obligation: Analyzing the following TRS for decreasing loops: The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(n^1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 min(0, y) -> 0 min(s(x), s(y)) -> s(min(x, y)) max(x, 0) -> x max(0, y) -> y max(s(x), s(y)) -> s(max(x, y)) -(x, 0) -> x -(s(x), s(y)) -> -(x, y) gcd(s(x), s(y)) -> gcd(-(s(max(x, y)), s(min(x, y))), s(min(x, y))) gcd(s(x), 0) -> s(x) gcd(0, s(y)) -> s(y) The (relative) TRS S consists of the following rules: encArg(0) -> 0 encArg(s(x_1)) -> s(encArg(x_1)) encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) encArg(cons_-(x_1, x_2)) -> -(encArg(x_1), encArg(x_2)) encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) encode_0 -> 0 encode_s(x_1) -> s(encArg(x_1)) encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) encode_-(x_1, x_2) -> -(encArg(x_1), encArg(x_2)) encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) Rewrite Strategy: INNERMOST ---------------------------------------- (19) DecreasingLoopProof (LOWER BOUND(ID)) The following loop(s) give(s) rise to the lower bound Omega(n^1): The rewrite sequence -(s(x), s(y)) ->^+ -(x, y) gives rise to a decreasing loop by considering the right hand sides subterm at position []. The pumping substitution is [x / s(x), y / s(y)]. The result substitution is [ ]. ---------------------------------------- (20) Complex Obligation (BEST) ---------------------------------------- (21) Obligation: Proved the lower bound n^1 for the following obligation: The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(n^1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 min(0, y) -> 0 min(s(x), s(y)) -> s(min(x, y)) max(x, 0) -> x max(0, y) -> y max(s(x), s(y)) -> s(max(x, y)) -(x, 0) -> x -(s(x), s(y)) -> -(x, y) gcd(s(x), s(y)) -> gcd(-(s(max(x, y)), s(min(x, y))), s(min(x, y))) gcd(s(x), 0) -> s(x) gcd(0, s(y)) -> s(y) The (relative) TRS S consists of the following rules: encArg(0) -> 0 encArg(s(x_1)) -> s(encArg(x_1)) encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) encArg(cons_-(x_1, x_2)) -> -(encArg(x_1), encArg(x_2)) encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) encode_0 -> 0 encode_s(x_1) -> s(encArg(x_1)) encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) encode_-(x_1, x_2) -> -(encArg(x_1), encArg(x_2)) encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) Rewrite Strategy: INNERMOST ---------------------------------------- (22) LowerBoundPropagationProof (FINISHED) Propagated lower bound. ---------------------------------------- (23) BOUNDS(n^1, INF) ---------------------------------------- (24) Obligation: Analyzing the following TRS for decreasing loops: The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(n^1, n^3). The TRS R consists of the following rules: min(x, 0) -> 0 min(0, y) -> 0 min(s(x), s(y)) -> s(min(x, y)) max(x, 0) -> x max(0, y) -> y max(s(x), s(y)) -> s(max(x, y)) -(x, 0) -> x -(s(x), s(y)) -> -(x, y) gcd(s(x), s(y)) -> gcd(-(s(max(x, y)), s(min(x, y))), s(min(x, y))) gcd(s(x), 0) -> s(x) gcd(0, s(y)) -> s(y) The (relative) TRS S consists of the following rules: encArg(0) -> 0 encArg(s(x_1)) -> s(encArg(x_1)) encArg(cons_min(x_1, x_2)) -> min(encArg(x_1), encArg(x_2)) encArg(cons_max(x_1, x_2)) -> max(encArg(x_1), encArg(x_2)) encArg(cons_-(x_1, x_2)) -> -(encArg(x_1), encArg(x_2)) encArg(cons_gcd(x_1, x_2)) -> gcd(encArg(x_1), encArg(x_2)) encode_min(x_1, x_2) -> min(encArg(x_1), encArg(x_2)) encode_0 -> 0 encode_s(x_1) -> s(encArg(x_1)) encode_max(x_1, x_2) -> max(encArg(x_1), encArg(x_2)) encode_-(x_1, x_2) -> -(encArg(x_1), encArg(x_2)) encode_gcd(x_1, x_2) -> gcd(encArg(x_1), encArg(x_2)) Rewrite Strategy: INNERMOST