WORST_CASE(?, O(n^1)) proof of /export/starexec/sandbox2/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# AProVE Commit ID: 794c25de1cacf0d048858bcd21c9a779e1221865 marcel 20200619 unpublished dirty The Derivational Complexity (innermost) of the given DCpxTrs could be proven to be BOUNDS(1, n^1). (0) DCpxTrs (1) DerivationalComplexityToRuntimeComplexityProof [BOTH BOUNDS(ID, ID), 0 ms] (2) CpxRelTRS (3) SInnermostTerminationProof [BOTH CONCRETE BOUNDS(ID, ID), 53 ms] (4) CpxRelTRS (5) RelTrsToTrsProof [UPPER BOUND(ID), 0 ms] (6) CpxTRS (7) CpxTrsMatchBoundsProof [FINISHED, 64 ms] (8) BOUNDS(1, n^1) ---------------------------------------- (0) Obligation: The Derivational Complexity (innermost) of the given DCpxTrs could be proven to be BOUNDS(1, n^1). The TRS R consists of the following rules: 5(4(1(x1))) -> 2(5(5(1(1(1(0(2(3(4(x1)))))))))) 4(1(1(3(x1)))) -> 4(4(5(1(4(0(2(0(3(3(x1)))))))))) 4(4(1(3(x1)))) -> 5(1(1(4(5(5(3(3(2(3(x1)))))))))) 0(0(4(1(4(x1))))) -> 3(3(1(1(0(3(1(4(2(4(x1)))))))))) 0(5(0(4(2(x1))))) -> 0(0(3(5(3(3(2(3(4(5(x1)))))))))) 2(4(3(4(0(x1))))) -> 2(5(2(2(5(5(0(3(2(3(x1)))))))))) 4(4(2(3(4(x1))))) -> 2(2(4(5(3(3(1(1(1(4(x1)))))))))) 5(2(4(3(0(x1))))) -> 2(5(5(2(3(2(5(4(0(0(x1)))))))))) 0(0(0(2(0(1(x1)))))) -> 3(3(5(3(1(3(1(4(0(1(x1)))))))))) 1(2(0(1(3(2(x1)))))) -> 2(0(3(2(1(2(3(1(0(3(x1)))))))))) 1(3(5(4(3(5(x1)))))) -> 1(3(3(1(1(5(1(0(1(5(x1)))))))))) 1(4(1(0(1(2(x1)))))) -> 1(0(3(1(5(3(3(4(5(2(x1)))))))))) 3(2(4(3(5(5(x1)))))) -> 3(5(5(5(1(4(4(5(4(5(x1)))))))))) 3(4(3(2(0(5(x1)))))) -> 2(3(3(5(3(3(1(3(3(5(x1)))))))))) 3(5(5(5(0(2(x1)))))) -> 3(3(5(1(0(0(3(3(1(0(x1)))))))))) 5(0(4(3(0(1(x1)))))) -> 0(3(1(2(5(1(1(1(2(1(x1)))))))))) 5(5(4(3(2(4(x1)))))) -> 5(4(2(2(5(2(1(2(3(4(x1)))))))))) 0(0(2(0(5(2(1(x1))))))) -> 0(4(3(5(2(3(5(5(2(1(x1)))))))))) 0(1(3(4(2(1(2(x1))))))) -> 0(1(2(0(3(1(2(5(2(2(x1)))))))))) 0(1(4(1(4(4(3(x1))))))) -> 0(1(0(1(1(2(0(5(2(3(x1)))))))))) 0(5(1(1(3(4(1(x1))))))) -> 0(2(2(0(2(3(1(5(5(3(x1)))))))))) 1(3(1(0(4(1(0(x1))))))) -> 1(3(3(3(3(0(0(3(1(0(x1)))))))))) 1(3(2(0(1(2(1(x1))))))) -> 5(2(4(2(4(4(2(5(1(3(x1)))))))))) 1(3(5(4(4(1(2(x1))))))) -> 2(0(5(0(2(3(2(2(2(2(x1)))))))))) 1(4(0(0(2(5(0(x1))))))) -> 1(0(3(2(2(2(1(0(5(0(x1)))))))))) 2(0(1(5(1(4(2(x1))))))) -> 2(2(5(5(2(1(2(4(0(5(x1)))))))))) 2(0(4(0(4(3(0(x1))))))) -> 3(1(3(3(4(5(2(3(0(3(x1)))))))))) 3(0(4(1(0(0(0(x1))))))) -> 5(2(3(5(4(5(5(1(3(0(x1)))))))))) 3(0(4(3(0(3(4(x1))))))) -> 3(5(3(1(0(3(2(3(0(4(x1)))))))))) 3(4(0(4(4(2(3(x1))))))) -> 3(2(4(4(5(1(1(4(5(0(x1)))))))))) 3(4(4(1(4(1(1(x1))))))) -> 4(2(0(3(2(1(3(0(0(1(x1)))))))))) 3(5(0(4(1(5(0(x1))))))) -> 2(3(1(0(5(4(3(0(3(3(x1)))))))))) 3(5(0(5(5(5(3(x1))))))) -> 3(3(5(4(0(1(4(5(3(0(x1)))))))))) 4(1(5(2(0(1(5(x1))))))) -> 2(5(4(2(3(3(0(0(0(5(x1)))))))))) 4(3(0(1(2(4(2(x1))))))) -> 4(3(3(1(1(0(3(2(2(5(x1)))))))))) 4(3(4(1(4(4(3(x1))))))) -> 1(4(3(3(3(1(3(1(2(2(x1)))))))))) 5(0(4(2(0(4(2(x1))))))) -> 5(2(2(0(1(5(5(2(4(2(x1)))))))))) 5(0(4(2(5(5(0(x1))))))) -> 0(3(3(1(2(3(0(0(2(3(x1)))))))))) 5(4(1(2(0(4(1(x1))))))) -> 4(5(4(2(2(3(4(5(5(3(x1)))))))))) 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(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_3(x_1)) -> 3(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) ---------------------------------------- (2) Obligation: The Runtime Complexity (innermost) of the given CpxRelTRS could be proven to be BOUNDS(1, n^1). The TRS R consists of the following rules: 5(4(1(x1))) -> 2(5(5(1(1(1(0(2(3(4(x1)))))))))) 4(1(1(3(x1)))) -> 4(4(5(1(4(0(2(0(3(3(x1)))))))))) 4(4(1(3(x1)))) -> 5(1(1(4(5(5(3(3(2(3(x1)))))))))) 0(0(4(1(4(x1))))) -> 3(3(1(1(0(3(1(4(2(4(x1)))))))))) 0(5(0(4(2(x1))))) -> 0(0(3(5(3(3(2(3(4(5(x1)))))))))) 2(4(3(4(0(x1))))) -> 2(5(2(2(5(5(0(3(2(3(x1)))))))))) 4(4(2(3(4(x1))))) -> 2(2(4(5(3(3(1(1(1(4(x1)))))))))) 5(2(4(3(0(x1))))) -> 2(5(5(2(3(2(5(4(0(0(x1)))))))))) 0(0(0(2(0(1(x1)))))) -> 3(3(5(3(1(3(1(4(0(1(x1)))))))))) 1(2(0(1(3(2(x1)))))) -> 2(0(3(2(1(2(3(1(0(3(x1)))))))))) 1(3(5(4(3(5(x1)))))) -> 1(3(3(1(1(5(1(0(1(5(x1)))))))))) 1(4(1(0(1(2(x1)))))) -> 1(0(3(1(5(3(3(4(5(2(x1)))))))))) 3(2(4(3(5(5(x1)))))) -> 3(5(5(5(1(4(4(5(4(5(x1)))))))))) 3(4(3(2(0(5(x1)))))) -> 2(3(3(5(3(3(1(3(3(5(x1)))))))))) 3(5(5(5(0(2(x1)))))) -> 3(3(5(1(0(0(3(3(1(0(x1)))))))))) 5(0(4(3(0(1(x1)))))) -> 0(3(1(2(5(1(1(1(2(1(x1)))))))))) 5(5(4(3(2(4(x1)))))) -> 5(4(2(2(5(2(1(2(3(4(x1)))))))))) 0(0(2(0(5(2(1(x1))))))) -> 0(4(3(5(2(3(5(5(2(1(x1)))))))))) 0(1(3(4(2(1(2(x1))))))) -> 0(1(2(0(3(1(2(5(2(2(x1)))))))))) 0(1(4(1(4(4(3(x1))))))) -> 0(1(0(1(1(2(0(5(2(3(x1)))))))))) 0(5(1(1(3(4(1(x1))))))) -> 0(2(2(0(2(3(1(5(5(3(x1)))))))))) 1(3(1(0(4(1(0(x1))))))) -> 1(3(3(3(3(0(0(3(1(0(x1)))))))))) 1(3(2(0(1(2(1(x1))))))) -> 5(2(4(2(4(4(2(5(1(3(x1)))))))))) 1(3(5(4(4(1(2(x1))))))) -> 2(0(5(0(2(3(2(2(2(2(x1)))))))))) 1(4(0(0(2(5(0(x1))))))) -> 1(0(3(2(2(2(1(0(5(0(x1)))))))))) 2(0(1(5(1(4(2(x1))))))) -> 2(2(5(5(2(1(2(4(0(5(x1)))))))))) 2(0(4(0(4(3(0(x1))))))) -> 3(1(3(3(4(5(2(3(0(3(x1)))))))))) 3(0(4(1(0(0(0(x1))))))) -> 5(2(3(5(4(5(5(1(3(0(x1)))))))))) 3(0(4(3(0(3(4(x1))))))) -> 3(5(3(1(0(3(2(3(0(4(x1)))))))))) 3(4(0(4(4(2(3(x1))))))) -> 3(2(4(4(5(1(1(4(5(0(x1)))))))))) 3(4(4(1(4(1(1(x1))))))) -> 4(2(0(3(2(1(3(0(0(1(x1)))))))))) 3(5(0(4(1(5(0(x1))))))) -> 2(3(1(0(5(4(3(0(3(3(x1)))))))))) 3(5(0(5(5(5(3(x1))))))) -> 3(3(5(4(0(1(4(5(3(0(x1)))))))))) 4(1(5(2(0(1(5(x1))))))) -> 2(5(4(2(3(3(0(0(0(5(x1)))))))))) 4(3(0(1(2(4(2(x1))))))) -> 4(3(3(1(1(0(3(2(2(5(x1)))))))))) 4(3(4(1(4(4(3(x1))))))) -> 1(4(3(3(3(1(3(1(2(2(x1)))))))))) 5(0(4(2(0(4(2(x1))))))) -> 5(2(2(0(1(5(5(2(4(2(x1)))))))))) 5(0(4(2(5(5(0(x1))))))) -> 0(3(3(1(2(3(0(0(2(3(x1)))))))))) 5(4(1(2(0(4(1(x1))))))) -> 4(5(4(2(2(3(4(5(5(3(x1)))))))))) The (relative) TRS S consists of the following rules: encArg(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_3(x_1)) -> 3(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) 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(1, n^1). The TRS R consists of the following rules: 5(4(1(x1))) -> 2(5(5(1(1(1(0(2(3(4(x1)))))))))) 4(1(1(3(x1)))) -> 4(4(5(1(4(0(2(0(3(3(x1)))))))))) 4(4(1(3(x1)))) -> 5(1(1(4(5(5(3(3(2(3(x1)))))))))) 0(0(4(1(4(x1))))) -> 3(3(1(1(0(3(1(4(2(4(x1)))))))))) 0(5(0(4(2(x1))))) -> 0(0(3(5(3(3(2(3(4(5(x1)))))))))) 2(4(3(4(0(x1))))) -> 2(5(2(2(5(5(0(3(2(3(x1)))))))))) 4(4(2(3(4(x1))))) -> 2(2(4(5(3(3(1(1(1(4(x1)))))))))) 5(2(4(3(0(x1))))) -> 2(5(5(2(3(2(5(4(0(0(x1)))))))))) 0(0(0(2(0(1(x1)))))) -> 3(3(5(3(1(3(1(4(0(1(x1)))))))))) 1(2(0(1(3(2(x1)))))) -> 2(0(3(2(1(2(3(1(0(3(x1)))))))))) 1(3(5(4(3(5(x1)))))) -> 1(3(3(1(1(5(1(0(1(5(x1)))))))))) 1(4(1(0(1(2(x1)))))) -> 1(0(3(1(5(3(3(4(5(2(x1)))))))))) 3(2(4(3(5(5(x1)))))) -> 3(5(5(5(1(4(4(5(4(5(x1)))))))))) 3(4(3(2(0(5(x1)))))) -> 2(3(3(5(3(3(1(3(3(5(x1)))))))))) 3(5(5(5(0(2(x1)))))) -> 3(3(5(1(0(0(3(3(1(0(x1)))))))))) 5(0(4(3(0(1(x1)))))) -> 0(3(1(2(5(1(1(1(2(1(x1)))))))))) 5(5(4(3(2(4(x1)))))) -> 5(4(2(2(5(2(1(2(3(4(x1)))))))))) 0(0(2(0(5(2(1(x1))))))) -> 0(4(3(5(2(3(5(5(2(1(x1)))))))))) 0(1(3(4(2(1(2(x1))))))) -> 0(1(2(0(3(1(2(5(2(2(x1)))))))))) 0(1(4(1(4(4(3(x1))))))) -> 0(1(0(1(1(2(0(5(2(3(x1)))))))))) 0(5(1(1(3(4(1(x1))))))) -> 0(2(2(0(2(3(1(5(5(3(x1)))))))))) 1(3(1(0(4(1(0(x1))))))) -> 1(3(3(3(3(0(0(3(1(0(x1)))))))))) 1(3(2(0(1(2(1(x1))))))) -> 5(2(4(2(4(4(2(5(1(3(x1)))))))))) 1(3(5(4(4(1(2(x1))))))) -> 2(0(5(0(2(3(2(2(2(2(x1)))))))))) 1(4(0(0(2(5(0(x1))))))) -> 1(0(3(2(2(2(1(0(5(0(x1)))))))))) 2(0(1(5(1(4(2(x1))))))) -> 2(2(5(5(2(1(2(4(0(5(x1)))))))))) 2(0(4(0(4(3(0(x1))))))) -> 3(1(3(3(4(5(2(3(0(3(x1)))))))))) 3(0(4(1(0(0(0(x1))))))) -> 5(2(3(5(4(5(5(1(3(0(x1)))))))))) 3(0(4(3(0(3(4(x1))))))) -> 3(5(3(1(0(3(2(3(0(4(x1)))))))))) 3(4(0(4(4(2(3(x1))))))) -> 3(2(4(4(5(1(1(4(5(0(x1)))))))))) 3(4(4(1(4(1(1(x1))))))) -> 4(2(0(3(2(1(3(0(0(1(x1)))))))))) 3(5(0(4(1(5(0(x1))))))) -> 2(3(1(0(5(4(3(0(3(3(x1)))))))))) 3(5(0(5(5(5(3(x1))))))) -> 3(3(5(4(0(1(4(5(3(0(x1)))))))))) 4(1(5(2(0(1(5(x1))))))) -> 2(5(4(2(3(3(0(0(0(5(x1)))))))))) 4(3(0(1(2(4(2(x1))))))) -> 4(3(3(1(1(0(3(2(2(5(x1)))))))))) 4(3(4(1(4(4(3(x1))))))) -> 1(4(3(3(3(1(3(1(2(2(x1)))))))))) 5(0(4(2(0(4(2(x1))))))) -> 5(2(2(0(1(5(5(2(4(2(x1)))))))))) 5(0(4(2(5(5(0(x1))))))) -> 0(3(3(1(2(3(0(0(2(3(x1)))))))))) 5(4(1(2(0(4(1(x1))))))) -> 4(5(4(2(2(3(4(5(5(3(x1)))))))))) The (relative) TRS S consists of the following rules: encArg(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_3(x_1)) -> 3(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) Rewrite Strategy: INNERMOST ---------------------------------------- (5) RelTrsToTrsProof (UPPER BOUND(ID)) transformed relative TRS to TRS ---------------------------------------- (6) Obligation: The Runtime Complexity (innermost) of the given CpxTRS could be proven to be BOUNDS(1, n^1). The TRS R consists of the following rules: 5(4(1(x1))) -> 2(5(5(1(1(1(0(2(3(4(x1)))))))))) 4(1(1(3(x1)))) -> 4(4(5(1(4(0(2(0(3(3(x1)))))))))) 4(4(1(3(x1)))) -> 5(1(1(4(5(5(3(3(2(3(x1)))))))))) 0(0(4(1(4(x1))))) -> 3(3(1(1(0(3(1(4(2(4(x1)))))))))) 0(5(0(4(2(x1))))) -> 0(0(3(5(3(3(2(3(4(5(x1)))))))))) 2(4(3(4(0(x1))))) -> 2(5(2(2(5(5(0(3(2(3(x1)))))))))) 4(4(2(3(4(x1))))) -> 2(2(4(5(3(3(1(1(1(4(x1)))))))))) 5(2(4(3(0(x1))))) -> 2(5(5(2(3(2(5(4(0(0(x1)))))))))) 0(0(0(2(0(1(x1)))))) -> 3(3(5(3(1(3(1(4(0(1(x1)))))))))) 1(2(0(1(3(2(x1)))))) -> 2(0(3(2(1(2(3(1(0(3(x1)))))))))) 1(3(5(4(3(5(x1)))))) -> 1(3(3(1(1(5(1(0(1(5(x1)))))))))) 1(4(1(0(1(2(x1)))))) -> 1(0(3(1(5(3(3(4(5(2(x1)))))))))) 3(2(4(3(5(5(x1)))))) -> 3(5(5(5(1(4(4(5(4(5(x1)))))))))) 3(4(3(2(0(5(x1)))))) -> 2(3(3(5(3(3(1(3(3(5(x1)))))))))) 3(5(5(5(0(2(x1)))))) -> 3(3(5(1(0(0(3(3(1(0(x1)))))))))) 5(0(4(3(0(1(x1)))))) -> 0(3(1(2(5(1(1(1(2(1(x1)))))))))) 5(5(4(3(2(4(x1)))))) -> 5(4(2(2(5(2(1(2(3(4(x1)))))))))) 0(0(2(0(5(2(1(x1))))))) -> 0(4(3(5(2(3(5(5(2(1(x1)))))))))) 0(1(3(4(2(1(2(x1))))))) -> 0(1(2(0(3(1(2(5(2(2(x1)))))))))) 0(1(4(1(4(4(3(x1))))))) -> 0(1(0(1(1(2(0(5(2(3(x1)))))))))) 0(5(1(1(3(4(1(x1))))))) -> 0(2(2(0(2(3(1(5(5(3(x1)))))))))) 1(3(1(0(4(1(0(x1))))))) -> 1(3(3(3(3(0(0(3(1(0(x1)))))))))) 1(3(2(0(1(2(1(x1))))))) -> 5(2(4(2(4(4(2(5(1(3(x1)))))))))) 1(3(5(4(4(1(2(x1))))))) -> 2(0(5(0(2(3(2(2(2(2(x1)))))))))) 1(4(0(0(2(5(0(x1))))))) -> 1(0(3(2(2(2(1(0(5(0(x1)))))))))) 2(0(1(5(1(4(2(x1))))))) -> 2(2(5(5(2(1(2(4(0(5(x1)))))))))) 2(0(4(0(4(3(0(x1))))))) -> 3(1(3(3(4(5(2(3(0(3(x1)))))))))) 3(0(4(1(0(0(0(x1))))))) -> 5(2(3(5(4(5(5(1(3(0(x1)))))))))) 3(0(4(3(0(3(4(x1))))))) -> 3(5(3(1(0(3(2(3(0(4(x1)))))))))) 3(4(0(4(4(2(3(x1))))))) -> 3(2(4(4(5(1(1(4(5(0(x1)))))))))) 3(4(4(1(4(1(1(x1))))))) -> 4(2(0(3(2(1(3(0(0(1(x1)))))))))) 3(5(0(4(1(5(0(x1))))))) -> 2(3(1(0(5(4(3(0(3(3(x1)))))))))) 3(5(0(5(5(5(3(x1))))))) -> 3(3(5(4(0(1(4(5(3(0(x1)))))))))) 4(1(5(2(0(1(5(x1))))))) -> 2(5(4(2(3(3(0(0(0(5(x1)))))))))) 4(3(0(1(2(4(2(x1))))))) -> 4(3(3(1(1(0(3(2(2(5(x1)))))))))) 4(3(4(1(4(4(3(x1))))))) -> 1(4(3(3(3(1(3(1(2(2(x1)))))))))) 5(0(4(2(0(4(2(x1))))))) -> 5(2(2(0(1(5(5(2(4(2(x1)))))))))) 5(0(4(2(5(5(0(x1))))))) -> 0(3(3(1(2(3(0(0(2(3(x1)))))))))) 5(4(1(2(0(4(1(x1))))))) -> 4(5(4(2(2(3(4(5(5(3(x1)))))))))) encArg(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_3(x_1)) -> 3(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) S is empty. Rewrite Strategy: INNERMOST ---------------------------------------- (7) CpxTrsMatchBoundsProof (FINISHED) A linear upper bound on the runtime complexity of the TRS R could be shown with a Match Bound [MATCHBOUNDS1,MATCHBOUNDS2] of 3. The certificate found is represented by the following graph. "[148, 149, 150, 151, 152, 153, 154, 155, 156, 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, 190, 191, 192, 193, 194, 195, 196, 197, 198, 199, 200, 201, 202, 203, 204, 205, 206, 207, 208, 209, 210, 211, 212, 213, 214, 215, 216, 217, 218, 219, 220, 221, 222, 223, 224, 225, 226, 227, 228, 229, 230, 231, 232, 233, 234, 235, 236, 237, 238, 239, 240, 241, 242, 243, 244, 245, 246, 247, 248, 249, 250, 251, 252, 253, 254, 255, 256, 257, 258, 259, 260, 261, 262, 263, 264, 265, 266, 267, 268, 269, 270, 271, 272, 273, 274, 275, 276, 277, 278, 279, 280, 281, 282, 283, 284, 285, 286, 287, 288, 289, 290, 291, 292, 293, 294, 295, 296, 297, 298, 299, 300, 301, 302, 303, 304, 305, 306, 307, 308, 309, 310, 311, 312, 313, 314, 315, 316, 317, 318, 319, 320, 321, 322, 323, 324, 325, 326, 327, 328, 329, 330, 331, 332, 333, 334, 335, 336, 337, 338, 339, 340, 341, 342, 343, 344, 345, 346, 347, 348, 349, 350, 351, 352, 353, 354, 355, 356, 357, 358, 359, 360, 361, 362, 363, 364, 365, 366, 367, 368, 369, 370, 371, 372, 373, 374, 375, 376, 377, 378, 379, 380, 381, 382, 383, 384, 385, 386, 387, 388, 389, 390, 391, 392, 393, 394, 395, 396, 397, 398, 399, 400, 401, 402, 403, 404, 405, 406, 407, 408, 409, 410, 411, 412, 413, 414, 415, 416, 417, 418, 419, 420, 421, 422, 423, 424, 425, 426, 427, 428, 429, 430, 431, 432, 433, 434, 435, 436, 437, 438, 439, 440, 441, 442, 443, 444, 445, 446, 447, 448, 449, 450, 451, 452, 453, 454, 455, 456, 457, 458, 459, 460, 461, 462, 463, 464, 465, 466, 467, 468, 469, 470, 471, 472, 473, 474, 475, 476, 477, 478, 479, 480, 481, 482, 483, 484, 485, 486, 487, 488, 489, 490, 491, 492, 493, 494, 495, 496, 497, 498, 499, 500, 501, 502, 503, 504, 505, 506, 507, 508, 509, 510] {(148,149,[5_1|0, 4_1|0, 0_1|0, 2_1|0, 1_1|0, 3_1|0, encArg_1|0, encode_5_1|0, encode_4_1|0, encode_1_1|0, encode_2_1|0, encode_0_1|0, encode_3_1|0]), (148,150,[5_1|1, 4_1|1, 0_1|1, 2_1|1, 1_1|1, 3_1|1]), (148,151,[2_1|2]), (148,160,[4_1|2]), (148,169,[2_1|2]), (148,178,[0_1|2]), (148,187,[5_1|2]), (148,196,[0_1|2]), (148,205,[5_1|2]), (148,214,[4_1|2]), (148,223,[2_1|2]), (148,232,[5_1|2]), (148,241,[2_1|2]), (148,250,[4_1|2]), (148,259,[1_1|2]), (148,268,[3_1|2]), (148,277,[3_1|2]), (148,286,[0_1|2]), (148,295,[0_1|2]), (148,304,[0_1|2]), (148,313,[0_1|2]), (148,322,[0_1|2]), (148,331,[2_1|2]), (148,340,[2_1|2]), (148,349,[3_1|2]), (148,358,[2_1|2]), (148,367,[1_1|2]), (148,376,[2_1|2]), (148,385,[1_1|2]), (148,394,[5_1|2]), (148,403,[1_1|2]), (148,412,[1_1|2]), (148,421,[3_1|2]), (148,430,[2_1|2]), (148,439,[3_1|2]), (148,448,[4_1|2]), (148,457,[3_1|2]), (148,466,[2_1|2]), (148,475,[3_1|2]), (148,484,[5_1|2]), (148,493,[3_1|2]), (149,149,[cons_5_1|0, cons_4_1|0, cons_0_1|0, cons_2_1|0, cons_1_1|0, cons_3_1|0]), (150,149,[encArg_1|1]), (150,150,[5_1|1, 4_1|1, 0_1|1, 2_1|1, 1_1|1, 3_1|1]), (150,151,[2_1|2]), (150,160,[4_1|2]), (150,169,[2_1|2]), (150,178,[0_1|2]), (150,187,[5_1|2]), (150,196,[0_1|2]), (150,205,[5_1|2]), (150,214,[4_1|2]), (150,223,[2_1|2]), (150,232,[5_1|2]), (150,241,[2_1|2]), (150,250,[4_1|2]), (150,259,[1_1|2]), (150,268,[3_1|2]), (150,277,[3_1|2]), (150,286,[0_1|2]), (150,295,[0_1|2]), (150,304,[0_1|2]), (150,313,[0_1|2]), (150,322,[0_1|2]), (150,331,[2_1|2]), (150,340,[2_1|2]), (150,349,[3_1|2]), (150,358,[2_1|2]), (150,367,[1_1|2]), (150,376,[2_1|2]), (150,385,[1_1|2]), (150,394,[5_1|2]), (150,403,[1_1|2]), (150,412,[1_1|2]), (150,421,[3_1|2]), (150,430,[2_1|2]), (150,439,[3_1|2]), (150,448,[4_1|2]), (150,457,[3_1|2]), (150,466,[2_1|2]), (150,475,[3_1|2]), (150,484,[5_1|2]), (150,493,[3_1|2]), (151,152,[5_1|2]), (152,153,[5_1|2]), (153,154,[1_1|2]), (154,155,[1_1|2]), (155,156,[1_1|2]), (156,157,[0_1|2]), (157,158,[2_1|2]), (158,159,[3_1|2]), (158,430,[2_1|2]), (158,439,[3_1|2]), (158,448,[4_1|2]), (159,150,[4_1|2]), (159,259,[4_1|2, 1_1|2]), (159,367,[4_1|2]), (159,385,[4_1|2]), (159,403,[4_1|2]), (159,412,[4_1|2]), (159,214,[4_1|2]), (159,223,[2_1|2]), (159,232,[5_1|2]), (159,241,[2_1|2]), (159,250,[4_1|2]), (160,161,[5_1|2]), (161,162,[4_1|2]), (162,163,[2_1|2]), (163,164,[2_1|2]), (164,165,[3_1|2]), (165,166,[4_1|2]), (166,167,[5_1|2]), (167,168,[5_1|2]), (168,150,[3_1|2]), (168,259,[3_1|2]), (168,367,[3_1|2]), (168,385,[3_1|2]), (168,403,[3_1|2]), (168,412,[3_1|2]), (168,421,[3_1|2]), (168,430,[2_1|2]), (168,439,[3_1|2]), (168,448,[4_1|2]), (168,457,[3_1|2]), (168,466,[2_1|2]), (168,475,[3_1|2]), (168,484,[5_1|2]), (168,493,[3_1|2]), (169,170,[5_1|2]), (170,171,[5_1|2]), (171,172,[2_1|2]), (172,173,[3_1|2]), (173,174,[2_1|2]), (174,175,[5_1|2]), (175,176,[4_1|2]), (176,177,[0_1|2]), (176,268,[3_1|2]), (176,277,[3_1|2]), (176,286,[0_1|2]), (177,150,[0_1|2]), (177,178,[0_1|2]), (177,196,[0_1|2]), (177,286,[0_1|2]), (177,295,[0_1|2]), (177,304,[0_1|2]), (177,313,[0_1|2]), (177,322,[0_1|2]), (177,268,[3_1|2]), (177,277,[3_1|2]), (178,179,[3_1|2]), (179,180,[1_1|2]), 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(474,150,[3_1|2]), (474,178,[3_1|2]), (474,196,[3_1|2]), (474,286,[3_1|2]), (474,295,[3_1|2]), (474,304,[3_1|2]), (474,313,[3_1|2]), (474,322,[3_1|2]), (474,421,[3_1|2]), (474,430,[2_1|2]), (474,439,[3_1|2]), (474,448,[4_1|2]), (474,457,[3_1|2]), (474,466,[2_1|2]), (474,475,[3_1|2]), (474,484,[5_1|2]), (474,493,[3_1|2]), (475,476,[3_1|2]), (476,477,[5_1|2]), (477,478,[4_1|2]), (478,479,[0_1|2]), (479,480,[1_1|2]), (480,481,[4_1|2]), (481,482,[5_1|2]), (482,483,[3_1|2]), (482,484,[5_1|2]), (482,493,[3_1|2]), (483,150,[0_1|2]), (483,268,[0_1|2, 3_1|2]), (483,277,[0_1|2, 3_1|2]), (483,349,[0_1|2]), (483,421,[0_1|2]), (483,439,[0_1|2]), (483,457,[0_1|2]), (483,475,[0_1|2]), (483,493,[0_1|2]), (483,286,[0_1|2]), (483,295,[0_1|2]), (483,304,[0_1|2]), (483,313,[0_1|2]), (483,322,[0_1|2]), (484,485,[2_1|2]), (485,486,[3_1|2]), (486,487,[5_1|2]), (487,488,[4_1|2]), (488,489,[5_1|2]), (489,490,[5_1|2]), (490,491,[1_1|2]), (491,492,[3_1|2]), (491,484,[5_1|2]), (491,493,[3_1|2]), (492,150,[0_1|2]), (492,178,[0_1|2]), (492,196,[0_1|2]), (492,286,[0_1|2]), (492,295,[0_1|2]), (492,304,[0_1|2]), (492,313,[0_1|2]), (492,322,[0_1|2]), (492,296,[0_1|2]), (492,268,[3_1|2]), (492,277,[3_1|2]), (493,494,[5_1|2]), (494,495,[3_1|2]), (495,496,[1_1|2]), (496,497,[0_1|2]), (497,498,[3_1|2]), (498,499,[2_1|2]), (499,500,[3_1|2]), (499,484,[5_1|2]), (499,493,[3_1|2]), (500,501,[0_1|2]), (501,150,[4_1|2]), (501,160,[4_1|2]), (501,214,[4_1|2]), (501,250,[4_1|2]), (501,448,[4_1|2]), (501,223,[2_1|2]), (501,232,[5_1|2]), (501,241,[2_1|2]), (501,259,[1_1|2]), (502,503,[0_1|3]), (503,504,[3_1|3]), (504,505,[5_1|3]), (505,506,[3_1|3]), (506,507,[3_1|3]), (507,508,[2_1|3]), (508,509,[3_1|3]), (509,510,[4_1|3]), (510,449,[5_1|3])}" ---------------------------------------- (8) BOUNDS(1, n^1)