WORST_CASE(?, O(n^1)) proof of /export/starexec/sandbox2/benchmark/theBenchmark.xml # AProVE Commit ID: 794c25de1cacf0d048858bcd21c9a779e1221865 marcel 20200619 unpublished dirty The Derivational Complexity (full) of the given DCpxTrs could be proven to be BOUNDS(1, n^1).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), 36 ms] (4) CpxRelTRS (5) RelTrsToTrsProof [UPPER BOUND(ID), 0 ms] (6) CpxTRS (7) CpxTrsMatchBoundsProof [FINISHED, 45 ms] (8) BOUNDS(1, n^1) ---------------------------------------- (0) Obligation: The Derivational Complexity (full) of the given DCpxTrs could be proven to be BOUNDS(1, n^1). The TRS R consists of the following rules: 3(4(4(4(x1)))) -> 5(1(0(3(3(5(2(3(3(2(x1)))))))))) 5(3(1(3(x1)))) -> 5(5(2(1(5(5(5(1(1(1(x1)))))))))) 0(4(0(5(0(x1))))) -> 0(4(2(2(2(4(0(4(3(3(x1)))))))))) 0(0(3(5(1(4(x1)))))) -> 0(4(1(1(5(2(5(3(3(0(x1)))))))))) 0(5(0(4(5(0(x1)))))) -> 0(0(2(3(0(2(0(0(1(0(x1)))))))))) 1(0(0(3(4(4(x1)))))) -> 0(2(2(1(3(3(0(0(3(3(x1)))))))))) 3(5(4(2(0(3(x1)))))) -> 3(2(0(1(2(1(5(1(3(3(x1)))))))))) 4(4(0(4(4(0(x1)))))) -> 4(3(0(0(4(5(1(5(1(0(x1)))))))))) 5(4(0(1(5(4(x1)))))) -> 5(4(3(2(1(1(0(3(3(1(x1)))))))))) 5(4(5(0(5(0(x1)))))) -> 3(3(3(2(1(1(0(4(2(0(x1)))))))))) 0(0(3(0(5(4(4(x1))))))) -> 5(5(1(3(3(1(2(0(4(2(x1)))))))))) 0(0(3(1(5(4(3(x1))))))) -> 2(1(5(0(2(5(3(3(0(3(x1)))))))))) 0(1(3(0(5(4(4(x1))))))) -> 0(1(3(3(3(4(5(0(3(5(x1)))))))))) 0(4(0(2(2(4(4(x1))))))) -> 4(2(5(5(2(3(3(2(4(4(x1)))))))))) 0(5(0(4(1(3(1(x1))))))) -> 0(0(1(2(3(4(5(3(0(0(x1)))))))))) 0(5(3(4(3(5(4(x1))))))) -> 0(3(1(5(1(3(3(5(3(3(x1)))))))))) 0(5(5(3(2(3(2(x1))))))) -> 0(5(5(3(4(5(5(3(4(1(x1)))))))))) 1(3(4(1(4(4(0(x1))))))) -> 2(0(4(3(3(0(0(4(2(0(x1)))))))))) 1(4(4(2(1(4(4(x1))))))) -> 3(5(1(1(0(5(0(3(1(0(x1)))))))))) 2(1(1(5(4(1(0(x1))))))) -> 1(5(5(1(2(1(5(3(3(0(x1)))))))))) 2(5(3(2(1(3(5(x1))))))) -> 5(3(3(4(3(4(5(5(1(1(x1)))))))))) 3(1(0(1(5(4(4(x1))))))) -> 3(0(4(3(3(3(3(2(0(5(x1)))))))))) 3(2(3(1(2(4(4(x1))))))) -> 3(2(5(2(5(1(3(0(4(5(x1)))))))))) 3(4(4(3(2(4(4(x1))))))) -> 3(5(5(2(4(4(2(0(2(2(x1)))))))))) 4(2(4(2(5(4(5(x1))))))) -> 0(5(1(5(4(3(4(1(3(5(x1)))))))))) 4(3(2(3(5(3(2(x1))))))) -> 4(5(1(5(2(0(1(1(5(2(x1)))))))))) 4(4(0(5(4(5(4(x1))))))) -> 2(0(2(4(3(3(2(1(5(4(x1)))))))))) 4(5(4(2(4(1(2(x1))))))) -> 4(3(5(3(3(3(1(3(2(2(x1)))))))))) 5(0(1(1(5(4(5(x1))))))) -> 5(1(1(3(0(4(1(4(5(1(x1)))))))))) 5(0(3(2(4(5(4(x1))))))) -> 5(3(5(5(2(2(4(5(2(0(x1)))))))))) 5(0(5(4(5(1(4(x1))))))) -> 2(1(0(0(0(5(1(5(5(2(x1)))))))))) 5(3(4(4(4(0(5(x1))))))) -> 2(3(3(5(3(1(5(1(1(1(x1)))))))))) 5(4(0(1(4(1(4(x1))))))) -> 3(3(2(0(4(1(0(0(3(5(x1)))))))))) 5(4(1(2(5(0(1(x1))))))) -> 3(3(4(3(4(0(3(0(0(1(x1)))))))))) 5(4(1(3(4(5(4(x1))))))) -> 3(2(4(2(5(5(5(5(0(4(x1)))))))))) S is empty. Rewrite Strategy: FULL ---------------------------------------- (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_3(x_1)) -> 3(encArg(x_1)) encArg(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) ---------------------------------------- (2) Obligation: The Runtime Complexity (full) of the given CpxRelTRS could be proven to be BOUNDS(1, n^1). The TRS R consists of the following rules: 3(4(4(4(x1)))) -> 5(1(0(3(3(5(2(3(3(2(x1)))))))))) 5(3(1(3(x1)))) -> 5(5(2(1(5(5(5(1(1(1(x1)))))))))) 0(4(0(5(0(x1))))) -> 0(4(2(2(2(4(0(4(3(3(x1)))))))))) 0(0(3(5(1(4(x1)))))) -> 0(4(1(1(5(2(5(3(3(0(x1)))))))))) 0(5(0(4(5(0(x1)))))) -> 0(0(2(3(0(2(0(0(1(0(x1)))))))))) 1(0(0(3(4(4(x1)))))) -> 0(2(2(1(3(3(0(0(3(3(x1)))))))))) 3(5(4(2(0(3(x1)))))) -> 3(2(0(1(2(1(5(1(3(3(x1)))))))))) 4(4(0(4(4(0(x1)))))) -> 4(3(0(0(4(5(1(5(1(0(x1)))))))))) 5(4(0(1(5(4(x1)))))) -> 5(4(3(2(1(1(0(3(3(1(x1)))))))))) 5(4(5(0(5(0(x1)))))) -> 3(3(3(2(1(1(0(4(2(0(x1)))))))))) 0(0(3(0(5(4(4(x1))))))) -> 5(5(1(3(3(1(2(0(4(2(x1)))))))))) 0(0(3(1(5(4(3(x1))))))) -> 2(1(5(0(2(5(3(3(0(3(x1)))))))))) 0(1(3(0(5(4(4(x1))))))) -> 0(1(3(3(3(4(5(0(3(5(x1)))))))))) 0(4(0(2(2(4(4(x1))))))) -> 4(2(5(5(2(3(3(2(4(4(x1)))))))))) 0(5(0(4(1(3(1(x1))))))) -> 0(0(1(2(3(4(5(3(0(0(x1)))))))))) 0(5(3(4(3(5(4(x1))))))) -> 0(3(1(5(1(3(3(5(3(3(x1)))))))))) 0(5(5(3(2(3(2(x1))))))) -> 0(5(5(3(4(5(5(3(4(1(x1)))))))))) 1(3(4(1(4(4(0(x1))))))) -> 2(0(4(3(3(0(0(4(2(0(x1)))))))))) 1(4(4(2(1(4(4(x1))))))) -> 3(5(1(1(0(5(0(3(1(0(x1)))))))))) 2(1(1(5(4(1(0(x1))))))) -> 1(5(5(1(2(1(5(3(3(0(x1)))))))))) 2(5(3(2(1(3(5(x1))))))) -> 5(3(3(4(3(4(5(5(1(1(x1)))))))))) 3(1(0(1(5(4(4(x1))))))) -> 3(0(4(3(3(3(3(2(0(5(x1)))))))))) 3(2(3(1(2(4(4(x1))))))) -> 3(2(5(2(5(1(3(0(4(5(x1)))))))))) 3(4(4(3(2(4(4(x1))))))) -> 3(5(5(2(4(4(2(0(2(2(x1)))))))))) 4(2(4(2(5(4(5(x1))))))) -> 0(5(1(5(4(3(4(1(3(5(x1)))))))))) 4(3(2(3(5(3(2(x1))))))) -> 4(5(1(5(2(0(1(1(5(2(x1)))))))))) 4(4(0(5(4(5(4(x1))))))) -> 2(0(2(4(3(3(2(1(5(4(x1)))))))))) 4(5(4(2(4(1(2(x1))))))) -> 4(3(5(3(3(3(1(3(2(2(x1)))))))))) 5(0(1(1(5(4(5(x1))))))) -> 5(1(1(3(0(4(1(4(5(1(x1)))))))))) 5(0(3(2(4(5(4(x1))))))) -> 5(3(5(5(2(2(4(5(2(0(x1)))))))))) 5(0(5(4(5(1(4(x1))))))) -> 2(1(0(0(0(5(1(5(5(2(x1)))))))))) 5(3(4(4(4(0(5(x1))))))) -> 2(3(3(5(3(1(5(1(1(1(x1)))))))))) 5(4(0(1(4(1(4(x1))))))) -> 3(3(2(0(4(1(0(0(3(5(x1)))))))))) 5(4(1(2(5(0(1(x1))))))) -> 3(3(4(3(4(0(3(0(0(1(x1)))))))))) 5(4(1(3(4(5(4(x1))))))) -> 3(2(4(2(5(5(5(5(0(4(x1)))))))))) The (relative) TRS S consists of the following rules: encArg(cons_3(x_1)) -> 3(encArg(x_1)) encArg(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) Rewrite Strategy: FULL ---------------------------------------- (3) SInnermostTerminationProof (BOTH CONCRETE BOUNDS(ID, ID)) proved innermost termination of relative rules ---------------------------------------- (4) Obligation: The Runtime Complexity (full) of the given CpxRelTRS could be proven to be BOUNDS(1, n^1). The TRS R consists of the following rules: 3(4(4(4(x1)))) -> 5(1(0(3(3(5(2(3(3(2(x1)))))))))) 5(3(1(3(x1)))) -> 5(5(2(1(5(5(5(1(1(1(x1)))))))))) 0(4(0(5(0(x1))))) -> 0(4(2(2(2(4(0(4(3(3(x1)))))))))) 0(0(3(5(1(4(x1)))))) -> 0(4(1(1(5(2(5(3(3(0(x1)))))))))) 0(5(0(4(5(0(x1)))))) -> 0(0(2(3(0(2(0(0(1(0(x1)))))))))) 1(0(0(3(4(4(x1)))))) -> 0(2(2(1(3(3(0(0(3(3(x1)))))))))) 3(5(4(2(0(3(x1)))))) -> 3(2(0(1(2(1(5(1(3(3(x1)))))))))) 4(4(0(4(4(0(x1)))))) -> 4(3(0(0(4(5(1(5(1(0(x1)))))))))) 5(4(0(1(5(4(x1)))))) -> 5(4(3(2(1(1(0(3(3(1(x1)))))))))) 5(4(5(0(5(0(x1)))))) -> 3(3(3(2(1(1(0(4(2(0(x1)))))))))) 0(0(3(0(5(4(4(x1))))))) -> 5(5(1(3(3(1(2(0(4(2(x1)))))))))) 0(0(3(1(5(4(3(x1))))))) -> 2(1(5(0(2(5(3(3(0(3(x1)))))))))) 0(1(3(0(5(4(4(x1))))))) -> 0(1(3(3(3(4(5(0(3(5(x1)))))))))) 0(4(0(2(2(4(4(x1))))))) -> 4(2(5(5(2(3(3(2(4(4(x1)))))))))) 0(5(0(4(1(3(1(x1))))))) -> 0(0(1(2(3(4(5(3(0(0(x1)))))))))) 0(5(3(4(3(5(4(x1))))))) -> 0(3(1(5(1(3(3(5(3(3(x1)))))))))) 0(5(5(3(2(3(2(x1))))))) -> 0(5(5(3(4(5(5(3(4(1(x1)))))))))) 1(3(4(1(4(4(0(x1))))))) -> 2(0(4(3(3(0(0(4(2(0(x1)))))))))) 1(4(4(2(1(4(4(x1))))))) -> 3(5(1(1(0(5(0(3(1(0(x1)))))))))) 2(1(1(5(4(1(0(x1))))))) -> 1(5(5(1(2(1(5(3(3(0(x1)))))))))) 2(5(3(2(1(3(5(x1))))))) -> 5(3(3(4(3(4(5(5(1(1(x1)))))))))) 3(1(0(1(5(4(4(x1))))))) -> 3(0(4(3(3(3(3(2(0(5(x1)))))))))) 3(2(3(1(2(4(4(x1))))))) -> 3(2(5(2(5(1(3(0(4(5(x1)))))))))) 3(4(4(3(2(4(4(x1))))))) -> 3(5(5(2(4(4(2(0(2(2(x1)))))))))) 4(2(4(2(5(4(5(x1))))))) -> 0(5(1(5(4(3(4(1(3(5(x1)))))))))) 4(3(2(3(5(3(2(x1))))))) -> 4(5(1(5(2(0(1(1(5(2(x1)))))))))) 4(4(0(5(4(5(4(x1))))))) -> 2(0(2(4(3(3(2(1(5(4(x1)))))))))) 4(5(4(2(4(1(2(x1))))))) -> 4(3(5(3(3(3(1(3(2(2(x1)))))))))) 5(0(1(1(5(4(5(x1))))))) -> 5(1(1(3(0(4(1(4(5(1(x1)))))))))) 5(0(3(2(4(5(4(x1))))))) -> 5(3(5(5(2(2(4(5(2(0(x1)))))))))) 5(0(5(4(5(1(4(x1))))))) -> 2(1(0(0(0(5(1(5(5(2(x1)))))))))) 5(3(4(4(4(0(5(x1))))))) -> 2(3(3(5(3(1(5(1(1(1(x1)))))))))) 5(4(0(1(4(1(4(x1))))))) -> 3(3(2(0(4(1(0(0(3(5(x1)))))))))) 5(4(1(2(5(0(1(x1))))))) -> 3(3(4(3(4(0(3(0(0(1(x1)))))))))) 5(4(1(3(4(5(4(x1))))))) -> 3(2(4(2(5(5(5(5(0(4(x1)))))))))) The (relative) TRS S consists of the following rules: encArg(cons_3(x_1)) -> 3(encArg(x_1)) encArg(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) Rewrite Strategy: FULL ---------------------------------------- (5) RelTrsToTrsProof (UPPER BOUND(ID)) transformed relative TRS to TRS ---------------------------------------- (6) Obligation: The Runtime Complexity (full) of the given CpxTRS could be proven to be BOUNDS(1, n^1). The TRS R consists of the following rules: 3(4(4(4(x1)))) -> 5(1(0(3(3(5(2(3(3(2(x1)))))))))) 5(3(1(3(x1)))) -> 5(5(2(1(5(5(5(1(1(1(x1)))))))))) 0(4(0(5(0(x1))))) -> 0(4(2(2(2(4(0(4(3(3(x1)))))))))) 0(0(3(5(1(4(x1)))))) -> 0(4(1(1(5(2(5(3(3(0(x1)))))))))) 0(5(0(4(5(0(x1)))))) -> 0(0(2(3(0(2(0(0(1(0(x1)))))))))) 1(0(0(3(4(4(x1)))))) -> 0(2(2(1(3(3(0(0(3(3(x1)))))))))) 3(5(4(2(0(3(x1)))))) -> 3(2(0(1(2(1(5(1(3(3(x1)))))))))) 4(4(0(4(4(0(x1)))))) -> 4(3(0(0(4(5(1(5(1(0(x1)))))))))) 5(4(0(1(5(4(x1)))))) -> 5(4(3(2(1(1(0(3(3(1(x1)))))))))) 5(4(5(0(5(0(x1)))))) -> 3(3(3(2(1(1(0(4(2(0(x1)))))))))) 0(0(3(0(5(4(4(x1))))))) -> 5(5(1(3(3(1(2(0(4(2(x1)))))))))) 0(0(3(1(5(4(3(x1))))))) -> 2(1(5(0(2(5(3(3(0(3(x1)))))))))) 0(1(3(0(5(4(4(x1))))))) -> 0(1(3(3(3(4(5(0(3(5(x1)))))))))) 0(4(0(2(2(4(4(x1))))))) -> 4(2(5(5(2(3(3(2(4(4(x1)))))))))) 0(5(0(4(1(3(1(x1))))))) -> 0(0(1(2(3(4(5(3(0(0(x1)))))))))) 0(5(3(4(3(5(4(x1))))))) -> 0(3(1(5(1(3(3(5(3(3(x1)))))))))) 0(5(5(3(2(3(2(x1))))))) -> 0(5(5(3(4(5(5(3(4(1(x1)))))))))) 1(3(4(1(4(4(0(x1))))))) -> 2(0(4(3(3(0(0(4(2(0(x1)))))))))) 1(4(4(2(1(4(4(x1))))))) -> 3(5(1(1(0(5(0(3(1(0(x1)))))))))) 2(1(1(5(4(1(0(x1))))))) -> 1(5(5(1(2(1(5(3(3(0(x1)))))))))) 2(5(3(2(1(3(5(x1))))))) -> 5(3(3(4(3(4(5(5(1(1(x1)))))))))) 3(1(0(1(5(4(4(x1))))))) -> 3(0(4(3(3(3(3(2(0(5(x1)))))))))) 3(2(3(1(2(4(4(x1))))))) -> 3(2(5(2(5(1(3(0(4(5(x1)))))))))) 3(4(4(3(2(4(4(x1))))))) -> 3(5(5(2(4(4(2(0(2(2(x1)))))))))) 4(2(4(2(5(4(5(x1))))))) -> 0(5(1(5(4(3(4(1(3(5(x1)))))))))) 4(3(2(3(5(3(2(x1))))))) -> 4(5(1(5(2(0(1(1(5(2(x1)))))))))) 4(4(0(5(4(5(4(x1))))))) -> 2(0(2(4(3(3(2(1(5(4(x1)))))))))) 4(5(4(2(4(1(2(x1))))))) -> 4(3(5(3(3(3(1(3(2(2(x1)))))))))) 5(0(1(1(5(4(5(x1))))))) -> 5(1(1(3(0(4(1(4(5(1(x1)))))))))) 5(0(3(2(4(5(4(x1))))))) -> 5(3(5(5(2(2(4(5(2(0(x1)))))))))) 5(0(5(4(5(1(4(x1))))))) -> 2(1(0(0(0(5(1(5(5(2(x1)))))))))) 5(3(4(4(4(0(5(x1))))))) -> 2(3(3(5(3(1(5(1(1(1(x1)))))))))) 5(4(0(1(4(1(4(x1))))))) -> 3(3(2(0(4(1(0(0(3(5(x1)))))))))) 5(4(1(2(5(0(1(x1))))))) -> 3(3(4(3(4(0(3(0(0(1(x1)))))))))) 5(4(1(3(4(5(4(x1))))))) -> 3(2(4(2(5(5(5(5(0(4(x1)))))))))) encArg(cons_3(x_1)) -> 3(encArg(x_1)) encArg(cons_5(x_1)) -> 5(encArg(x_1)) encArg(cons_0(x_1)) -> 0(encArg(x_1)) encArg(cons_1(x_1)) -> 1(encArg(x_1)) encArg(cons_4(x_1)) -> 4(encArg(x_1)) encArg(cons_2(x_1)) -> 2(encArg(x_1)) encode_3(x_1) -> 3(encArg(x_1)) encode_4(x_1) -> 4(encArg(x_1)) encode_5(x_1) -> 5(encArg(x_1)) encode_1(x_1) -> 1(encArg(x_1)) encode_0(x_1) -> 0(encArg(x_1)) encode_2(x_1) -> 2(encArg(x_1)) S is empty. Rewrite Strategy: FULL ---------------------------------------- (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 2. The certificate found is represented by the following graph. "[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] {(151,152,[3_1|0, 5_1|0, 0_1|0, 1_1|0, 4_1|0, 2_1|0, encArg_1|0, encode_3_1|0, encode_4_1|0, encode_5_1|0, encode_1_1|0, encode_0_1|0, encode_2_1|0]), (151,153,[3_1|1, 5_1|1, 0_1|1, 1_1|1, 4_1|1, 2_1|1]), (151,154,[5_1|2]), (151,163,[3_1|2]), (151,172,[3_1|2]), (151,181,[3_1|2]), (151,190,[3_1|2]), (151,199,[5_1|2]), (151,208,[2_1|2]), (151,217,[5_1|2]), (151,226,[3_1|2]), (151,235,[3_1|2]), (151,244,[3_1|2]), (151,253,[3_1|2]), (151,262,[5_1|2]), (151,271,[5_1|2]), (151,280,[2_1|2]), (151,289,[0_1|2]), (151,298,[4_1|2]), (151,307,[0_1|2]), (151,316,[5_1|2]), (151,325,[2_1|2]), (151,334,[0_1|2]), (151,343,[0_1|2]), (151,352,[0_1|2]), (151,361,[0_1|2]), (151,370,[0_1|2]), (151,379,[0_1|2]), (151,388,[2_1|2]), (151,397,[3_1|2]), (151,406,[4_1|2]), (151,415,[2_1|2]), (151,424,[0_1|2]), (151,433,[4_1|2]), (151,442,[4_1|2]), (151,451,[1_1|2]), (151,460,[5_1|2]), (152,152,[cons_3_1|0, cons_5_1|0, cons_0_1|0, cons_1_1|0, cons_4_1|0, cons_2_1|0]), (153,152,[encArg_1|1]), (153,153,[3_1|1, 5_1|1, 0_1|1, 1_1|1, 4_1|1, 2_1|1]), (153,154,[5_1|2]), (153,163,[3_1|2]), (153,172,[3_1|2]), (153,181,[3_1|2]), (153,190,[3_1|2]), (153,199,[5_1|2]), (153,208,[2_1|2]), (153,217,[5_1|2]), (153,226,[3_1|2]), (153,235,[3_1|2]), (153,244,[3_1|2]), (153,253,[3_1|2]), (153,262,[5_1|2]), (153,271,[5_1|2]), (153,280,[2_1|2]), (153,289,[0_1|2]), (153,298,[4_1|2]), (153,307,[0_1|2]), (153,316,[5_1|2]), (153,325,[2_1|2]), (153,334,[0_1|2]), (153,343,[0_1|2]), (153,352,[0_1|2]), (153,361,[0_1|2]), (153,370,[0_1|2]), (153,379,[0_1|2]), (153,388,[2_1|2]), (153,397,[3_1|2]), (153,406,[4_1|2]), (153,415,[2_1|2]), (153,424,[0_1|2]), (153,433,[4_1|2]), (153,442,[4_1|2]), (153,451,[1_1|2]), (153,460,[5_1|2]), (154,155,[1_1|2]), (155,156,[0_1|2]), (156,157,[3_1|2]), (157,158,[3_1|2]), (158,159,[5_1|2]), (159,160,[2_1|2]), (160,161,[3_1|2]), (161,162,[3_1|2]), (161,190,[3_1|2]), (162,153,[2_1|2]), (162,298,[2_1|2]), (162,406,[2_1|2]), (162,433,[2_1|2]), (162,442,[2_1|2]), (162,451,[1_1|2]), (162,460,[5_1|2]), (163,164,[5_1|2]), (164,165,[5_1|2]), (165,166,[2_1|2]), (166,167,[4_1|2]), (167,168,[4_1|2]), (168,169,[2_1|2]), (169,170,[0_1|2]), (170,171,[2_1|2]), (171,153,[2_1|2]), (171,298,[2_1|2]), (171,406,[2_1|2]), (171,433,[2_1|2]), (171,442,[2_1|2]), (171,451,[1_1|2]), (171,460,[5_1|2]), (172,173,[2_1|2]), (173,174,[0_1|2]), (174,175,[1_1|2]), (175,176,[2_1|2]), (176,177,[1_1|2]), (177,178,[5_1|2]), (178,179,[1_1|2]), (179,180,[3_1|2]), (180,153,[3_1|2]), (180,163,[3_1|2]), (180,172,[3_1|2]), (180,181,[3_1|2]), (180,190,[3_1|2]), (180,226,[3_1|2]), (180,235,[3_1|2]), (180,244,[3_1|2]), (180,253,[3_1|2]), (180,397,[3_1|2]), (180,353,[3_1|2]), (180,154,[5_1|2]), (181,182,[0_1|2]), (182,183,[4_1|2]), (183,184,[3_1|2]), (184,185,[3_1|2]), (185,186,[3_1|2]), (186,187,[3_1|2]), (187,188,[2_1|2]), (188,189,[0_1|2]), (188,334,[0_1|2]), (188,343,[0_1|2]), (188,352,[0_1|2]), (188,361,[0_1|2]), (189,153,[5_1|2]), (189,298,[5_1|2]), (189,406,[5_1|2]), (189,433,[5_1|2]), (189,442,[5_1|2]), (189,199,[5_1|2]), (189,208,[2_1|2]), (189,217,[5_1|2]), (189,226,[3_1|2]), (189,235,[3_1|2]), (189,244,[3_1|2]), (189,253,[3_1|2]), (189,262,[5_1|2]), (189,271,[5_1|2]), (189,280,[2_1|2]), (190,191,[2_1|2]), (191,192,[5_1|2]), (192,193,[2_1|2]), (193,194,[5_1|2]), (194,195,[1_1|2]), (195,196,[3_1|2]), (196,197,[0_1|2]), (197,198,[4_1|2]), (197,442,[4_1|2]), (198,153,[5_1|2]), (198,298,[5_1|2]), (198,406,[5_1|2]), (198,433,[5_1|2]), (198,442,[5_1|2]), (198,199,[5_1|2]), (198,208,[2_1|2]), (198,217,[5_1|2]), (198,226,[3_1|2]), (198,235,[3_1|2]), (198,244,[3_1|2]), (198,253,[3_1|2]), (198,262,[5_1|2]), (198,271,[5_1|2]), (198,280,[2_1|2]), (199,200,[5_1|2]), (200,201,[2_1|2]), (201,202,[1_1|2]), (202,203,[5_1|2]), (203,204,[5_1|2]), (204,205,[5_1|2]), (205,206,[1_1|2]), (206,207,[1_1|2]), (207,153,[1_1|2]), (207,163,[1_1|2]), (207,172,[1_1|2]), (207,181,[1_1|2]), (207,190,[1_1|2]), (207,226,[1_1|2]), (207,235,[1_1|2]), (207,244,[1_1|2]), (207,253,[1_1|2]), (207,397,[1_1|2, 3_1|2]), (207,379,[0_1|2]), (207,388,[2_1|2]), (208,209,[3_1|2]), (209,210,[3_1|2]), (210,211,[5_1|2]), (211,212,[3_1|2]), (212,213,[1_1|2]), (213,214,[5_1|2]), (214,215,[1_1|2]), (215,216,[1_1|2]), (216,153,[1_1|2]), (216,154,[1_1|2]), (216,199,[1_1|2]), (216,217,[1_1|2]), (216,262,[1_1|2]), (216,271,[1_1|2]), (216,316,[1_1|2]), (216,460,[1_1|2]), (216,362,[1_1|2]), (216,425,[1_1|2]), (216,379,[0_1|2]), (216,388,[2_1|2]), (216,397,[3_1|2]), (217,218,[4_1|2]), (218,219,[3_1|2]), (219,220,[2_1|2]), (220,221,[1_1|2]), (221,222,[1_1|2]), (222,223,[0_1|2]), (223,224,[3_1|2]), (224,225,[3_1|2]), (224,181,[3_1|2]), (225,153,[1_1|2]), (225,298,[1_1|2]), (225,406,[1_1|2]), (225,433,[1_1|2]), (225,442,[1_1|2]), (225,218,[1_1|2]), (225,379,[0_1|2]), (225,388,[2_1|2]), (225,397,[3_1|2]), (226,227,[3_1|2]), (227,228,[2_1|2]), (228,229,[0_1|2]), (229,230,[4_1|2]), (230,231,[1_1|2]), (231,232,[0_1|2]), (231,307,[0_1|2]), (232,233,[0_1|2]), (233,234,[3_1|2]), (233,172,[3_1|2]), (234,153,[5_1|2]), (234,298,[5_1|2]), (234,406,[5_1|2]), (234,433,[5_1|2]), (234,442,[5_1|2]), (234,199,[5_1|2]), (234,208,[2_1|2]), (234,217,[5_1|2]), (234,226,[3_1|2]), (234,235,[3_1|2]), (234,244,[3_1|2]), (234,253,[3_1|2]), (234,262,[5_1|2]), (234,271,[5_1|2]), (234,280,[2_1|2]), (235,236,[3_1|2]), (236,237,[3_1|2]), (237,238,[2_1|2]), (238,239,[1_1|2]), (239,240,[1_1|2]), (240,241,[0_1|2]), (241,242,[4_1|2]), (242,243,[2_1|2]), (243,153,[0_1|2]), (243,289,[0_1|2]), (243,307,[0_1|2]), (243,334,[0_1|2]), (243,343,[0_1|2]), (243,352,[0_1|2]), (243,361,[0_1|2]), (243,370,[0_1|2]), (243,379,[0_1|2]), (243,424,[0_1|2]), (243,298,[4_1|2]), (243,316,[5_1|2]), (243,325,[2_1|2]), (244,245,[3_1|2]), (245,246,[4_1|2]), (246,247,[3_1|2]), (247,248,[4_1|2]), (248,249,[0_1|2]), (249,250,[3_1|2]), (250,251,[0_1|2]), (251,252,[0_1|2]), (251,370,[0_1|2]), (252,153,[1_1|2]), (252,451,[1_1|2]), (252,371,[1_1|2]), (252,379,[0_1|2]), (252,388,[2_1|2]), (252,397,[3_1|2]), (253,254,[2_1|2]), (254,255,[4_1|2]), (255,256,[2_1|2]), (256,257,[5_1|2]), (257,258,[5_1|2]), (258,259,[5_1|2]), (259,260,[5_1|2]), (260,261,[0_1|2]), (260,289,[0_1|2]), (260,298,[4_1|2]), (261,153,[4_1|2]), (261,298,[4_1|2]), (261,406,[4_1|2]), (261,433,[4_1|2]), (261,442,[4_1|2]), (261,218,[4_1|2]), (261,415,[2_1|2]), (261,424,[0_1|2]), (262,263,[1_1|2]), (263,264,[1_1|2]), (264,265,[3_1|2]), (265,266,[0_1|2]), (266,267,[4_1|2]), (267,268,[1_1|2]), (268,269,[4_1|2]), (269,270,[5_1|2]), (270,153,[1_1|2]), (270,154,[1_1|2]), (270,199,[1_1|2]), (270,217,[1_1|2]), (270,262,[1_1|2]), (270,271,[1_1|2]), (270,316,[1_1|2]), (270,460,[1_1|2]), (270,434,[1_1|2]), (270,379,[0_1|2]), (270,388,[2_1|2]), (270,397,[3_1|2]), (271,272,[3_1|2]), (272,273,[5_1|2]), (273,274,[5_1|2]), (274,275,[2_1|2]), (275,276,[2_1|2]), (276,277,[4_1|2]), (277,278,[5_1|2]), (278,279,[2_1|2]), (279,153,[0_1|2]), (279,298,[0_1|2, 4_1|2]), (279,406,[0_1|2]), (279,433,[0_1|2]), (279,442,[0_1|2]), (279,218,[0_1|2]), (279,289,[0_1|2]), (279,307,[0_1|2]), (279,316,[5_1|2]), (279,325,[2_1|2]), (279,334,[0_1|2]), (279,343,[0_1|2]), (279,352,[0_1|2]), (279,361,[0_1|2]), (279,370,[0_1|2]), (280,281,[1_1|2]), (281,282,[0_1|2]), (282,283,[0_1|2]), (283,284,[0_1|2]), (284,285,[5_1|2]), (285,286,[1_1|2]), (286,287,[5_1|2]), (287,288,[5_1|2]), (288,153,[2_1|2]), (288,298,[2_1|2]), (288,406,[2_1|2]), (288,433,[2_1|2]), (288,442,[2_1|2]), (288,451,[1_1|2]), (288,460,[5_1|2]), (289,290,[4_1|2]), (290,291,[2_1|2]), (291,292,[2_1|2]), (292,293,[2_1|2]), (293,294,[4_1|2]), (294,295,[0_1|2]), (295,296,[4_1|2]), (296,297,[3_1|2]), (297,153,[3_1|2]), (297,289,[3_1|2]), (297,307,[3_1|2]), (297,334,[3_1|2]), (297,343,[3_1|2]), (297,352,[3_1|2]), (297,361,[3_1|2]), (297,370,[3_1|2]), (297,379,[3_1|2]), (297,424,[3_1|2]), (297,154,[5_1|2]), (297,163,[3_1|2]), (297,172,[3_1|2]), (297,181,[3_1|2]), (297,190,[3_1|2]), (298,299,[2_1|2]), (299,300,[5_1|2]), (300,301,[5_1|2]), (301,302,[2_1|2]), (302,303,[3_1|2]), (303,304,[3_1|2]), (304,305,[2_1|2]), (305,306,[4_1|2]), (305,406,[4_1|2]), (305,415,[2_1|2]), (306,153,[4_1|2]), (306,298,[4_1|2]), (306,406,[4_1|2]), (306,433,[4_1|2]), (306,442,[4_1|2]), (306,415,[2_1|2]), (306,424,[0_1|2]), (307,308,[4_1|2]), (308,309,[1_1|2]), (309,310,[1_1|2]), (310,311,[5_1|2]), (311,312,[2_1|2]), (312,313,[5_1|2]), (313,314,[3_1|2]), (314,315,[3_1|2]), (315,153,[0_1|2]), (315,298,[0_1|2, 4_1|2]), (315,406,[0_1|2]), (315,433,[0_1|2]), (315,442,[0_1|2]), (315,289,[0_1|2]), (315,307,[0_1|2]), (315,316,[5_1|2]), (315,325,[2_1|2]), (315,334,[0_1|2]), (315,343,[0_1|2]), (315,352,[0_1|2]), (315,361,[0_1|2]), (315,370,[0_1|2]), (316,317,[5_1|2]), (317,318,[1_1|2]), (318,319,[3_1|2]), (319,320,[3_1|2]), (320,321,[1_1|2]), (321,322,[2_1|2]), (322,323,[0_1|2]), (323,324,[4_1|2]), (323,424,[0_1|2]), (324,153,[2_1|2]), (324,298,[2_1|2]), (324,406,[2_1|2]), (324,433,[2_1|2]), (324,442,[2_1|2]), (324,451,[1_1|2]), (324,460,[5_1|2]), (325,326,[1_1|2]), (326,327,[5_1|2]), (327,328,[0_1|2]), (328,329,[2_1|2]), (329,330,[5_1|2]), (330,331,[3_1|2]), (331,332,[3_1|2]), (332,333,[0_1|2]), (333,153,[3_1|2]), (333,163,[3_1|2]), (333,172,[3_1|2]), (333,181,[3_1|2]), (333,190,[3_1|2]), (333,226,[3_1|2]), (333,235,[3_1|2]), (333,244,[3_1|2]), (333,253,[3_1|2]), (333,397,[3_1|2]), (333,407,[3_1|2]), (333,443,[3_1|2]), (333,219,[3_1|2]), (333,154,[5_1|2]), (334,335,[0_1|2]), (335,336,[2_1|2]), (336,337,[3_1|2]), (337,338,[0_1|2]), (338,339,[2_1|2]), (339,340,[0_1|2]), (340,341,[0_1|2]), (341,342,[1_1|2]), (341,379,[0_1|2]), (342,153,[0_1|2]), (342,289,[0_1|2]), (342,307,[0_1|2]), (342,334,[0_1|2]), (342,343,[0_1|2]), (342,352,[0_1|2]), (342,361,[0_1|2]), (342,370,[0_1|2]), (342,379,[0_1|2]), (342,424,[0_1|2]), (342,298,[4_1|2]), (342,316,[5_1|2]), (342,325,[2_1|2]), (343,344,[0_1|2]), (344,345,[1_1|2]), (345,346,[2_1|2]), (346,347,[3_1|2]), (347,348,[4_1|2]), (348,349,[5_1|2]), (349,350,[3_1|2]), (350,351,[0_1|2]), (350,307,[0_1|2]), (350,316,[5_1|2]), (350,325,[2_1|2]), (351,153,[0_1|2]), (351,451,[0_1|2]), (351,289,[0_1|2]), (351,298,[4_1|2]), (351,307,[0_1|2]), (351,316,[5_1|2]), (351,325,[2_1|2]), (351,334,[0_1|2]), (351,343,[0_1|2]), (351,352,[0_1|2]), (351,361,[0_1|2]), (351,370,[0_1|2]), (352,353,[3_1|2]), (353,354,[1_1|2]), (354,355,[5_1|2]), (355,356,[1_1|2]), (356,357,[3_1|2]), (357,358,[3_1|2]), (358,359,[5_1|2]), (359,360,[3_1|2]), (360,153,[3_1|2]), (360,298,[3_1|2]), (360,406,[3_1|2]), (360,433,[3_1|2]), (360,442,[3_1|2]), (360,218,[3_1|2]), (360,154,[5_1|2]), (360,163,[3_1|2]), (360,172,[3_1|2]), (360,181,[3_1|2]), (360,190,[3_1|2]), (361,362,[5_1|2]), (362,363,[5_1|2]), (363,364,[3_1|2]), (364,365,[4_1|2]), (365,366,[5_1|2]), (366,367,[5_1|2]), (367,368,[3_1|2]), (368,369,[4_1|2]), (369,153,[1_1|2]), (369,208,[1_1|2]), (369,280,[1_1|2]), (369,325,[1_1|2]), (369,388,[1_1|2, 2_1|2]), (369,415,[1_1|2]), (369,173,[1_1|2]), (369,191,[1_1|2]), (369,254,[1_1|2]), (369,379,[0_1|2]), (369,397,[3_1|2]), (370,371,[1_1|2]), (371,372,[3_1|2]), (372,373,[3_1|2]), (373,374,[3_1|2]), (374,375,[4_1|2]), (375,376,[5_1|2]), (376,377,[0_1|2]), (377,378,[3_1|2]), (377,172,[3_1|2]), (378,153,[5_1|2]), (378,298,[5_1|2]), (378,406,[5_1|2]), (378,433,[5_1|2]), (378,442,[5_1|2]), (378,199,[5_1|2]), (378,208,[2_1|2]), (378,217,[5_1|2]), (378,226,[3_1|2]), (378,235,[3_1|2]), (378,244,[3_1|2]), (378,253,[3_1|2]), (378,262,[5_1|2]), (378,271,[5_1|2]), (378,280,[2_1|2]), (379,380,[2_1|2]), (380,381,[2_1|2]), (381,382,[1_1|2]), (382,383,[3_1|2]), (383,384,[3_1|2]), (384,385,[0_1|2]), (385,386,[0_1|2]), (386,387,[3_1|2]), (387,153,[3_1|2]), (387,298,[3_1|2]), (387,406,[3_1|2]), (387,433,[3_1|2]), (387,442,[3_1|2]), (387,154,[5_1|2]), (387,163,[3_1|2]), (387,172,[3_1|2]), (387,181,[3_1|2]), (387,190,[3_1|2]), (388,389,[0_1|2]), (389,390,[4_1|2]), (390,391,[3_1|2]), (391,392,[3_1|2]), (392,393,[0_1|2]), (393,394,[0_1|2]), (394,395,[4_1|2]), (395,396,[2_1|2]), (396,153,[0_1|2]), (396,289,[0_1|2]), (396,307,[0_1|2]), (396,334,[0_1|2]), (396,343,[0_1|2]), (396,352,[0_1|2]), (396,361,[0_1|2]), (396,370,[0_1|2]), (396,379,[0_1|2]), (396,424,[0_1|2]), (396,298,[4_1|2]), (396,316,[5_1|2]), (396,325,[2_1|2]), (397,398,[5_1|2]), (398,399,[1_1|2]), (399,400,[1_1|2]), (400,401,[0_1|2]), (401,402,[5_1|2]), (402,403,[0_1|2]), (403,404,[3_1|2]), (403,181,[3_1|2]), (404,405,[1_1|2]), (404,379,[0_1|2]), (405,153,[0_1|2]), (405,298,[0_1|2, 4_1|2]), (405,406,[0_1|2]), (405,433,[0_1|2]), (405,442,[0_1|2]), (405,289,[0_1|2]), (405,307,[0_1|2]), (405,316,[5_1|2]), (405,325,[2_1|2]), (405,334,[0_1|2]), (405,343,[0_1|2]), (405,352,[0_1|2]), (405,361,[0_1|2]), (405,370,[0_1|2]), (406,407,[3_1|2]), (407,408,[0_1|2]), (408,409,[0_1|2]), (409,410,[4_1|2]), (410,411,[5_1|2]), (411,412,[1_1|2]), (412,413,[5_1|2]), (413,414,[1_1|2]), (413,379,[0_1|2]), (414,153,[0_1|2]), (414,289,[0_1|2]), (414,307,[0_1|2]), (414,334,[0_1|2]), (414,343,[0_1|2]), (414,352,[0_1|2]), (414,361,[0_1|2]), (414,370,[0_1|2]), (414,379,[0_1|2]), (414,424,[0_1|2]), (414,298,[4_1|2]), (414,316,[5_1|2]), (414,325,[2_1|2]), (415,416,[0_1|2]), (416,417,[2_1|2]), (417,418,[4_1|2]), (418,419,[3_1|2]), (419,420,[3_1|2]), (420,421,[2_1|2]), (421,422,[1_1|2]), (422,423,[5_1|2]), (422,217,[5_1|2]), (422,226,[3_1|2]), (422,235,[3_1|2]), (422,244,[3_1|2]), (422,253,[3_1|2]), (423,153,[4_1|2]), (423,298,[4_1|2]), (423,406,[4_1|2]), (423,433,[4_1|2]), (423,442,[4_1|2]), (423,218,[4_1|2]), (423,415,[2_1|2]), (423,424,[0_1|2]), (424,425,[5_1|2]), (425,426,[1_1|2]), (426,427,[5_1|2]), (427,428,[4_1|2]), (428,429,[3_1|2]), (429,430,[4_1|2]), (430,431,[1_1|2]), (431,432,[3_1|2]), (431,172,[3_1|2]), (432,153,[5_1|2]), (432,154,[5_1|2]), (432,199,[5_1|2]), (432,217,[5_1|2]), (432,262,[5_1|2]), (432,271,[5_1|2]), (432,316,[5_1|2]), (432,460,[5_1|2]), (432,434,[5_1|2]), (432,208,[2_1|2]), (432,226,[3_1|2]), (432,235,[3_1|2]), (432,244,[3_1|2]), (432,253,[3_1|2]), (432,280,[2_1|2]), (433,434,[5_1|2]), (434,435,[1_1|2]), (435,436,[5_1|2]), (436,437,[2_1|2]), (437,438,[0_1|2]), (438,439,[1_1|2]), (439,440,[1_1|2]), (440,441,[5_1|2]), (441,153,[2_1|2]), (441,208,[2_1|2]), (441,280,[2_1|2]), (441,325,[2_1|2]), (441,388,[2_1|2]), (441,415,[2_1|2]), (441,173,[2_1|2]), (441,191,[2_1|2]), (441,254,[2_1|2]), (441,451,[1_1|2]), (441,460,[5_1|2]), (442,443,[3_1|2]), (443,444,[5_1|2]), (444,445,[3_1|2]), (445,446,[3_1|2]), (446,447,[3_1|2]), (447,448,[1_1|2]), (448,449,[3_1|2]), (449,450,[2_1|2]), (450,153,[2_1|2]), (450,208,[2_1|2]), (450,280,[2_1|2]), (450,325,[2_1|2]), (450,388,[2_1|2]), (450,415,[2_1|2]), (450,451,[1_1|2]), (450,460,[5_1|2]), (451,452,[5_1|2]), (452,453,[5_1|2]), (453,454,[1_1|2]), (454,455,[2_1|2]), (455,456,[1_1|2]), (456,457,[5_1|2]), (457,458,[3_1|2]), (458,459,[3_1|2]), (459,153,[0_1|2]), (459,289,[0_1|2]), (459,307,[0_1|2]), (459,334,[0_1|2]), (459,343,[0_1|2]), (459,352,[0_1|2]), (459,361,[0_1|2]), (459,370,[0_1|2]), (459,379,[0_1|2]), (459,424,[0_1|2]), (459,298,[4_1|2]), (459,316,[5_1|2]), (459,325,[2_1|2]), (460,461,[3_1|2]), (461,462,[3_1|2]), (462,463,[4_1|2]), (463,464,[3_1|2]), (464,465,[4_1|2]), (465,466,[5_1|2]), (466,467,[5_1|2]), (467,468,[1_1|2]), (468,153,[1_1|2]), (468,154,[1_1|2]), (468,199,[1_1|2]), (468,217,[1_1|2]), (468,262,[1_1|2]), (468,271,[1_1|2]), (468,316,[1_1|2]), (468,460,[1_1|2]), (468,164,[1_1|2]), (468,398,[1_1|2]), (468,379,[0_1|2]), (468,388,[2_1|2]), (468,397,[3_1|2])}" ---------------------------------------- (8) BOUNDS(1, n^1)