YES proof of /export/starexec/sandbox/benchmark/theBenchmark.xml # AProVE Commit ID: 794c25de1cacf0d048858bcd21c9a779e1221865 marcel 20200619 unpublished dirty Termination w.r.t. Q of the given QTRS could be proven: (0) QTRS (1) DependencyPairsProof [EQUIVALENT, 1 ms] (2) QDP (3) DependencyGraphProof [EQUIVALENT, 0 ms] (4) AND (5) QDP (6) UsableRulesProof [EQUIVALENT, 0 ms] (7) QDP (8) QDPOrderProof [EQUIVALENT, 47 ms] (9) QDP (10) DependencyGraphProof [EQUIVALENT, 0 ms] (11) QDP (12) QDPOrderProof [EQUIVALENT, 15 ms] (13) QDP (14) DependencyGraphProof [EQUIVALENT, 0 ms] (15) TRUE (16) QDP (17) UsableRulesProof [EQUIVALENT, 0 ms] (18) QDP (19) QDPOrderProof [EQUIVALENT, 59 ms] (20) QDP (21) PisEmptyProof [EQUIVALENT, 0 ms] (22) YES ---------------------------------------- (0) Obligation: Q restricted rewrite system: The TRS R consists of the following rules: b(a(a(x1))) -> a(b(c(x1))) c(a(x1)) -> a(c(x1)) b(c(a(x1))) -> a(b(c(x1))) c(b(x1)) -> d(x1) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) L(a(a(x1))) -> L(a(b(c(x1)))) c(R(x1)) -> c(b(R(x1))) Q is empty. ---------------------------------------- (1) DependencyPairsProof (EQUIVALENT) Using Dependency Pairs [AG00,LPAR04] we result in the following initial DP problem. ---------------------------------------- (2) Obligation: Q DP problem: The TRS P consists of the following rules: B(a(a(x1))) -> A(b(c(x1))) B(a(a(x1))) -> B(c(x1)) B(a(a(x1))) -> C(x1) C(a(x1)) -> A(c(x1)) C(a(x1)) -> C(x1) B(c(a(x1))) -> A(b(c(x1))) B(c(a(x1))) -> B(c(x1)) B(c(a(x1))) -> C(x1) C(b(x1)) -> D(x1) A(d(x1)) -> D(a(x1)) A(d(x1)) -> A(x1) D(x1) -> B(a(x1)) D(x1) -> A(x1) L^1(a(a(x1))) -> L^1(a(b(c(x1)))) L^1(a(a(x1))) -> A(b(c(x1))) L^1(a(a(x1))) -> B(c(x1)) L^1(a(a(x1))) -> C(x1) C(R(x1)) -> C(b(R(x1))) C(R(x1)) -> B(R(x1)) The TRS R consists of the following rules: b(a(a(x1))) -> a(b(c(x1))) c(a(x1)) -> a(c(x1)) b(c(a(x1))) -> a(b(c(x1))) c(b(x1)) -> d(x1) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) L(a(a(x1))) -> L(a(b(c(x1)))) c(R(x1)) -> c(b(R(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (3) DependencyGraphProof (EQUIVALENT) The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 2 SCCs with 4 less nodes. ---------------------------------------- (4) Complex Obligation (AND) ---------------------------------------- (5) Obligation: Q DP problem: The TRS P consists of the following rules: A(d(x1)) -> D(a(x1)) D(x1) -> B(a(x1)) B(a(a(x1))) -> A(b(c(x1))) A(d(x1)) -> A(x1) B(a(a(x1))) -> B(c(x1)) B(a(a(x1))) -> C(x1) C(a(x1)) -> A(c(x1)) C(a(x1)) -> C(x1) C(b(x1)) -> D(x1) D(x1) -> A(x1) C(R(x1)) -> C(b(R(x1))) B(c(a(x1))) -> A(b(c(x1))) B(c(a(x1))) -> B(c(x1)) B(c(a(x1))) -> C(x1) The TRS R consists of the following rules: b(a(a(x1))) -> a(b(c(x1))) c(a(x1)) -> a(c(x1)) b(c(a(x1))) -> a(b(c(x1))) c(b(x1)) -> d(x1) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) L(a(a(x1))) -> L(a(b(c(x1)))) c(R(x1)) -> c(b(R(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (6) UsableRulesProof (EQUIVALENT) We can use the usable rules and reduction pair processor [LPAR04] with the Ce-compatible extension of the polynomial order that maps every function symbol to the sum of its arguments. Then, we can delete all non-usable rules [FROCOS05] from R. ---------------------------------------- (7) Obligation: Q DP problem: The TRS P consists of the following rules: A(d(x1)) -> D(a(x1)) D(x1) -> B(a(x1)) B(a(a(x1))) -> A(b(c(x1))) A(d(x1)) -> A(x1) B(a(a(x1))) -> B(c(x1)) B(a(a(x1))) -> C(x1) C(a(x1)) -> A(c(x1)) C(a(x1)) -> C(x1) C(b(x1)) -> D(x1) D(x1) -> A(x1) C(R(x1)) -> C(b(R(x1))) B(c(a(x1))) -> A(b(c(x1))) B(c(a(x1))) -> B(c(x1)) B(c(a(x1))) -> C(x1) The TRS R consists of the following rules: c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) b(c(a(x1))) -> a(b(c(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (8) QDPOrderProof (EQUIVALENT) We use the reduction pair processor [LPAR04,JAR06]. The following pairs can be oriented strictly and are deleted. A(d(x1)) -> A(x1) B(a(a(x1))) -> B(c(x1)) B(a(a(x1))) -> C(x1) C(a(x1)) -> C(x1) B(c(a(x1))) -> B(c(x1)) B(c(a(x1))) -> C(x1) The remaining pairs can at least be oriented weakly. Used ordering: Polynomial interpretation [POLO]: POL(A(x_1)) = 1 + x_1 POL(B(x_1)) = x_1 POL(C(x_1)) = 1 + x_1 POL(D(x_1)) = 1 + x_1 POL(R(x_1)) = 1 + x_1 POL(a(x_1)) = 1 + x_1 POL(b(x_1)) = x_1 POL(c(x_1)) = 1 + x_1 POL(d(x_1)) = 1 + x_1 The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented: d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) a(d(x1)) -> d(a(x1)) b(c(a(x1))) -> a(b(c(x1))) c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) ---------------------------------------- (9) Obligation: Q DP problem: The TRS P consists of the following rules: A(d(x1)) -> D(a(x1)) D(x1) -> B(a(x1)) B(a(a(x1))) -> A(b(c(x1))) C(a(x1)) -> A(c(x1)) C(b(x1)) -> D(x1) D(x1) -> A(x1) C(R(x1)) -> C(b(R(x1))) B(c(a(x1))) -> A(b(c(x1))) The TRS R consists of the following rules: c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) b(c(a(x1))) -> a(b(c(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (10) DependencyGraphProof (EQUIVALENT) The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 1 SCC with 3 less nodes. ---------------------------------------- (11) Obligation: Q DP problem: The TRS P consists of the following rules: D(x1) -> B(a(x1)) B(a(a(x1))) -> A(b(c(x1))) A(d(x1)) -> D(a(x1)) D(x1) -> A(x1) B(c(a(x1))) -> A(b(c(x1))) The TRS R consists of the following rules: c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) b(c(a(x1))) -> a(b(c(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (12) QDPOrderProof (EQUIVALENT) We use the reduction pair processor [LPAR04,JAR06]. The following pairs can be oriented strictly and are deleted. A(d(x1)) -> D(a(x1)) The remaining pairs can at least be oriented weakly. Used ordering: Polynomial interpretation [POLO]: POL(A(x_1)) = x_1 POL(B(x_1)) = 0 POL(D(x_1)) = x_1 POL(R(x_1)) = 1 + x_1 POL(a(x_1)) = x_1 POL(b(x_1)) = 0 POL(c(x_1)) = 0 POL(d(x_1)) = 1 + x_1 The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented: d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) a(d(x1)) -> d(a(x1)) b(c(a(x1))) -> a(b(c(x1))) ---------------------------------------- (13) Obligation: Q DP problem: The TRS P consists of the following rules: D(x1) -> B(a(x1)) B(a(a(x1))) -> A(b(c(x1))) D(x1) -> A(x1) B(c(a(x1))) -> A(b(c(x1))) The TRS R consists of the following rules: c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) b(c(a(x1))) -> a(b(c(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (14) DependencyGraphProof (EQUIVALENT) The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 0 SCCs with 4 less nodes. ---------------------------------------- (15) TRUE ---------------------------------------- (16) Obligation: Q DP problem: The TRS P consists of the following rules: L^1(a(a(x1))) -> L^1(a(b(c(x1)))) The TRS R consists of the following rules: b(a(a(x1))) -> a(b(c(x1))) c(a(x1)) -> a(c(x1)) b(c(a(x1))) -> a(b(c(x1))) c(b(x1)) -> d(x1) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) L(a(a(x1))) -> L(a(b(c(x1)))) c(R(x1)) -> c(b(R(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (17) UsableRulesProof (EQUIVALENT) We can use the usable rules and reduction pair processor [LPAR04] with the Ce-compatible extension of the polynomial order that maps every function symbol to the sum of its arguments. Then, we can delete all non-usable rules [FROCOS05] from R. ---------------------------------------- (18) Obligation: Q DP problem: The TRS P consists of the following rules: L^1(a(a(x1))) -> L^1(a(b(c(x1)))) The TRS R consists of the following rules: c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) b(c(a(x1))) -> a(b(c(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (19) QDPOrderProof (EQUIVALENT) We use the reduction pair processor [LPAR04,JAR06]. The following pairs can be oriented strictly and are deleted. L^1(a(a(x1))) -> L^1(a(b(c(x1)))) The remaining pairs can at least be oriented weakly. Used ordering: Polynomial Order [NEGPOLO,POLO] with Interpretation: POL( L^1_1(x_1) ) = max{0, x_1 - 2} POL( a_1(x_1) ) = x_1 + 2 POL( b_1(x_1) ) = max{0, x_1 - 2} POL( c_1(x_1) ) = x_1 + 2 POL( d_1(x_1) ) = x_1 POL( R_1(x_1) ) = 0 The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented: c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) a(d(x1)) -> d(a(x1)) b(c(a(x1))) -> a(b(c(x1))) ---------------------------------------- (20) Obligation: Q DP problem: P is empty. The TRS R consists of the following rules: c(a(x1)) -> a(c(x1)) c(b(x1)) -> d(x1) c(R(x1)) -> c(b(R(x1))) a(d(x1)) -> d(a(x1)) d(x1) -> b(a(x1)) b(a(a(x1))) -> a(b(c(x1))) b(c(a(x1))) -> a(b(c(x1))) Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (21) PisEmptyProof (EQUIVALENT) The TRS P is empty. Hence, there is no (P,Q,R) chain. ---------------------------------------- (22) YES