/export/starexec/sandbox2/solver/bin/starexec_run_default /export/starexec/sandbox2/benchmark/theBenchmark.xml /export/starexec/sandbox2/output/output_files -------------------------------------------------------------------------------- YES Problem 1: (VAR X X1 X2 Y) (RULES active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ) (STRATEGY INNERMOST) Problem 1: Dependency Pairs Processor: -> Pairs: ACTIVE(f(g(X),Y)) -> F(X,f(g(X),Y)) ACTIVE(f(X1,X2)) -> ACTIVE(X1) ACTIVE(f(X1,X2)) -> F(active(X1),X2) ACTIVE(g(X)) -> ACTIVE(X) ACTIVE(g(X)) -> G(active(X)) F(mark(X1),X2) -> F(X1,X2) F(ok(X1),ok(X2)) -> F(X1,X2) G(mark(X)) -> G(X) G(ok(X)) -> G(X) PROPER(f(X1,X2)) -> F(proper(X1),proper(X2)) PROPER(f(X1,X2)) -> PROPER(X1) PROPER(f(X1,X2)) -> PROPER(X2) PROPER(g(X)) -> G(proper(X)) PROPER(g(X)) -> PROPER(X) TOP(mark(X)) -> PROPER(X) TOP(mark(X)) -> TOP(proper(X)) TOP(ok(X)) -> ACTIVE(X) TOP(ok(X)) -> TOP(active(X)) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) Problem 1: SCC Processor: -> Pairs: ACTIVE(f(g(X),Y)) -> F(X,f(g(X),Y)) ACTIVE(f(X1,X2)) -> ACTIVE(X1) ACTIVE(f(X1,X2)) -> F(active(X1),X2) ACTIVE(g(X)) -> ACTIVE(X) ACTIVE(g(X)) -> G(active(X)) F(mark(X1),X2) -> F(X1,X2) F(ok(X1),ok(X2)) -> F(X1,X2) G(mark(X)) -> G(X) G(ok(X)) -> G(X) PROPER(f(X1,X2)) -> F(proper(X1),proper(X2)) PROPER(f(X1,X2)) -> PROPER(X1) PROPER(f(X1,X2)) -> PROPER(X2) PROPER(g(X)) -> G(proper(X)) PROPER(g(X)) -> PROPER(X) TOP(mark(X)) -> PROPER(X) TOP(mark(X)) -> TOP(proper(X)) TOP(ok(X)) -> ACTIVE(X) TOP(ok(X)) -> TOP(active(X)) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Strongly Connected Components: ->->Cycle: ->->-> Pairs: G(mark(X)) -> G(X) G(ok(X)) -> G(X) ->->-> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->->Cycle: ->->-> Pairs: F(mark(X1),X2) -> F(X1,X2) F(ok(X1),ok(X2)) -> F(X1,X2) ->->-> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->->Cycle: ->->-> Pairs: PROPER(f(X1,X2)) -> PROPER(X1) PROPER(f(X1,X2)) -> PROPER(X2) PROPER(g(X)) -> PROPER(X) ->->-> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->->Cycle: ->->-> Pairs: ACTIVE(f(X1,X2)) -> ACTIVE(X1) ACTIVE(g(X)) -> ACTIVE(X) ->->-> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->->Cycle: ->->-> Pairs: TOP(mark(X)) -> TOP(proper(X)) TOP(ok(X)) -> TOP(active(X)) ->->-> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) The problem is decomposed in 5 subproblems. Problem 1.1: Subterm Processor: -> Pairs: G(mark(X)) -> G(X) G(ok(X)) -> G(X) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Projection: pi(G) = 1 Problem 1.1: SCC Processor: -> Pairs: Empty -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Strongly Connected Components: There is no strongly connected component The problem is finite. Problem 1.2: Subterm Processor: -> Pairs: F(mark(X1),X2) -> F(X1,X2) F(ok(X1),ok(X2)) -> F(X1,X2) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Projection: pi(F) = 1 Problem 1.2: SCC Processor: -> Pairs: Empty -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Strongly Connected Components: There is no strongly connected component The problem is finite. Problem 1.3: Subterm Processor: -> Pairs: PROPER(f(X1,X2)) -> PROPER(X1) PROPER(f(X1,X2)) -> PROPER(X2) PROPER(g(X)) -> PROPER(X) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Projection: pi(PROPER) = 1 Problem 1.3: SCC Processor: -> Pairs: Empty -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Strongly Connected Components: There is no strongly connected component The problem is finite. Problem 1.4: Subterm Processor: -> Pairs: ACTIVE(f(X1,X2)) -> ACTIVE(X1) ACTIVE(g(X)) -> ACTIVE(X) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Projection: pi(ACTIVE) = 1 Problem 1.4: SCC Processor: -> Pairs: Empty -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Strongly Connected Components: There is no strongly connected component The problem is finite. Problem 1.5: Reduction Pairs Processor: -> Pairs: TOP(mark(X)) -> TOP(proper(X)) TOP(ok(X)) -> TOP(active(X)) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) -> Usable rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) ->Interpretation type: Linear ->Coefficients: Natural Numbers ->Dimension: 1 ->Bound: 2 ->Interpretation: [active](X) = X + 2 [f](X1,X2) = X1 + 2.X2 [g](X) = X [proper](X) = 0 [mark](X) = 2 [ok](X) = 2.X + 2 [TOP](X) = 2.X Problem 1.5: SCC Processor: -> Pairs: TOP(ok(X)) -> TOP(active(X)) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Strongly Connected Components: ->->Cycle: ->->-> Pairs: TOP(ok(X)) -> TOP(active(X)) ->->-> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) Problem 1.5: Reduction Pairs Processor: -> Pairs: TOP(ok(X)) -> TOP(active(X)) -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) -> Usable rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) ->Interpretation type: Linear ->Coefficients: Natural Numbers ->Dimension: 1 ->Bound: 2 ->Interpretation: [active](X) = 2.X [f](X1,X2) = 2.X2 + 2 [g](X) = 2.X [mark](X) = 1 [ok](X) = 2.X + 2 [TOP](X) = X Problem 1.5: SCC Processor: -> Pairs: Empty -> Rules: active(f(g(X),Y)) -> mark(f(X,f(g(X),Y))) active(f(X1,X2)) -> f(active(X1),X2) active(g(X)) -> g(active(X)) f(mark(X1),X2) -> mark(f(X1,X2)) f(ok(X1),ok(X2)) -> ok(f(X1,X2)) g(mark(X)) -> mark(g(X)) g(ok(X)) -> ok(g(X)) proper(f(X1,X2)) -> f(proper(X1),proper(X2)) proper(g(X)) -> g(proper(X)) top(mark(X)) -> top(proper(X)) top(ok(X)) -> top(active(X)) ->Strongly Connected Components: There is no strongly connected component The problem is finite.