YES Problem 1: (VAR v_NonEmpty:S x:S) (RULES f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) ) Problem 1: Innermost Equivalent Processor: -> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) -> The term rewriting system is non-overlaping or locally confluent overlay system. Therefore, innermost termination implies termination. Problem 1: Dependency Pairs Processor: -> Pairs: F(x:S,f(a,a)) -> F(f(f(a,a),a),x:S) F(x:S,f(a,a)) -> F(a,f(f(f(a,a),a),x:S)) -> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) Problem 1: SCC Processor: -> Pairs: F(x:S,f(a,a)) -> F(f(f(a,a),a),x:S) F(x:S,f(a,a)) -> F(a,f(f(f(a,a),a),x:S)) -> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) ->Strongly Connected Components: ->->Cycle: ->->-> Pairs: F(x:S,f(a,a)) -> F(f(f(a,a),a),x:S) F(x:S,f(a,a)) -> F(a,f(f(f(a,a),a),x:S)) ->->-> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) Problem 1: Reduction Pairs Processor: -> Pairs: F(x:S,f(a,a)) -> F(f(f(a,a),a),x:S) F(x:S,f(a,a)) -> F(a,f(f(f(a,a),a),x:S)) -> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) -> Usable rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) ->Interpretation type: Simple mixed ->Coefficients: All rationals ->Dimension: 1 ->Bound: 2 ->Interpretation: [f](X1,X2) = 1/2.X1.X2 [a] = 1 [fSNonEmpty] = 0 [F](X1,X2) = 2.X1.X2 + 1/2.X2 Problem 1: SCC Processor: -> Pairs: F(x:S,f(a,a)) -> F(a,f(f(f(a,a),a),x:S)) -> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) ->Strongly Connected Components: ->->Cycle: ->->-> Pairs: F(x:S,f(a,a)) -> F(a,f(f(f(a,a),a),x:S)) ->->-> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) Problem 1: Reduction Pairs Processor: -> Pairs: F(x:S,f(a,a)) -> F(a,f(f(f(a,a),a),x:S)) -> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) -> Usable rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) ->Interpretation type: Linear ->Coefficients: All rationals ->Dimension: 1 ->Bound: 4 ->Interpretation: [f](X1,X2) = 1/4.X1 + 1/2.X2 [a] = 1/4 [fSNonEmpty] = 0 [F](X1,X2) = 3/2.X1 + 3.X2 Problem 1: SCC Processor: -> Pairs: Empty -> Rules: f(x:S,f(a,a)) -> f(a,f(f(f(a,a),a),x:S)) ->Strongly Connected Components: There is no strongly connected component The problem is finite.