We consider the following Problem: Strict Trs: {a(b(a(x))) -> b(a(x))} StartTerms: basic terms Strategy: innermost Certificate: YES(?,O(n^1)) Proof: We consider the following Problem: Strict Trs: {a(b(a(x))) -> b(a(x))} StartTerms: basic terms Strategy: innermost Certificate: YES(?,O(n^1)) Proof: The weightgap principle applies, where following rules are oriented strictly: TRS Component: {a(b(a(x))) -> b(a(x))} Interpretation of nonconstant growth: ------------------------------------- The following argument positions are usable: Uargs(a) = {}, Uargs(b) = {} We have the following EDA-non-satisfying and IDA(1)-non-satisfying matrix interpretation: Interpretation Functions: a(x1) = [0 2] x1 + [1] [0 0] [1] b(x1) = [0 0] x1 + [0] [0 0] [0] The strictly oriented rules are moved into the weak component. We consider the following Problem: Weak Trs: {a(b(a(x))) -> b(a(x))} StartTerms: basic terms Strategy: innermost Certificate: YES(O(1),O(1)) Proof: We consider the following Problem: Weak Trs: {a(b(a(x))) -> b(a(x))} StartTerms: basic terms Strategy: innermost Certificate: YES(O(1),O(1)) Proof: Empty rules are trivially bounded Hurray, we answered YES(?,O(n^1))