YES Problem: a(x1) -> x1 a(a(b(x1))) -> b(a(b(a(x1)))) b(b(x1)) -> c(a(x1)) Proof: String Reversal Processor: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) DP Processor: DPs: b#(a(a(x1))) -> b#(x1) b#(a(a(x1))) -> a#(b(x1)) b#(a(a(x1))) -> b#(a(b(x1))) b#(a(a(x1))) -> a#(b(a(b(x1)))) b#(b(x1)) -> a#(c(x1)) TRS: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) TDG Processor: DPs: b#(a(a(x1))) -> b#(x1) b#(a(a(x1))) -> a#(b(x1)) b#(a(a(x1))) -> b#(a(b(x1))) b#(a(a(x1))) -> a#(b(a(b(x1)))) b#(b(x1)) -> a#(c(x1)) TRS: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) graph: b#(a(a(x1))) -> b#(a(b(x1))) -> b#(b(x1)) -> a#(c(x1)) b#(a(a(x1))) -> b#(a(b(x1))) -> b#(a(a(x1))) -> a#(b(a(b(x1)))) b#(a(a(x1))) -> b#(a(b(x1))) -> b#(a(a(x1))) -> b#(a(b(x1))) b#(a(a(x1))) -> b#(a(b(x1))) -> b#(a(a(x1))) -> a#(b(x1)) b#(a(a(x1))) -> b#(a(b(x1))) -> b#(a(a(x1))) -> b#(x1) b#(a(a(x1))) -> b#(x1) -> b#(b(x1)) -> a#(c(x1)) b#(a(a(x1))) -> b#(x1) -> b#(a(a(x1))) -> a#(b(a(b(x1)))) b#(a(a(x1))) -> b#(x1) -> b#(a(a(x1))) -> b#(a(b(x1))) b#(a(a(x1))) -> b#(x1) -> b#(a(a(x1))) -> a#(b(x1)) b#(a(a(x1))) -> b#(x1) -> b#(a(a(x1))) -> b#(x1) SCC Processor: #sccs: 1 #rules: 2 #arcs: 10/25 DPs: b#(a(a(x1))) -> b#(a(b(x1))) b#(a(a(x1))) -> b#(x1) TRS: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) Arctic Interpretation Processor: dimension: 2 usable rules: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) interpretation: [b#](x0) = [1 0]x0 + [0], [-& -&] [0] [c](x0) = [0 -&]x0 + [1], [0 -&] [1] [b](x0) = [1 -&]x0 + [1], [0 0] [1] [a](x0) = [2 0]x0 + [2] orientation: b#(a(a(x1))) = [3 2]x1 + [3] >= [2 -&]x1 + [3] = b#(a(b(x1))) b#(a(a(x1))) = [3 2]x1 + [3] >= [1 0]x1 + [0] = b#(x1) [0 0] [1] a(x1) = [2 0]x1 + [2] >= x1 = x1 [2 0] [2] [2 -&] [2] b(a(a(x1))) = [3 1]x1 + [3] >= [3 -&]x1 + [3] = a(b(a(b(x1)))) [0 -&] [1] [0 -&] [1] b(b(x1)) = [1 -&]x1 + [2] >= [0 -&]x1 + [2] = a(c(x1)) problem: DPs: b#(a(a(x1))) -> b#(a(b(x1))) TRS: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) Restore Modifier: DPs: b#(a(a(x1))) -> b#(a(b(x1))) TRS: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) EDG Processor: DPs: b#(a(a(x1))) -> b#(a(b(x1))) TRS: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) graph: b#(a(a(x1))) -> b#(a(b(x1))) -> b#(a(a(x1))) -> b#(a(b(x1))) Arctic Interpretation Processor: dimension: 2 usable rules: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) interpretation: [b#](x0) = [-& 0 ]x0 + [0], [-& 0 ] [0] [c](x0) = [-& -&]x0 + [1], [-& 1 ] [0] [b](x0) = [-& 0 ]x0 + [2], [0 2] [3] [a](x0) = [0 0]x0 + [0] orientation: b#(a(a(x1))) = [0 2]x1 + [3] >= [-& 1 ]x1 + [2] = b#(a(b(x1))) [0 2] [3] a(x1) = [0 0]x1 + [0] >= x1 = x1 [1 3] [4] [-& 3 ] [4] b(a(a(x1))) = [0 2]x1 + [3] >= [-& 2 ]x1 + [3] = a(b(a(b(x1)))) [-& 1 ] [3] [-& 0 ] [3] b(b(x1)) = [-& 0 ]x1 + [2] >= [-& 0 ]x1 + [1] = a(c(x1)) problem: DPs: TRS: a(x1) -> x1 b(a(a(x1))) -> a(b(a(b(x1)))) b(b(x1)) -> a(c(x1)) Qed