7.62/2.88 MAYBE 7.62/2.88 7.62/2.88 Proof: 7.62/2.88 ConCon could not decide confluence of the system. 7.62/2.88 \cite{ALS94}, Theorem 4.1 does not apply. 7.62/2.88 This system is of type 3 or smaller. 7.62/2.88 This system is strongly deterministic. 7.62/2.88 This system is quasi-decreasing. 7.62/2.88 By \cite{A14}, Theorem 11.5.9. 7.62/2.88 This system is of type 3 or smaller. 7.62/2.88 This system is deterministic. 7.62/2.88 System R transformed to V(R) + Emb. 7.62/2.88 This system is terminating. 7.62/2.88 Call external tool: 7.62/2.88 ./ttt2.sh 7.62/2.88 Input: 7.62/2.88 (VAR x) 7.62/2.88 (RULES 7.62/2.88 e(0) -> true 7.62/2.88 e(s(x)) -> true 7.62/2.88 e(s(x)) -> o(x) 7.62/2.88 e(s(x)) -> false 7.62/2.88 e(s(x)) -> e(x) 7.62/2.88 o(0) -> true 7.62/2.88 o(s(x)) -> true 7.62/2.88 o(s(x)) -> e(x) 7.62/2.88 o(s(x)) -> false 7.62/2.88 o(s(x)) -> o(x) 7.62/2.88 s(x) -> x 7.62/2.88 o(x) -> x 7.62/2.88 e(x) -> x 7.62/2.88 ) 7.62/2.88 7.62/2.88 Matrix Interpretation Processor: dim=3 7.62/2.88 7.62/2.88 interpretation: 7.62/2.88 [1] 7.62/2.88 [false] = [0] 7.62/2.88 [0], 7.62/2.88 7.62/2.88 [1 0 0] 7.62/2.88 [o](x0) = [0 1 0]x0 7.62/2.88 [1 0 1] , 7.62/2.88 7.62/2.88 [1 1 0] [1] 7.62/2.88 [s](x0) = [1 1 0]x0 + [0] 7.62/2.88 [0 0 1] [0], 7.62/2.88 7.62/2.88 [0] 7.62/2.88 [true] = [0] 7.62/2.88 [0], 7.62/2.88 7.62/2.88 [1 0 0] 7.62/2.88 [e](x0) = [0 1 0]x0 7.62/2.88 [0 1 1] , 7.62/2.88 7.62/2.88 [1] 7.62/2.88 [0] = [0] 7.62/2.88 [0] 7.62/2.88 orientation: 7.62/2.88 [1] [0] 7.62/2.88 e(0()) = [0] >= [0] = true() 7.62/2.88 [0] [0] 7.62/2.88 7.62/2.88 [1 1 0] [1] [0] 7.62/2.88 e(s(x)) = [1 1 0]x + [0] >= [0] = true() 7.62/2.88 [1 1 1] [0] [0] 7.62/2.88 7.62/2.88 [1 1 0] [1] [1 0 0] 7.62/2.88 e(s(x)) = [1 1 0]x + [0] >= [0 1 0]x = o(x) 7.62/2.88 [1 1 1] [0] [1 0 1] 7.62/2.88 7.62/2.88 [1 1 0] [1] [1] 7.62/2.88 e(s(x)) = [1 1 0]x + [0] >= [0] = false() 7.62/2.88 [1 1 1] [0] [0] 7.62/2.88 7.62/2.88 [1 1 0] [1] [1 0 0] 7.62/2.88 e(s(x)) = [1 1 0]x + [0] >= [0 1 0]x = e(x) 7.62/2.88 [1 1 1] [0] [0 1 1] 7.62/2.88 7.62/2.88 [1] [0] 7.62/2.89 o(0()) = [0] >= [0] = true() 7.62/2.89 [1] [0] 7.62/2.89 7.62/2.89 [1 1 0] [1] [0] 7.62/2.89 o(s(x)) = [1 1 0]x + [0] >= [0] = true() 7.62/2.89 [1 1 1] [1] [0] 7.62/2.89 7.62/2.89 [1 1 0] [1] [1 0 0] 7.62/2.89 o(s(x)) = [1 1 0]x + [0] >= [0 1 0]x = e(x) 7.62/2.89 [1 1 1] [1] [0 1 1] 7.62/2.89 7.62/2.89 [1 1 0] [1] [1] 7.62/2.89 o(s(x)) = [1 1 0]x + [0] >= [0] = false() 7.62/2.89 [1 1 1] [1] [0] 7.62/2.89 7.62/2.89 [1 1 0] [1] [1 0 0] 7.62/2.89 o(s(x)) = [1 1 0]x + [0] >= [0 1 0]x = o(x) 7.62/2.89 [1 1 1] [1] [1 0 1] 7.62/2.89 7.62/2.89 [1 1 0] [1] 7.62/2.89 s(x) = [1 1 0]x + [0] >= x = x 7.62/2.89 [0 0 1] [0] 7.62/2.89 7.62/2.89 [1 0 0] 7.62/2.89 o(x) = [0 1 0]x >= x = x 7.62/2.89 [1 0 1] 7.62/2.89 7.62/2.89 [1 0 0] 7.62/2.89 e(x) = [0 1 0]x >= x = x 7.62/2.89 [0 1 1] 7.62/2.89 problem: 7.62/2.89 e(s(x)) -> false() 7.62/2.89 o(s(x)) -> false() 7.62/2.89 o(x) -> x 7.62/2.89 e(x) -> x 7.62/2.89 Matrix Interpretation Processor: dim=3 7.62/2.89 7.62/2.89 interpretation: 7.62/2.89 [0] 7.62/2.89 [false] = [0] 7.62/2.89 [0], 7.62/2.89 7.62/2.89 [1 0 0] [1] 7.62/2.89 [o](x0) = [1 1 0]x0 + [0] 7.62/2.89 [0 0 1] [0], 7.62/2.89 7.62/2.89 [1 0 0] 7.62/2.89 [s](x0) = [0 0 0]x0 7.62/2.89 [0 1 0] , 7.62/2.89 7.62/2.89 [1 0 1] [1] 7.62/2.89 [e](x0) = [0 1 0]x0 + [0] 7.62/2.89 [0 0 1] [0] 7.62/2.89 orientation: 7.62/2.89 [1 1 0] [1] [0] 7.62/2.89 e(s(x)) = [0 0 0]x + [0] >= [0] = false() 7.62/2.89 [0 1 0] [0] [0] 7.62/2.89 7.62/2.89 [1 0 0] [1] [0] 7.62/2.89 o(s(x)) = [1 0 0]x + [0] >= [0] = false() 7.62/2.89 [0 1 0] [0] [0] 7.62/2.89 7.62/2.89 [1 0 0] [1] 7.62/2.89 o(x) = [1 1 0]x + [0] >= x = x 7.62/2.89 [0 0 1] [0] 7.62/2.89 7.62/2.89 [1 0 1] [1] 7.62/2.89 e(x) = [0 1 0]x + [0] >= x = x 7.62/2.89 [0 0 1] [0] 7.62/2.89 problem: 7.62/2.89 7.62/2.89 Qed 7.62/2.89 This critical pair is conditional. 7.62/2.89 This critical pair has some non-trivial conditions. 7.62/2.89 ConCon could not decide whether all 4 critical pairs are joinable or not. 7.62/2.89 Overlap: (rule1: e(s(y)) -> false <= e(y) = true, rule2: e(s(z)) -> true <= o(z) = true, pos: ε, mgu: {(y,z)}) 7.62/2.89 CP: true = false <= e(z) = true, o(z) = true 7.62/2.89 ConCon could not decide infeasibility of this critical pair. 7.62/2.89 7.62/2.91 EOF