Problem: or(T(),x) -> T() or(x,F()) -> x or(or(x,y),z) -> or(x,or(y,z)) or(x,y) -> or(y,x) Proof: AT confluence processor Complete TRS T' of input TRS: or(T(),x) -> T() or(x,F()) -> x or(x,T()) -> T() or(F(),x) -> x or(or(x,y),z) -> or(x,or(y,z)) or(x,y) -> or(y,x) T' = (P union S) with TRS P:or(or(x,y),z) -> or(x,or(y,z)) or(x,y) -> or(y,x) TRS S:or(T(),x) -> T() or(x,F()) -> x or(x,T()) -> T() or(F(),x) -> x S is linear and P is reversible. CP(S,S) = T() = T(), F() = F() CP(S,P union P^-1) = or(T(),z) = or(T(),or(y,z)), T() = or(y,T()), T() = or(or(T(),y),z), or(x,T()) = or(or(x,T()),z), T() = or(x,T()), or(x,y) = or(x,or(y,F())), or(x,z) = or(x,or(F(),z)), x = or(F(),x), or(x,y) = or(or(x,y),F()), y = or(F(),y), T() = or(x,or(y,T())), or(T(),z) = or(x,or(T(),z)), T() = or(T(),x), or(x,T()) = or(or(x,y),T()), T() = or(T(),y), or(y,z) = or(F(),or(y,z)), y = or(y,F()), or(y,z) = or(or(F(),y),z), or(x,z) = or(or(x,F()),z), x = or(x,F()) CP(P union P^-1,S) = or(x413,or(x414,F())) = or(x413,x414), or(x416,or(x417,T())) = T(), or(x,T()) = T(), or(F(),x) = x, or(T(),x) = T(), or(x,F()) = x, or(or(T(),x428),x429) = T(), or(or(F(),x431),x432) = or(x431,x432) We have to check termination of S: Matrix Interpretation Processor: dim=1 interpretation: [or](x0, x1) = x0 + 4x1 + 3, [T] = 2, [F] = 0 orientation: or(T(),x) = 4x + 5 >= 2 = T() or(x,F()) = x + 3 >= x = x or(x,T()) = x + 11 >= 2 = T() or(F(),x) = 4x + 3 >= x = x problem: Qed