YES Problem: __(__(X,Y),Z) -> __(X,__(Y,Z)) __(X,nil()) -> X __(nil(),X) -> X and(tt(),X) -> activate(X) isList(V) -> isNeList(activate(V)) isList(n__nil()) -> tt() isList(n____(V1,V2)) -> and(isList(activate(V1)),n__isList(activate(V2))) isNeList(V) -> isQid(activate(V)) isNeList(n____(V1,V2)) -> and(isList(activate(V1)),n__isNeList(activate(V2))) isNeList(n____(V1,V2)) -> and(isNeList(activate(V1)),n__isList(activate(V2))) isNePal(V) -> isQid(activate(V)) isNePal(n____(I,__(P,I))) -> and(isQid(activate(I)),n__isPal(activate(P))) isPal(V) -> isNePal(activate(V)) isPal(n__nil()) -> tt() isQid(n__a()) -> tt() isQid(n__e()) -> tt() isQid(n__i()) -> tt() isQid(n__o()) -> tt() isQid(n__u()) -> tt() nil() -> n__nil() __(X1,X2) -> n____(X1,X2) isList(X) -> n__isList(X) isNeList(X) -> n__isNeList(X) isPal(X) -> n__isPal(X) a() -> n__a() e() -> n__e() i() -> n__i() o() -> n__o() u() -> n__u() activate(n__nil()) -> nil() activate(n____(X1,X2)) -> __(X1,X2) activate(n__isList(X)) -> isList(X) activate(n__isNeList(X)) -> isNeList(X) activate(n__isPal(X)) -> isPal(X) activate(n__a()) -> a() activate(n__e()) -> e() activate(n__i()) -> i() activate(n__o()) -> o() activate(n__u()) -> u() activate(X) -> X Proof: Matrix Interpretation Processor: dim=1 interpretation: [n__o] = 0, [activate](x0) = x0, [n__a] = 0, [n____](x0, x1) = 5x0 + x1, [nil] = 2, [and](x0, x1) = x0 + x1, [n__e] = 0, [e] = 0, [n__u] = 0, [n__i] = 4, [i] = 4, [isList](x0) = x0, [isQid](x0) = x0, [__](x0, x1) = 5x0 + x1, [n__nil] = 2, [a] = 0, [isPal](x0) = 4x0, [isNePal](x0) = x0, [o] = 0, [u] = 0, [n__isNeList](x0) = x0, [n__isList](x0) = x0, [n__isPal](x0) = 4x0, [isNeList](x0) = x0, [tt] = 0 orientation: __(__(X,Y),Z) = 25X + 5Y + Z >= 5X + 5Y + Z = __(X,__(Y,Z)) __(X,nil()) = 5X + 2 >= X = X __(nil(),X) = X + 10 >= X = X and(tt(),X) = X >= X = activate(X) isList(V) = V >= V = isNeList(activate(V)) isList(n__nil()) = 2 >= 0 = tt() isList(n____(V1,V2)) = 5V1 + V2 >= V1 + V2 = and(isList(activate(V1)),n__isList(activate(V2))) isNeList(V) = V >= V = isQid(activate(V)) isNeList(n____(V1,V2)) = 5V1 + V2 >= V1 + V2 = and(isList(activate(V1)),n__isNeList(activate(V2))) isNeList(n____(V1,V2)) = 5V1 + V2 >= V1 + V2 = and(isNeList(activate(V1)),n__isList(activate(V2))) isNePal(V) = V >= V = isQid(activate(V)) isNePal(n____(I,__(P,I))) = 6I + 5P >= I + 4P = and(isQid(activate(I)),n__isPal(activate(P))) isPal(V) = 4V >= V = isNePal(activate(V)) isPal(n__nil()) = 8 >= 0 = tt() isQid(n__a()) = 0 >= 0 = tt() isQid(n__e()) = 0 >= 0 = tt() isQid(n__i()) = 4 >= 0 = tt() isQid(n__o()) = 0 >= 0 = tt() isQid(n__u()) = 0 >= 0 = tt() nil() = 2 >= 2 = n__nil() __(X1,X2) = 5X1 + X2 >= 5X1 + X2 = n____(X1,X2) isList(X) = X >= X = n__isList(X) isNeList(X) = X >= X = n__isNeList(X) isPal(X) = 4X >= 4X = n__isPal(X) a() = 0 >= 0 = n__a() e() = 0 >= 0 = n__e() i() = 4 >= 4 = n__i() o() = 0 >= 0 = n__o() u() = 0 >= 0 = n__u() activate(n__nil()) = 2 >= 2 = nil() activate(n____(X1,X2)) = 5X1 + X2 >= 5X1 + X2 = __(X1,X2) activate(n__isList(X)) = X >= X = isList(X) activate(n__isNeList(X)) = X >= X = isNeList(X) activate(n__isPal(X)) = 4X >= 4X = isPal(X) activate(n__a()) = 0 >= 0 = a() activate(n__e()) = 0 >= 0 = e() activate(n__i()) = 4 >= 4 = i() activate(n__o()) = 0 >= 0 = o() activate(n__u()) = 0 >= 0 = u() activate(X) = X >= X = X problem: __(__(X,Y),Z) -> __(X,__(Y,Z)) and(tt(),X) -> activate(X) isList(V) -> isNeList(activate(V)) isList(n____(V1,V2)) -> and(isList(activate(V1)),n__isList(activate(V2))) isNeList(V) -> isQid(activate(V)) isNeList(n____(V1,V2)) -> and(isList(activate(V1)),n__isNeList(activate(V2))) isNeList(n____(V1,V2)) -> and(isNeList(activate(V1)),n__isList(activate(V2))) isNePal(V) -> isQid(activate(V)) isNePal(n____(I,__(P,I))) -> and(isQid(activate(I)),n__isPal(activate(P))) isPal(V) -> isNePal(activate(V)) isQid(n__a()) -> tt() isQid(n__e()) -> tt() isQid(n__o()) -> tt() isQid(n__u()) -> tt() nil() -> n__nil() __(X1,X2) -> n____(X1,X2) isList(X) -> n__isList(X) isNeList(X) -> n__isNeList(X) isPal(X) -> n__isPal(X) a() -> n__a() e() -> n__e() i() -> n__i() o() -> n__o() u() -> n__u() activate(n__nil()) -> nil() activate(n____(X1,X2)) -> __(X1,X2) activate(n__isList(X)) -> isList(X) activate(n__isNeList(X)) -> isNeList(X) activate(n__isPal(X)) -> isPal(X) activate(n__a()) -> a() activate(n__e()) -> e() activate(n__i()) -> i() activate(n__o()) -> o() activate(n__u()) -> u() activate(X) -> X Matrix Interpretation Processor: dim=1 interpretation: [n__o] = 4, [activate](x0) = x0, [n__a] = 4, [n____](x0, x1) = 4x0 + x1 + 4, [nil] = 0, [and](x0, x1) = x0 + x1, [n__e] = 0, [e] = 0, [n__u] = 0, [n__i] = 5, [i] = 5, [isList](x0) = x0, [isQid](x0) = x0, [__](x0, x1) = 4x0 + x1 + 4, [n__nil] = 0, [a] = 4, [isPal](x0) = x0, [isNePal](x0) = x0, [o] = 4, [u] = 0, [n__isNeList](x0) = x0, [n__isList](x0) = x0, [n__isPal](x0) = x0, [isNeList](x0) = x0, [tt] = 0 orientation: __(__(X,Y),Z) = 16X + 4Y + Z + 20 >= 4X + 4Y + Z + 8 = __(X,__(Y,Z)) and(tt(),X) = X >= X = activate(X) isList(V) = V >= V = isNeList(activate(V)) isList(n____(V1,V2)) = 4V1 + V2 + 4 >= V1 + V2 = and(isList(activate(V1)),n__isList(activate(V2))) isNeList(V) = V >= V = isQid(activate(V)) isNeList(n____(V1,V2)) = 4V1 + V2 + 4 >= V1 + V2 = and(isList(activate(V1)),n__isNeList(activate(V2))) isNeList(n____(V1,V2)) = 4V1 + V2 + 4 >= V1 + V2 = and(isNeList(activate(V1)),n__isList(activate(V2))) isNePal(V) = V >= V = isQid(activate(V)) isNePal(n____(I,__(P,I))) = 5I + 4P + 8 >= I + P = and(isQid(activate(I)),n__isPal(activate(P))) isPal(V) = V >= V = isNePal(activate(V)) isQid(n__a()) = 4 >= 0 = tt() isQid(n__e()) = 0 >= 0 = tt() isQid(n__o()) = 4 >= 0 = tt() isQid(n__u()) = 0 >= 0 = tt() nil() = 0 >= 0 = n__nil() __(X1,X2) = 4X1 + X2 + 4 >= 4X1 + X2 + 4 = n____(X1,X2) isList(X) = X >= X = n__isList(X) isNeList(X) = X >= X = n__isNeList(X) isPal(X) = X >= X = n__isPal(X) a() = 4 >= 4 = n__a() e() = 0 >= 0 = n__e() i() = 5 >= 5 = n__i() o() = 4 >= 4 = n__o() u() = 0 >= 0 = n__u() activate(n__nil()) = 0 >= 0 = nil() activate(n____(X1,X2)) = 4X1 + X2 + 4 >= 4X1 + X2 + 4 = __(X1,X2) activate(n__isList(X)) = X >= X = isList(X) activate(n__isNeList(X)) = X >= X = isNeList(X) activate(n__isPal(X)) = X >= X = isPal(X) activate(n__a()) = 4 >= 4 = a() activate(n__e()) = 0 >= 0 = e() activate(n__i()) = 5 >= 5 = i() activate(n__o()) = 4 >= 4 = o() activate(n__u()) = 0 >= 0 = u() activate(X) = X >= X = X problem: and(tt(),X) -> activate(X) isList(V) -> isNeList(activate(V)) isNeList(V) -> isQid(activate(V)) isNePal(V) -> isQid(activate(V)) isPal(V) -> isNePal(activate(V)) isQid(n__e()) -> tt() isQid(n__u()) -> tt() nil() -> n__nil() __(X1,X2) -> n____(X1,X2) isList(X) -> n__isList(X) isNeList(X) -> n__isNeList(X) isPal(X) -> n__isPal(X) a() -> n__a() e() -> n__e() i() -> n__i() o() -> n__o() u() -> n__u() activate(n__nil()) -> nil() activate(n____(X1,X2)) -> __(X1,X2) activate(n__isList(X)) -> isList(X) activate(n__isNeList(X)) -> isNeList(X) activate(n__isPal(X)) -> isPal(X) activate(n__a()) -> a() activate(n__e()) -> e() activate(n__i()) -> i() activate(n__o()) -> o() activate(n__u()) -> u() activate(X) -> X Matrix Interpretation Processor: dim=1 interpretation: [n__o] = 7, [activate](x0) = x0 + 1, [n__a] = 5, [n____](x0, x1) = x0 + x1, [nil] = 1, [and](x0, x1) = x0 + x1 + 7, [n__e] = 0, [e] = 1, [n__u] = 0, [n__i] = 0, [i] = 1, [isList](x0) = x0 + 2, [isQid](x0) = x0, [__](x0, x1) = x0 + x1 + 1, [n__nil] = 1, [a] = 5, [isPal](x0) = 4x0 + 2, [isNePal](x0) = x0 + 1, [o] = 7, [u] = 0, [n__isNeList](x0) = x0 + 1, [n__isList](x0) = x0 + 1, [n__isPal](x0) = 4x0 + 2, [isNeList](x0) = x0 + 1, [tt] = 0 orientation: and(tt(),X) = X + 7 >= X + 1 = activate(X) isList(V) = V + 2 >= V + 2 = isNeList(activate(V)) isNeList(V) = V + 1 >= V + 1 = isQid(activate(V)) isNePal(V) = V + 1 >= V + 1 = isQid(activate(V)) isPal(V) = 4V + 2 >= V + 2 = isNePal(activate(V)) isQid(n__e()) = 0 >= 0 = tt() isQid(n__u()) = 0 >= 0 = tt() nil() = 1 >= 1 = n__nil() __(X1,X2) = X1 + X2 + 1 >= X1 + X2 = n____(X1,X2) isList(X) = X + 2 >= X + 1 = n__isList(X) isNeList(X) = X + 1 >= X + 1 = n__isNeList(X) isPal(X) = 4X + 2 >= 4X + 2 = n__isPal(X) a() = 5 >= 5 = n__a() e() = 1 >= 0 = n__e() i() = 1 >= 0 = n__i() o() = 7 >= 7 = n__o() u() = 0 >= 0 = n__u() activate(n__nil()) = 2 >= 1 = nil() activate(n____(X1,X2)) = X1 + X2 + 1 >= X1 + X2 + 1 = __(X1,X2) activate(n__isList(X)) = X + 2 >= X + 2 = isList(X) activate(n__isNeList(X)) = X + 2 >= X + 1 = isNeList(X) activate(n__isPal(X)) = 4X + 3 >= 4X + 2 = isPal(X) activate(n__a()) = 6 >= 5 = a() activate(n__e()) = 1 >= 1 = e() activate(n__i()) = 1 >= 1 = i() activate(n__o()) = 8 >= 7 = o() activate(n__u()) = 1 >= 0 = u() activate(X) = X + 1 >= X = X problem: isList(V) -> isNeList(activate(V)) isNeList(V) -> isQid(activate(V)) isNePal(V) -> isQid(activate(V)) isPal(V) -> isNePal(activate(V)) isQid(n__e()) -> tt() isQid(n__u()) -> tt() nil() -> n__nil() isNeList(X) -> n__isNeList(X) isPal(X) -> n__isPal(X) a() -> n__a() o() -> n__o() u() -> n__u() activate(n____(X1,X2)) -> __(X1,X2) activate(n__isList(X)) -> isList(X) activate(n__e()) -> e() activate(n__i()) -> i() Matrix Interpretation Processor: dim=1 interpretation: [n__o] = 0, [activate](x0) = x0, [n__a] = 0, [n____](x0, x1) = x0 + x1, [nil] = 0, [n__e] = 0, [e] = 0, [n__u] = 0, [n__i] = 0, [i] = 0, [isList](x0) = 4x0, [isQid](x0) = 4x0, [__](x0, x1) = x0 + x1, [n__nil] = 0, [a] = 4, [isPal](x0) = 4x0, [isNePal](x0) = 4x0, [o] = 0, [u] = 0, [n__isNeList](x0) = 4x0, [n__isList](x0) = 4x0, [n__isPal](x0) = 4x0, [isNeList](x0) = 4x0, [tt] = 0 orientation: isList(V) = 4V >= 4V = isNeList(activate(V)) isNeList(V) = 4V >= 4V = isQid(activate(V)) isNePal(V) = 4V >= 4V = isQid(activate(V)) isPal(V) = 4V >= 4V = isNePal(activate(V)) isQid(n__e()) = 0 >= 0 = tt() isQid(n__u()) = 0 >= 0 = tt() nil() = 0 >= 0 = n__nil() isNeList(X) = 4X >= 4X = n__isNeList(X) isPal(X) = 4X >= 4X = n__isPal(X) a() = 4 >= 0 = n__a() o() = 0 >= 0 = n__o() u() = 0 >= 0 = n__u() activate(n____(X1,X2)) = X1 + X2 >= X1 + X2 = __(X1,X2) activate(n__isList(X)) = 4X >= 4X = isList(X) activate(n__e()) = 0 >= 0 = e() activate(n__i()) = 0 >= 0 = i() problem: isList(V) -> isNeList(activate(V)) isNeList(V) -> isQid(activate(V)) isNePal(V) -> isQid(activate(V)) isPal(V) -> isNePal(activate(V)) isQid(n__e()) -> tt() isQid(n__u()) -> tt() nil() -> n__nil() isNeList(X) -> n__isNeList(X) isPal(X) -> n__isPal(X) o() -> n__o() u() -> n__u() activate(n____(X1,X2)) -> __(X1,X2) activate(n__isList(X)) -> isList(X) activate(n__e()) -> e() activate(n__i()) -> i() Matrix Interpretation Processor: dim=3 interpretation: [0] [n__o] = [0] [0], [1 0 0] [activate](x0) = [0 0 1]x0 [0 1 0] , [1 0 0] [1 0 0] [1] [n____](x0, x1) = [0 0 0]x0 + [0 0 0]x1 + [0] [0 0 0] [0 0 0] [0], [0] [nil] = [0] [0], [1] [n__e] = [0] [0], [0] [e] = [0] [0], [0] [n__u] = [0] [1], [1] [n__i] = [0] [0], [0] [i] = [0] [0], [1 0 1] [1] [isList](x0) = [0 0 0]x0 + [1] [0 0 0] [0], [1 0 1] [isQid](x0) = [0 0 0]x0 [0 0 0] , [1 0 0] [1 0 0] [__](x0, x1) = [0 0 0]x0 + [0 0 0]x1 [0 0 0] [0 0 0] , [0] [n__nil] = [0] [0], [1 0 1] [1] [isPal](x0) = [0 0 0]x0 + [0] [0 0 0] [0], [1 1 0] [1] [isNePal](x0) = [0 0 0]x0 + [0] [0 0 0] [0], [1] [o] = [0] [0], [0] [u] = [0] [1], [1 1 0] [0] [n__isNeList](x0) = [0 0 0]x0 + [1] [0 0 0] [0], [1 0 1] [1] [n__isList](x0) = [0 0 0]x0 + [0] [0 0 0] [1], [1 0 0] [n__isPal](x0) = [0 0 0]x0 [0 0 0] , [1 1 0] [0] [isNeList](x0) = [0 0 0]x0 + [1] [0 0 0] [0], [0] [tt] = [0] [0] orientation: [1 0 1] [1] [1 0 1] [0] isList(V) = [0 0 0]V + [1] >= [0 0 0]V + [1] = isNeList(activate(V)) [0 0 0] [0] [0 0 0] [0] [1 1 0] [0] [1 1 0] isNeList(V) = [0 0 0]V + [1] >= [0 0 0]V = isQid(activate(V)) [0 0 0] [0] [0 0 0] [1 1 0] [1] [1 1 0] isNePal(V) = [0 0 0]V + [0] >= [0 0 0]V = isQid(activate(V)) [0 0 0] [0] [0 0 0] [1 0 1] [1] [1 0 1] [1] isPal(V) = [0 0 0]V + [0] >= [0 0 0]V + [0] = isNePal(activate(V)) [0 0 0] [0] [0 0 0] [0] [1] [0] isQid(n__e()) = [0] >= [0] = tt() [0] [0] [1] [0] isQid(n__u()) = [0] >= [0] = tt() [0] [0] [0] [0] nil() = [0] >= [0] = n__nil() [0] [0] [1 1 0] [0] [1 1 0] [0] isNeList(X) = [0 0 0]X + [1] >= [0 0 0]X + [1] = n__isNeList(X) [0 0 0] [0] [0 0 0] [0] [1 0 1] [1] [1 0 0] isPal(X) = [0 0 0]X + [0] >= [0 0 0]X = n__isPal(X) [0 0 0] [0] [0 0 0] [1] [0] o() = [0] >= [0] = n__o() [0] [0] [0] [0] u() = [0] >= [0] = n__u() [1] [1] [1 0 0] [1 0 0] [1] [1 0 0] [1 0 0] activate(n____(X1,X2)) = [0 0 0]X1 + [0 0 0]X2 + [0] >= [0 0 0]X1 + [0 0 0]X2 = __(X1,X2) [0 0 0] [0 0 0] [0] [0 0 0] [0 0 0] [1 0 1] [1] [1 0 1] [1] activate(n__isList(X)) = [0 0 0]X + [1] >= [0 0 0]X + [1] = isList(X) [0 0 0] [0] [0 0 0] [0] [1] [0] activate(n__e()) = [0] >= [0] = e() [0] [0] [1] [0] activate(n__i()) = [0] >= [0] = i() [0] [0] problem: isNeList(V) -> isQid(activate(V)) isPal(V) -> isNePal(activate(V)) nil() -> n__nil() isNeList(X) -> n__isNeList(X) u() -> n__u() activate(n__isList(X)) -> isList(X) Matrix Interpretation Processor: dim=3 interpretation: [1 0 0] [activate](x0) = [0 1 0]x0 [0 0 0] , [1] [nil] = [0] [0], [0] [n__u] = [0] [0], [1 0 0] [isList](x0) = [0 0 0]x0 [0 0 0] , [1 0 0] [isQid](x0) = [0 0 0]x0 [0 1 0] , [0] [n__nil] = [0] [0], [1 0 0] [isPal](x0) = [0 0 0]x0 [0 0 0] , [1 0 0] [isNePal](x0) = [0 0 0]x0 [0 0 0] , [0] [u] = [0] [0], [1 0 0] [n__isNeList](x0) = [0 0 0]x0 [0 1 0] , [1 0 0] [1] [n__isList](x0) = [0 0 0]x0 + [0] [0 0 0] [0], [1 0 0] [1] [isNeList](x0) = [0 0 0]x0 + [0] [0 1 0] [0] orientation: [1 0 0] [1] [1 0 0] isNeList(V) = [0 0 0]V + [0] >= [0 0 0]V = isQid(activate(V)) [0 1 0] [0] [0 1 0] [1 0 0] [1 0 0] isPal(V) = [0 0 0]V >= [0 0 0]V = isNePal(activate(V)) [0 0 0] [0 0 0] [1] [0] nil() = [0] >= [0] = n__nil() [0] [0] [1 0 0] [1] [1 0 0] isNeList(X) = [0 0 0]X + [0] >= [0 0 0]X = n__isNeList(X) [0 1 0] [0] [0 1 0] [0] [0] u() = [0] >= [0] = n__u() [0] [0] [1 0 0] [1] [1 0 0] activate(n__isList(X)) = [0 0 0]X + [0] >= [0 0 0]X = isList(X) [0 0 0] [0] [0 0 0] problem: isPal(V) -> isNePal(activate(V)) u() -> n__u() Matrix Interpretation Processor: dim=3 interpretation: [1 0 0] [activate](x0) = [0 0 0]x0 [1 0 0] , [0] [n__u] = [0] [0], [1 0 0] [isPal](x0) = [1 0 0]x0 [0 0 0] , [1 0 0] [isNePal](x0) = [0 0 1]x0 [0 0 0] , [1] [u] = [0] [0] orientation: [1 0 0] [1 0 0] isPal(V) = [1 0 0]V >= [1 0 0]V = isNePal(activate(V)) [0 0 0] [0 0 0] [1] [0] u() = [0] >= [0] = n__u() [0] [0] problem: isPal(V) -> isNePal(activate(V)) Matrix Interpretation Processor: dim=3 interpretation: [1 0 0] [0] [activate](x0) = [0 0 0]x0 + [1] [0 0 0] [0], [1 0 0] [1] [isPal](x0) = [0 0 0]x0 + [0] [0 0 0] [1], [1 0 0] [isNePal](x0) = [0 0 0]x0 [0 1 0] orientation: [1 0 0] [1] [1 0 0] [0] isPal(V) = [0 0 0]V + [0] >= [0 0 0]V + [0] = isNePal(activate(V)) [0 0 0] [1] [0 0 0] [1] problem: Qed