NO Nontermination Proof

Nontermination Proof

by ttt2 (version ttt2 1.15)

Input

The rewrite relation of the following TRS is considered.

Begin(s(x0))	→	Wait(Right1(x0))
Begin(s(0(x0)))	→	Wait(Right2(x0))
Begin(0(x0))	→	Wait(Right3(x0))
Begin(s(s(x0)))	→	Wait(Right4(x0))
Begin(s(x0))	→	Wait(Right5(x0))
Begin(half(s(s(s(s(x0))))))	→	Wait(Right6(x0))
Begin(s(s(s(s(x0)))))	→	Wait(Right7(x0))
Begin(s(s(s(x0))))	→	Wait(Right8(x0))
Begin(s(s(x0)))	→	Wait(Right9(x0))
Begin(s(x0))	→	Wait(Right10(x0))
Begin(s(s(s(x0))))	→	Wait(Right11(x0))
Begin(s(s(x0)))	→	Wait(Right12(x0))
Begin(s(x0))	→	Wait(Right13(x0))
Begin(s(p(s(x0))))	→	Wait(Right14(x0))
Begin(p(s(x0)))	→	Wait(Right15(x0))
Begin(s(x0))	→	Wait(Right16(x0))
Right1(log(End(x0)))	→	Left(s(log(half(s(End(x0))))))
Right2(half(End(x0)))	→	Left(0(End(x0)))
Right3(half(s(End(x0))))	→	Left(0(End(x0)))
Right4(half(End(x0)))	→	Left(s(half(p(s(s(End(x0)))))))
Right5(half(s(End(x0))))	→	Left(s(half(p(s(s(End(x0)))))))
Right6(half(End(x0)))	→	Left(s(s(half(half(End(x0))))))
Right7(half(half(End(x0))))	→	Left(s(s(half(half(End(x0))))))
Right8(half(half(s(End(x0)))))	→	Left(s(s(half(half(End(x0))))))
Right9(half(half(s(s(End(x0))))))	→	Left(s(s(half(half(End(x0))))))
Right10(half(half(s(s(s(End(x0)))))))	→	Left(s(s(half(half(End(x0))))))
Right11(p(End(x0)))	→	Left(s(p(s(s(End(x0))))))
Right12(p(s(End(x0))))	→	Left(s(p(s(s(End(x0))))))
Right13(p(s(s(End(x0)))))	→	Left(s(p(s(s(End(x0))))))
Right14(s(End(x0)))	→	Left(s(s(End(x0))))
Right15(s(s(End(x0))))	→	Left(s(s(End(x0))))
Right16(s(s(p(End(x0)))))	→	Left(s(s(End(x0))))
Right1(log(x0))	→	Alog(Right1(x0))
Right2(log(x0))	→	Alog(Right2(x0))
Right3(log(x0))	→	Alog(Right3(x0))
Right4(log(x0))	→	Alog(Right4(x0))
Right5(log(x0))	→	Alog(Right5(x0))
Right6(log(x0))	→	Alog(Right6(x0))
Right7(log(x0))	→	Alog(Right7(x0))
Right8(log(x0))	→	Alog(Right8(x0))
Right9(log(x0))	→	Alog(Right9(x0))
Right10(log(x0))	→	Alog(Right10(x0))
Right11(log(x0))	→	Alog(Right11(x0))
Right12(log(x0))	→	Alog(Right12(x0))
Right13(log(x0))	→	Alog(Right13(x0))
Right14(log(x0))	→	Alog(Right14(x0))
Right15(log(x0))	→	Alog(Right15(x0))
Right16(log(x0))	→	Alog(Right16(x0))
Right1(s(x0))	→	As(Right1(x0))
Right2(s(x0))	→	As(Right2(x0))
Right3(s(x0))	→	As(Right3(x0))
Right4(s(x0))	→	As(Right4(x0))
Right5(s(x0))	→	As(Right5(x0))
Right6(s(x0))	→	As(Right6(x0))
Right7(s(x0))	→	As(Right7(x0))
Right8(s(x0))	→	As(Right8(x0))
Right9(s(x0))	→	As(Right9(x0))
Right10(s(x0))	→	As(Right10(x0))
Right11(s(x0))	→	As(Right11(x0))
Right12(s(x0))	→	As(Right12(x0))
Right13(s(x0))	→	As(Right13(x0))
Right14(s(x0))	→	As(Right14(x0))
Right15(s(x0))	→	As(Right15(x0))
Right16(s(x0))	→	As(Right16(x0))
Right1(half(x0))	→	Ahalf(Right1(x0))
Right2(half(x0))	→	Ahalf(Right2(x0))
Right3(half(x0))	→	Ahalf(Right3(x0))
Right4(half(x0))	→	Ahalf(Right4(x0))
Right5(half(x0))	→	Ahalf(Right5(x0))
Right6(half(x0))	→	Ahalf(Right6(x0))
Right7(half(x0))	→	Ahalf(Right7(x0))
Right8(half(x0))	→	Ahalf(Right8(x0))
Right9(half(x0))	→	Ahalf(Right9(x0))
Right10(half(x0))	→	Ahalf(Right10(x0))
Right11(half(x0))	→	Ahalf(Right11(x0))
Right12(half(x0))	→	Ahalf(Right12(x0))
Right13(half(x0))	→	Ahalf(Right13(x0))
Right14(half(x0))	→	Ahalf(Right14(x0))
Right15(half(x0))	→	Ahalf(Right15(x0))
Right16(half(x0))	→	Ahalf(Right16(x0))
Right1(0(x0))	→	A0(Right1(x0))
Right2(0(x0))	→	A0(Right2(x0))
Right3(0(x0))	→	A0(Right3(x0))
Right4(0(x0))	→	A0(Right4(x0))
Right5(0(x0))	→	A0(Right5(x0))
Right6(0(x0))	→	A0(Right6(x0))
Right7(0(x0))	→	A0(Right7(x0))
Right8(0(x0))	→	A0(Right8(x0))
Right9(0(x0))	→	A0(Right9(x0))
Right10(0(x0))	→	A0(Right10(x0))
Right11(0(x0))	→	A0(Right11(x0))
Right12(0(x0))	→	A0(Right12(x0))
Right13(0(x0))	→	A0(Right13(x0))
Right14(0(x0))	→	A0(Right14(x0))
Right15(0(x0))	→	A0(Right15(x0))
Right16(0(x0))	→	A0(Right16(x0))
Right1(p(x0))	→	Ap(Right1(x0))
Right2(p(x0))	→	Ap(Right2(x0))
Right3(p(x0))	→	Ap(Right3(x0))
Right4(p(x0))	→	Ap(Right4(x0))
Right5(p(x0))	→	Ap(Right5(x0))
Right6(p(x0))	→	Ap(Right6(x0))
Right7(p(x0))	→	Ap(Right7(x0))
Right8(p(x0))	→	Ap(Right8(x0))
Right9(p(x0))	→	Ap(Right9(x0))
Right10(p(x0))	→	Ap(Right10(x0))
Right11(p(x0))	→	Ap(Right11(x0))
Right12(p(x0))	→	Ap(Right12(x0))
Right13(p(x0))	→	Ap(Right13(x0))
Right14(p(x0))	→	Ap(Right14(x0))
Right15(p(x0))	→	Ap(Right15(x0))
Right16(p(x0))	→	Ap(Right16(x0))
Alog(Left(x0))	→	Left(log(x0))
As(Left(x0))	→	Left(s(x0))
Ahalf(Left(x0))	→	Left(half(x0))
A0(Left(x0))	→	Left(0(x0))
Ap(Left(x0))	→	Left(p(x0))
Wait(Left(x0))	→	Begin(x0)
log(s(x0))	→	s(log(half(s(x0))))
half(s(0(x0)))	→	0(x0)
half(s(s(x0)))	→	s(half(p(s(s(x0)))))
half(half(s(s(s(s(x0))))))	→	s(s(half(half(x0))))
p(s(s(s(x0))))	→	s(p(s(s(x0))))
s(s(p(s(x0))))	→	s(s(x0))

Proof

1 Loop

The following loop proves nontermination.

t₀ = Begin(s(p(s(s(End(x73685))))))

→_ε Wait(Right13(p(s(s(End(x73685))))))

→₁ Wait(Left(s(p(s(s(End(x73685)))))))

→_ε Begin(s(p(s(s(End(x73685))))))

= t₃

where t₃ = t₀σ and σ = {x73685/x73685}

t₀	=	Begin(s(p(s(s(End(x73685))))))
	→_ε	Wait(Right13(p(s(s(End(x73685))))))
	→₁	Wait(Left(s(p(s(s(End(x73685)))))))
	→_ε	Begin(s(p(s(s(End(x73685))))))
	=	t₃