YES Termination Proof

Termination Proof

by ttt2 (version ttt2 1.15)

Input

The rewrite relation of the following TRS is considered.

B(x0)	→	W(V(x0))
M(x0)	→	x0
M(V(a(x0)))	→	V(Xa(x0))
M(V(b(x0)))	→	V(Xb(x0))
Xa(a(x0))	→	a(Xa(x0))
Xa(b(x0))	→	b(Xa(x0))
Xb(a(x0))	→	a(Xb(x0))
Xb(b(x0))	→	b(Xb(x0))
Xa(E(x0))	→	a(E(x0))
Xb(E(x0))	→	b(E(x0))
W(V(x0))	→	R(L(x0))
L(a(x0))	→	Ya(L(x0))
L(b(x0))	→	Yb(L(x0))
L(a(x0))	→	D(b(x0))
Ya(D(x0))	→	D(a(x0))
Yb(D(x0))	→	D(b(x0))
R(D(x0))	→	B(x0)

Proof

1 Rule Removal

Using the linear polynomial interpretation over the arctic semiring over the integers

[a(x₁)]	=	4 · x₁ + -∞
[E(x₁)]	=	0 · x₁ + -∞
[V(x₁)]	=	4 · x₁ + -∞
[M(x₁)]	=	0 · x₁ + -∞
[Xa(x₁)]	=	4 · x₁ + -∞
[R(x₁)]	=	1 · x₁ + -∞
[B(x₁)]	=	7 · x₁ + -∞
[Xb(x₁)]	=	2 · x₁ + -∞
[Yb(x₁)]	=	2 · x₁ + -∞
[Ya(x₁)]	=	4 · x₁ + -∞
[L(x₁)]	=	6 · x₁ + -∞
[D(x₁)]	=	7 · x₁ + -∞
[b(x₁)]	=	2 · x₁ + -∞
[W(x₁)]	=	3 · x₁ + -∞

the rules

B(x0)	→	W(V(x0))
M(x0)	→	x0
M(V(a(x0)))	→	V(Xa(x0))
M(V(b(x0)))	→	V(Xb(x0))
Xa(a(x0))	→	a(Xa(x0))
Xa(b(x0))	→	b(Xa(x0))
Xb(a(x0))	→	a(Xb(x0))
Xb(b(x0))	→	b(Xb(x0))
Xa(E(x0))	→	a(E(x0))
Xb(E(x0))	→	b(E(x0))
W(V(x0))	→	R(L(x0))
L(a(x0))	→	Ya(L(x0))
L(b(x0))	→	Yb(L(x0))
Ya(D(x0))	→	D(a(x0))
Yb(D(x0))	→	D(b(x0))

remain.

1.1 Rule Removal

Using the linear polynomial interpretation over the arctic semiring over the integers

[a(x₁)]	=	7 · x₁ + -∞
[E(x₁)]	=	1 · x₁ + -∞
[V(x₁)]	=	8 · x₁ + -∞
[M(x₁)]	=	15 · x₁ + -∞
[Xa(x₁)]	=	13 · x₁ + -∞
[R(x₁)]	=	0 · x₁ + -∞
[B(x₁)]	=	15 · x₁ + -∞
[Xb(x₁)]	=	8 · x₁ + -∞
[Yb(x₁)]	=	0 · x₁ + -∞
[Ya(x₁)]	=	7 · x₁ + -∞
[L(x₁)]	=	0 · x₁ + -∞
[D(x₁)]	=	9 · x₁ + -∞
[b(x₁)]	=	0 · x₁ + -∞
[W(x₁)]	=	7 · x₁ + -∞

the rules

B(x0)	→	W(V(x0))
Xa(a(x0))	→	a(Xa(x0))
Xa(b(x0))	→	b(Xa(x0))
Xb(a(x0))	→	a(Xb(x0))
Xb(b(x0))	→	b(Xb(x0))
L(a(x0))	→	Ya(L(x0))
L(b(x0))	→	Yb(L(x0))
Ya(D(x0))	→	D(a(x0))
Yb(D(x0))	→	D(b(x0))

remain.

1.1.1 Rule Removal

Using the linear polynomial interpretation over the arctic semiring over the integers

[a(x₁)]	=	14 · x₁ + -∞
[V(x₁)]	=	0 · x₁ + -∞
[Xa(x₁)]	=	8 · x₁ + -∞
[B(x₁)]	=	5 · x₁ + -∞
[Xb(x₁)]	=	12 · x₁ + -∞
[Yb(x₁)]	=	0 · x₁ + -∞
[Ya(x₁)]	=	14 · x₁ + -∞
[L(x₁)]	=	1 · x₁ + -∞
[D(x₁)]	=	9 · x₁ + -∞
[b(x₁)]	=	0 · x₁ + -∞
[W(x₁)]	=	4 · x₁ + -∞

the rules

Xa(a(x0))	→	a(Xa(x0))
Xa(b(x0))	→	b(Xa(x0))
Xb(a(x0))	→	a(Xb(x0))
Xb(b(x0))	→	b(Xb(x0))
L(a(x0))	→	Ya(L(x0))
L(b(x0))	→	Yb(L(x0))
Ya(D(x0))	→	D(a(x0))
Yb(D(x0))	→	D(b(x0))

remain.

1.1.1.1 Rule Removal

Using the Knuth Bendix order with w0 = 1 and the following precedence and weight function

prec(D)	=	0		weight(D)	=	1
prec(Yb)	=	2		weight(Yb)	=	1
prec(Ya)	=	2		weight(Ya)	=	1
prec(L)	=	3		weight(L)	=	1
prec(Xb)	=	1		weight(Xb)	=	1
prec(b)	=	0		weight(b)	=	1
prec(Xa)	=	7		weight(Xa)	=	0
prec(a)	=	0		weight(a)	=	1

all rules could be removed.

1.1.1.1.1 R is empty

There are no rules in the TRS. Hence, it is terminating.