Certification Problem

Input (TPDB TRS_Standard/Zantema_05/z05)

The rewrite relation of the following TRS is considered.

f(a,f(a,x))	→	f(c,f(b,x))	(1)
f(b,f(b,x))	→	f(a,f(c,x))	(2)
f(c,f(c,x))	→	f(b,f(a,x))	(3)

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by AProVE @ termCOMP 2023)

1 Uncurrying

We uncurry the binary symbol f in combination with the following symbol map which also determines the applicative arities of these symbols.

a	is mapped to	a,	a1(x₁)
c	is mapped to	c,	c1(x₁)
b	is mapped to	b,	b1(x₁)

There are no uncurry rules.
No rules have to be added for the eta-expansion.

Uncurrying the rules and adding the uncurrying rules yields the new set of rules

a1(a1(x))	→	c1(b1(x))	(7)
b1(b1(x))	→	a1(c1(x))	(8)
c1(c1(x))	→	b1(a1(x))	(9)
f(a,y1)	→	a1(y1)	(4)
f(c,y1)	→	c1(y1)	(5)
f(b,y1)	→	b1(y1)	(6)

1.1 Rule Removal

Using the linear polynomial interpretation over the naturals

[a1(x₁)]	=	2 + 2 · x₁
[c1(x₁)]	=	2 + 2 · x₁
[b1(x₁)]	=	2 + 2 · x₁
[f(x₁, x₂)]	=	2 + 1 · x₁ + 2 · x₂
[a]	=	0
[c]	=	1
[b]	=	2

all of the following rules can be deleted.

f(c,y1)	→	c1(y1)	(5)
f(b,y1)	→	b1(y1)	(6)

1.1.1 Rule Removal

Using the linear polynomial interpretation over the naturals

[a1(x₁)]	=	2 + 2 · x₁
[c1(x₁)]	=	2 + 2 · x₁
[b1(x₁)]	=	2 + 2 · x₁
[f(x₁, x₂)]	=	1 + 2 · x₁ + 2 · x₂
[a]	=	2

all of the following rules can be deleted.

f(a,y1)

→

a1(y1)

(4)

1.1.1.1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

a1^#(a1(x))	→	c1^#(b1(x))	(10)
a1^#(a1(x))	→	b1^#(x)	(11)
b1^#(b1(x))	→	a1^#(c1(x))	(12)
b1^#(b1(x))	→	c1^#(x)	(13)
c1^#(c1(x))	→	b1^#(a1(x))	(14)
c1^#(c1(x))	→	a1^#(x)	(15)

1.1.1.1.1 Monotonic Reduction Pair Processor

Using the linear polynomial interpretation over the naturals

[a1(x₁)]	=	1 + 2 · x₁
[c1(x₁)]	=	1 + 2 · x₁
[b1(x₁)]	=	1 + 2 · x₁
[a1^#(x₁)]	=	1 · x₁
[c1^#(x₁)]	=	1 · x₁
[b1^#(x₁)]	=	1 · x₁

the pairs

a1^#(a1(x))	→	b1^#(x)	(11)
b1^#(b1(x))	→	c1^#(x)	(13)
c1^#(c1(x))	→	a1^#(x)	(15)

and no rules could be deleted.

1.1.1.1.1.1 Narrowing Processor

We consider all narrowings of the pair below position 1 to get the following set of pairs

a1^#(a1(b1(x0)))

→

c1^#(a1(c1(x0)))

(16)

1.1.1.1.1.1.1 Narrowing Processor

We consider all narrowings of the pair below position 1 to get the following set of pairs

b1^#(b1(c1(x0)))

→

a1^#(b1(a1(x0)))

(17)

1.1.1.1.1.1.1.1 Narrowing Processor

We consider all narrowings of the pair below position 1 to get the following set of pairs

c1^#(c1(a1(x0)))

→

b1^#(c1(b1(x0)))

(18)

1.1.1.1.1.1.1.1.1 Reduction Pair Processor

Using the matrix interpretations of dimension 3 with strict dimension 1 over the arctic semiring over the naturals

[a1^#(x₁)]

-∞

0	0	0
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[a1(x₁)]

-∞

0	-∞	0
0	-∞	0
1	1	0

· x₁

[b1(x₁)]

0	0	-∞
1	0	0
-∞	1	0

· x₁

[c1^#(x₁)]

-∞

0	0	-∞
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[c1(x₁)]

-∞

0	0	0
1	-∞	0
1	0	0

· x₁

[b1^#(x₁)]

-∞

0	0	-∞
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

the pair

a1^#(a1(b1(x0)))

→

c1^#(a1(c1(x0)))

(16)

could be deleted.

1.1.1.1.1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 0 components.