Certification Problem

Input (TPDB SRS_Standard/Secret_06_SRS/multum2)

The rewrite relation of the following TRS is considered.

a(a(b(x1)))	→	b(b(a(a(x1))))	(1)
b(a(b(a(x1))))	→	a(a(a(b(x1))))	(2)

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by AProVE @ termCOMP 2023)

1 String Reversal

Since only unary symbols occur, one can reverse all terms and obtains the TRS

b(a(a(x1)))	→	a(a(b(b(x1))))	(3)
a(b(a(b(x1))))	→	b(a(a(a(x1))))	(4)

1.1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

b^#(a(a(x1)))	→	a^#(a(b(b(x1))))	(5)
b^#(a(a(x1)))	→	a^#(b(b(x1)))	(6)
b^#(a(a(x1)))	→	b^#(b(x1))	(7)
b^#(a(a(x1)))	→	b^#(x1)	(8)
a^#(b(a(b(x1))))	→	b^#(a(a(a(x1))))	(9)
a^#(b(a(b(x1))))	→	a^#(a(a(x1)))	(10)
a^#(b(a(b(x1))))	→	a^#(a(x1))	(11)
a^#(b(a(b(x1))))	→	a^#(x1)	(12)

1.1.1 Reduction Pair Processor

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

[b^#(x₁)]

-∞

0	0	0
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[a(x₁)]

0	-∞	-∞
0	-∞	0
0	0	-∞

· x₁

[a^#(x₁)]

-∞

0	0	-∞
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[b(x₁)]

-∞	0	-∞
-∞	-∞	-∞
0	0	0

· x₁

the pair

b^#(a(a(x1)))

→

a^#(b(b(x1)))

(6)

could be deleted.

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

[b^#(x₁)]

-∞

0	0	0
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[a(x₁)]

0	-∞	-∞
0	-∞	0
0	0	-∞

· x₁

[a^#(x₁)]

-∞

0	-∞	0
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[b(x₁)]

-∞	0	-∞
-∞	-∞	-∞
0	0	0

· x₁

the pair

b^#(a(a(x1)))

→

a^#(a(b(b(x1))))

(5)

could be deleted.

1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 2 components.

The 1^st component contains the pair

a^#(b(a(b(x1))))	→	a^#(a(x1))	(11)
a^#(b(a(b(x1))))	→	a^#(a(a(x1)))	(10)
a^#(b(a(b(x1))))	→	a^#(x1)	(12)

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

[a^#(x₁)]

-∞

0	0	0
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[b(x₁)]

-∞	0	-∞
0	-∞	-∞
0	1	0

· x₁

[a(x₁)]

-∞

-∞	0	0
-∞	0	-∞
-∞	0	-∞

· x₁

the pair

a^#(b(a(b(x1))))

→

a^#(a(a(x1)))

(10)

could be deleted.

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

[a^#(x₁)]

-∞

-∞	-∞	0
-∞	-∞	-∞
-∞	-∞	-∞

· x₁

[b(x₁)]

-∞	-∞	-∞
0	0	0
0	-∞	-∞

· x₁

[a(x₁)]

-∞	0	0
-∞	-∞	0
-∞	-∞	-∞

· x₁

the pair

a^#(b(a(b(x1))))

→

a^#(a(x1))

(11)

could be deleted.

1.1.1.1.1.1.1.1 Monotonic Reduction Pair Processor with Usable Rules

Using the linear polynomial interpretation over the naturals

[b(x₁)]	=	1 · x₁
[a(x₁)]	=	1 · x₁
[a^#(x₁)]	=	1 · x₁

having no usable rules (w.r.t. the implicit argument filter of the reduction pair), the rule could be deleted.

1.1.1.1.1.1.1.1.1 Size-Change Termination

Using size-change termination in combination with the subterm criterion one obtains the following initial size-change graphs.

a^#(b(a(b(x1))))	→	a^#(x1)	(12)

1	>	1

As there is no critical graph in the transitive closure, there are no infinite chains.

The 2^nd component contains the pair

b^#(a(a(x1)))	→	b^#(x1)	(8)
b^#(a(a(x1)))	→	b^#(b(x1))	(7)

1.1.1.1.1.2 Reduction Pair Processor

Using the matrix interpretations of dimension 5 with strict dimension 1 over the integers

[b^#(x₁)]

0	0	0	0	1
0	0	0	0	0
0	0	0	0	0
0	0	0	0	0
0	0	0	0	0

· x₁

[a(x₁)]

0	0	0
1	1	0
0	1	0
0	0	0
0	1	1

· x₁

[b(x₁)]

0	0	0	0
0	0	0	0
0	1	1	0
1	0	0	0
0	0	0	1

· x₁

the pairs

b^#(a(a(x1)))	→	b^#(x1)	(8)
b^#(a(a(x1)))	→	b^#(b(x1))	(7)

could be deleted.

1.1.1.1.1.2.1 P is empty

There are no pairs anymore.