Certification Problem

Input (TPDB TRS_Standard/AProVE_07/wiehe08)

The rewrite relation of the following TRS is considered.

minus(x,0)	→	x	(1)
minus(s(x),s(y))	→	minus(x,y)	(2)
quot(0,s(y))	→	0	(3)
quot(s(x),s(y))	→	s(quot(minus(x,y),s(y)))	(4)
plus(s(x),s(y))	→	s(s(plus(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y)))))	(5)
plus(s(x),x)	→	plus(if(gt(x,x),id(x),id(x)),s(x))	(6)
plus(zero,y)	→	y	(7)
plus(id(x),s(y))	→	s(plus(x,if(gt(s(y),y),y,s(y))))	(8)
id(x)	→	x	(9)
if(true,x,y)	→	x	(10)
if(false,x,y)	→	y	(11)
not(x)	→	if(x,false,true)	(12)
gt(s(x),zero)	→	true	(13)
gt(zero,y)	→	false	(14)
gt(s(x),s(y))	→	gt(x,y)	(15)

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by ttt2 @ termCOMP 2023)

1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

minus^#(s(x),s(y))	→	minus^#(x,y)	(16)
quot^#(s(x),s(y))	→	minus^#(x,y)	(17)
quot^#(s(x),s(y))	→	quot^#(minus(x,y),s(y))	(18)
plus^#(s(x),s(y))	→	id^#(y)	(19)
plus^#(s(x),s(y))	→	id^#(x)	(20)
plus^#(s(x),s(y))	→	not^#(gt(x,y))	(21)
plus^#(s(x),s(y))	→	if^#(not(gt(x,y)),id(x),id(y))	(22)
plus^#(s(x),s(y))	→	gt^#(x,y)	(23)
plus^#(s(x),s(y))	→	if^#(gt(x,y),x,y)	(24)
plus^#(s(x),s(y))	→	plus^#(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y)))	(25)
plus^#(s(x),x)	→	id^#(x)	(26)
plus^#(s(x),x)	→	gt^#(x,x)	(27)
plus^#(s(x),x)	→	if^#(gt(x,x),id(x),id(x))	(28)
plus^#(s(x),x)	→	plus^#(if(gt(x,x),id(x),id(x)),s(x))	(29)
plus^#(id(x),s(y))	→	gt^#(s(y),y)	(30)
plus^#(id(x),s(y))	→	if^#(gt(s(y),y),y,s(y))	(31)
plus^#(id(x),s(y))	→	plus^#(x,if(gt(s(y),y),y,s(y)))	(32)
not^#(x)	→	if^#(x,false,true)	(33)
gt^#(s(x),s(y))	→	gt^#(x,y)	(34)

1.1 Dependency Graph Processor

The dependency pairs are split into 4 components.

The 1^st component contains the pair

quot^#(s(x),s(y))

→

quot^#(minus(x,y),s(y))

(18)

1.1.1 Subterm Criterion Processor

We use the projection to multisets

π(quot^#)	=	{ 1 }
π(minus)	=	{ 1 }

to remove the pairs:

quot^#(s(x),s(y))

→

quot^#(minus(x,y),s(y))

(18)

1.1.1.1 P is empty

There are no pairs anymore.

The 2^nd component contains the pair
minus^#(s(x),s(y)) → minus^#(x,y) (16)

1.1.2 Size-Change Termination

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

minus^#(s(x),s(y)) → minus^#(x,y) (16)

2 > 2

1 > 1

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

The 3^rd component contains the pair

plus^#(id(x),s(y))	→	plus^#(x,if(gt(s(y),y),y,s(y)))	(32)
plus^#(s(x),s(y))	→	plus^#(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y)))	(25)
plus^#(s(x),x)	→	plus^#(if(gt(x,x),id(x),id(x)),s(x))	(29)

1.1.3 Reduction Pair Processor with Usable Rules

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

[id(x₁)]	=	0 · x₁ + 1
[gt(x₁, x₂)]	=	-∞ · x₁ + 2 · x₂ + 1
[true]	=	0
[not(x₁)]	=	2 · x₁ + 1
[plus^#(x₁, x₂)]	=	2 · x₁ + 0 · x₂ + 0
[false]	=	0
[zero]	=	2
[if(x₁, x₂, x₃)]	=	0 · x₁ + 0 · x₂ + 0 · x₃ + 0
[s(x₁)]	=	4 · x₁ + 2

together with the usable rules

gt(s(x),zero)	→	true	(13)
gt(s(x),s(y))	→	gt(x,y)	(15)
gt(zero,y)	→	false	(14)
if(true,x,y)	→	x	(10)
if(false,x,y)	→	y	(11)
id(x)	→	x	(9)
not(x)	→	if(x,false,true)	(12)

(w.r.t. the implicit argument filter of the reduction pair), the pair

plus^#(s(x),x)

→

plus^#(if(gt(x,x),id(x),id(x)),s(x))

(29)

could be deleted.

1.1.3.1 Reduction Pair Processor with Usable Rules

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

[id(x₁)]	=	0 · x₁ + -∞
[gt(x₁, x₂)]	=	0 · x₁ + 4 · x₂ + 3
[true]	=	5
[not(x₁)]	=	-∞ · x₁ + 2
[plus^#(x₁, x₂)]	=	0 · x₁ + 0 · x₂ + -∞
[false]	=	1
[zero]	=	1
[if(x₁, x₂, x₃)]	=	-∞ · x₁ + 0 · x₂ + 0 · x₃ + -∞
[s(x₁)]	=	1 · x₁ + -∞

together with the usable rules

if(true,x,y)	→	x	(10)
if(false,x,y)	→	y	(11)
id(x)	→	x	(9)

(w.r.t. the implicit argument filter of the reduction pair), the pair

plus^#(s(x),s(y))

→

plus^#(if(gt(x,y),x,y),if(not(gt(x,y)),id(x),id(y)))

(25)