Certification Problem

Input (TPDB TRS_Standard/HirokawaMiddeldorp_04/t000)

The rewrite relation of the following TRS is considered.

There are 104 ruless (increase limit for explicit display).

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by NaTT @ termCOMP 2023)

1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

+^#(2,8)	→	c^#(1,0)	(105)
+^#(8,4)	→	c^#(1,2)	(106)
+^#(5,5)	→	c^#(1,0)	(107)
+^#(3,8)	→	c^#(1,1)	(108)
+^#(c(x,y),z)	→	c^#(x,+(y,z))	(109)
+^#(9,9)	→	c^#(1,8)	(110)
+^#(5,9)	→	c^#(1,4)	(111)
+^#(9,2)	→	c^#(1,1)	(112)
+^#(c(x,y),z)	→	+^#(y,z)	(113)
c^#(x,c(y,z))	→	c^#(+(x,y),z)	(114)
+^#(6,4)	→	c^#(1,0)	(115)
+^#(9,8)	→	c^#(1,7)	(116)
+^#(8,6)	→	c^#(1,4)	(117)
+^#(4,9)	→	c^#(1,3)	(118)
+^#(3,7)	→	c^#(1,0)	(119)
+^#(4,7)	→	c^#(1,1)	(120)
+^#(7,3)	→	c^#(1,0)	(121)
+^#(9,5)	→	c^#(1,4)	(122)
+^#(7,7)	→	c^#(1,4)	(123)
+^#(7,6)	→	c^#(1,3)	(124)
+^#(5,7)	→	c^#(1,2)	(125)
+^#(2,9)	→	c^#(1,1)	(126)
+^#(5,8)	→	c^#(1,3)	(127)
+^#(8,8)	→	c^#(1,6)	(128)
c^#(x,c(y,z))	→	+^#(x,y)	(129)
+^#(6,8)	→	c^#(1,4)	(130)
+^#(7,5)	→	c^#(1,2)	(131)
+^#(9,6)	→	c^#(1,5)	(132)
+^#(8,3)	→	c^#(1,1)	(133)
+^#(7,4)	→	c^#(1,1)	(134)
+^#(1,9)	→	c^#(1,0)	(135)
+^#(9,4)	→	c^#(1,3)	(136)
+^#(6,7)	→	c^#(1,3)	(137)
+^#(7,8)	→	c^#(1,5)	(138)
+^#(6,9)	→	c^#(1,5)	(139)
+^#(8,7)	→	c^#(1,5)	(140)
+^#(x,c(y,z))	→	+^#(x,z)	(141)
+^#(8,9)	→	c^#(1,7)	(142)
+^#(4,8)	→	c^#(1,2)	(143)
+^#(5,6)	→	c^#(1,1)	(144)
+^#(x,c(y,z))	→	c^#(y,+(x,z))	(145)
+^#(9,1)	→	c^#(1,0)	(146)
+^#(9,3)	→	c^#(1,2)	(147)
+^#(3,9)	→	c^#(1,2)	(148)
+^#(8,2)	→	c^#(1,0)	(149)
+^#(8,5)	→	c^#(1,3)	(150)
+^#(4,6)	→	c^#(1,0)	(151)
+^#(6,6)	→	c^#(1,2)	(152)
+^#(6,5)	→	c^#(1,1)	(153)
+^#(7,9)	→	c^#(1,6)	(154)
+^#(9,7)	→	c^#(1,6)	(155)

1.1 Dependency Graph Processor

The dependency pairs are split into 1 component.

The 1^st component contains the pair

c^#(x,c(y,z))	→	+^#(x,y)	(129)
+^#(x,c(y,z))	→	c^#(y,+(x,z))	(145)
+^#(x,c(y,z))	→	+^#(x,z)	(141)
c^#(x,c(y,z))	→	c^#(+(x,y),z)	(114)
+^#(c(x,y),z)	→	+^#(y,z)	(113)
+^#(c(x,y),z)	→	c^#(x,+(y,z))	(109)

1.1.1 Reduction Pair Processor with Usable Rules

Using the Max-polynomial interpretation

[7]	=	14688
[1]	=	14682
[4]	=	14685
[5]	=	14686
[3]	=	14684
[c(x₁, x₂)]	=	x₁ + x₂ + 52877
[9]	=	14690
[8]	=	14689
[0]	=	14681
[c^#(x₁, x₂)]	=	x₁ + x₂ + 0
[2]	=	14683
[6]	=	14687
[+(x₁, x₂)]	=	x₁ + x₂ + 52868
[+^#(x₁, x₂)]	=	x₁ + x₂ + 52876

together with the usable rules

There are 104 ruless (increase limit for explicit display).

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

c^#(x,c(y,z))	→	+^#(x,y)	(129)
+^#(x,c(y,z))	→	c^#(y,+(x,z))	(145)
+^#(x,c(y,z))	→	+^#(x,z)	(141)
c^#(x,c(y,z))	→	c^#(+(x,y),z)	(114)
+^#(c(x,y),z)	→	+^#(y,z)	(113)
+^#(c(x,y),z)	→	c^#(x,+(y,z))	(109)

could be deleted.

1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 0 components.