Certification Problem

Input (TPDB SRS_Standard/ICFP_2010/41843)

The rewrite relation of the following TRS is considered.

0(0(1(2(x1))))	→	0(3(1(0(2(x1)))))	(1)
0(1(2(2(x1))))	→	1(2(0(3(2(2(x1))))))	(2)
0(1(2(4(x1))))	→	0(3(2(3(1(4(x1))))))	(3)
0(5(0(5(x1))))	→	0(3(0(5(5(x1)))))	(4)
0(5(1(2(x1))))	→	1(0(1(5(2(x1)))))	(5)
0(5(1(2(x1))))	→	0(1(0(1(5(2(x1))))))	(6)
0(5(1(2(x1))))	→	0(3(2(3(1(5(x1))))))	(7)
0(5(4(2(x1))))	→	0(4(5(3(2(x1)))))	(8)
0(5(5(2(x1))))	→	5(0(1(5(2(x1)))))	(9)
1(0(0(5(x1))))	→	1(1(0(0(1(5(4(x1)))))))	(10)
1(0(1(2(x1))))	→	1(1(3(0(2(x1)))))	(11)
1(0(1(2(x1))))	→	1(1(0(3(2(2(x1))))))	(12)
1(0(1(2(x1))))	→	1(1(0(3(2(3(x1))))))	(13)
1(0(5(4(x1))))	→	0(1(1(5(4(x1)))))	(14)
1(2(0(5(x1))))	→	0(3(2(3(1(5(x1))))))	(15)
1(2(0(5(x1))))	→	5(0(3(3(2(1(x1))))))	(16)
1(5(0(2(x1))))	→	1(1(0(1(1(5(2(x1)))))))	(17)
1(5(1(2(x1))))	→	0(1(1(5(2(x1)))))	(18)
1(5(1(2(x1))))	→	1(0(1(5(3(2(x1))))))	(19)
5(0(0(2(x1))))	→	5(0(3(0(2(x1)))))	(20)
5(0(1(2(x1))))	→	5(1(0(3(2(x1)))))	(21)
5(0(1(2(x1))))	→	5(1(0(3(2(3(x1))))))	(22)
0(0(0(1(2(x1)))))	→	0(2(0(1(0(3(3(4(x1))))))))	(23)
0(0(2(5(2(x1)))))	→	0(3(2(0(5(2(x1))))))	(24)
0(1(2(5(0(x1)))))	→	3(3(2(2(0(0(1(5(x1))))))))	(25)
0(1(2(5(2(x1)))))	→	0(3(2(1(5(3(2(x1)))))))	(26)
0(3(5(2(2(x1)))))	→	0(4(5(3(2(2(x1))))))	(27)
0(4(2(0(5(x1)))))	→	0(4(0(3(2(1(5(x1)))))))	(28)
0(4(2(5(2(x1)))))	→	0(5(4(3(3(2(2(x1)))))))	(29)
0(5(0(2(2(x1)))))	→	0(2(5(0(3(2(x1))))))	(30)
0(5(0(5(1(x1)))))	→	0(1(0(3(5(5(x1))))))	(31)
0(5(1(3(0(x1)))))	→	0(0(1(1(5(3(x1))))))	(32)
0(5(2(2(4(x1)))))	→	0(5(3(2(2(4(x1))))))	(33)
0(5(2(3(1(x1)))))	→	0(1(5(3(2(2(2(x1)))))))	(34)
0(5(2(4(1(x1)))))	→	0(4(3(2(5(1(x1))))))	(35)
0(5(3(5(2(x1)))))	→	0(0(3(5(5(2(x1))))))	(36)
0(5(5(3(1(x1)))))	→	5(0(1(5(3(3(2(x1)))))))	(37)
1(0(5(5(1(x1)))))	→	0(4(5(1(5(1(x1))))))	(38)
1(1(2(2(0(x1)))))	→	1(1(3(2(2(0(x1))))))	(39)
1(1(2(3(4(x1)))))	→	1(1(3(2(2(4(x1))))))	(40)
1(1(3(5(2(x1)))))	→	1(1(5(3(3(2(x1))))))	(41)
1(5(0(5(0(x1)))))	→	0(1(5(3(5(1(0(x1)))))))	(42)
1(5(5(1(2(x1)))))	→	1(5(1(1(5(3(2(2(x1))))))))	(43)
5(0(2(0(5(x1)))))	→	5(0(3(3(2(0(5(x1)))))))	(44)
5(0(2(3(4(x1)))))	→	5(0(3(2(3(4(x1))))))	(45)
5(5(0(1(2(x1)))))	→	5(5(3(0(2(1(x1))))))	(46)
0(0(0(5(1(2(x1))))))	→	0(0(1(5(0(2(4(x1)))))))	(47)
0(0(1(2(4(1(x1))))))	→	1(3(0(2(3(0(4(1(x1))))))))	(48)
0(0(2(1(2(0(x1))))))	→	0(1(0(3(2(2(2(0(x1))))))))	(49)
0(0(2(3(0(5(x1))))))	→	0(0(3(0(3(2(5(x1)))))))	(50)
0(0(5(2(3(4(x1))))))	→	0(4(0(3(1(2(5(x1)))))))	(51)
0(0(5(5(3(4(x1))))))	→	1(4(1(0(0(3(5(5(x1))))))))	(52)
0(1(2(0(1(2(x1))))))	→	1(0(3(2(2(1(1(0(x1))))))))	(53)
0(1(2(2(0(5(x1))))))	→	0(4(1(5(0(3(2(2(x1))))))))	(54)
0(1(2(5(5(5(x1))))))	→	0(2(5(1(5(3(5(x1)))))))	(55)
0(1(3(1(5(2(x1))))))	→	1(0(1(5(3(3(2(x1)))))))	(56)
0(1(4(4(0(5(x1))))))	→	4(3(0(0(1(5(4(x1)))))))	(57)
0(2(5(3(5(1(x1))))))	→	0(3(3(2(2(1(5(5(x1))))))))	(58)
0(5(0(0(5(4(x1))))))	→	0(1(0(1(0(4(5(5(x1))))))))	(59)
0(5(1(2(1(4(x1))))))	→	1(1(5(3(2(2(0(4(x1))))))))	(60)
0(5(5(1(2(5(x1))))))	→	0(2(1(5(5(4(5(x1)))))))	(61)
1(0(0(2(3(4(x1))))))	→	1(4(0(0(3(3(2(x1)))))))	(62)
1(0(1(3(5(1(x1))))))	→	0(1(1(1(5(3(2(2(x1))))))))	(63)
1(0(5(4(2(1(x1))))))	→	0(1(1(5(3(4(2(x1)))))))	(64)
1(1(0(1(2(2(x1))))))	→	1(0(1(1(3(1(2(2(x1))))))))	(65)
1(2(1(2(0(0(x1))))))	→	0(3(2(2(1(0(1(x1)))))))	(66)
1(4(1(0(0(5(x1))))))	→	0(0(1(5(4(2(1(x1)))))))	(67)
1(4(3(5(0(2(x1))))))	→	0(3(3(2(1(5(4(x1)))))))	(68)
0(0(1(2(3(5(5(x1)))))))	→	5(1(5(0(3(0(2(1(x1))))))))	(69)
0(0(2(3(4(2(1(x1)))))))	→	0(0(4(1(3(2(3(2(x1))))))))	(70)
0(1(0(0(5(3(4(x1)))))))	→	0(3(0(5(0(4(3(1(x1))))))))	(71)
0(1(2(4(4(0(5(x1)))))))	→	5(4(0(1(0(3(2(4(x1))))))))	(72)
0(5(2(5(1(3(4(x1)))))))	→	1(4(5(2(0(3(1(5(x1))))))))	(73)
0(5(5(0(2(5(1(x1)))))))	→	5(3(0(0(1(5(2(5(x1))))))))	(74)
0(5(5(2(5(3(4(x1)))))))	→	0(3(2(1(4(5(5(5(x1))))))))	(75)
1(0(1(2(3(4(5(x1)))))))	→	3(0(2(1(5(1(3(4(x1))))))))	(76)
1(1(0(2(0(2(2(x1)))))))	→	1(1(0(2(0(3(2(2(x1))))))))	(77)
1(2(4(3(5(3(5(x1)))))))	→	5(1(3(2(2(4(3(5(x1))))))))	(78)
1(4(3(5(2(5(2(x1)))))))	→	5(1(3(2(2(1(5(4(x1))))))))	(79)

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by AProVE @ termCOMP 2023)

1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

There are 283 ruless (increase limit for explicit display).

1.1 Dependency Graph Processor

The dependency pairs are split into 1 component.

The 1^st component contains the pair

0^#(0(1(2(x1))))	→	1^#(0(2(x1)))	(81)
1^#(0(1(2(x1))))	→	0^#(2(x1))	(111)
0^#(2(5(3(5(1(x1))))))	→	1^#(5(5(x1)))	(269)
1^#(0(5(5(1(x1)))))	→	5^#(1(5(1(x1))))	(196)
5^#(0(0(2(x1))))	→	5^#(0(3(0(2(x1)))))	(140)
5^#(5(0(1(2(x1)))))	→	0^#(2(1(x1)))	(221)
0^#(2(5(3(5(1(x1))))))	→	5^#(5(x1))	(270)
5^#(5(0(1(2(x1)))))	→	1^#(x1)	(222)
1^#(2(0(5(x1))))	→	1^#(5(x1))	(122)
1^#(0(5(5(1(x1)))))	→	1^#(5(1(x1)))	(197)
1^#(5(0(5(0(x1)))))	→	5^#(1(0(x1)))	(208)
1^#(5(0(5(0(x1)))))	→	1^#(0(x1))	(209)
1^#(4(1(0(0(5(x1))))))	→	1^#(x1)	(311)
1^#(2(0(5(x1))))	→	1^#(x1)	(125)
1^#(2(1(2(0(0(x1))))))	→	1^#(0(1(x1)))	(304)
1^#(2(1(2(0(0(x1))))))	→	0^#(1(x1))	(305)
0^#(0(1(2(x1))))	→	0^#(2(x1))	(82)
0^#(2(5(3(5(1(x1))))))	→	5^#(x1)	(271)
0^#(1(2(4(x1))))	→	1^#(4(x1))	(86)
0^#(5(0(5(x1))))	→	0^#(5(5(x1)))	(88)
0^#(5(0(5(x1))))	→	5^#(5(x1))	(89)
0^#(5(1(2(x1))))	→	1^#(5(x1))	(96)
0^#(5(1(2(x1))))	→	5^#(x1)	(97)
0^#(1(2(5(0(x1)))))	→	0^#(0(1(5(x1))))	(154)
0^#(1(2(5(0(x1)))))	→	0^#(1(5(x1)))	(155)
0^#(1(2(5(0(x1)))))	→	1^#(5(x1))	(156)
0^#(1(2(5(0(x1)))))	→	5^#(x1)	(157)
0^#(5(0(5(1(x1)))))	→	0^#(1(0(3(5(5(x1))))))	(171)
0^#(5(0(5(1(x1)))))	→	1^#(0(3(5(5(x1)))))	(172)
0^#(5(0(5(1(x1)))))	→	5^#(5(x1))	(174)
0^#(5(0(5(1(x1)))))	→	5^#(x1)	(175)
0^#(0(0(5(1(2(x1))))))	→	0^#(0(1(5(0(2(4(x1)))))))	(223)
0^#(0(0(5(1(2(x1))))))	→	0^#(1(5(0(2(4(x1))))))	(224)
0^#(0(5(5(3(4(x1))))))	→	1^#(4(1(0(0(3(5(5(x1))))))))	(241)
0^#(0(5(5(3(4(x1))))))	→	1^#(0(0(3(5(5(x1))))))	(242)
0^#(0(5(5(3(4(x1))))))	→	0^#(0(3(5(5(x1)))))	(243)
0^#(0(5(5(3(4(x1))))))	→	5^#(5(x1))	(245)
0^#(0(5(5(3(4(x1))))))	→	5^#(x1)	(246)
0^#(1(2(0(1(2(x1))))))	→	1^#(1(0(x1)))	(249)
0^#(1(2(0(1(2(x1))))))	→	1^#(0(x1))	(250)
0^#(1(2(0(1(2(x1))))))	→	0^#(x1)	(251)
0^#(0(2(5(2(x1)))))	→	0^#(5(2(x1)))	(153)
0^#(5(2(4(1(x1)))))	→	5^#(1(x1))	(187)
0^#(5(2(5(1(3(4(x1)))))))	→	1^#(5(x1))	(336)
0^#(5(2(5(1(3(4(x1)))))))	→	5^#(x1)	(337)
0^#(4(2(0(5(x1)))))	→	1^#(5(x1))	(165)
0^#(0(5(2(3(4(x1))))))	→	1^#(2(5(x1)))	(239)
1^#(2(1(2(0(0(x1))))))	→	1^#(x1)	(306)
0^#(0(5(2(3(4(x1))))))	→	5^#(x1)	(240)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(1(0(4(5(5(x1))))))))	(272)
0^#(5(0(0(5(4(x1))))))	→	1^#(0(1(0(4(5(5(x1)))))))	(273)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(4(5(5(x1))))))	(274)
0^#(5(0(0(5(4(x1))))))	→	1^#(0(4(5(5(x1)))))	(275)
0^#(5(0(0(5(4(x1))))))	→	5^#(5(x1))	(277)
0^#(5(0(0(5(4(x1))))))	→	5^#(x1)	(278)
0^#(5(1(2(1(4(x1))))))	→	0^#(4(x1))	(282)
0^#(0(1(2(3(5(5(x1)))))))	→	5^#(1(5(0(3(0(2(1(x1))))))))	(315)
0^#(0(1(2(3(5(5(x1)))))))	→	1^#(5(0(3(0(2(1(x1)))))))	(316)
0^#(0(1(2(3(5(5(x1)))))))	→	5^#(0(3(0(2(1(x1))))))	(317)
0^#(0(1(2(3(5(5(x1)))))))	→	0^#(2(1(x1)))	(319)
0^#(0(1(2(3(5(5(x1)))))))	→	1^#(x1)	(320)
0^#(1(0(0(5(3(4(x1)))))))	→	1^#(x1)	(328)
0^#(5(5(0(2(5(1(x1)))))))	→	5^#(x1)	(343)
0^#(5(5(2(5(3(4(x1)))))))	→	1^#(4(5(5(5(x1)))))	(345)
0^#(5(5(2(5(3(4(x1)))))))	→	5^#(5(5(x1)))	(346)
0^#(5(5(2(5(3(4(x1)))))))	→	5^#(5(x1))	(347)
0^#(5(5(2(5(3(4(x1)))))))	→	5^#(x1)	(348)

1.1.1 Reduction Pair Processor

Using the linear polynomial interpretation over the naturals

[0^#(x₁)]	=	1 · x₁
[0(x₁)]	=	1 · x₁
[1(x₁)]	=	1 · x₁
[2(x₁)]	=	1 · x₁
[1^#(x₁)]	=	1 · x₁
[5(x₁)]	=	1 + 1 · x₁
[3(x₁)]	=	1 · x₁
[5^#(x₁)]	=	1 · x₁
[4(x₁)]	=	1 · x₁

the pairs

1^#(0(5(5(1(x1)))))	→	5^#(1(5(1(x1))))	(196)
5^#(5(0(1(2(x1)))))	→	0^#(2(1(x1)))	(221)
0^#(2(5(3(5(1(x1))))))	→	5^#(5(x1))	(270)
5^#(5(0(1(2(x1)))))	→	1^#(x1)	(222)
1^#(0(5(5(1(x1)))))	→	1^#(5(1(x1)))	(197)
1^#(5(0(5(0(x1)))))	→	5^#(1(0(x1)))	(208)
1^#(5(0(5(0(x1)))))	→	1^#(0(x1))	(209)
1^#(4(1(0(0(5(x1))))))	→	1^#(x1)	(311)
1^#(2(0(5(x1))))	→	1^#(x1)	(125)
0^#(2(5(3(5(1(x1))))))	→	5^#(x1)	(271)
0^#(5(0(5(x1))))	→	5^#(5(x1))	(89)
0^#(5(1(2(x1))))	→	5^#(x1)	(97)
0^#(1(2(5(0(x1)))))	→	5^#(x1)	(157)
0^#(5(0(5(1(x1)))))	→	5^#(5(x1))	(174)
0^#(5(0(5(1(x1)))))	→	5^#(x1)	(175)
0^#(0(5(5(3(4(x1))))))	→	5^#(5(x1))	(245)
0^#(0(5(5(3(4(x1))))))	→	5^#(x1)	(246)
0^#(5(2(4(1(x1)))))	→	5^#(1(x1))	(187)
0^#(5(2(5(1(3(4(x1)))))))	→	1^#(5(x1))	(336)
0^#(5(2(5(1(3(4(x1)))))))	→	5^#(x1)	(337)
0^#(0(5(2(3(4(x1))))))	→	5^#(x1)	(240)
0^#(5(0(0(5(4(x1))))))	→	5^#(5(x1))	(277)
0^#(5(0(0(5(4(x1))))))	→	5^#(x1)	(278)
0^#(5(1(2(1(4(x1))))))	→	0^#(4(x1))	(282)
0^#(0(1(2(3(5(5(x1)))))))	→	5^#(1(5(0(3(0(2(1(x1))))))))	(315)
0^#(0(1(2(3(5(5(x1)))))))	→	1^#(5(0(3(0(2(1(x1)))))))	(316)
0^#(0(1(2(3(5(5(x1)))))))	→	5^#(0(3(0(2(1(x1))))))	(317)
0^#(0(1(2(3(5(5(x1)))))))	→	0^#(2(1(x1)))	(319)
0^#(0(1(2(3(5(5(x1)))))))	→	1^#(x1)	(320)
0^#(1(0(0(5(3(4(x1)))))))	→	1^#(x1)	(328)
0^#(5(5(0(2(5(1(x1)))))))	→	5^#(x1)	(343)
0^#(5(5(2(5(3(4(x1)))))))	→	5^#(5(5(x1)))	(346)
0^#(5(5(2(5(3(4(x1)))))))	→	5^#(5(x1))	(347)
0^#(5(5(2(5(3(4(x1)))))))	→	5^#(x1)	(348)

could be deleted.

1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 3 components.

The 1^st component contains the pair

0^#(5(0(5(x1))))	→	0^#(5(5(x1)))	(88)
0^#(1(2(5(0(x1)))))	→	0^#(0(1(5(x1))))	(154)
0^#(1(2(5(0(x1)))))	→	0^#(1(5(x1)))	(155)
0^#(5(0(5(1(x1)))))	→	0^#(1(0(3(5(5(x1))))))	(171)
0^#(0(0(5(1(2(x1))))))	→	0^#(0(1(5(0(2(4(x1)))))))	(223)
0^#(0(0(5(1(2(x1))))))	→	0^#(1(5(0(2(4(x1))))))	(224)
0^#(0(5(5(3(4(x1))))))	→	0^#(0(3(5(5(x1)))))	(243)
0^#(1(2(0(1(2(x1))))))	→	0^#(x1)	(251)
0^#(0(5(2(3(4(x1))))))	→	1^#(2(5(x1)))	(239)
1^#(2(1(2(0(0(x1))))))	→	0^#(1(x1))	(305)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(1(0(4(5(5(x1))))))))	(272)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(4(5(5(x1))))))	(274)
1^#(2(1(2(0(0(x1))))))	→	1^#(x1)	(306)

1.1.1.1.1 Reduction Pair Processor with Usable Rules

Using the linear polynomial interpretation over the naturals

[0^#(x₁)]	=	0
[5(x₁)]	=	0
[0(x₁)]	=	1 + 1 · x₁
[1(x₁)]	=	1 · x₁
[2(x₁)]	=	1 · x₁
[3(x₁)]	=	0
[4(x₁)]	=	0
[1^#(x₁)]	=	1 · x₁

together with the usable rules

5(0(0(2(x1))))	→	5(0(3(0(2(x1)))))	(20)
5(0(1(2(x1))))	→	5(1(0(3(2(x1)))))	(21)
5(0(1(2(x1))))	→	5(1(0(3(2(3(x1))))))	(22)
5(0(2(0(5(x1)))))	→	5(0(3(3(2(0(5(x1)))))))	(44)
5(0(2(3(4(x1)))))	→	5(0(3(2(3(4(x1))))))	(45)
5(5(0(1(2(x1)))))	→	5(5(3(0(2(1(x1))))))	(46)

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

1^#(2(1(2(0(0(x1))))))	→	0^#(1(x1))	(305)
1^#(2(1(2(0(0(x1))))))	→	1^#(x1)	(306)

could be deleted.

1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 1 component.

The 1^st component contains the pair

0^#(1(2(5(0(x1)))))	→	0^#(0(1(5(x1))))	(154)
0^#(5(0(5(x1))))	→	0^#(5(5(x1)))	(88)
0^#(1(2(5(0(x1)))))	→	0^#(1(5(x1)))	(155)
0^#(5(0(5(1(x1)))))	→	0^#(1(0(3(5(5(x1))))))	(171)
0^#(0(0(5(1(2(x1))))))	→	0^#(0(1(5(0(2(4(x1)))))))	(223)
0^#(0(0(5(1(2(x1))))))	→	0^#(1(5(0(2(4(x1))))))	(224)
0^#(0(5(5(3(4(x1))))))	→	0^#(0(3(5(5(x1)))))	(243)
0^#(1(2(0(1(2(x1))))))	→	0^#(x1)	(251)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(1(0(4(5(5(x1))))))))	(272)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(4(5(5(x1))))))	(274)

1.1.1.1.1.1.1 Reduction Pair Processor

Using the linear polynomial interpretation over the naturals

[0^#(x₁)]	=	1 · x₁
[1(x₁)]	=	1 · x₁
[2(x₁)]	=	1 + 1 · x₁
[5(x₁)]	=	1 · x₁
[0(x₁)]	=	1 · x₁
[3(x₁)]	=	0
[4(x₁)]	=	0

the pairs

0^#(1(2(5(0(x1)))))	→	0^#(0(1(5(x1))))	(154)
0^#(1(2(5(0(x1)))))	→	0^#(1(5(x1)))	(155)
0^#(1(2(0(1(2(x1))))))	→	0^#(x1)	(251)

could be deleted.

1.1.1.1.1.1.1.1 Split

We split (P,R) into the relative DP-problem (PD,P-PD,RD,R-RD) and (P-PD,R-RD) where the pairs PD

0^#(0(0(5(1(2(x1))))))	→	0^#(1(5(0(2(4(x1))))))	(224)
0^#(0(0(5(1(2(x1))))))	→	0^#(0(1(5(0(2(4(x1)))))))	(223)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(4(5(5(x1))))))	(274)
0^#(5(0(0(5(4(x1))))))	→	0^#(1(0(1(0(4(5(5(x1))))))))	(272)
0^#(0(5(5(3(4(x1))))))	→	0^#(0(3(5(5(x1)))))	(243)

and the rules RD

There are no rules.

are deleted.

1.1.1.1.1.1.1.1.1 Semantic Labeling Processor

The following interpretations form a model of the rules.

As carrier we take the set {0,1}. Symbols are labeled by the interpretation of their arguments using the interpretations (modulo 2):

[5(x₁)]	=	0
[0^#(x₁)]	=	0
[0(x₁)]	=	0
[1(x₁)]	=	0
[2(x₁)]	=	1
[3(x₁)]	=	0
[4(x₁)]	=	0

We obtain the set of labeled pairs

0^#₀(5₀(0₀(5₀(x1))))	→	0^#₀(5₀(5₀(x1)))	(363)
0^#₀(5₀(0₀(5₀(1₀(x1)))))	→	0^#₀(1₀(0₀(3₀(5₀(5₀(x1))))))	(364)
0^#₀(5₀(0₀(5₀(1₁(x1)))))	→	0^#₀(1₀(0₀(3₀(5₀(5₁(x1))))))	(365)
0^#₀(5₀(0₀(5₁(x1))))	→	0^#₀(5₀(5₁(x1)))	(366)
0^#₀(0₀(0₀(5₀(1₁(2₀(x1))))))	→	0^#₀(0₀(1₀(5₀(0₁(2₀(4₀(x1)))))))	(367)
0^#₀(0₀(0₀(5₀(1₁(2₁(x1))))))	→	0^#₀(0₀(1₀(5₀(0₁(2₀(4₁(x1)))))))	(368)
0^#₀(0₀(0₀(5₀(1₁(2₀(x1))))))	→	0^#₀(1₀(5₀(0₁(2₀(4₀(x1))))))	(369)
0^#₀(0₀(0₀(5₀(1₁(2₁(x1))))))	→	0^#₀(1₀(5₀(0₁(2₀(4₁(x1))))))	(370)
0^#₀(0₀(5₀(5₀(3₀(4₀(x1))))))	→	0^#₀(0₀(3₀(5₀(5₀(x1)))))	(371)
0^#₀(0₀(5₀(5₀(3₀(4₁(x1))))))	→	0^#₀(0₀(3₀(5₀(5₁(x1)))))	(372)
0^#₀(5₀(0₀(0₀(5₀(4₀(x1))))))	→	0^#₀(1₀(0₀(1₀(0₀(4₀(5₀(5₀(x1))))))))	(373)
0^#₀(5₀(0₀(0₀(5₀(4₁(x1))))))	→	0^#₀(1₀(0₀(1₀(0₀(4₀(5₀(5₁(x1))))))))	(374)
0^#₀(5₀(0₀(0₀(5₀(4₀(x1))))))	→	0^#₀(1₀(0₀(4₀(5₀(5₀(x1))))))	(375)
0^#₀(5₀(0₀(0₀(5₀(4₁(x1))))))	→	0^#₀(1₀(0₀(4₀(5₀(5₁(x1))))))	(376)

and the set of labeled rules:

There are 158 ruless (increase limit for explicit display).

1.1.1.1.1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 1 component.

The 1^st component contains the pair

0^#₀(5₀(0₀(5₀(1₀(x1)))))	→	0^#₀(1₀(0₀(3₀(5₀(5₀(x1))))))	(364)
0^#₀(5₀(0₀(5₀(x1))))	→	0^#₀(5₀(5₀(x1)))	(363)
0^#₀(0₀(0₀(5₀(1₁(2₀(x1))))))	→	0^#₀(0₀(1₀(5₀(0₁(2₀(4₀(x1)))))))	(367)
0^#₀(0₀(0₀(5₀(1₁(2₀(x1))))))	→	0^#₀(1₀(5₀(0₁(2₀(4₀(x1))))))	(369)
0^#₀(0₀(5₀(5₀(3₀(4₀(x1))))))	→	0^#₀(0₀(3₀(5₀(5₀(x1)))))	(371)

1.1.1.1.1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

Using the linear polynomial interpretation over the naturals

[0^#₀(x₁)]	=	1 · x₁
[5₀(x₁)]	=	1 · x₁
[0₀(x₁)]	=	1 · x₁
[1₀(x₁)]	=	0
[3₀(x₁)]	=	0
[1₁(x₁)]	=	1 + 1 · x₁
[2₀(x₁)]	=	1
[0₁(x₁)]	=	0
[4₀(x₁)]	=	0
[2₁(x₁)]	=	1
[3₁(x₁)]	=	0
[5₁(x₁)]	=	0
[4₁(x₁)]	=	1 + 1 · x₁

together with the usable rules

There are 155 ruless (increase limit for explicit display).

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

0^#₀(0₀(0₀(5₀(1₁(2₀(x1))))))	→	0^#₀(0₀(1₀(5₀(0₁(2₀(4₀(x1)))))))	(367)
0^#₀(0₀(0₀(5₀(1₁(2₀(x1))))))	→	0^#₀(1₀(5₀(0₁(2₀(4₀(x1))))))	(369)

could be deleted.

1.1.1.1.1.1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

Using the linear polynomial interpretation over the naturals

[0^#₀(x₁)]	=	1 · x₁
[5₀(x₁)]	=	1
[0₀(x₁)]	=	1 · x₁
[1₀(x₁)]	=	1
[3₀(x₁)]	=	0
[4₀(x₁)]	=	0
[0₁(x₁)]	=	1
[2₀(x₁)]	=	0
[2₁(x₁)]	=	0
[1₁(x₁)]	=	1
[3₁(x₁)]	=	0
[5₁(x₁)]	=	1
[4₁(x₁)]	=	1

together with the usable rules

There are 155 ruless (increase limit for explicit display).

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

0^#₀(0₀(5₀(5₀(3₀(4₀(x1))))))

→

0^#₀(0₀(3₀(5₀(5₀(x1)))))

(371)

could be deleted.

1.1.1.1.1.1.1.1.1.1.1.1.1 P is empty

There are no pairs anymore.

1.1.1.1.1.1.1.1.2 Reduction Pair Processor with Usable Rules

Using the linear polynomial interpretation over the naturals

[0^#(x₁)]	=	1 · x₁
[5(x₁)]	=	1
[0(x₁)]	=	0
[1(x₁)]	=	1 · x₁
[3(x₁)]	=	1 · x₁
[2(x₁)]	=	1
[4(x₁)]	=	1 · x₁

together with the usable rules

5(0(0(2(x1))))	→	5(0(3(0(2(x1)))))	(20)
5(0(1(2(x1))))	→	5(1(0(3(2(x1)))))	(21)
5(0(1(2(x1))))	→	5(1(0(3(2(3(x1))))))	(22)
5(0(2(0(5(x1)))))	→	5(0(3(3(2(0(5(x1)))))))	(44)
5(0(2(3(4(x1)))))	→	5(0(3(2(3(4(x1))))))	(45)
5(5(0(1(2(x1)))))	→	5(5(3(0(2(1(x1))))))	(46)
0(3(5(2(2(x1)))))	→	0(4(5(3(2(2(x1))))))	(27)
1(0(0(5(x1))))	→	1(1(0(0(1(5(4(x1)))))))	(10)
1(0(1(2(x1))))	→	1(1(3(0(2(x1)))))	(11)
1(0(1(2(x1))))	→	1(1(0(3(2(2(x1))))))	(12)
1(0(1(2(x1))))	→	1(1(0(3(2(3(x1))))))	(13)
1(0(5(4(x1))))	→	0(1(1(5(4(x1)))))	(14)
1(2(0(5(x1))))	→	0(3(2(3(1(5(x1))))))	(15)
1(2(0(5(x1))))	→	5(0(3(3(2(1(x1))))))	(16)
1(5(0(2(x1))))	→	1(1(0(1(1(5(2(x1)))))))	(17)
1(5(1(2(x1))))	→	0(1(1(5(2(x1)))))	(18)
1(5(1(2(x1))))	→	1(0(1(5(3(2(x1))))))	(19)
1(0(5(5(1(x1)))))	→	0(4(5(1(5(1(x1))))))	(38)
1(1(2(2(0(x1)))))	→	1(1(3(2(2(0(x1))))))	(39)
1(1(2(3(4(x1)))))	→	1(1(3(2(2(4(x1))))))	(40)
1(1(3(5(2(x1)))))	→	1(1(5(3(3(2(x1))))))	(41)
1(5(0(5(0(x1)))))	→	0(1(5(3(5(1(0(x1)))))))	(42)
1(5(5(1(2(x1)))))	→	1(5(1(1(5(3(2(2(x1))))))))	(43)
1(0(0(2(3(4(x1))))))	→	1(4(0(0(3(3(2(x1)))))))	(62)
1(0(1(3(5(1(x1))))))	→	0(1(1(1(5(3(2(2(x1))))))))	(63)
1(0(5(4(2(1(x1))))))	→	0(1(1(5(3(4(2(x1)))))))	(64)
1(1(0(1(2(2(x1))))))	→	1(0(1(1(3(1(2(2(x1))))))))	(65)
1(2(1(2(0(0(x1))))))	→	0(3(2(2(1(0(1(x1)))))))	(66)
1(4(1(0(0(5(x1))))))	→	0(0(1(5(4(2(1(x1)))))))	(67)
1(4(3(5(0(2(x1))))))	→	0(3(3(2(1(5(4(x1)))))))	(68)
1(0(1(2(3(4(5(x1)))))))	→	3(0(2(1(5(1(3(4(x1))))))))	(76)
1(1(0(2(0(2(2(x1)))))))	→	1(1(0(2(0(3(2(2(x1))))))))	(77)
1(2(4(3(5(3(5(x1)))))))	→	5(1(3(2(2(4(3(5(x1))))))))	(78)
1(4(3(5(2(5(2(x1)))))))	→	5(1(3(2(2(1(5(4(x1))))))))	(79)
0(2(5(3(5(1(x1))))))	→	0(3(3(2(2(1(5(5(x1))))))))	(58)
0(4(2(0(5(x1)))))	→	0(4(0(3(2(1(5(x1)))))))	(28)
0(4(2(5(2(x1)))))	→	0(5(4(3(3(2(2(x1)))))))	(29)

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

0^#(5(0(5(1(x1)))))

→

0^#(1(0(3(5(5(x1))))))

(171)

could be deleted.

1.1.1.1.1.1.1.1.2.1 Reduction Pair Processor with Usable Rules

Using the linear polynomial interpretation over the naturals

[0^#(x₁)]	=	1 · x₁
[5(x₁)]	=	1 + 1 · x₁
[0(x₁)]	=	1 + 1 · x₁
[2(x₁)]	=	1 · x₁
[3(x₁)]	=	1
[1(x₁)]	=	0
[4(x₁)]	=	0

together with the usable rules

5(0(0(2(x1))))	→	5(0(3(0(2(x1)))))	(20)
5(0(1(2(x1))))	→	5(1(0(3(2(x1)))))	(21)
5(0(1(2(x1))))	→	5(1(0(3(2(3(x1))))))	(22)
5(0(2(0(5(x1)))))	→	5(0(3(3(2(0(5(x1)))))))	(44)
5(0(2(3(4(x1)))))	→	5(0(3(2(3(4(x1))))))	(45)
5(5(0(1(2(x1)))))	→	5(5(3(0(2(1(x1))))))	(46)
0(3(5(2(2(x1)))))	→	0(4(5(3(2(2(x1))))))	(27)

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

0^#(5(0(5(x1))))

→

0^#(5(5(x1)))

(88)

could be deleted.

1.1.1.1.1.1.1.1.2.1.1 P is empty

There are no pairs anymore.

The 2^nd component contains the pair

0^#(2(5(3(5(1(x1))))))	→	1^#(5(5(x1)))	(269)
1^#(0(1(2(x1))))	→	0^#(2(x1))	(111)

1.1.1.1.2 Reduction Pair Processor with Usable Rules

Using the linear polynomial interpretation over the naturals

[0^#(x₁)]	=	1
[2(x₁)]	=	0
[5(x₁)]	=	0
[3(x₁)]	=	0
[1(x₁)]	=	1
[1^#(x₁)]	=	1 · x₁
[0(x₁)]	=	1 + 1 · x₁
[4(x₁)]	=	0

together with the usable rules

5(0(0(2(x1))))	→	5(0(3(0(2(x1)))))	(20)
5(0(1(2(x1))))	→	5(1(0(3(2(x1)))))	(21)
5(0(1(2(x1))))	→	5(1(0(3(2(3(x1))))))	(22)
5(0(2(0(5(x1)))))	→	5(0(3(3(2(0(5(x1)))))))	(44)
5(0(2(3(4(x1)))))	→	5(0(3(2(3(4(x1))))))	(45)
5(5(0(1(2(x1)))))	→	5(5(3(0(2(1(x1))))))	(46)

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

0^#(2(5(3(5(1(x1))))))	→	1^#(5(5(x1)))	(269)
1^#(0(1(2(x1))))	→	0^#(2(x1))	(111)

could be deleted.

1.1.1.1.2.1 P is empty

There are no pairs anymore.

The 3^rd component contains the pair
5^#(0(0(2(x1)))) → 5^#(0(3(0(2(x1))))) (140)

1.1.1.1.3 Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the naturals

[5^#(x₁)] = 1 · x₁

[0(x₁)] = 1 + 1 · x₁

[2(x₁)] = 0

[3(x₁)] = 0

[5(x₁)] = 0

[1(x₁)] = 0

[4(x₁)] = 0

together with the usable rule
0(3(5(2(2(x1))))) → 0(4(5(3(2(2(x1)))))) (27)
(w.r.t. the implicit argument filter of the reduction pair), the pair
5^#(0(0(2(x1)))) → 5^#(0(3(0(2(x1))))) (140)
could be deleted.
1.1.1.1.3.1 P is empty

There are no pairs anymore.

Certification Problem

Input (TPDB SRS_Standard/ICFP_2010/41843)

Property / Task

Answer / Result

Proof (by AProVE @ termCOMP 2023)

1 Dependency Pair Transformation

1.1 Dependency Graph Processor

1.1.1 Reduction Pair Processor

1.1.1.1 Dependency Graph Processor

1.1.1.1.1 Reduction Pair Processor with Usable Rules

1.1.1.1.1.1 Dependency Graph Processor

1.1.1.1.1.1.1 Reduction Pair Processor

1.1.1.1.1.1.1.1 Split

1.1.1.1.1.1.1.1.1 Semantic Labeling Processor

1.1.1.1.1.1.1.1.1.1 Dependency Graph Processor

1.1.1.1.1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

1.1.1.1.1.1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

1.1.1.1.1.1.1.1.1.1.1.1.1 P is empty

1.1.1.1.1.1.1.1.2 Reduction Pair Processor with Usable Rules

1.1.1.1.1.1.1.1.2.1 Reduction Pair Processor with Usable Rules

1.1.1.1.1.1.1.1.2.1.1 P is empty

1.1.1.1.2 Reduction Pair Processor with Usable Rules

1.1.1.1.2.1 P is empty

1.1.1.1.3 Reduction Pair Processor with Usable Rules

1.1.1.1.3.1 P is empty