Certification Problem

Input (TPDB SRS_Relative/Waldmann_19/random-202)

The rewrite relation of the following TRS is considered.

a(a(a(x1)))	→	b(b(c(x1)))	(1)
b(b(b(x1)))	→	c(c(b(x1)))	(2)
a(c(a(x1)))	→	b(c(b(x1)))	(3)
b(c(b(x1)))	→	a(c(c(x1)))	(4)
c(c(a(x1)))	→	b(b(a(x1)))	(5)
c(a(a(x1)))	→	b(b(c(x1)))	(6)

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by matchbox @ termCOMP 2023)

1 Closure Under Flat Contexts

Using the flat contexts

{c(☐), b(☐), a(☐)}

We obtain the transformed TRS

c(a(a(a(x1))))	→	c(b(b(c(x1))))	(7)
c(b(b(b(x1))))	→	c(c(c(b(x1))))	(8)
c(a(c(a(x1))))	→	c(b(c(b(x1))))	(9)
c(b(c(b(x1))))	→	c(a(c(c(x1))))	(10)
c(c(c(a(x1))))	→	c(b(b(a(x1))))	(11)
c(c(a(a(x1))))	→	c(b(b(c(x1))))	(12)
b(a(a(a(x1))))	→	b(b(b(c(x1))))	(13)
b(b(b(b(x1))))	→	b(c(c(b(x1))))	(14)
b(a(c(a(x1))))	→	b(b(c(b(x1))))	(15)
b(b(c(b(x1))))	→	b(a(c(c(x1))))	(16)
b(c(c(a(x1))))	→	b(b(b(a(x1))))	(17)
b(c(a(a(x1))))	→	b(b(b(c(x1))))	(18)
a(a(a(a(x1))))	→	a(b(b(c(x1))))	(19)
a(b(b(b(x1))))	→	a(c(c(b(x1))))	(20)
a(a(c(a(x1))))	→	a(b(c(b(x1))))	(21)
a(b(c(b(x1))))	→	a(a(c(c(x1))))	(22)
a(c(c(a(x1))))	→	a(b(b(a(x1))))	(23)
a(c(a(a(x1))))	→	a(b(b(c(x1))))	(24)

1.1 Semantic Labeling

The following interpretations form a model of the rules.

As carrier we take the set {0,1,2}. Symbols are labeled by the interpretation of their arguments using the interpretations (modulo 3):

[c(x₁)]	=	3x₁ + 0
[b(x₁)]	=	3x₁ + 1
[a(x₁)]	=	3x₁ + 2

We obtain the labeled TRS

a₂(a₂(a₂(a₂(x1))))	→	a₁(b₁(b₀(c₂(x1))))	(25)
a₂(a₂(a₂(a₁(x1))))	→	a₁(b₁(b₀(c₁(x1))))	(26)
a₂(a₂(a₂(a₀(x1))))	→	a₁(b₁(b₀(c₀(x1))))	(27)
b₂(a₂(a₂(a₂(x1))))	→	b₁(b₁(b₀(c₂(x1))))	(28)
b₂(a₂(a₂(a₁(x1))))	→	b₁(b₁(b₀(c₁(x1))))	(29)
b₂(a₂(a₂(a₀(x1))))	→	b₁(b₁(b₀(c₀(x1))))	(30)
c₂(a₂(a₂(a₂(x1))))	→	c₁(b₁(b₀(c₂(x1))))	(31)
c₂(a₂(a₂(a₁(x1))))	→	c₁(b₁(b₀(c₁(x1))))	(32)
c₂(a₂(a₂(a₀(x1))))	→	c₁(b₁(b₀(c₀(x1))))	(33)
a₁(b₁(b₁(b₂(x1))))	→	a₀(c₀(c₁(b₂(x1))))	(34)
a₁(b₁(b₁(b₁(x1))))	→	a₀(c₀(c₁(b₁(x1))))	(35)
a₁(b₁(b₁(b₀(x1))))	→	a₀(c₀(c₁(b₀(x1))))	(36)
b₁(b₁(b₁(b₂(x1))))	→	b₀(c₀(c₁(b₂(x1))))	(37)
b₁(b₁(b₁(b₁(x1))))	→	b₀(c₀(c₁(b₁(x1))))	(38)
b₁(b₁(b₁(b₀(x1))))	→	b₀(c₀(c₁(b₀(x1))))	(39)
c₁(b₁(b₁(b₂(x1))))	→	c₀(c₀(c₁(b₂(x1))))	(40)
c₁(b₁(b₁(b₁(x1))))	→	c₀(c₀(c₁(b₁(x1))))	(41)
c₁(b₁(b₁(b₀(x1))))	→	c₀(c₀(c₁(b₀(x1))))	(42)
a₂(a₀(c₂(a₂(x1))))	→	a₁(b₀(c₁(b₂(x1))))	(43)
a₂(a₀(c₂(a₁(x1))))	→	a₁(b₀(c₁(b₁(x1))))	(44)
a₂(a₀(c₂(a₀(x1))))	→	a₁(b₀(c₁(b₀(x1))))	(45)
b₂(a₀(c₂(a₂(x1))))	→	b₁(b₀(c₁(b₂(x1))))	(46)
b₂(a₀(c₂(a₁(x1))))	→	b₁(b₀(c₁(b₁(x1))))	(47)
b₂(a₀(c₂(a₀(x1))))	→	b₁(b₀(c₁(b₀(x1))))	(48)
c₂(a₀(c₂(a₂(x1))))	→	c₁(b₀(c₁(b₂(x1))))	(49)
c₂(a₀(c₂(a₁(x1))))	→	c₁(b₀(c₁(b₁(x1))))	(50)
c₂(a₀(c₂(a₀(x1))))	→	c₁(b₀(c₁(b₀(x1))))	(51)
a₁(b₀(c₁(b₂(x1))))	→	a₂(a₀(c₀(c₂(x1))))	(52)
a₁(b₀(c₁(b₁(x1))))	→	a₂(a₀(c₀(c₁(x1))))	(53)
a₁(b₀(c₁(b₀(x1))))	→	a₂(a₀(c₀(c₀(x1))))	(54)
b₁(b₀(c₁(b₂(x1))))	→	b₂(a₀(c₀(c₂(x1))))	(55)
b₁(b₀(c₁(b₁(x1))))	→	b₂(a₀(c₀(c₁(x1))))	(56)
b₁(b₀(c₁(b₀(x1))))	→	b₂(a₀(c₀(c₀(x1))))	(57)
c₁(b₀(c₁(b₂(x1))))	→	c₂(a₀(c₀(c₂(x1))))	(58)
c₁(b₀(c₁(b₁(x1))))	→	c₂(a₀(c₀(c₁(x1))))	(59)
c₁(b₀(c₁(b₀(x1))))	→	c₂(a₀(c₀(c₀(x1))))	(60)
a₀(c₀(c₂(a₂(x1))))	→	a₁(b₁(b₂(a₂(x1))))	(61)
a₀(c₀(c₂(a₁(x1))))	→	a₁(b₁(b₂(a₁(x1))))	(62)
a₀(c₀(c₂(a₀(x1))))	→	a₁(b₁(b₂(a₀(x1))))	(63)
b₀(c₀(c₂(a₂(x1))))	→	b₁(b₁(b₂(a₂(x1))))	(64)
b₀(c₀(c₂(a₁(x1))))	→	b₁(b₁(b₂(a₁(x1))))	(65)
b₀(c₀(c₂(a₀(x1))))	→	b₁(b₁(b₂(a₀(x1))))	(66)
c₀(c₀(c₂(a₂(x1))))	→	c₁(b₁(b₂(a₂(x1))))	(67)
c₀(c₀(c₂(a₁(x1))))	→	c₁(b₁(b₂(a₁(x1))))	(68)
c₀(c₀(c₂(a₀(x1))))	→	c₁(b₁(b₂(a₀(x1))))	(69)
a₀(c₂(a₂(a₂(x1))))	→	a₁(b₁(b₀(c₂(x1))))	(70)
a₀(c₂(a₂(a₁(x1))))	→	a₁(b₁(b₀(c₁(x1))))	(71)
a₀(c₂(a₂(a₀(x1))))	→	a₁(b₁(b₀(c₀(x1))))	(72)
b₀(c₂(a₂(a₂(x1))))	→	b₁(b₁(b₀(c₂(x1))))	(73)
b₀(c₂(a₂(a₁(x1))))	→	b₁(b₁(b₀(c₁(x1))))	(74)
b₀(c₂(a₂(a₀(x1))))	→	b₁(b₁(b₀(c₀(x1))))	(75)
c₀(c₂(a₂(a₂(x1))))	→	c₁(b₁(b₀(c₂(x1))))	(76)
c₀(c₂(a₂(a₁(x1))))	→	c₁(b₁(b₀(c₁(x1))))	(77)
c₀(c₂(a₂(a₀(x1))))	→	c₁(b₁(b₀(c₀(x1))))	(78)

1.1.1 String Reversal

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

a₂(a₂(a₂(a₂(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(79)
a₁(a₂(a₂(a₂(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(80)
a₀(a₂(a₂(a₂(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(81)
a₂(a₂(a₂(b₂(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(82)
a₁(a₂(a₂(b₂(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(83)
a₀(a₂(a₂(b₂(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(84)
a₂(a₂(a₂(c₂(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(85)
a₁(a₂(a₂(c₂(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(86)
a₀(a₂(a₂(c₂(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(87)
b₂(b₁(b₁(a₁(x1))))	→	b₂(c₁(c₀(a₀(x1))))	(88)
b₁(b₁(b₁(a₁(x1))))	→	b₁(c₁(c₀(a₀(x1))))	(89)
b₀(b₁(b₁(a₁(x1))))	→	b₀(c₁(c₀(a₀(x1))))	(90)
b₂(b₁(b₁(b₁(x1))))	→	b₂(c₁(c₀(b₀(x1))))	(91)
b₁(b₁(b₁(b₁(x1))))	→	b₁(c₁(c₀(b₀(x1))))	(92)
b₀(b₁(b₁(b₁(x1))))	→	b₀(c₁(c₀(b₀(x1))))	(93)
b₂(b₁(b₁(c₁(x1))))	→	b₂(c₁(c₀(c₀(x1))))	(94)
b₁(b₁(b₁(c₁(x1))))	→	b₁(c₁(c₀(c₀(x1))))	(95)
b₀(b₁(b₁(c₁(x1))))	→	b₀(c₁(c₀(c₀(x1))))	(96)
a₂(c₂(a₀(a₂(x1))))	→	b₂(c₁(b₀(a₁(x1))))	(97)
a₁(c₂(a₀(a₂(x1))))	→	b₁(c₁(b₀(a₁(x1))))	(98)
a₀(c₂(a₀(a₂(x1))))	→	b₀(c₁(b₀(a₁(x1))))	(99)
a₂(c₂(a₀(b₂(x1))))	→	b₂(c₁(b₀(b₁(x1))))	(100)
a₁(c₂(a₀(b₂(x1))))	→	b₁(c₁(b₀(b₁(x1))))	(101)
a₀(c₂(a₀(b₂(x1))))	→	b₀(c₁(b₀(b₁(x1))))	(102)
a₂(c₂(a₀(c₂(x1))))	→	b₂(c₁(b₀(c₁(x1))))	(103)
a₁(c₂(a₀(c₂(x1))))	→	b₁(c₁(b₀(c₁(x1))))	(104)
a₀(c₂(a₀(c₂(x1))))	→	b₀(c₁(b₀(c₁(x1))))	(105)
b₂(c₁(b₀(a₁(x1))))	→	c₂(c₀(a₀(a₂(x1))))	(106)
b₁(c₁(b₀(a₁(x1))))	→	c₁(c₀(a₀(a₂(x1))))	(107)
b₀(c₁(b₀(a₁(x1))))	→	c₀(c₀(a₀(a₂(x1))))	(108)
b₂(c₁(b₀(b₁(x1))))	→	c₂(c₀(a₀(b₂(x1))))	(109)
b₁(c₁(b₀(b₁(x1))))	→	c₁(c₀(a₀(b₂(x1))))	(110)
b₀(c₁(b₀(b₁(x1))))	→	c₀(c₀(a₀(b₂(x1))))	(111)
b₂(c₁(b₀(c₁(x1))))	→	c₂(c₀(a₀(c₂(x1))))	(112)
b₁(c₁(b₀(c₁(x1))))	→	c₁(c₀(a₀(c₂(x1))))	(113)
b₀(c₁(b₀(c₁(x1))))	→	c₀(c₀(a₀(c₂(x1))))	(114)
a₂(c₂(c₀(a₀(x1))))	→	a₂(b₂(b₁(a₁(x1))))	(115)
a₁(c₂(c₀(a₀(x1))))	→	a₁(b₂(b₁(a₁(x1))))	(116)
a₀(c₂(c₀(a₀(x1))))	→	a₀(b₂(b₁(a₁(x1))))	(117)
a₂(c₂(c₀(b₀(x1))))	→	a₂(b₂(b₁(b₁(x1))))	(118)
a₁(c₂(c₀(b₀(x1))))	→	a₁(b₂(b₁(b₁(x1))))	(119)
a₀(c₂(c₀(b₀(x1))))	→	a₀(b₂(b₁(b₁(x1))))	(120)
a₂(c₂(c₀(c₀(x1))))	→	a₂(b₂(b₁(c₁(x1))))	(121)
a₁(c₂(c₀(c₀(x1))))	→	a₁(b₂(b₁(c₁(x1))))	(122)
a₀(c₂(c₀(c₀(x1))))	→	a₀(b₂(b₁(c₁(x1))))	(123)
a₂(a₂(c₂(a₀(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(124)
a₁(a₂(c₂(a₀(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(125)
a₀(a₂(c₂(a₀(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(126)
a₂(a₂(c₂(b₀(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(127)
a₁(a₂(c₂(b₀(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(128)
a₀(a₂(c₂(b₀(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(129)
a₂(a₂(c₂(c₀(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(130)
a₁(a₂(c₂(c₀(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(131)
a₀(a₂(c₂(c₀(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(132)

1.1.1.1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

There are 135 ruless (increase limit for explicit display).

1.1.1.1.1 Monotonic Reduction Pair Processor with Usable Rules

Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1

[c₀(x₁)]

x₁ +

[c₁(x₁)]

x₁ +

[c₂(x₁)]

x₁ +

[b₀(x₁)]

x₁ +

[b₁(x₁)]

x₁ +

[b₂(x₁)]

x₁ +

[a₀(x₁)]

x₁ +

[a₁(x₁)]

x₁ +

[a₂(x₁)]

x₁ +

[b₀^#(x₁)]

x₁ +

[b₁^#(x₁)]

x₁ +

[b₂^#(x₁)]

x₁ +

[a₀^#(x₁)]

x₁ +

[a₁^#(x₁)]

x₁ +

[a₂^#(x₁)]

x₁ +

together with the usable rules

a₂(a₂(a₂(a₂(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(79)
a₁(a₂(a₂(a₂(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(80)
a₀(a₂(a₂(a₂(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(81)
a₂(a₂(a₂(b₂(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(82)
a₁(a₂(a₂(b₂(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(83)
a₀(a₂(a₂(b₂(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(84)
a₂(a₂(a₂(c₂(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(85)
a₁(a₂(a₂(c₂(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(86)
a₀(a₂(a₂(c₂(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(87)
b₂(b₁(b₁(a₁(x1))))	→	b₂(c₁(c₀(a₀(x1))))	(88)
b₁(b₁(b₁(a₁(x1))))	→	b₁(c₁(c₀(a₀(x1))))	(89)
b₀(b₁(b₁(a₁(x1))))	→	b₀(c₁(c₀(a₀(x1))))	(90)
b₂(b₁(b₁(b₁(x1))))	→	b₂(c₁(c₀(b₀(x1))))	(91)
b₁(b₁(b₁(b₁(x1))))	→	b₁(c₁(c₀(b₀(x1))))	(92)
b₀(b₁(b₁(b₁(x1))))	→	b₀(c₁(c₀(b₀(x1))))	(93)
b₂(b₁(b₁(c₁(x1))))	→	b₂(c₁(c₀(c₀(x1))))	(94)
b₁(b₁(b₁(c₁(x1))))	→	b₁(c₁(c₀(c₀(x1))))	(95)
b₀(b₁(b₁(c₁(x1))))	→	b₀(c₁(c₀(c₀(x1))))	(96)
a₂(c₂(a₀(a₂(x1))))	→	b₂(c₁(b₀(a₁(x1))))	(97)
a₁(c₂(a₀(a₂(x1))))	→	b₁(c₁(b₀(a₁(x1))))	(98)
a₀(c₂(a₀(a₂(x1))))	→	b₀(c₁(b₀(a₁(x1))))	(99)
a₂(c₂(a₀(b₂(x1))))	→	b₂(c₁(b₀(b₁(x1))))	(100)
a₁(c₂(a₀(b₂(x1))))	→	b₁(c₁(b₀(b₁(x1))))	(101)
a₀(c₂(a₀(b₂(x1))))	→	b₀(c₁(b₀(b₁(x1))))	(102)
a₂(c₂(a₀(c₂(x1))))	→	b₂(c₁(b₀(c₁(x1))))	(103)
a₁(c₂(a₀(c₂(x1))))	→	b₁(c₁(b₀(c₁(x1))))	(104)
a₀(c₂(a₀(c₂(x1))))	→	b₀(c₁(b₀(c₁(x1))))	(105)
b₂(c₁(b₀(a₁(x1))))	→	c₂(c₀(a₀(a₂(x1))))	(106)
b₁(c₁(b₀(a₁(x1))))	→	c₁(c₀(a₀(a₂(x1))))	(107)
b₀(c₁(b₀(a₁(x1))))	→	c₀(c₀(a₀(a₂(x1))))	(108)
b₂(c₁(b₀(b₁(x1))))	→	c₂(c₀(a₀(b₂(x1))))	(109)
b₁(c₁(b₀(b₁(x1))))	→	c₁(c₀(a₀(b₂(x1))))	(110)
b₀(c₁(b₀(b₁(x1))))	→	c₀(c₀(a₀(b₂(x1))))	(111)
b₂(c₁(b₀(c₁(x1))))	→	c₂(c₀(a₀(c₂(x1))))	(112)
b₁(c₁(b₀(c₁(x1))))	→	c₁(c₀(a₀(c₂(x1))))	(113)
b₀(c₁(b₀(c₁(x1))))	→	c₀(c₀(a₀(c₂(x1))))	(114)
a₂(c₂(c₀(a₀(x1))))	→	a₂(b₂(b₁(a₁(x1))))	(115)
a₁(c₂(c₀(a₀(x1))))	→	a₁(b₂(b₁(a₁(x1))))	(116)
a₀(c₂(c₀(a₀(x1))))	→	a₀(b₂(b₁(a₁(x1))))	(117)
a₂(c₂(c₀(b₀(x1))))	→	a₂(b₂(b₁(b₁(x1))))	(118)
a₁(c₂(c₀(b₀(x1))))	→	a₁(b₂(b₁(b₁(x1))))	(119)
a₀(c₂(c₀(b₀(x1))))	→	a₀(b₂(b₁(b₁(x1))))	(120)
a₂(c₂(c₀(c₀(x1))))	→	a₂(b₂(b₁(c₁(x1))))	(121)
a₁(c₂(c₀(c₀(x1))))	→	a₁(b₂(b₁(c₁(x1))))	(122)
a₀(c₂(c₀(c₀(x1))))	→	a₀(b₂(b₁(c₁(x1))))	(123)
a₂(a₂(c₂(a₀(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(124)
a₁(a₂(c₂(a₀(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(125)
a₀(a₂(c₂(a₀(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(126)
a₂(a₂(c₂(b₀(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(127)
a₁(a₂(c₂(b₀(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(128)
a₀(a₂(c₂(b₀(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(129)
a₂(a₂(c₂(c₀(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(130)
a₁(a₂(c₂(c₀(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(131)
a₀(a₂(c₂(c₀(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(132)

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

There are 117 ruless (increase limit for explicit display).

and no rules could be deleted.

1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 3 components.

The 1^st component contains the pair

a₀^#(c₂(c₀(c₀(x1))))	→	a₀^#(b₂(b₁(c₁(x1))))	(165)
a₀^#(c₂(c₀(b₀(x1))))	→	a₀^#(b₂(b₁(b₁(x1))))	(169)
a₀^#(c₂(c₀(a₀(x1))))	→	a₀^#(b₂(b₁(a₁(x1))))	(172)

1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

[c₀(x₁)]

0	0
-2	-2

· x₁ +

-∞

[c₁(x₁)]

0	0
-2	0

· x₁ +

-∞

[c₂(x₁)]

0	0
0	0

· x₁ +

-∞

[b₀(x₁)]

0	0
0	0

· x₁ +

-∞

[b₁(x₁)]

0	0
-2	-2

· x₁ +

-∞

[b₂(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₀(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₁(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₂(x₁)]

0	0
0	0

· x₁ +

-∞

[a₀^#(x₁)]

1	2
1	2

· x₁ +

-∞

together with the usable rules

a₂(a₂(a₂(a₂(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(79)
a₁(a₂(a₂(a₂(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(80)
a₀(a₂(a₂(a₂(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(81)
a₂(a₂(a₂(b₂(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(82)
a₁(a₂(a₂(b₂(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(83)
a₀(a₂(a₂(b₂(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(84)
a₂(a₂(a₂(c₂(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(85)
a₁(a₂(a₂(c₂(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(86)
a₀(a₂(a₂(c₂(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(87)
b₂(b₁(b₁(a₁(x1))))	→	b₂(c₁(c₀(a₀(x1))))	(88)
b₁(b₁(b₁(a₁(x1))))	→	b₁(c₁(c₀(a₀(x1))))	(89)
b₀(b₁(b₁(a₁(x1))))	→	b₀(c₁(c₀(a₀(x1))))	(90)
b₂(b₁(b₁(b₁(x1))))	→	b₂(c₁(c₀(b₀(x1))))	(91)
b₁(b₁(b₁(b₁(x1))))	→	b₁(c₁(c₀(b₀(x1))))	(92)
b₀(b₁(b₁(b₁(x1))))	→	b₀(c₁(c₀(b₀(x1))))	(93)
b₂(b₁(b₁(c₁(x1))))	→	b₂(c₁(c₀(c₀(x1))))	(94)
b₁(b₁(b₁(c₁(x1))))	→	b₁(c₁(c₀(c₀(x1))))	(95)
b₀(b₁(b₁(c₁(x1))))	→	b₀(c₁(c₀(c₀(x1))))	(96)
a₂(c₂(a₀(a₂(x1))))	→	b₂(c₁(b₀(a₁(x1))))	(97)
a₁(c₂(a₀(a₂(x1))))	→	b₁(c₁(b₀(a₁(x1))))	(98)
a₀(c₂(a₀(a₂(x1))))	→	b₀(c₁(b₀(a₁(x1))))	(99)
a₂(c₂(a₀(b₂(x1))))	→	b₂(c₁(b₀(b₁(x1))))	(100)
a₁(c₂(a₀(b₂(x1))))	→	b₁(c₁(b₀(b₁(x1))))	(101)
a₀(c₂(a₀(b₂(x1))))	→	b₀(c₁(b₀(b₁(x1))))	(102)
a₂(c₂(a₀(c₂(x1))))	→	b₂(c₁(b₀(c₁(x1))))	(103)
a₁(c₂(a₀(c₂(x1))))	→	b₁(c₁(b₀(c₁(x1))))	(104)
a₀(c₂(a₀(c₂(x1))))	→	b₀(c₁(b₀(c₁(x1))))	(105)
b₂(c₁(b₀(a₁(x1))))	→	c₂(c₀(a₀(a₂(x1))))	(106)
b₁(c₁(b₀(a₁(x1))))	→	c₁(c₀(a₀(a₂(x1))))	(107)
b₀(c₁(b₀(a₁(x1))))	→	c₀(c₀(a₀(a₂(x1))))	(108)
b₂(c₁(b₀(b₁(x1))))	→	c₂(c₀(a₀(b₂(x1))))	(109)
b₁(c₁(b₀(b₁(x1))))	→	c₁(c₀(a₀(b₂(x1))))	(110)
b₀(c₁(b₀(b₁(x1))))	→	c₀(c₀(a₀(b₂(x1))))	(111)
b₂(c₁(b₀(c₁(x1))))	→	c₂(c₀(a₀(c₂(x1))))	(112)
b₁(c₁(b₀(c₁(x1))))	→	c₁(c₀(a₀(c₂(x1))))	(113)
b₀(c₁(b₀(c₁(x1))))	→	c₀(c₀(a₀(c₂(x1))))	(114)
a₂(c₂(c₀(a₀(x1))))	→	a₂(b₂(b₁(a₁(x1))))	(115)
a₁(c₂(c₀(a₀(x1))))	→	a₁(b₂(b₁(a₁(x1))))	(116)
a₀(c₂(c₀(a₀(x1))))	→	a₀(b₂(b₁(a₁(x1))))	(117)
a₂(c₂(c₀(b₀(x1))))	→	a₂(b₂(b₁(b₁(x1))))	(118)
a₁(c₂(c₀(b₀(x1))))	→	a₁(b₂(b₁(b₁(x1))))	(119)
a₀(c₂(c₀(b₀(x1))))	→	a₀(b₂(b₁(b₁(x1))))	(120)
a₂(c₂(c₀(c₀(x1))))	→	a₂(b₂(b₁(c₁(x1))))	(121)
a₁(c₂(c₀(c₀(x1))))	→	a₁(b₂(b₁(c₁(x1))))	(122)
a₀(c₂(c₀(c₀(x1))))	→	a₀(b₂(b₁(c₁(x1))))	(123)
a₂(a₂(c₂(a₀(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(124)
a₁(a₂(c₂(a₀(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(125)
a₀(a₂(c₂(a₀(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(126)
a₂(a₂(c₂(b₀(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(127)
a₁(a₂(c₂(b₀(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(128)
a₀(a₂(c₂(b₀(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(129)
a₂(a₂(c₂(c₀(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(130)
a₁(a₂(c₂(c₀(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(131)
a₀(a₂(c₂(c₀(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(132)

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

a₀^#(c₂(c₀(c₀(x1))))	→	a₀^#(b₂(b₁(c₁(x1))))	(165)
a₀^#(c₂(c₀(b₀(x1))))	→	a₀^#(b₂(b₁(b₁(x1))))	(169)
a₀^#(c₂(c₀(a₀(x1))))	→	a₀^#(b₂(b₁(a₁(x1))))	(172)

could be deleted.

1.1.1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 0 components.

The 2^nd component contains the pair

a₁^#(c₂(c₀(c₀(x1))))	→	a₁^#(b₂(b₁(c₁(x1))))	(200)
a₁^#(c₂(c₀(b₀(x1))))	→	a₁^#(b₂(b₁(b₁(x1))))	(204)
a₁^#(c₂(c₀(a₀(x1))))	→	a₁^#(b₂(b₁(a₁(x1))))	(208)

1.1.1.1.1.1.2 Reduction Pair Processor with Usable Rules

Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

[c₀(x₁)]

0	0
-2	-2

· x₁ +

-∞

[c₁(x₁)]

0	0
-2	0

· x₁ +

-∞

[c₂(x₁)]

0	0
0	0

· x₁ +

-∞

[b₀(x₁)]

0	0
0	0

· x₁ +

-∞

[b₁(x₁)]

0	0
-2	-2

· x₁ +

-∞

[b₂(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₀(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₁(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₂(x₁)]

0	0
0	0

· x₁ +

-∞

[a₁^#(x₁)]

1	2
1	2

· x₁ +

-∞

together with the usable rules

a₂(a₂(a₂(a₂(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(79)
a₁(a₂(a₂(a₂(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(80)
a₀(a₂(a₂(a₂(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(81)
a₂(a₂(a₂(b₂(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(82)
a₁(a₂(a₂(b₂(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(83)
a₀(a₂(a₂(b₂(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(84)
a₂(a₂(a₂(c₂(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(85)
a₁(a₂(a₂(c₂(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(86)
a₀(a₂(a₂(c₂(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(87)
b₂(b₁(b₁(a₁(x1))))	→	b₂(c₁(c₀(a₀(x1))))	(88)
b₁(b₁(b₁(a₁(x1))))	→	b₁(c₁(c₀(a₀(x1))))	(89)
b₀(b₁(b₁(a₁(x1))))	→	b₀(c₁(c₀(a₀(x1))))	(90)
b₂(b₁(b₁(b₁(x1))))	→	b₂(c₁(c₀(b₀(x1))))	(91)
b₁(b₁(b₁(b₁(x1))))	→	b₁(c₁(c₀(b₀(x1))))	(92)
b₀(b₁(b₁(b₁(x1))))	→	b₀(c₁(c₀(b₀(x1))))	(93)
b₂(b₁(b₁(c₁(x1))))	→	b₂(c₁(c₀(c₀(x1))))	(94)
b₁(b₁(b₁(c₁(x1))))	→	b₁(c₁(c₀(c₀(x1))))	(95)
b₀(b₁(b₁(c₁(x1))))	→	b₀(c₁(c₀(c₀(x1))))	(96)
a₂(c₂(a₀(a₂(x1))))	→	b₂(c₁(b₀(a₁(x1))))	(97)
a₁(c₂(a₀(a₂(x1))))	→	b₁(c₁(b₀(a₁(x1))))	(98)
a₀(c₂(a₀(a₂(x1))))	→	b₀(c₁(b₀(a₁(x1))))	(99)
a₂(c₂(a₀(b₂(x1))))	→	b₂(c₁(b₀(b₁(x1))))	(100)
a₁(c₂(a₀(b₂(x1))))	→	b₁(c₁(b₀(b₁(x1))))	(101)
a₀(c₂(a₀(b₂(x1))))	→	b₀(c₁(b₀(b₁(x1))))	(102)
a₂(c₂(a₀(c₂(x1))))	→	b₂(c₁(b₀(c₁(x1))))	(103)
a₁(c₂(a₀(c₂(x1))))	→	b₁(c₁(b₀(c₁(x1))))	(104)
a₀(c₂(a₀(c₂(x1))))	→	b₀(c₁(b₀(c₁(x1))))	(105)
b₂(c₁(b₀(a₁(x1))))	→	c₂(c₀(a₀(a₂(x1))))	(106)
b₁(c₁(b₀(a₁(x1))))	→	c₁(c₀(a₀(a₂(x1))))	(107)
b₀(c₁(b₀(a₁(x1))))	→	c₀(c₀(a₀(a₂(x1))))	(108)
b₂(c₁(b₀(b₁(x1))))	→	c₂(c₀(a₀(b₂(x1))))	(109)
b₁(c₁(b₀(b₁(x1))))	→	c₁(c₀(a₀(b₂(x1))))	(110)
b₀(c₁(b₀(b₁(x1))))	→	c₀(c₀(a₀(b₂(x1))))	(111)
b₂(c₁(b₀(c₁(x1))))	→	c₂(c₀(a₀(c₂(x1))))	(112)
b₁(c₁(b₀(c₁(x1))))	→	c₁(c₀(a₀(c₂(x1))))	(113)
b₀(c₁(b₀(c₁(x1))))	→	c₀(c₀(a₀(c₂(x1))))	(114)
a₂(c₂(c₀(a₀(x1))))	→	a₂(b₂(b₁(a₁(x1))))	(115)
a₁(c₂(c₀(a₀(x1))))	→	a₁(b₂(b₁(a₁(x1))))	(116)
a₀(c₂(c₀(a₀(x1))))	→	a₀(b₂(b₁(a₁(x1))))	(117)
a₂(c₂(c₀(b₀(x1))))	→	a₂(b₂(b₁(b₁(x1))))	(118)
a₁(c₂(c₀(b₀(x1))))	→	a₁(b₂(b₁(b₁(x1))))	(119)
a₀(c₂(c₀(b₀(x1))))	→	a₀(b₂(b₁(b₁(x1))))	(120)
a₂(c₂(c₀(c₀(x1))))	→	a₂(b₂(b₁(c₁(x1))))	(121)
a₁(c₂(c₀(c₀(x1))))	→	a₁(b₂(b₁(c₁(x1))))	(122)
a₀(c₂(c₀(c₀(x1))))	→	a₀(b₂(b₁(c₁(x1))))	(123)
a₂(a₂(c₂(a₀(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(124)
a₁(a₂(c₂(a₀(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(125)
a₀(a₂(c₂(a₀(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(126)
a₂(a₂(c₂(b₀(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(127)
a₁(a₂(c₂(b₀(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(128)
a₀(a₂(c₂(b₀(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(129)
a₂(a₂(c₂(c₀(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(130)
a₁(a₂(c₂(c₀(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(131)
a₀(a₂(c₂(c₀(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(132)

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

a₁^#(c₂(c₀(c₀(x1))))	→	a₁^#(b₂(b₁(c₁(x1))))	(200)
a₁^#(c₂(c₀(b₀(x1))))	→	a₁^#(b₂(b₁(b₁(x1))))	(204)
a₁^#(c₂(c₀(a₀(x1))))	→	a₁^#(b₂(b₁(a₁(x1))))	(208)

could be deleted.

1.1.1.1.1.1.2.1 Dependency Graph Processor

The dependency pairs are split into 0 components.

The 3^rd component contains the pair

a₂^#(c₂(c₀(c₀(x1))))	→	a₂^#(b₂(b₁(c₁(x1))))	(235)
a₂^#(c₂(c₀(b₀(x1))))	→	a₂^#(b₂(b₁(b₁(x1))))	(239)
a₂^#(c₂(c₀(a₀(x1))))	→	a₂^#(b₂(b₁(a₁(x1))))	(243)

1.1.1.1.1.1.3 Reduction Pair Processor with Usable Rules

Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

[c₀(x₁)]

0	0
-2	-2

· x₁ +

-∞

[c₁(x₁)]

0	0
-2	0

· x₁ +

-∞

[c₂(x₁)]

0	0
0	0

· x₁ +

-∞

[b₀(x₁)]

0	0
0	0

· x₁ +

-∞

[b₁(x₁)]

0	0
-2	-2

· x₁ +

-∞

[b₂(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₀(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₁(x₁)]

0	0
-2	0

· x₁ +

-∞

[a₂(x₁)]

0	0
0	0

· x₁ +

-∞

[a₂^#(x₁)]

1	2
1	2

· x₁ +

-∞

together with the usable rules

a₂(a₂(a₂(a₂(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(79)
a₁(a₂(a₂(a₂(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(80)
a₀(a₂(a₂(a₂(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(81)
a₂(a₂(a₂(b₂(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(82)
a₁(a₂(a₂(b₂(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(83)
a₀(a₂(a₂(b₂(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(84)
a₂(a₂(a₂(c₂(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(85)
a₁(a₂(a₂(c₂(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(86)
a₀(a₂(a₂(c₂(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(87)
b₂(b₁(b₁(a₁(x1))))	→	b₂(c₁(c₀(a₀(x1))))	(88)
b₁(b₁(b₁(a₁(x1))))	→	b₁(c₁(c₀(a₀(x1))))	(89)
b₀(b₁(b₁(a₁(x1))))	→	b₀(c₁(c₀(a₀(x1))))	(90)
b₂(b₁(b₁(b₁(x1))))	→	b₂(c₁(c₀(b₀(x1))))	(91)
b₁(b₁(b₁(b₁(x1))))	→	b₁(c₁(c₀(b₀(x1))))	(92)
b₀(b₁(b₁(b₁(x1))))	→	b₀(c₁(c₀(b₀(x1))))	(93)
b₂(b₁(b₁(c₁(x1))))	→	b₂(c₁(c₀(c₀(x1))))	(94)
b₁(b₁(b₁(c₁(x1))))	→	b₁(c₁(c₀(c₀(x1))))	(95)
b₀(b₁(b₁(c₁(x1))))	→	b₀(c₁(c₀(c₀(x1))))	(96)
a₂(c₂(a₀(a₂(x1))))	→	b₂(c₁(b₀(a₁(x1))))	(97)
a₁(c₂(a₀(a₂(x1))))	→	b₁(c₁(b₀(a₁(x1))))	(98)
a₀(c₂(a₀(a₂(x1))))	→	b₀(c₁(b₀(a₁(x1))))	(99)
a₂(c₂(a₀(b₂(x1))))	→	b₂(c₁(b₀(b₁(x1))))	(100)
a₁(c₂(a₀(b₂(x1))))	→	b₁(c₁(b₀(b₁(x1))))	(101)
a₀(c₂(a₀(b₂(x1))))	→	b₀(c₁(b₀(b₁(x1))))	(102)
a₂(c₂(a₀(c₂(x1))))	→	b₂(c₁(b₀(c₁(x1))))	(103)
a₁(c₂(a₀(c₂(x1))))	→	b₁(c₁(b₀(c₁(x1))))	(104)
a₀(c₂(a₀(c₂(x1))))	→	b₀(c₁(b₀(c₁(x1))))	(105)
b₂(c₁(b₀(a₁(x1))))	→	c₂(c₀(a₀(a₂(x1))))	(106)
b₁(c₁(b₀(a₁(x1))))	→	c₁(c₀(a₀(a₂(x1))))	(107)
b₀(c₁(b₀(a₁(x1))))	→	c₀(c₀(a₀(a₂(x1))))	(108)
b₂(c₁(b₀(b₁(x1))))	→	c₂(c₀(a₀(b₂(x1))))	(109)
b₁(c₁(b₀(b₁(x1))))	→	c₁(c₀(a₀(b₂(x1))))	(110)
b₀(c₁(b₀(b₁(x1))))	→	c₀(c₀(a₀(b₂(x1))))	(111)
b₂(c₁(b₀(c₁(x1))))	→	c₂(c₀(a₀(c₂(x1))))	(112)
b₁(c₁(b₀(c₁(x1))))	→	c₁(c₀(a₀(c₂(x1))))	(113)
b₀(c₁(b₀(c₁(x1))))	→	c₀(c₀(a₀(c₂(x1))))	(114)
a₂(c₂(c₀(a₀(x1))))	→	a₂(b₂(b₁(a₁(x1))))	(115)
a₁(c₂(c₀(a₀(x1))))	→	a₁(b₂(b₁(a₁(x1))))	(116)
a₀(c₂(c₀(a₀(x1))))	→	a₀(b₂(b₁(a₁(x1))))	(117)
a₂(c₂(c₀(b₀(x1))))	→	a₂(b₂(b₁(b₁(x1))))	(118)
a₁(c₂(c₀(b₀(x1))))	→	a₁(b₂(b₁(b₁(x1))))	(119)
a₀(c₂(c₀(b₀(x1))))	→	a₀(b₂(b₁(b₁(x1))))	(120)
a₂(c₂(c₀(c₀(x1))))	→	a₂(b₂(b₁(c₁(x1))))	(121)
a₁(c₂(c₀(c₀(x1))))	→	a₁(b₂(b₁(c₁(x1))))	(122)
a₀(c₂(c₀(c₀(x1))))	→	a₀(b₂(b₁(c₁(x1))))	(123)
a₂(a₂(c₂(a₀(x1))))	→	c₂(b₀(b₁(a₁(x1))))	(124)
a₁(a₂(c₂(a₀(x1))))	→	c₁(b₀(b₁(a₁(x1))))	(125)
a₀(a₂(c₂(a₀(x1))))	→	c₀(b₀(b₁(a₁(x1))))	(126)
a₂(a₂(c₂(b₀(x1))))	→	c₂(b₀(b₁(b₁(x1))))	(127)
a₁(a₂(c₂(b₀(x1))))	→	c₁(b₀(b₁(b₁(x1))))	(128)
a₀(a₂(c₂(b₀(x1))))	→	c₀(b₀(b₁(b₁(x1))))	(129)
a₂(a₂(c₂(c₀(x1))))	→	c₂(b₀(b₁(c₁(x1))))	(130)
a₁(a₂(c₂(c₀(x1))))	→	c₁(b₀(b₁(c₁(x1))))	(131)
a₀(a₂(c₂(c₀(x1))))	→	c₀(b₀(b₁(c₁(x1))))	(132)

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

a₂^#(c₂(c₀(c₀(x1))))	→	a₂^#(b₂(b₁(c₁(x1))))	(235)
a₂^#(c₂(c₀(b₀(x1))))	→	a₂^#(b₂(b₁(b₁(x1))))	(239)
a₂^#(c₂(c₀(a₀(x1))))	→	a₂^#(b₂(b₁(a₁(x1))))	(243)

could be deleted.

1.1.1.1.1.1.3.1 Dependency Graph Processor

The dependency pairs are split into 0 components.