Certification Problem

Input (TPDB SRS_Relative/Waldmann_19/random-168)

The rewrite relation of the following TRS is considered.

c(a(a(x1)))	→	a(c(a(x1)))	(1)
a(c(c(x1)))	→	a(c(b(x1)))	(2)
a(b(b(x1)))	→	a(a(b(x1)))	(3)
a(c(c(x1)))	→	c(a(b(x1)))	(4)
a(a(b(x1)))	→	c(a(b(x1)))	(5)
a(b(b(x1)))	→	a(b(c(x1)))	(6)
a(a(a(x1)))	→	c(b(a(x1)))	(7)

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(c(a(a(x1))))	→	c(a(c(a(x1))))	(8)
c(a(c(c(x1))))	→	c(a(c(b(x1))))	(9)
c(a(b(b(x1))))	→	c(a(a(b(x1))))	(10)
c(a(c(c(x1))))	→	c(c(a(b(x1))))	(11)
c(a(a(b(x1))))	→	c(c(a(b(x1))))	(12)
c(a(b(b(x1))))	→	c(a(b(c(x1))))	(13)
c(a(a(a(x1))))	→	c(c(b(a(x1))))	(14)
b(c(a(a(x1))))	→	b(a(c(a(x1))))	(15)
b(a(c(c(x1))))	→	b(a(c(b(x1))))	(16)
b(a(b(b(x1))))	→	b(a(a(b(x1))))	(17)
b(a(c(c(x1))))	→	b(c(a(b(x1))))	(18)
b(a(a(b(x1))))	→	b(c(a(b(x1))))	(19)
b(a(b(b(x1))))	→	b(a(b(c(x1))))	(20)
b(a(a(a(x1))))	→	b(c(b(a(x1))))	(21)
a(c(a(a(x1))))	→	a(a(c(a(x1))))	(22)
a(a(c(c(x1))))	→	a(a(c(b(x1))))	(23)
a(a(b(b(x1))))	→	a(a(a(b(x1))))	(24)
a(a(c(c(x1))))	→	a(c(a(b(x1))))	(25)
a(a(a(b(x1))))	→	a(c(a(b(x1))))	(26)
a(a(b(b(x1))))	→	a(a(b(c(x1))))	(27)
a(a(a(a(x1))))	→	a(c(b(a(x1))))	(28)

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

c₀(c₂(a₂(a₀(x1))))	→	c₂(a₀(c₂(a₀(x1))))	(29)
c₀(c₂(a₂(a₂(x1))))	→	c₂(a₀(c₂(a₂(x1))))	(30)
c₀(c₂(a₂(a₁(x1))))	→	c₂(a₀(c₂(a₁(x1))))	(31)
a₀(c₂(a₂(a₀(x1))))	→	a₂(a₀(c₂(a₀(x1))))	(32)
a₀(c₂(a₂(a₂(x1))))	→	a₂(a₀(c₂(a₂(x1))))	(33)
a₀(c₂(a₂(a₁(x1))))	→	a₂(a₀(c₂(a₁(x1))))	(34)
b₀(c₂(a₂(a₀(x1))))	→	b₂(a₀(c₂(a₀(x1))))	(35)
b₀(c₂(a₂(a₂(x1))))	→	b₂(a₀(c₂(a₂(x1))))	(36)
b₀(c₂(a₂(a₁(x1))))	→	b₂(a₀(c₂(a₁(x1))))	(37)
c₂(a₀(c₀(c₀(x1))))	→	c₂(a₀(c₁(b₀(x1))))	(38)
c₂(a₀(c₀(c₂(x1))))	→	c₂(a₀(c₁(b₂(x1))))	(39)
c₂(a₀(c₀(c₁(x1))))	→	c₂(a₀(c₁(b₁(x1))))	(40)
a₂(a₀(c₀(c₀(x1))))	→	a₂(a₀(c₁(b₀(x1))))	(41)
a₂(a₀(c₀(c₂(x1))))	→	a₂(a₀(c₁(b₂(x1))))	(42)
a₂(a₀(c₀(c₁(x1))))	→	a₂(a₀(c₁(b₁(x1))))	(43)
b₂(a₀(c₀(c₀(x1))))	→	b₂(a₀(c₁(b₀(x1))))	(44)
b₂(a₀(c₀(c₂(x1))))	→	b₂(a₀(c₁(b₂(x1))))	(45)
b₂(a₀(c₀(c₁(x1))))	→	b₂(a₀(c₁(b₁(x1))))	(46)
c₂(a₁(b₁(b₀(x1))))	→	c₂(a₂(a₁(b₀(x1))))	(47)
c₂(a₁(b₁(b₂(x1))))	→	c₂(a₂(a₁(b₂(x1))))	(48)
c₂(a₁(b₁(b₁(x1))))	→	c₂(a₂(a₁(b₁(x1))))	(49)
a₂(a₁(b₁(b₀(x1))))	→	a₂(a₂(a₁(b₀(x1))))	(50)
a₂(a₁(b₁(b₂(x1))))	→	a₂(a₂(a₁(b₂(x1))))	(51)
a₂(a₁(b₁(b₁(x1))))	→	a₂(a₂(a₁(b₁(x1))))	(52)
b₂(a₁(b₁(b₀(x1))))	→	b₂(a₂(a₁(b₀(x1))))	(53)
b₂(a₁(b₁(b₂(x1))))	→	b₂(a₂(a₁(b₂(x1))))	(54)
b₂(a₁(b₁(b₁(x1))))	→	b₂(a₂(a₁(b₁(x1))))	(55)
c₂(a₀(c₀(c₀(x1))))	→	c₀(c₂(a₁(b₀(x1))))	(56)
c₂(a₀(c₀(c₂(x1))))	→	c₀(c₂(a₁(b₂(x1))))	(57)
c₂(a₀(c₀(c₁(x1))))	→	c₀(c₂(a₁(b₁(x1))))	(58)
a₂(a₀(c₀(c₀(x1))))	→	a₀(c₂(a₁(b₀(x1))))	(59)
a₂(a₀(c₀(c₂(x1))))	→	a₀(c₂(a₁(b₂(x1))))	(60)
a₂(a₀(c₀(c₁(x1))))	→	a₀(c₂(a₁(b₁(x1))))	(61)
b₂(a₀(c₀(c₀(x1))))	→	b₀(c₂(a₁(b₀(x1))))	(62)
b₂(a₀(c₀(c₂(x1))))	→	b₀(c₂(a₁(b₂(x1))))	(63)
b₂(a₀(c₀(c₁(x1))))	→	b₀(c₂(a₁(b₁(x1))))	(64)
c₂(a₂(a₁(b₀(x1))))	→	c₀(c₂(a₁(b₀(x1))))	(65)
c₂(a₂(a₁(b₂(x1))))	→	c₀(c₂(a₁(b₂(x1))))	(66)
c₂(a₂(a₁(b₁(x1))))	→	c₀(c₂(a₁(b₁(x1))))	(67)
a₂(a₂(a₁(b₀(x1))))	→	a₀(c₂(a₁(b₀(x1))))	(68)
a₂(a₂(a₁(b₂(x1))))	→	a₀(c₂(a₁(b₂(x1))))	(69)
a₂(a₂(a₁(b₁(x1))))	→	a₀(c₂(a₁(b₁(x1))))	(70)
b₂(a₂(a₁(b₀(x1))))	→	b₀(c₂(a₁(b₀(x1))))	(71)
b₂(a₂(a₁(b₂(x1))))	→	b₀(c₂(a₁(b₂(x1))))	(72)
b₂(a₂(a₁(b₁(x1))))	→	b₀(c₂(a₁(b₁(x1))))	(73)
c₂(a₁(b₁(b₀(x1))))	→	c₂(a₁(b₀(c₀(x1))))	(74)
c₂(a₁(b₁(b₂(x1))))	→	c₂(a₁(b₀(c₂(x1))))	(75)
c₂(a₁(b₁(b₁(x1))))	→	c₂(a₁(b₀(c₁(x1))))	(76)
a₂(a₁(b₁(b₀(x1))))	→	a₂(a₁(b₀(c₀(x1))))	(77)
a₂(a₁(b₁(b₂(x1))))	→	a₂(a₁(b₀(c₂(x1))))	(78)
a₂(a₁(b₁(b₁(x1))))	→	a₂(a₁(b₀(c₁(x1))))	(79)
b₂(a₁(b₁(b₀(x1))))	→	b₂(a₁(b₀(c₀(x1))))	(80)
b₂(a₁(b₁(b₂(x1))))	→	b₂(a₁(b₀(c₂(x1))))	(81)
b₂(a₁(b₁(b₁(x1))))	→	b₂(a₁(b₀(c₁(x1))))	(82)
c₂(a₂(a₂(a₀(x1))))	→	c₀(c₁(b₂(a₀(x1))))	(83)
c₂(a₂(a₂(a₂(x1))))	→	c₀(c₁(b₂(a₂(x1))))	(84)
c₂(a₂(a₂(a₁(x1))))	→	c₀(c₁(b₂(a₁(x1))))	(85)
a₂(a₂(a₂(a₀(x1))))	→	a₀(c₁(b₂(a₀(x1))))	(86)
a₂(a₂(a₂(a₂(x1))))	→	a₀(c₁(b₂(a₂(x1))))	(87)
a₂(a₂(a₂(a₁(x1))))	→	a₀(c₁(b₂(a₁(x1))))	(88)
b₂(a₂(a₂(a₀(x1))))	→	b₀(c₁(b₂(a₀(x1))))	(89)
b₂(a₂(a₂(a₂(x1))))	→	b₀(c₁(b₂(a₂(x1))))	(90)
b₂(a₂(a₂(a₁(x1))))	→	b₀(c₁(b₂(a₁(x1))))	(91)

1.1.1 Rule Removal

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 +

all of the following rules can be deleted.

c₀(c₂(a₂(a₀(x1))))	→	c₂(a₀(c₂(a₀(x1))))	(29)
c₀(c₂(a₂(a₂(x1))))	→	c₂(a₀(c₂(a₂(x1))))	(30)
c₀(c₂(a₂(a₁(x1))))	→	c₂(a₀(c₂(a₁(x1))))	(31)
b₀(c₂(a₂(a₀(x1))))	→	b₂(a₀(c₂(a₀(x1))))	(35)
b₀(c₂(a₂(a₂(x1))))	→	b₂(a₀(c₂(a₂(x1))))	(36)
b₀(c₂(a₂(a₁(x1))))	→	b₂(a₀(c₂(a₁(x1))))	(37)
c₂(a₀(c₀(c₀(x1))))	→	c₂(a₀(c₁(b₀(x1))))	(38)
c₂(a₀(c₀(c₂(x1))))	→	c₂(a₀(c₁(b₂(x1))))	(39)
a₂(a₀(c₀(c₀(x1))))	→	a₂(a₀(c₁(b₀(x1))))	(41)
a₂(a₀(c₀(c₂(x1))))	→	a₂(a₀(c₁(b₂(x1))))	(42)
b₂(a₀(c₀(c₀(x1))))	→	b₂(a₀(c₁(b₀(x1))))	(44)
b₂(a₀(c₀(c₂(x1))))	→	b₂(a₀(c₁(b₂(x1))))	(45)
c₂(a₀(c₀(c₀(x1))))	→	c₀(c₂(a₁(b₀(x1))))	(56)
c₂(a₀(c₀(c₂(x1))))	→	c₀(c₂(a₁(b₂(x1))))	(57)
c₂(a₀(c₀(c₁(x1))))	→	c₀(c₂(a₁(b₁(x1))))	(58)
a₂(a₀(c₀(c₀(x1))))	→	a₀(c₂(a₁(b₀(x1))))	(59)
a₂(a₀(c₀(c₂(x1))))	→	a₀(c₂(a₁(b₂(x1))))	(60)
a₂(a₀(c₀(c₁(x1))))	→	a₀(c₂(a₁(b₁(x1))))	(61)
b₂(a₀(c₀(c₀(x1))))	→	b₀(c₂(a₁(b₀(x1))))	(62)
b₂(a₀(c₀(c₂(x1))))	→	b₀(c₂(a₁(b₂(x1))))	(63)
b₂(a₀(c₀(c₁(x1))))	→	b₀(c₂(a₁(b₁(x1))))	(64)
a₂(a₂(a₁(b₀(x1))))	→	a₀(c₂(a₁(b₀(x1))))	(68)
a₂(a₂(a₁(b₂(x1))))	→	a₀(c₂(a₁(b₂(x1))))	(69)
a₂(a₂(a₁(b₁(x1))))	→	a₀(c₂(a₁(b₁(x1))))	(70)
b₂(a₂(a₁(b₀(x1))))	→	b₀(c₂(a₁(b₀(x1))))	(71)
b₂(a₂(a₁(b₂(x1))))	→	b₀(c₂(a₁(b₂(x1))))	(72)
b₂(a₂(a₁(b₁(x1))))	→	b₀(c₂(a₁(b₁(x1))))	(73)
c₂(a₁(b₁(b₂(x1))))	→	c₂(a₁(b₀(c₂(x1))))	(75)
c₂(a₁(b₁(b₁(x1))))	→	c₂(a₁(b₀(c₁(x1))))	(76)
a₂(a₁(b₁(b₂(x1))))	→	a₂(a₁(b₀(c₂(x1))))	(78)
a₂(a₁(b₁(b₁(x1))))	→	a₂(a₁(b₀(c₁(x1))))	(79)
b₂(a₁(b₁(b₂(x1))))	→	b₂(a₁(b₀(c₂(x1))))	(81)
b₂(a₁(b₁(b₁(x1))))	→	b₂(a₁(b₀(c₁(x1))))	(82)
c₂(a₂(a₂(a₀(x1))))	→	c₀(c₁(b₂(a₀(x1))))	(83)
c₂(a₂(a₂(a₂(x1))))	→	c₀(c₁(b₂(a₂(x1))))	(84)
c₂(a₂(a₂(a₁(x1))))	→	c₀(c₁(b₂(a₁(x1))))	(85)
a₂(a₂(a₂(a₀(x1))))	→	a₀(c₁(b₂(a₀(x1))))	(86)
a₂(a₂(a₂(a₂(x1))))	→	a₀(c₁(b₂(a₂(x1))))	(87)
a₂(a₂(a₂(a₁(x1))))	→	a₀(c₁(b₂(a₁(x1))))	(88)
b₂(a₂(a₂(a₀(x1))))	→	b₀(c₁(b₂(a₀(x1))))	(89)
b₂(a₂(a₂(a₂(x1))))	→	b₀(c₁(b₂(a₂(x1))))	(90)
b₂(a₂(a₂(a₁(x1))))	→	b₀(c₁(b₂(a₁(x1))))	(91)

1.1.1.1 String Reversal

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

a₀(a₂(c₂(a₀(x1))))	→	a₀(c₂(a₀(a₂(x1))))	(92)
a₂(a₂(c₂(a₀(x1))))	→	a₂(c₂(a₀(a₂(x1))))	(93)
a₁(a₂(c₂(a₀(x1))))	→	a₁(c₂(a₀(a₂(x1))))	(94)
c₁(c₀(a₀(c₂(x1))))	→	b₁(c₁(a₀(c₂(x1))))	(95)
c₁(c₀(a₀(a₂(x1))))	→	b₁(c₁(a₀(a₂(x1))))	(96)
c₁(c₀(a₀(b₂(x1))))	→	b₁(c₁(a₀(b₂(x1))))	(97)
b₀(b₁(a₁(c₂(x1))))	→	b₀(a₁(a₂(c₂(x1))))	(98)
b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₁(b₁(a₁(c₂(x1))))	→	b₁(a₁(a₂(c₂(x1))))	(100)
b₀(b₁(a₁(a₂(x1))))	→	b₀(a₁(a₂(a₂(x1))))	(101)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₁(b₁(a₁(a₂(x1))))	→	b₁(a₁(a₂(a₂(x1))))	(103)
b₀(b₁(a₁(b₂(x1))))	→	b₀(a₁(a₂(b₂(x1))))	(104)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₁(b₁(a₁(b₂(x1))))	→	b₁(a₁(a₂(b₂(x1))))	(106)
b₀(a₁(a₂(c₂(x1))))	→	b₀(a₁(c₂(c₀(x1))))	(107)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)
b₁(a₁(a₂(c₂(x1))))	→	b₁(a₁(c₂(c₀(x1))))	(109)
b₀(b₁(a₁(c₂(x1))))	→	c₀(b₀(a₁(c₂(x1))))	(110)
b₀(b₁(a₁(a₂(x1))))	→	c₀(b₀(a₁(a₂(x1))))	(111)
b₀(b₁(a₁(b₂(x1))))	→	c₀(b₀(a₁(b₂(x1))))	(112)

1.1.1.1.1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

c₁^#(c₀(a₀(c₂(x1))))	→	c₁^#(a₀(c₂(x1)))	(113)
c₁^#(c₀(a₀(c₂(x1))))	→	b₁^#(c₁(a₀(c₂(x1))))	(114)
c₁^#(c₀(a₀(b₂(x1))))	→	c₁^#(a₀(b₂(x1)))	(115)
c₁^#(c₀(a₀(b₂(x1))))	→	b₁^#(c₁(a₀(b₂(x1))))	(116)
c₁^#(c₀(a₀(a₂(x1))))	→	c₁^#(a₀(a₂(x1)))	(117)
c₁^#(c₀(a₀(a₂(x1))))	→	b₁^#(c₁(a₀(a₂(x1))))	(118)
b₀^#(b₁(a₁(c₂(x1))))	→	b₀^#(a₁(c₂(x1)))	(119)
b₀^#(b₁(a₁(c₂(x1))))	→	b₀^#(a₁(a₂(c₂(x1))))	(120)
b₀^#(b₁(a₁(c₂(x1))))	→	a₁^#(a₂(c₂(x1)))	(121)
b₀^#(b₁(a₁(c₂(x1))))	→	a₂^#(c₂(x1))	(122)
b₀^#(b₁(a₁(b₂(x1))))	→	b₀^#(a₁(b₂(x1)))	(123)
b₀^#(b₁(a₁(b₂(x1))))	→	b₀^#(a₁(a₂(b₂(x1))))	(124)
b₀^#(b₁(a₁(b₂(x1))))	→	a₁^#(a₂(b₂(x1)))	(125)
b₀^#(b₁(a₁(b₂(x1))))	→	a₂^#(b₂(x1))	(126)
b₀^#(b₁(a₁(a₂(x1))))	→	b₀^#(a₁(a₂(x1)))	(127)
b₀^#(b₁(a₁(a₂(x1))))	→	b₀^#(a₁(a₂(a₂(x1))))	(128)
b₀^#(b₁(a₁(a₂(x1))))	→	a₁^#(a₂(a₂(x1)))	(129)
b₀^#(b₁(a₁(a₂(x1))))	→	a₂^#(a₂(x1))	(130)
b₀^#(a₁(a₂(c₂(x1))))	→	b₀^#(a₁(c₂(c₀(x1))))	(131)
b₀^#(a₁(a₂(c₂(x1))))	→	a₁^#(c₂(c₀(x1)))	(132)
b₁^#(b₁(a₁(c₂(x1))))	→	b₁^#(a₁(a₂(c₂(x1))))	(133)
b₁^#(b₁(a₁(c₂(x1))))	→	a₁^#(a₂(c₂(x1)))	(134)
b₁^#(b₁(a₁(c₂(x1))))	→	a₂^#(c₂(x1))	(135)
b₁^#(b₁(a₁(b₂(x1))))	→	b₁^#(a₁(a₂(b₂(x1))))	(136)
b₁^#(b₁(a₁(b₂(x1))))	→	a₁^#(a₂(b₂(x1)))	(137)
b₁^#(b₁(a₁(b₂(x1))))	→	a₂^#(b₂(x1))	(138)
b₁^#(b₁(a₁(a₂(x1))))	→	b₁^#(a₁(a₂(a₂(x1))))	(139)
b₁^#(b₁(a₁(a₂(x1))))	→	a₁^#(a₂(a₂(x1)))	(140)
b₁^#(b₁(a₁(a₂(x1))))	→	a₂^#(a₂(x1))	(141)
b₁^#(a₁(a₂(c₂(x1))))	→	b₁^#(a₁(c₂(c₀(x1))))	(142)
b₁^#(a₁(a₂(c₂(x1))))	→	a₁^#(c₂(c₀(x1)))	(143)
b₂^#(b₁(a₁(c₂(x1))))	→	b₂^#(a₁(a₂(c₂(x1))))	(144)
b₂^#(b₁(a₁(c₂(x1))))	→	a₁^#(a₂(c₂(x1)))	(145)
b₂^#(b₁(a₁(c₂(x1))))	→	a₂^#(c₂(x1))	(146)
b₂^#(b₁(a₁(b₂(x1))))	→	b₂^#(a₁(a₂(b₂(x1))))	(147)
b₂^#(b₁(a₁(b₂(x1))))	→	a₁^#(a₂(b₂(x1)))	(148)
b₂^#(b₁(a₁(b₂(x1))))	→	a₂^#(b₂(x1))	(149)
b₂^#(b₁(a₁(a₂(x1))))	→	b₂^#(a₁(a₂(a₂(x1))))	(150)
b₂^#(b₁(a₁(a₂(x1))))	→	a₁^#(a₂(a₂(x1)))	(151)
b₂^#(b₁(a₁(a₂(x1))))	→	a₂^#(a₂(x1))	(152)
b₂^#(a₁(a₂(c₂(x1))))	→	b₂^#(a₁(c₂(c₀(x1))))	(153)
b₂^#(a₁(a₂(c₂(x1))))	→	a₁^#(c₂(c₀(x1)))	(154)
a₀^#(a₂(c₂(a₀(x1))))	→	a₀^#(c₂(a₀(a₂(x1))))	(155)
a₀^#(a₂(c₂(a₀(x1))))	→	a₀^#(a₂(x1))	(156)
a₀^#(a₂(c₂(a₀(x1))))	→	a₂^#(x1)	(157)
a₁^#(a₂(c₂(a₀(x1))))	→	a₀^#(a₂(x1))	(158)
a₁^#(a₂(c₂(a₀(x1))))	→	a₁^#(c₂(a₀(a₂(x1))))	(159)
a₁^#(a₂(c₂(a₀(x1))))	→	a₂^#(x1)	(160)
a₂^#(a₂(c₂(a₀(x1))))	→	a₀^#(a₂(x1))	(161)
a₂^#(a₂(c₂(a₀(x1))))	→	a₂^#(x1)	(162)
a₂^#(a₂(c₂(a₀(x1))))	→	a₂^#(c₂(a₀(a₂(x1))))	(163)

1.1.1.1.1.1 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 +

[c₁^#(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

a₀(a₂(c₂(a₀(x1))))	→	a₀(c₂(a₀(a₂(x1))))	(92)
a₂(a₂(c₂(a₀(x1))))	→	a₂(c₂(a₀(a₂(x1))))	(93)
a₁(a₂(c₂(a₀(x1))))	→	a₁(c₂(a₀(a₂(x1))))	(94)
c₁(c₀(a₀(c₂(x1))))	→	b₁(c₁(a₀(c₂(x1))))	(95)
c₁(c₀(a₀(a₂(x1))))	→	b₁(c₁(a₀(a₂(x1))))	(96)
c₁(c₀(a₀(b₂(x1))))	→	b₁(c₁(a₀(b₂(x1))))	(97)
b₀(b₁(a₁(c₂(x1))))	→	b₀(a₁(a₂(c₂(x1))))	(98)
b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₁(b₁(a₁(c₂(x1))))	→	b₁(a₁(a₂(c₂(x1))))	(100)
b₀(b₁(a₁(a₂(x1))))	→	b₀(a₁(a₂(a₂(x1))))	(101)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₁(b₁(a₁(a₂(x1))))	→	b₁(a₁(a₂(a₂(x1))))	(103)
b₀(b₁(a₁(b₂(x1))))	→	b₀(a₁(a₂(b₂(x1))))	(104)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₁(b₁(a₁(b₂(x1))))	→	b₁(a₁(a₂(b₂(x1))))	(106)
b₀(a₁(a₂(c₂(x1))))	→	b₀(a₁(c₂(c₀(x1))))	(107)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)
b₁(a₁(a₂(c₂(x1))))	→	b₁(a₁(c₂(c₀(x1))))	(109)
b₀(b₁(a₁(c₂(x1))))	→	c₀(b₀(a₁(c₂(x1))))	(110)
b₀(b₁(a₁(a₂(x1))))	→	c₀(b₀(a₁(a₂(x1))))	(111)
b₀(b₁(a₁(b₂(x1))))	→	c₀(b₀(a₁(b₂(x1))))	(112)

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

c₁^#(c₀(a₀(c₂(x1))))	→	c₁^#(a₀(c₂(x1)))	(113)
c₁^#(c₀(a₀(c₂(x1))))	→	b₁^#(c₁(a₀(c₂(x1))))	(114)
c₁^#(c₀(a₀(b₂(x1))))	→	c₁^#(a₀(b₂(x1)))	(115)
c₁^#(c₀(a₀(b₂(x1))))	→	b₁^#(c₁(a₀(b₂(x1))))	(116)
c₁^#(c₀(a₀(a₂(x1))))	→	c₁^#(a₀(a₂(x1)))	(117)
c₁^#(c₀(a₀(a₂(x1))))	→	b₁^#(c₁(a₀(a₂(x1))))	(118)
b₀^#(b₁(a₁(c₂(x1))))	→	b₀^#(a₁(c₂(x1)))	(119)
b₀^#(b₁(a₁(c₂(x1))))	→	a₁^#(a₂(c₂(x1)))	(121)
b₀^#(b₁(a₁(c₂(x1))))	→	a₂^#(c₂(x1))	(122)
b₀^#(b₁(a₁(b₂(x1))))	→	b₀^#(a₁(b₂(x1)))	(123)
b₀^#(b₁(a₁(b₂(x1))))	→	a₁^#(a₂(b₂(x1)))	(125)
b₀^#(b₁(a₁(b₂(x1))))	→	a₂^#(b₂(x1))	(126)
b₀^#(b₁(a₁(a₂(x1))))	→	b₀^#(a₁(a₂(x1)))	(127)
b₀^#(b₁(a₁(a₂(x1))))	→	a₁^#(a₂(a₂(x1)))	(129)
b₀^#(b₁(a₁(a₂(x1))))	→	a₂^#(a₂(x1))	(130)
b₀^#(a₁(a₂(c₂(x1))))	→	a₁^#(c₂(c₀(x1)))	(132)
b₁^#(b₁(a₁(c₂(x1))))	→	a₁^#(a₂(c₂(x1)))	(134)
b₁^#(b₁(a₁(c₂(x1))))	→	a₂^#(c₂(x1))	(135)
b₁^#(b₁(a₁(b₂(x1))))	→	a₁^#(a₂(b₂(x1)))	(137)
b₁^#(b₁(a₁(b₂(x1))))	→	a₂^#(b₂(x1))	(138)
b₁^#(b₁(a₁(a₂(x1))))	→	a₁^#(a₂(a₂(x1)))	(140)
b₁^#(b₁(a₁(a₂(x1))))	→	a₂^#(a₂(x1))	(141)
b₁^#(a₁(a₂(c₂(x1))))	→	a₁^#(c₂(c₀(x1)))	(143)
b₂^#(b₁(a₁(c₂(x1))))	→	a₁^#(a₂(c₂(x1)))	(145)
b₂^#(b₁(a₁(c₂(x1))))	→	a₂^#(c₂(x1))	(146)
b₂^#(b₁(a₁(b₂(x1))))	→	a₁^#(a₂(b₂(x1)))	(148)
b₂^#(b₁(a₁(b₂(x1))))	→	a₂^#(b₂(x1))	(149)
b₂^#(b₁(a₁(a₂(x1))))	→	a₁^#(a₂(a₂(x1)))	(151)
b₂^#(b₁(a₁(a₂(x1))))	→	a₂^#(a₂(x1))	(152)
b₂^#(a₁(a₂(c₂(x1))))	→	a₁^#(c₂(c₀(x1)))	(154)
a₀^#(a₂(c₂(a₀(x1))))	→	a₀^#(a₂(x1))	(156)
a₀^#(a₂(c₂(a₀(x1))))	→	a₂^#(x1)	(157)
a₁^#(a₂(c₂(a₀(x1))))	→	a₀^#(a₂(x1))	(158)
a₁^#(a₂(c₂(a₀(x1))))	→	a₂^#(x1)	(160)
a₂^#(a₂(c₂(a₀(x1))))	→	a₀^#(a₂(x1))	(161)
a₂^#(a₂(c₂(a₀(x1))))	→	a₂^#(x1)	(162)

and no rules could be deleted.

1.1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 3 components.

The 1^st component contains the pair

b₀^#(b₁(a₁(c₂(x1))))	→	b₀^#(a₁(a₂(c₂(x1))))	(120)
b₀^#(b₁(a₁(b₂(x1))))	→	b₀^#(a₁(a₂(b₂(x1))))	(124)
b₀^#(b₁(a₁(a₂(x1))))	→	b₀^#(a₁(a₂(a₂(x1))))	(128)

1.1.1.1.1.1.1.1 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 +

[c₂(x₁)]

x₁ +

[b₁(x₁)]

x₁ +

[b₂(x₁)]

x₁ +

[a₀(x₁)]

x₁ +

[a₁(x₁)]

x₁ +

[a₂(x₁)]

x₁ +

[b₀^#(x₁)]

x₁ +

together with the usable rules

a₀(a₂(c₂(a₀(x1))))	→	a₀(c₂(a₀(a₂(x1))))	(92)
a₂(a₂(c₂(a₀(x1))))	→	a₂(c₂(a₀(a₂(x1))))	(93)
a₁(a₂(c₂(a₀(x1))))	→	a₁(c₂(a₀(a₂(x1))))	(94)
b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)

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

b₀^#(b₁(a₁(c₂(x1))))	→	b₀^#(a₁(a₂(c₂(x1))))	(120)
b₀^#(b₁(a₁(b₂(x1))))	→	b₀^#(a₁(a₂(b₂(x1))))	(124)
b₀^#(b₁(a₁(a₂(x1))))	→	b₀^#(a₁(a₂(a₂(x1))))	(128)

and the rules

b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)

could be deleted.

1.1.1.1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 0 components.

The 2^nd component contains the pair

b₁^#(b₁(a₁(c₂(x1))))	→	b₁^#(a₁(a₂(c₂(x1))))	(133)
b₁^#(b₁(a₁(b₂(x1))))	→	b₁^#(a₁(a₂(b₂(x1))))	(136)
b₁^#(b₁(a₁(a₂(x1))))	→	b₁^#(a₁(a₂(a₂(x1))))	(139)

1.1.1.1.1.1.1.2 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 +

[c₂(x₁)]

x₁ +

[b₁(x₁)]

x₁ +

[b₂(x₁)]

x₁ +

[a₀(x₁)]

x₁ +

[a₁(x₁)]

x₁ +

[a₂(x₁)]

x₁ +

[b₁^#(x₁)]

x₁ +

together with the usable rules

a₀(a₂(c₂(a₀(x1))))	→	a₀(c₂(a₀(a₂(x1))))	(92)
a₂(a₂(c₂(a₀(x1))))	→	a₂(c₂(a₀(a₂(x1))))	(93)
a₁(a₂(c₂(a₀(x1))))	→	a₁(c₂(a₀(a₂(x1))))	(94)
b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)

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

b₁^#(b₁(a₁(c₂(x1))))	→	b₁^#(a₁(a₂(c₂(x1))))	(133)
b₁^#(b₁(a₁(b₂(x1))))	→	b₁^#(a₁(a₂(b₂(x1))))	(136)
b₁^#(b₁(a₁(a₂(x1))))	→	b₁^#(a₁(a₂(a₂(x1))))	(139)

and the rules

b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)

could be deleted.

1.1.1.1.1.1.1.2.1 Dependency Graph Processor

The dependency pairs are split into 0 components.

The 3^rd component contains the pair

b₂^#(b₁(a₁(c₂(x1))))	→	b₂^#(a₁(a₂(c₂(x1))))	(144)
b₂^#(b₁(a₁(b₂(x1))))	→	b₂^#(a₁(a₂(b₂(x1))))	(147)
b₂^#(b₁(a₁(a₂(x1))))	→	b₂^#(a₁(a₂(a₂(x1))))	(150)

1.1.1.1.1.1.1.3 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 +

[c₂(x₁)]

x₁ +

[b₁(x₁)]

x₁ +

[b₂(x₁)]

x₁ +

[a₀(x₁)]

x₁ +

[a₁(x₁)]

x₁ +

[a₂(x₁)]

x₁ +

[b₂^#(x₁)]

x₁ +

together with the usable rules

a₀(a₂(c₂(a₀(x1))))	→	a₀(c₂(a₀(a₂(x1))))	(92)
a₂(a₂(c₂(a₀(x1))))	→	a₂(c₂(a₀(a₂(x1))))	(93)
a₁(a₂(c₂(a₀(x1))))	→	a₁(c₂(a₀(a₂(x1))))	(94)
b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)

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

b₂^#(b₁(a₁(c₂(x1))))	→	b₂^#(a₁(a₂(c₂(x1))))	(144)
b₂^#(b₁(a₁(b₂(x1))))	→	b₂^#(a₁(a₂(b₂(x1))))	(147)
b₂^#(b₁(a₁(a₂(x1))))	→	b₂^#(a₁(a₂(a₂(x1))))	(150)

and the rules

b₂(b₁(a₁(c₂(x1))))	→	b₂(a₁(a₂(c₂(x1))))	(99)
b₂(b₁(a₁(a₂(x1))))	→	b₂(a₁(a₂(a₂(x1))))	(102)
b₂(b₁(a₁(b₂(x1))))	→	b₂(a₁(a₂(b₂(x1))))	(105)
b₂(a₁(a₂(c₂(x1))))	→	b₂(a₁(c₂(c₀(x1))))	(108)

could be deleted.

1.1.1.1.1.1.1.3.1 Dependency Graph Processor

The dependency pairs are split into 0 components.