Certification Problem

Input (TPDB SRS_Standard/ICFP_2010/3533)

The rewrite relation of the following TRS is considered.

1(0(4(0(x1))))	→	2(2(2(3(3(1(5(5(2(0(x1))))))))))	(1)
0(4(1(5(5(x1)))))	→	2(4(2(0(2(4(3(0(1(5(x1))))))))))	(2)
1(4(2(5(2(x1)))))	→	4(3(5(0(2(2(0(0(5(3(x1))))))))))	(3)
3(1(0(3(0(x1)))))	→	3(2(2(2(4(3(3(5(2(0(x1))))))))))	(4)
5(0(1(4(3(x1)))))	→	3(5(4(2(2(0(4(3(3(0(x1))))))))))	(5)
5(5(5(5(2(x1)))))	→	5(2(2(0(3(3(1(5(0(0(x1))))))))))	(6)
0(5(0(1(1(3(x1))))))	→	0(2(5(3(4(3(1(0(1(3(x1))))))))))	(7)
0(5(0(5(2(5(x1))))))	→	4(2(0(0(2(5(1(3(4(1(x1))))))))))	(8)
1(5(4(0(1(1(x1))))))	→	4(3(4(4(0(0(0(5(3(3(x1))))))))))	(9)
2(4(0(1(0(4(x1))))))	→	0(2(3(3(3(3(5(0(2(5(x1))))))))))	(10)
2(4(1(3(1(4(x1))))))	→	5(5(3(4(3(2(1(4(4(4(x1))))))))))	(11)
2(5(2(5(4(0(x1))))))	→	4(2(5(3(5(5(2(2(3(0(x1))))))))))	(12)
3(4(2(4(2(5(x1))))))	→	3(5(2(2(0(5(2(4(3(2(x1))))))))))	(13)
4(1(3(0(4(0(x1))))))	→	5(0(1(2(3(1(2(3(5(2(x1))))))))))	(14)
5(4(3(2(4(0(x1))))))	→	5(0(1(2(0(2(2(3(0(2(x1))))))))))	(15)
5(5(0(4(0(3(x1))))))	→	5(2(2(2(2(2(4(4(3(2(x1))))))))))	(16)
0(0(5(0(4(0(5(x1)))))))	→	0(5(5(3(5(3(0(5(2(5(x1))))))))))	(17)
0(0(5(1(2(5(1(x1)))))))	→	0(1(2(4(3(5(0(1(3(3(x1))))))))))	(18)
0(0(5(5(5(0(5(x1)))))))	→	0(1(2(3(5(3(0(0(4(1(x1))))))))))	(19)
0(1(1(1(3(0(1(x1)))))))	→	4(2(2(3(3(0(4(0(0(3(x1))))))))))	(20)
0(3(1(0(3(1(1(x1)))))))	→	0(3(5(3(5(4(4(5(4(0(x1))))))))))	(21)
0(4(1(2(5(0(5(x1)))))))	→	2(0(1(5(1(5(0(2(0(5(x1))))))))))	(22)
0(4(2(4(2(3(4(x1)))))))	→	2(0(0(0(5(5(2(0(4(4(x1))))))))))	(23)
0(5(0(3(5(2(0(x1)))))))	→	2(2(3(3(1(4(2(2(0(2(x1))))))))))	(24)
1(0(4(0(4(0(5(x1)))))))	→	2(2(2(2(3(5(4(2(2(4(x1))))))))))	(25)
1(0(4(2(4(2(4(x1)))))))	→	1(2(0(0(4(4(2(2(2(2(x1))))))))))	(26)
1(0(5(0(4(3(4(x1)))))))	→	0(4(5(3(5(2(0(3(1(2(x1))))))))))	(27)
1(0(5(5(0(4(2(x1)))))))	→	1(0(2(1(5(4(5(2(0(2(x1))))))))))	(28)
1(2(4(4(2(4(0(x1)))))))	→	0(2(4(2(3(0(4(3(4(3(x1))))))))))	(29)
2(1(1(4(4(1(4(x1)))))))	→	4(2(4(3(4(3(5(4(5(4(x1))))))))))	(30)
2(4(2(3(3(4(1(x1)))))))	→	4(4(3(5(4(0(2(2(4(4(x1))))))))))	(31)
3(4(0(5(2(3(5(x1)))))))	→	3(3(5(0(0(2(2(3(3(5(x1))))))))))	(32)
3(4(2(0(5(1(2(x1)))))))	→	3(3(3(3(3(2(0(1(5(3(x1))))))))))	(33)

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by matchbox @ termCOMP 2023)

1 Closure Under Flat Contexts

Using the flat contexts

{5(☐), 4(☐), 3(☐), 2(☐), 1(☐), 0(☐)}

We obtain the transformed TRS

There are 198 ruless (increase limit for explicit display).

1.1 Semantic Labeling

The following interpretations form a model of the rules.

As carrier we take the set {0,...,5}. Symbols are labeled by the interpretation of their arguments using the interpretations (modulo 6):

[5(x₁)]	=	6x₁ + 0
[4(x₁)]	=	6x₁ + 1
[3(x₁)]	=	6x₁ + 2
[2(x₁)]	=	6x₁ + 3
[1(x₁)]	=	6x₁ + 4
[0(x₁)]	=	6x₁ + 5

We obtain the labeled TRS

There are 1188 ruless (increase limit for explicit display).

1.1.1 Rule Removal

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

[5₀(x₁)]

x₁ +

22283/10

[5₁(x₁)]

x₁ +

282/5

[5₂(x₁)]

x₁ +

[5₃(x₁)]

x₁ +

58691/35

[5₄(x₁)]

x₁ +

[5₅(x₁)]

x₁ +

185722/35

[4₀(x₁)]

x₁ +

[4₁(x₁)]

x₁ +

[4₂(x₁)]

x₁ +

[4₃(x₁)]

x₁ +

19209/7

[4₄(x₁)]

x₁ +

373377/70

[4₅(x₁)]

x₁ +

186646/35

[3₀(x₁)]

x₁ +

[3₁(x₁)]

x₁ +

1917/2

[3₂(x₁)]

x₁ +

[3₃(x₁)]

x₁ +

[3₄(x₁)]

x₁ +

1794/35

[3₅(x₁)]

x₁ +

[2₀(x₁)]

x₁ +

184672/35

[2₁(x₁)]

x₁ +

19279/7

[2₂(x₁)]

x₁ +

[2₃(x₁)]

x₁ +

[2₄(x₁)]

x₁ +

6410/7

[2₅(x₁)]

x₁ +

[1₀(x₁)]

x₁ +

12829/10

[1₁(x₁)]

x₁ +

160404/35

[1₂(x₁)]

x₁ +

12829/10

[1₃(x₁)]

x₁ +

63974/35

[1₄(x₁)]

x₁ +

63687/14

[1₅(x₁)]

x₁ +

184672/35

[0₀(x₁)]

x₁ +

186191/35

[0₁(x₁)]

x₁ +

19104/7

[0₂(x₁)]

x₁ +

[0₃(x₁)]

x₁ +

[0₄(x₁)]

x₁ +

33604/35

[0₅(x₁)]

x₁ +

all of the following rules can be deleted.

There are 1146 ruless (increase limit for explicit display).

1.1.1.1 String Reversal

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

3₀(4₂(1₁(0₄(5₅(1₀(x1))))))	→	0₀(3₅(3₂(4₂(0₁(2₅(2₃(4₃(5₁(3₀(1₂(x1)))))))))))	(1420)
3₀(4₂(1₁(0₄(5₅(3₀(x1))))))	→	0₀(3₅(3₂(4₂(0₁(2₅(2₃(4₃(5₁(3₀(3₂(x1)))))))))))	(1421)
2₄(5₃(5₀(5₀(5₀(1₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(1₀(x1)))))))))))	(1422)
2₄(5₃(5₀(5₀(5₀(0₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(0₀(x1)))))))))))	(1423)
2₄(5₃(5₀(5₀(5₀(4₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(4₀(x1)))))))))))	(1424)
2₄(5₃(5₀(5₀(5₀(2₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(2₀(x1)))))))))))	(1425)
2₄(5₃(5₀(5₀(5₀(3₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(3₀(x1)))))))))))	(1426)
2₄(5₃(5₀(5₀(5₀(5₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(5₀(x1)))))))))))	(1427)
5₄(2₀(5₃(0₀(5₅(0₀(2₅(x1)))))))	→	1₄(4₄(3₁(1₂(5₄(2₀(0₃(0₅(2₅(4₃(2₁(x1)))))))))))	(1428)
4₄(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₄(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1429)
4₅(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₅(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1430)
4₁(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1431)
4₃(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₃(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1432)
4₂(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1433)
4₀(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₀(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1434)
0₁(4₅(2₁(3₃(4₂(5₁(1₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(1₀(x1)))))))))))	(1435)
0₁(4₅(2₁(3₃(4₂(5₁(0₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(0₀(x1)))))))))))	(1436)
0₁(4₅(2₁(3₃(4₂(5₁(4₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(4₀(x1)))))))))))	(1437)
0₁(4₅(2₁(3₃(4₂(5₁(2₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(2₀(x1)))))))))))	(1438)
0₁(4₅(2₁(3₃(4₂(5₁(3₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(3₀(x1)))))))))))	(1439)
0₁(4₅(2₁(3₃(4₂(5₁(5₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(5₀(x1)))))))))))	(1440)
1₂(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	3₂(0₂(0₅(4₅(0₁(3₅(3₂(2₂(2₃(4₃(2₁(x1)))))))))))	(1441)
1₀(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	3₀(0₂(0₅(4₅(0₁(3₅(3₂(2₂(2₃(4₃(2₁(x1)))))))))))	(1442)
4₄(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₄(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1443)
4₅(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₅(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1444)
4₁(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₁(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1445)
4₃(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₃(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1446)
4₂(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₂(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1447)
4₀(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₀(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1448)
4₄(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₄(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1449)
4₅(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₅(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1450)
4₁(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₁(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1451)
4₃(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₃(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1452)
4₂(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₂(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1453)
4₀(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₀(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1454)
4₄(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₄(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1455)
4₅(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₅(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1456)
4₁(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₁(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1457)
4₃(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₃(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1458)
4₂(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₂(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1459)
4₀(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₀(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1460)
1₃(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	4₃(4₁(2₁(2₃(0₃(4₅(5₁(3₀(4₂(4₁(1₁(x1)))))))))))	(1461)

1.1.1.1.1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

There are 122 ruless (increase limit for explicit display).

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

[5₀(x₁)]

x₁ +

[5₁(x₁)]

x₁ +

[5₂(x₁)]

x₁ +

[5₃(x₁)]

x₁ +

[5₄(x₁)]

x₁ +

[5₅(x₁)]

x₁ +

[4₀(x₁)]

x₁ +

[4₁(x₁)]

x₁ +

[4₂(x₁)]

x₁ +

[4₃(x₁)]

x₁ +

[4₄(x₁)]

x₁ +

[4₅(x₁)]

x₁ +

[3₀(x₁)]

x₁ +

[3₁(x₁)]

x₁ +

[3₂(x₁)]

x₁ +

[3₃(x₁)]

x₁ +

[3₄(x₁)]

x₁ +

[3₅(x₁)]

x₁ +

[2₀(x₁)]

x₁ +

[2₁(x₁)]

x₁ +

[2₂(x₁)]

x₁ +

[2₃(x₁)]

x₁ +

[2₄(x₁)]

x₁ +

[2₅(x₁)]

x₁ +

[1₀(x₁)]

x₁ +

[1₁(x₁)]

x₁ +

[1₂(x₁)]

x₁ +

[1₃(x₁)]

x₁ +

[1₄(x₁)]

x₁ +

[0₀(x₁)]

x₁ +

[0₁(x₁)]

x₁ +

[0₂(x₁)]

x₁ +

[0₃(x₁)]

x₁ +

[0₄(x₁)]

x₁ +

[0₅(x₁)]

x₁ +

[5₄^#(x₁)]

x₁ +

[4₀^#(x₁)]

x₁ +

[4₁^#(x₁)]

x₁ +

[4₂^#(x₁)]

x₁ +

[4₃^#(x₁)]

x₁ +

[4₄^#(x₁)]

x₁ +

[4₅^#(x₁)]

x₁ +

[3₀^#(x₁)]

x₁ +

[2₄^#(x₁)]

x₁ +

[1₀^#(x₁)]

x₁ +

[1₂^#(x₁)]

x₁ +

[1₃^#(x₁)]

x₁ +

[0₁^#(x₁)]

x₁ +

together with the usable rules

3₀(4₂(1₁(0₄(5₅(1₀(x1))))))	→	0₀(3₅(3₂(4₂(0₁(2₅(2₃(4₃(5₁(3₀(1₂(x1)))))))))))	(1420)
3₀(4₂(1₁(0₄(5₅(3₀(x1))))))	→	0₀(3₅(3₂(4₂(0₁(2₅(2₃(4₃(5₁(3₀(3₂(x1)))))))))))	(1421)
2₄(5₃(5₀(5₀(5₀(1₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(1₀(x1)))))))))))	(1422)
2₄(5₃(5₀(5₀(5₀(0₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(0₀(x1)))))))))))	(1423)
2₄(5₃(5₀(5₀(5₀(4₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(4₀(x1)))))))))))	(1424)
2₄(5₃(5₀(5₀(5₀(2₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(2₀(x1)))))))))))	(1425)
2₄(5₃(5₀(5₀(5₀(3₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(3₀(x1)))))))))))	(1426)
2₄(5₃(5₀(5₀(5₀(5₀(x1))))))	→	0₄(0₅(5₅(1₀(3₄(3₂(0₂(2₅(2₃(5₃(5₀(x1)))))))))))	(1427)
5₄(2₀(5₃(0₀(5₅(0₀(2₅(x1)))))))	→	1₄(4₄(3₁(1₂(5₄(2₀(0₃(0₅(2₅(4₃(2₁(x1)))))))))))	(1428)
4₄(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₄(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1429)
4₅(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₅(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1430)
4₁(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1431)
4₃(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₃(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1432)
4₂(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1433)
4₀(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₀(4₁(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))))	(1434)
0₁(4₅(2₁(3₃(4₂(5₁(1₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(1₀(x1)))))))))))	(1435)
0₁(4₅(2₁(3₃(4₂(5₁(0₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(0₀(x1)))))))))))	(1436)
0₁(4₅(2₁(3₃(4₂(5₁(4₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(4₀(x1)))))))))))	(1437)
0₁(4₅(2₁(3₃(4₂(5₁(2₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(2₀(x1)))))))))))	(1438)
0₁(4₅(2₁(3₃(4₂(5₁(3₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(3₀(x1)))))))))))	(1439)
0₁(4₅(2₁(3₃(4₂(5₁(5₀(x1)))))))	→	2₁(0₃(3₅(2₂(2₃(0₃(2₅(1₃(0₄(5₅(5₀(x1)))))))))))	(1440)
1₂(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	3₂(0₂(0₅(4₅(0₁(3₅(3₂(2₂(2₃(4₃(2₁(x1)))))))))))	(1441)
1₀(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	3₀(0₂(0₅(4₅(0₁(3₅(3₂(2₂(2₃(4₃(2₁(x1)))))))))))	(1442)
4₄(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₄(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1443)
4₅(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₅(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1444)
4₁(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₁(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1445)
4₃(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₃(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1446)
4₂(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₂(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1447)
4₀(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₀(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))))	(1448)
4₄(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₄(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1449)
4₅(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₅(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1450)
4₁(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₁(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1451)
4₃(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₃(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1452)
4₂(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₂(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1453)
4₀(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₀(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))))	(1454)
4₄(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₄(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1455)
4₅(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₅(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1456)
4₁(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₁(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1457)
4₃(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₃(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1458)
4₂(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₂(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1459)
4₀(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₀(4₁(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))))	(1460)
1₃(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	4₃(4₁(2₁(2₃(0₃(4₅(5₁(3₀(4₂(4₁(1₁(x1)))))))))))	(1461)

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

5₄^#(2₀(5₃(0₀(5₅(0₀(2₅(x1)))))))	→	5₄^#(2₀(0₃(0₅(2₅(4₃(2₁(x1)))))))	(1462)
5₄^#(2₀(5₃(0₀(5₅(0₀(2₅(x1)))))))	→	4₃^#(2₁(x1))	(1463)
5₄^#(2₀(5₃(0₀(5₅(0₀(2₅(x1)))))))	→	4₄^#(3₁(1₂(5₄(2₀(0₃(0₅(2₅(4₃(2₁(x1))))))))))	(1464)
5₄^#(2₀(5₃(0₀(5₅(0₀(2₅(x1)))))))	→	1₂^#(5₄(2₀(0₃(0₅(2₅(4₃(2₁(x1))))))))	(1465)
4₀^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1))))))))))	(1467)
4₀^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))	(1468)
4₀^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1))))))))))	(1470)
4₀^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))	(1471)
4₀^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1))))))))))	(1473)
4₀^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))	(1474)
4₀^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1))))))))))	(1476)
4₀^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))	(1477)
4₀^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂^#(3₁(5₂(5₀(0₀(x1)))))	(1478)
4₀^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	2₄^#(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))	(1479)
4₁^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))	(1482)
4₁^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))	(1485)
4₁^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))	(1488)
4₁^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂^#(3₁(5₂(5₀(0₀(x1)))))	(1492)
4₁^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	2₄^#(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))	(1493)
4₂^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1))))))))))	(1494)
4₂^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))	(1496)
4₂^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1))))))))))	(1497)
4₂^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))	(1499)
4₂^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1))))))))))	(1500)
4₂^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))	(1502)
4₂^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1))))))))))	(1503)
4₂^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))	(1504)
4₂^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂^#(3₁(5₂(5₀(0₀(x1)))))	(1506)
4₂^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	2₄^#(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))	(1507)
4₃^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1))))))))))	(1508)
4₃^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))	(1510)
4₃^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1))))))))))	(1511)
4₃^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))	(1513)
4₃^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1))))))))))	(1514)
4₃^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))	(1516)
4₃^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1))))))))))	(1517)
4₃^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))	(1518)
4₃^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂^#(3₁(5₂(5₀(0₀(x1)))))	(1519)
4₃^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	2₄^#(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))	(1521)
4₄^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1))))))))))	(1522)
4₄^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))	(1524)
4₄^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1))))))))))	(1525)
4₄^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))	(1527)
4₄^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1))))))))))	(1528)
4₄^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))	(1530)
4₄^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1))))))))))	(1531)
4₄^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))	(1532)
4₄^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂^#(3₁(5₂(5₀(0₀(x1)))))	(1533)
4₄^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	2₄^#(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))	(1535)
4₅^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1))))))))))	(1536)
4₅^#(3₁(2₂(4₃(2₁(4₃(0₁(3₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(3₃(x1)))))))))	(1538)
4₅^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1))))))))))	(1539)
4₅^#(3₁(2₂(4₃(2₁(4₃(0₁(2₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(2₃(x1)))))))))	(1541)
4₅^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	4₁^#(0₁(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1))))))))))	(1542)
4₅^#(3₁(2₂(4₃(2₁(4₃(0₁(0₅(x1))))))))	→	0₁^#(2₅(5₃(5₀(0₀(0₅(0₅(2₅(0₃(x1)))))))))	(1544)
4₅^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(4₁(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1))))))))))	(1545)
4₅^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₁^#(1₁(2₄(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))))	(1546)
4₅^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	4₂^#(3₁(5₂(5₀(0₀(x1)))))	(1547)
4₅^#(1₁(3₄(1₂(4₄(2₁(0₃(x1)))))))	→	2₄^#(3₃(4₂(3₁(5₂(5₀(0₀(x1)))))))	(1549)
3₀^#(4₂(1₁(0₄(5₅(3₀(x1))))))	→	4₂^#(0₁(2₅(2₃(4₃(5₁(3₀(3₂(x1))))))))	(1550)
3₀^#(4₂(1₁(0₄(5₅(3₀(x1))))))	→	4₃^#(5₁(3₀(3₂(x1))))	(1551)
3₀^#(4₂(1₁(0₄(5₅(3₀(x1))))))	→	3₀^#(3₂(x1))	(1552)
3₀^#(4₂(1₁(0₄(5₅(3₀(x1))))))	→	0₁^#(2₅(2₃(4₃(5₁(3₀(3₂(x1)))))))	(1553)
3₀^#(4₂(1₁(0₄(5₅(1₀(x1))))))	→	4₂^#(0₁(2₅(2₃(4₃(5₁(3₀(1₂(x1))))))))	(1554)
3₀^#(4₂(1₁(0₄(5₅(1₀(x1))))))	→	4₃^#(5₁(3₀(1₂(x1))))	(1555)
3₀^#(4₂(1₁(0₄(5₅(1₀(x1))))))	→	3₀^#(1₂(x1))	(1556)
3₀^#(4₂(1₁(0₄(5₅(1₀(x1))))))	→	1₂^#(x1)	(1557)
3₀^#(4₂(1₁(0₄(5₅(1₀(x1))))))	→	0₁^#(2₅(2₃(4₃(5₁(3₀(1₂(x1)))))))	(1558)
2₄^#(5₃(5₀(5₀(5₀(5₀(x1))))))	→	1₀^#(3₄(3₂(0₂(2₅(2₃(5₃(5₀(x1))))))))	(1559)
2₄^#(5₃(5₀(5₀(5₀(4₀(x1))))))	→	1₀^#(3₄(3₂(0₂(2₅(2₃(5₃(4₀(x1))))))))	(1560)
2₄^#(5₃(5₀(5₀(5₀(3₀(x1))))))	→	1₀^#(3₄(3₂(0₂(2₅(2₃(5₃(3₀(x1))))))))	(1561)
2₄^#(5₃(5₀(5₀(5₀(2₀(x1))))))	→	1₀^#(3₄(3₂(0₂(2₅(2₃(5₃(2₀(x1))))))))	(1562)
2₄^#(5₃(5₀(5₀(5₀(1₀(x1))))))	→	1₀^#(3₄(3₂(0₂(2₅(2₃(5₃(1₀(x1))))))))	(1563)
2₄^#(5₃(5₀(5₀(5₀(0₀(x1))))))	→	1₀^#(3₄(3₂(0₂(2₅(2₃(5₃(0₀(x1))))))))	(1564)
1₀^#(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	4₃^#(2₁(x1))	(1565)
1₀^#(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	4₅^#(0₁(3₅(3₂(2₂(2₃(4₃(2₁(x1))))))))	(1566)
1₀^#(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	3₀^#(0₂(0₅(4₅(0₁(3₅(3₂(2₂(2₃(4₃(2₁(x1)))))))))))	(1567)
1₀^#(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	0₁^#(3₅(3₂(2₂(2₃(4₃(2₁(x1)))))))	(1568)
1₂^#(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	4₃^#(2₁(x1))	(1569)
1₂^#(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	4₅^#(0₁(3₅(3₂(2₂(2₃(4₃(2₁(x1))))))))	(1570)
1₂^#(0₄(3₅(1₂(1₄(1₄(0₄(2₅(x1))))))))	→	0₁^#(3₅(3₂(2₂(2₃(4₃(2₁(x1)))))))	(1571)
1₃^#(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	4₁^#(2₁(2₃(0₃(4₅(5₁(3₀(4₂(4₁(1₁(x1))))))))))	(1572)
1₃^#(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	4₁^#(1₁(x1))	(1573)
1₃^#(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	4₂^#(4₁(1₁(x1)))	(1574)
1₃^#(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	4₃^#(4₁(2₁(2₃(0₃(4₅(5₁(3₀(4₂(4₁(1₁(x1)))))))))))	(1575)
1₃^#(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	4₅^#(5₁(3₀(4₂(4₁(1₁(x1))))))	(1576)
1₃^#(4₄(3₁(3₂(2₂(4₃(2₁(1₃(x1))))))))	→	3₀^#(4₂(4₁(1₁(x1))))	(1577)
0₁^#(4₅(2₁(3₃(4₂(5₁(5₀(x1)))))))	→	1₃^#(0₄(5₅(5₀(x1))))	(1578)
0₁^#(4₅(2₁(3₃(4₂(5₁(4₀(x1)))))))	→	1₃^#(0₄(5₅(4₀(x1))))	(1579)
0₁^#(4₅(2₁(3₃(4₂(5₁(3₀(x1)))))))	→	1₃^#(0₄(5₅(3₀(x1))))	(1580)
0₁^#(4₅(2₁(3₃(4₂(5₁(2₀(x1)))))))	→	1₃^#(0₄(5₅(2₀(x1))))	(1581)
0₁^#(4₅(2₁(3₃(4₂(5₁(1₀(x1)))))))	→	1₃^#(0₄(5₅(1₀(x1))))	(1582)
0₁^#(4₅(2₁(3₃(4₂(5₁(0₀(x1)))))))	→	1₃^#(0₄(5₅(0₀(x1))))	(1583)

and no rules could be deleted.

1.1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 0 components.