Certification Problem

Input (TPDB SRS_Standard/ICFP_2010/25416)

The rewrite relation of the following TRS is considered.

0(0(1(2(3(4(x1)))))) 3(0(2(1(0(4(x1)))))) (1)
3(0(3(3(2(1(5(x1))))))) 3(3(3(1(0(2(5(x1))))))) (2)
1(2(3(0(3(5(4(0(x1)))))))) 1(2(3(3(5(0(4(0(x1)))))))) (3)
3(0(3(0(1(2(2(0(x1)))))))) 3(1(3(0(0(2(2(0(x1)))))))) (4)
3(1(4(5(2(3(5(3(4(0(x1)))))))))) 3(1(4(3(5(2(5(3(4(0(x1)))))))))) (5)
5(3(1(2(0(2(4(4(2(3(x1)))))))))) 0(5(4(0(2(3(4(4(1(3(x1)))))))))) (6)
0(0(2(3(1(3(4(0(1(4(1(x1))))))))))) 0(2(3(1(2(5(3(5(3(0(x1)))))))))) (7)
0(1(2(2(4(2(2(2(2(2(4(x1))))))))))) 4(1(5(5(4(5(4(5(0(1(x1)))))))))) (8)
0(1(2(3(3(2(0(4(0(1(4(x1))))))))))) 2(0(5(4(3(5(2(3(4(1(x1)))))))))) (9)
0(1(5(1(3(2(0(2(3(4(4(x1))))))))))) 3(0(1(0(4(0(2(2(0(5(x1)))))))))) (10)
0(3(3(0(5(5(0(1(4(1(3(x1))))))))))) 4(4(0(2(0(3(4(0(4(1(x1)))))))))) (11)
0(5(0(0(1(2(3(4(5(0(3(x1))))))))))) 4(0(1(3(3(5(2(5(0(0(x1)))))))))) (12)
1(2(2(1(0(1(5(2(0(2(4(x1))))))))))) 1(2(2(0(1(1(5(2(0(2(4(x1))))))))))) (13)
1(3(3(4(0(3(4(0(5(5(2(x1))))))))))) 1(4(0(5(3(1(2(3(0(3(x1)))))))))) (14)
1(4(2(2(5(2(4(1(2(1(2(x1))))))))))) 5(0(3(5(3(5(5(5(4(5(x1)))))))))) (15)
2(0(2(1(1(5(2(5(3(3(5(x1))))))))))) 4(1(0(3(3(0(5(5(4(0(x1)))))))))) (16)
2(0(5(3(2(2(1(4(3(0(5(x1))))))))))) 5(4(5(0(5(1(1(5(4(1(x1)))))))))) (17)
2(1(1(2(3(0(3(5(2(2(5(x1))))))))))) 0(3(1(0(2(1(0(0(4(4(x1)))))))))) (18)
2(2(1(3(0(1(4(3(3(3(4(x1))))))))))) 5(0(1(4(5(4(4(5(4(3(x1)))))))))) (19)
2(5(2(3(0(2(5(0(2(0(5(x1))))))))))) 0(0(4(2(5(1(1(5(5(3(x1)))))))))) (20)
2(5(5(5(1(1(5(4(5(2(0(x1))))))))))) 2(0(1(1(5(3(4(3(1(5(x1)))))))))) (21)
3(0(5(3(5(2(0(3(0(1(4(x1))))))))))) 0(0(4(0(0(3(1(1(3(0(x1)))))))))) (22)
3(1(5(2(1(0(2(0(4(3(3(x1))))))))))) 3(5(2(2(3(1(0(4(5(5(x1)))))))))) (23)
3(2(1(3(1(2(2(1(3(1(3(x1))))))))))) 1(2(0(4(5(2(4(4(3(0(x1)))))))))) (24)
3(3(0(2(5(5(4(1(3(4(0(x1))))))))))) 3(3(0(2(2(0(5(4(3(3(x1)))))))))) (25)
3(3(3(3(2(2(4(1(2(5(1(x1))))))))))) 1(1(2(3(3(0(2(1(3(1(x1)))))))))) (26)
3(5(1(1(4(4(4(1(0(3(1(x1))))))))))) 4(3(1(4(3(1(4(1(0(5(1(x1))))))))))) (27)
4(2(0(1(2(2(3(1(3(5(2(x1))))))))))) 5(4(4(2(3(2(1(3(0(2(x1)))))))))) (28)
4(2(2(5(5(0(4(1(0(2(5(x1))))))))))) 2(4(1(4(4(1(2(4(1(3(x1)))))))))) (29)
4(4(4(4(2(3(5(1(5(0(5(x1))))))))))) 3(4(0(2(4(5(4(5(3(3(x1)))))))))) (30)
4(5(3(1(0(2(1(0(1(1(3(x1))))))))))) 5(2(5(5(4(4(0(1(3(1(x1)))))))))) (31)
5(0(2(2(3(1(4(0(4(2(1(x1))))))))))) 1(1(2(3(0(2(2(5(3(1(x1)))))))))) (32)
5(1(1(0(4(1(2(4(4(4(0(x1))))))))))) 3(0(0(5(4(5(3(0(5(4(x1)))))))))) (33)
5(2(4(0(0(4(4(3(1(2(1(x1))))))))))) 4(4(3(0(0(2(0(5(1(2(x1)))))))))) (34)
5(3(1(1(5(5(4(3(1(3(2(x1))))))))))) 4(4(3(3(5(3(1(4(0(1(x1)))))))))) (35)
5(3(2(4(4(1(0(3(2(1(3(x1))))))))))) 4(0(5(2(1(4(3(2(1(3(x1)))))))))) (36)
5(4(2(2(5(0(2(3(0(1(3(x1))))))))))) 1(4(4(3(4(0(5(5(4(5(x1)))))))))) (37)
5(5(3(3(5(2(4(0(2(2(0(x1))))))))))) 5(3(5(5(4(4(5(3(1(4(x1)))))))))) (38)
0(1(3(0(3(1(5(2(3(3(4(5(x1)))))))))))) 4(1(4(3(3(5(4(2(3(4(x1)))))))))) (39)
0(4(4(3(0(2(5(0(1(5(2(0(x1)))))))))))) 1(0(0(1(2(0(3(2(0(5(x1)))))))))) (40)
0(5(4(0(1(3(1(1(0(2(0(3(x1)))))))))))) 1(2(1(1(3(5(5(5(2(0(x1)))))))))) (41)
1(0(3(0(5(1(3(5(3(0(0(2(x1)))))))))))) 1(2(2(5(4(3(0(3(2(0(x1)))))))))) (42)
1(2(0(3(1(1(2(3(4(4(5(5(x1)))))))))))) 5(0(4(0(0(5(1(1(5(1(x1)))))))))) (43)
1(3(0(4(3(2(4(0(5(5(1(4(x1)))))))))))) 1(3(0(4(3(2(0(4(5(5(1(4(x1)))))))))))) (44)
1(5(0(3(4(3(0(5(4(1(1(3(x1)))))))))))) 3(1(4(2(2(5(5(4(3(0(x1)))))))))) (45)
2(1(4(3(3(0(0(0(1(3(1(1(x1)))))))))))) 4(5(2(1(2(2(5(2(3(3(x1)))))))))) (46)
2(1(4(4(3(5(0(2(3(2(2(4(x1)))))))))))) 3(5(1(5(2(0(0(4(4(4(x1)))))))))) (47)
2(4(0(5(1(3(3(2(3(1(3(5(x1)))))))))))) 2(4(0(5(3(1(3(2(3(1(3(5(x1)))))))))))) (48)
3(0(4(1(0(5(5(2(1(4(5(3(x1)))))))))))) 4(5(2(2(3(0(5(4(2(1(x1)))))))))) (49)
3(1(1(4(1(5(1(0(3(3(4(3(x1)))))))))))) 0(5(3(0(4(1(4(4(2(5(x1)))))))))) (50)
3(4(0(4(3(1(4(2(0(1(0(3(x1)))))))))))) 5(1(3(3(1(2(4(0(5(0(x1)))))))))) (51)
3(4(4(5(3(0(4(3(5(4(5(2(x1)))))))))))) 4(2(1(0(2(2(5(0(5(0(x1)))))))))) (52)
4(0(5(4(3(4(2(4(3(3(2(4(x1)))))))))))) 1(2(1(2(1(0(1(1(4(3(x1)))))))))) (53)
4(1(1(2(0(0(3(3(2(0(2(3(x1)))))))))))) 4(1(1(2(0(3(0(3(2(0(2(3(x1)))))))))))) (54)
4(1(2(1(2(0(3(1(1(2(4(2(x1)))))))))))) 5(3(0(2(4(4(0(3(5(1(x1)))))))))) (55)
4(2(1(5(4(3(0(5(3(3(1(1(x1)))))))))))) 5(5(4(4(1(3(1(4(5(0(x1)))))))))) (56)
5(4(4(0(3(4(0(3(0(5(3(4(x1)))))))))))) 5(4(4(3(0(4(0(3(5(0(3(4(x1)))))))))))) (57)
0(1(1(0(2(2(2(2(1(4(0(1(5(x1))))))))))))) 3(0(5(1(5(2(2(4(2(4(x1)))))))))) (58)
1(4(5(0(0(4(0(2(1(4(5(3(3(x1))))))))))))) 1(5(0(4(0(4(0(2(1(4(5(3(3(x1))))))))))))) (59)
2(0(0(3(3(2(0(0(0(5(2(1(5(x1))))))))))))) 2(0(0(3(3(0(2(0(0(5(2(1(5(x1))))))))))))) (60)
2(1(1(0(0(5(2(3(4(1(5(2(3(x1))))))))))))) 3(5(1(4(5(2(2(2(4(2(x1)))))))))) (61)
2(1(1(1(2(2(5(2(3(5(5(1(1(x1))))))))))))) 1(3(2(1(4(3(2(2(3(5(x1)))))))))) (62)
3(1(1(5(3(1(1(4(2(5(1(5(3(x1))))))))))))) 4(2(3(3(4(0(0(0(0(1(x1)))))))))) (63)
3(4(1(1(4(3(0(0(3(0(0(4(3(4(x1)))))))))))))) 3(4(1(1(4(3(0(3(0(0(0(4(3(4(x1)))))))))))))) (64)
3(5(5(5(4(4(0(5(0(5(4(5(2(0(0(x1))))))))))))))) 3(5(5(0(4(5(4(0(5(5(4(5(0(2(0(x1))))))))))))))) (65)
0(2(4(1(1(5(3(0(5(1(3(0(0(3(2(1(x1)))))))))))))))) 0(2(4(1(1(5(3(0(5(1(3(0(3(0(2(1(x1)))))))))))))))) (66)
5(4(0(3(5(4(4(2(5(1(3(3(5(5(4(2(x1)))))))))))))))) 5(4(0(3(5(4(4(5(2(1(3(3(5(5(4(2(x1)))))))))))))))) (67)
3(5(0(3(0(0(4(0(5(1(1(2(1(2(1(1(0(x1))))))))))))))))) 3(5(0(3(0(0(4(0(5(1(1(2(1(1(2(1(0(x1))))))))))))))))) (68)
1(2(0(3(3(2(1(1(2(5(2(2(1(4(3(1(1(2(x1)))))))))))))))))) 1(2(3(0(3(2(1(1(2(5(2(2(4(1(3(1(1(2(x1)))))))))))))))))) (69)
5(2(0(1(2(0(5(0(0(5(0(3(1(4(0(3(3(3(x1)))))))))))))))))) 5(2(0(1(0(2(5(0(0(5(0(3(1(4(0(3(3(3(x1)))))))))))))))))) (70)
2(0(3(0(2(3(2(0(1(5(1(1(5(1(3(2(2(4(0(x1))))))))))))))))))) 2(0(3(0(2(3(2(0(1(5(1(5(1(1(3(2(2(4(0(x1))))))))))))))))))) (71)
3(3(3(2(5(4(2(0(5(4(0(2(3(2(1(3(1(5(2(x1))))))))))))))))))) 3(3(3(2(5(4(2(0(5(4(0(2(3(2(3(1(1(5(2(x1))))))))))))))))))) (72)
5(1(5(5(0(5(4(2(0(5(2(4(0(0(5(5(0(0(2(x1))))))))))))))))))) 5(1(5(5(0(5(4(2(0(2(5(4(0(0(5(5(0(0(2(x1))))))))))))))))))) (73)
0(0(0(0(0(0(4(5(5(4(0(5(0(3(5(1(5(3(4(4(x1)))))))))))))))))))) 0(0(0(0(0(0(5(4(5(4(0(5(0(3(5(1(5(3(4(4(x1)))))))))))))))))))) (74)
4(0(1(4(1(4(5(2(5(2(3(1(3(4(5(4(0(2(2(1(3(x1))))))))))))))))))))) 4(0(4(1(1(4(5(2(5(2(3(1(3(4(5(4(0(2(2(1(3(x1))))))))))))))))))))) (75)
3(2(2(2(2(4(0(2(2(4(4(2(3(5(3(2(5(0(4(2(0(3(x1)))))))))))))))))))))) 3(2(2(4(2(4(2(5(0(2(0(3(2(4(2(2(4(2(5(0(3(3(x1)))))))))))))))))))))) (76)
5(2(3(5(0(2(2(4(0(3(3(5(0(5(1(1(2(1(1(2(1(3(x1)))))))))))))))))))))) 5(2(3(5(0(2(2(4(0(3(3(5(0(5(1(2(1(1(1(2(1(3(x1)))))))))))))))))))))) (77)
5(4(0(0(3(3(4(2(3(3(5(0(4(0(3(4(0(4(0(1(3(1(x1)))))))))))))))))))))) 5(0(4(0(3(3(4(2(3(3(5(0(4(0(3(4(0(4(0(1(3(1(x1)))))))))))))))))))))) (78)
0(3(2(2(1(5(0(0(0(4(0(4(1(2(3(5(0(2(1(1(3(2(2(x1))))))))))))))))))))))) 0(3(2(2(5(1(0(0(0(4(0(4(1(2(3(5(0(2(1(1(3(2(2(x1))))))))))))))))))))))) (79)
2(0(5(0(1(0(0(5(3(4(5(5(3(4(4(2(1(5(5(4(2(0(0(x1))))))))))))))))))))))) 2(0(5(0(1(0(5(0(3(4(5(5(3(4(4(2(1(5(5(4(2(0(0(x1))))))))))))))))))))))) (80)
5(4(2(4(4(2(1(3(4(5(1(4(0(3(5(0(3(1(2(3(4(2(2(x1))))))))))))))))))))))) 5(4(2(4(4(2(1(3(4(5(1(4(0(3(0(5(3(1(2(3(4(2(2(x1))))))))))))))))))))))) (81)
1(4(4(2(5(0(3(5(2(2(4(0(0(5(5(3(0(1(5(0(4(5(2(1(x1)))))))))))))))))))))))) 1(4(4(2(5(0(3(5(2(4(2(0(0(5(5(3(0(1(5(0(4(5(2(1(x1)))))))))))))))))))))))) (82)
0(4(1(0(0(2(4(4(3(4(5(0(0(0(4(0(1(3(0(2(4(3(3(3(3(x1))))))))))))))))))))))))) 0(4(1(0(0(2(4(4(3(4(5(0(0(0(4(0(3(1(0(2(4(3(3(3(3(x1))))))))))))))))))))))))) (83)
2(1(3(2(4(0(1(3(4(0(4(3(2(4(0(4(1(2(1(3(4(3(4(0(0(x1))))))))))))))))))))))))) 2(1(3(4(2(0(1(3(4(0(4(3(2(4(0(4(1(2(1(3(4(3(4(0(0(x1))))))))))))))))))))))))) (84)
1(5(2(4(5(1(2(1(1(0(1(5(0(2(3(0(1(3(2(4(2(5(3(4(2(0(x1)))))))))))))))))))))))))) 1(5(2(4(1(5(2(1(1(0(1(5(0(2(3(0(1(3(2(4(2(5(3(4(2(0(x1)))))))))))))))))))))))))) (85)
3(5(1(1(3(1(0(2(5(2(1(4(5(1(5(4(5(1(4(3(4(5(2(2(3(5(x1)))))))))))))))))))))))))) 3(5(1(1(3(1(0(2(5(2(1(4(5(1(5(4(5(1(4(4(3(5(2(2(3(5(x1)))))))))))))))))))))))))) (86)
4(3(4(5(2(1(3(3(5(3(5(0(3(3(2(4(0(3(0(2(0(3(0(3(1(5(x1)))))))))))))))))))))))))) 4(3(4(5(1(2(3(5(3(5(3(3(0(3(2(0(4(3(0(2(0(0(3(3(1(5(x1)))))))))))))))))))))))))) (87)
5(1(0(0(5(0(0(0(5(1(3(2(1(0(4(2(4(4(2(2(4(1(3(4(2(3(x1)))))))))))))))))))))))))) 5(1(0(0(5(0(0(0(5(3(1(2(1(0(4(2(4(4(2(2(4(1(3(4(2(3(x1)))))))))))))))))))))))))) (88)
2(0(3(5(4(2(2(3(2(5(5(0(5(2(4(3(0(1(5(1(1(1(1(1(2(2(2(x1))))))))))))))))))))))))))) 2(0(3(5(4(2(2(3(2(5(0(5(5(2(4(3(0(1(5(1(1(1(1(1(2(2(2(x1))))))))))))))))))))))))))) (89)
4(4(3(5(3(5(4(1(1(3(5(2(1(5(2(5(1(4(4(1(5(0(1(2(0(1(0(x1))))))))))))))))))))))))))) 4(4(3(5(5(3(4(1(1(5(3(2(1(5(2(5(1(4(4(1(5(0(1(2(0(1(0(x1))))))))))))))))))))))))))) (90)
0(0(2(4(2(4(2(1(1(5(3(0(1(1(5(5(3(2(4(1(0(0(2(1(0(3(0(5(x1)))))))))))))))))))))))))))) 0(0(2(4(2(4(2(1(1(5(0(3(1(1(5(5(3(2(4(1(0(0(2(1(0(3(0(5(x1)))))))))))))))))))))))))))) (91)
5(4(4(2(2(3(3(3(5(5(4(0(4(2(5(5(1(1(4(2(2(3(4(2(4(0(2(3(x1)))))))))))))))))))))))))))) 5(4(4(2(2(3(3(3(5(5(0(4(4(2(5(5(1(1(4(2(2(3(4(2(4(0(2(3(x1)))))))))))))))))))))))))))) (92)
0(2(1(0(1(5(3(3(4(4(2(4(2(3(3(3(1(1(4(0(0(4(2(3(3(1(1(5(2(x1))))))))))))))))))))))))))))) 0(2(1(0(1(5(3(3(4(4(2(4(2(3(3(3(1(1(4(0(0(4(3(2(3(1(1(5(2(x1))))))))))))))))))))))))))))) (93)
4(0(4(5(2(1(5(4(4(5(3(4(2(3(1(1(4(1(5(1(4(0(1(5(4(0(0(4(3(x1))))))))))))))))))))))))))))) 4(0(4(5(2(1(5(4(4(5(3(4(2(3(1(1(4(1(5(1(4(0(1(5(0(4(0(4(3(x1))))))))))))))))))))))))))))) (94)
3(5(5(4(5(5(2(5(1(1(3(0(1(0(1(5(3(5(0(5(2(5(0(2(4(2(1(1(1(4(x1)))))))))))))))))))))))))))))) 3(5(5(4(5(5(2(5(1(1(3(0(1(0(1(5(3(5(0(5(5(2(0(2(4(2(1(1(1(4(x1)))))))))))))))))))))))))))))) (95)

Property / Task

Prove or disprove termination.

Answer / Result

Yes.

Proof (by matchbox @ termCOMP 2023)

1 Rule Removal

Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1
[5(x1)] = x1 +
25
[4(x1)] = x1 +
22
[3(x1)] = x1 +
36
[2(x1)] = x1 +
37
[1(x1)] = x1 +
36
[0(x1)] = x1 +
36
all of the following rules can be deleted.
5(3(1(2(0(2(4(4(2(3(x1)))))))))) 0(5(4(0(2(3(4(4(1(3(x1)))))))))) (6)
0(0(2(3(1(3(4(0(1(4(1(x1))))))))))) 0(2(3(1(2(5(3(5(3(0(x1)))))))))) (7)
0(1(2(2(4(2(2(2(2(2(4(x1))))))))))) 4(1(5(5(4(5(4(5(0(1(x1)))))))))) (8)
0(1(2(3(3(2(0(4(0(1(4(x1))))))))))) 2(0(5(4(3(5(2(3(4(1(x1)))))))))) (9)
0(1(5(1(3(2(0(2(3(4(4(x1))))))))))) 3(0(1(0(4(0(2(2(0(5(x1)))))))))) (10)
0(3(3(0(5(5(0(1(4(1(3(x1))))))))))) 4(4(0(2(0(3(4(0(4(1(x1)))))))))) (11)
0(5(0(0(1(2(3(4(5(0(3(x1))))))))))) 4(0(1(3(3(5(2(5(0(0(x1)))))))))) (12)
1(3(3(4(0(3(4(0(5(5(2(x1))))))))))) 1(4(0(5(3(1(2(3(0(3(x1)))))))))) (14)
1(4(2(2(5(2(4(1(2(1(2(x1))))))))))) 5(0(3(5(3(5(5(5(4(5(x1)))))))))) (15)
2(0(2(1(1(5(2(5(3(3(5(x1))))))))))) 4(1(0(3(3(0(5(5(4(0(x1)))))))))) (16)
2(0(5(3(2(2(1(4(3(0(5(x1))))))))))) 5(4(5(0(5(1(1(5(4(1(x1)))))))))) (17)
2(1(1(2(3(0(3(5(2(2(5(x1))))))))))) 0(3(1(0(2(1(0(0(4(4(x1)))))))))) (18)
2(2(1(3(0(1(4(3(3(3(4(x1))))))))))) 5(0(1(4(5(4(4(5(4(3(x1)))))))))) (19)
2(5(2(3(0(2(5(0(2(0(5(x1))))))))))) 0(0(4(2(5(1(1(5(5(3(x1)))))))))) (20)
2(5(5(5(1(1(5(4(5(2(0(x1))))))))))) 2(0(1(1(5(3(4(3(1(5(x1)))))))))) (21)
3(0(5(3(5(2(0(3(0(1(4(x1))))))))))) 0(0(4(0(0(3(1(1(3(0(x1)))))))))) (22)
3(1(5(2(1(0(2(0(4(3(3(x1))))))))))) 3(5(2(2(3(1(0(4(5(5(x1)))))))))) (23)
3(2(1(3(1(2(2(1(3(1(3(x1))))))))))) 1(2(0(4(5(2(4(4(3(0(x1)))))))))) (24)
3(3(0(2(5(5(4(1(3(4(0(x1))))))))))) 3(3(0(2(2(0(5(4(3(3(x1)))))))))) (25)
3(3(3(3(2(2(4(1(2(5(1(x1))))))))))) 1(1(2(3(3(0(2(1(3(1(x1)))))))))) (26)
4(2(0(1(2(2(3(1(3(5(2(x1))))))))))) 5(4(4(2(3(2(1(3(0(2(x1)))))))))) (28)
4(2(2(5(5(0(4(1(0(2(5(x1))))))))))) 2(4(1(4(4(1(2(4(1(3(x1)))))))))) (29)
4(4(4(4(2(3(5(1(5(0(5(x1))))))))))) 3(4(0(2(4(5(4(5(3(3(x1)))))))))) (30)
4(5(3(1(0(2(1(0(1(1(3(x1))))))))))) 5(2(5(5(4(4(0(1(3(1(x1)))))))))) (31)
5(0(2(2(3(1(4(0(4(2(1(x1))))))))))) 1(1(2(3(0(2(2(5(3(1(x1)))))))))) (32)
5(1(1(0(4(1(2(4(4(4(0(x1))))))))))) 3(0(0(5(4(5(3(0(5(4(x1)))))))))) (33)
5(2(4(0(0(4(4(3(1(2(1(x1))))))))))) 4(4(3(0(0(2(0(5(1(2(x1)))))))))) (34)
5(3(1(1(5(5(4(3(1(3(2(x1))))))))))) 4(4(3(3(5(3(1(4(0(1(x1)))))))))) (35)
5(3(2(4(4(1(0(3(2(1(3(x1))))))))))) 4(0(5(2(1(4(3(2(1(3(x1)))))))))) (36)
5(4(2(2(5(0(2(3(0(1(3(x1))))))))))) 1(4(4(3(4(0(5(5(4(5(x1)))))))))) (37)
5(5(3(3(5(2(4(0(2(2(0(x1))))))))))) 5(3(5(5(4(4(5(3(1(4(x1)))))))))) (38)
0(1(3(0(3(1(5(2(3(3(4(5(x1)))))))))))) 4(1(4(3(3(5(4(2(3(4(x1)))))))))) (39)
0(4(4(3(0(2(5(0(1(5(2(0(x1)))))))))))) 1(0(0(1(2(0(3(2(0(5(x1)))))))))) (40)
0(5(4(0(1(3(1(1(0(2(0(3(x1)))))))))))) 1(2(1(1(3(5(5(5(2(0(x1)))))))))) (41)
1(0(3(0(5(1(3(5(3(0(0(2(x1)))))))))))) 1(2(2(5(4(3(0(3(2(0(x1)))))))))) (42)
1(2(0(3(1(1(2(3(4(4(5(5(x1)))))))))))) 5(0(4(0(0(5(1(1(5(1(x1)))))))))) (43)
1(5(0(3(4(3(0(5(4(1(1(3(x1)))))))))))) 3(1(4(2(2(5(5(4(3(0(x1)))))))))) (45)
2(1(4(3(3(0(0(0(1(3(1(1(x1)))))))))))) 4(5(2(1(2(2(5(2(3(3(x1)))))))))) (46)
2(1(4(4(3(5(0(2(3(2(2(4(x1)))))))))))) 3(5(1(5(2(0(0(4(4(4(x1)))))))))) (47)
3(0(4(1(0(5(5(2(1(4(5(3(x1)))))))))))) 4(5(2(2(3(0(5(4(2(1(x1)))))))))) (49)
3(1(1(4(1(5(1(0(3(3(4(3(x1)))))))))))) 0(5(3(0(4(1(4(4(2(5(x1)))))))))) (50)
3(4(0(4(3(1(4(2(0(1(0(3(x1)))))))))))) 5(1(3(3(1(2(4(0(5(0(x1)))))))))) (51)
3(4(4(5(3(0(4(3(5(4(5(2(x1)))))))))))) 4(2(1(0(2(2(5(0(5(0(x1)))))))))) (52)
4(0(5(4(3(4(2(4(3(3(2(4(x1)))))))))))) 1(2(1(2(1(0(1(1(4(3(x1)))))))))) (53)
4(1(2(1(2(0(3(1(1(2(4(2(x1)))))))))))) 5(3(0(2(4(4(0(3(5(1(x1)))))))))) (55)
4(2(1(5(4(3(0(5(3(3(1(1(x1)))))))))))) 5(5(4(4(1(3(1(4(5(0(x1)))))))))) (56)
0(1(1(0(2(2(2(2(1(4(0(1(5(x1))))))))))))) 3(0(5(1(5(2(2(4(2(4(x1)))))))))) (58)
2(1(1(0(0(5(2(3(4(1(5(2(3(x1))))))))))))) 3(5(1(4(5(2(2(2(4(2(x1)))))))))) (61)
2(1(1(1(2(2(5(2(3(5(5(1(1(x1))))))))))))) 1(3(2(1(4(3(2(2(3(5(x1)))))))))) (62)
3(1(1(5(3(1(1(4(2(5(1(5(3(x1))))))))))))) 4(2(3(3(4(0(0(0(0(1(x1)))))))))) (63)

1.1 Closure Under Flat Contexts

Using the flat contexts

{5(), 4(), 3(), 2(), 1(), 0()}

We obtain the transformed TRS

There are 270 ruless (increase limit for explicit display).

1.1.1 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 1620 ruless (increase limit for explicit display).

1.1.1.1 Rule Removal

Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1
[50(x1)] = x1 +
1
[51(x1)] = x1 +
0
[52(x1)] = x1 +
5
[53(x1)] = x1 +
0
[54(x1)] = x1 +
19
[55(x1)] = x1 +
0
[40(x1)] = x1 +
19
[41(x1)] = x1 +
19
[42(x1)] = x1 +
5
[43(x1)] = x1 +
24
[44(x1)] = x1 +
0
[45(x1)] = x1 +
24
[30(x1)] = x1 +
19
[31(x1)] = x1 +
24
[32(x1)] = x1 +
19
[33(x1)] = x1 +
19
[34(x1)] = x1 +
0
[35(x1)] = x1 +
2
[20(x1)] = x1 +
2
[21(x1)] = x1 +
19
[22(x1)] = x1 +
0
[23(x1)] = x1 +
61
[24(x1)] = x1 +
21
[25(x1)] = x1 +
0
[10(x1)] = x1 +
5
[11(x1)] = x1 +
5
[12(x1)] = x1 +
19
[13(x1)] = x1 +
5
[14(x1)] = x1 +
19
[15(x1)] = x1 +
2
[00(x1)] = x1 +
0
[01(x1)] = x1 +
1
[02(x1)] = x1 +
21
[03(x1)] = x1 +
0
[04(x1)] = x1 +
61
[05(x1)] = x1 +
24
all of the following rules can be deleted.

There are 1440 ruless (increase limit for explicit display).

1.1.1.1.1 String Reversal

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

There are 180 ruless (increase limit for explicit display).

1.1.1.1.1.1 Dependency Pair Transformation

The following set of initial dependency pairs has been identified.

There are 936 ruless (increase limit for explicit display).

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
[50(x1)] = x1 +
1
[51(x1)] = x1 +
0
[52(x1)] = x1 +
0
[53(x1)] = x1 +
1
[54(x1)] = x1 +
1
[55(x1)] = x1 +
0
[40(x1)] = x1 +
0
[41(x1)] = x1 +
0
[42(x1)] = x1 +
1
[43(x1)] = x1 +
0
[44(x1)] = x1 +
0
[45(x1)] = x1 +
1
[30(x1)] = x1 +
0
[31(x1)] = x1 +
1
[32(x1)] = x1 +
0
[33(x1)] = x1 +
1
[34(x1)] = x1 +
0
[35(x1)] = x1 +
1
[20(x1)] = x1 +
0
[21(x1)] = x1 +
1
[22(x1)] = x1 +
0
[23(x1)] = x1 +
1
[24(x1)] = x1 +
1
[25(x1)] = x1 +
0
[10(x1)] = x1 +
1
[11(x1)] = x1 +
0
[12(x1)] = x1 +
1
[13(x1)] = x1 +
1
[14(x1)] = x1 +
1
[15(x1)] = x1 +
1
[00(x1)] = x1 +
1
[01(x1)] = x1 +
1
[02(x1)] = x1 +
1
[03(x1)] = x1 +
0
[04(x1)] = x1 +
1
[05(x1)] = x1 +
1
[40#(x1)] = x1 +
1
[41#(x1)] = x1 +
1
[42#(x1)] = x1 +
0
[43#(x1)] = x1 +
1
[44#(x1)] = x1 +
1
[45#(x1)] = x1 +
0
[30#(x1)] = x1 +
1
[31#(x1)] = x1 +
0
[32#(x1)] = x1 +
1
[33#(x1)] = x1 +
0
[34#(x1)] = x1 +
1
[35#(x1)] = x1 +
0
[20#(x1)] = x1 +
1
[21#(x1)] = x1 +
0
[22#(x1)] = x1 +
1
[23#(x1)] = x1 +
0
[24#(x1)] = x1 +
0
[25#(x1)] = x1 +
1
[00#(x1)] = x1 +
0
[01#(x1)] = x1 +
0
[02#(x1)] = x1 +
0
[03#(x1)] = x1 +
1
[04#(x1)] = x1 +
0
[05#(x1)] = x1 +
0
together with the usable rules

There are 180 ruless (increase limit for explicit display).

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

There are 756 ruless (increase limit for explicit display).

and no rules could be deleted.

1.1.1.1.1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 0 components.