YES Termination w.r.t. Q proof of /home/cern_httpd/provide/research/cycsrs/tpdb/TPDB-d9b80194f163/SRS_Standard/Zantema_06/15.srs

Termination w.r.t. Q of the given QTRS could be proven:

0 QTRS
1 FlatCCProof (⇔, 0 ms)
2 QTRS
3 RootLabelingProof (⇔, 0 ms)
4 QTRS
5 DependencyPairsProof (⇔, 101 ms)
6 QDP
7 DependencyGraphProof (⇔, 0 ms)
8 AND
9 QDP
10 QDPOrderProof (⇔, 220 ms)
11 QDP
12 DependencyGraphProof (⇔, 0 ms)
13 QDP
14 QDPOrderProof (⇔, 108 ms)
15 QDP
16 PisEmptyProof (⇔, 0 ms)
17 YES
18 QDP
19 QDPOrderProof (⇔, 185 ms)
20 QDP
21 PisEmptyProof (⇔, 0 ms)
22 YES

(0) Obligation:

Q restricted rewrite system:
The TRS R consists of the following rules:

a(x) → b(x)
a(a(x)) → a(b(a(x)))
a(b(x)) → b(b(b(x)))
a(a(a(x))) → a(a(b(a(a(x)))))
a(a(b(x))) → a(b(b(a(b(x)))))
a(b(a(x))) → b(a(b(b(a(x)))))
a(b(b(x))) → b(b(b(b(b(x)))))
a(a(a(a(x)))) → a(a(a(b(a(a(a(x)))))))
a(a(a(b(x)))) → a(a(b(b(a(a(b(x)))))))
a(a(b(a(x)))) → a(b(a(b(a(b(a(x)))))))
a(a(b(b(x)))) → a(b(b(b(a(b(b(x)))))))
a(b(a(a(x)))) → b(a(a(b(b(a(a(x)))))))
a(b(a(b(x)))) → b(a(b(b(b(a(b(x)))))))
a(b(b(a(x)))) → b(b(a(b(b(b(a(x)))))))
a(b(b(b(x)))) → b(b(b(b(b(b(b(x)))))))

Q is empty.

(1) FlatCCProof (EQUIVALENT transformation)

We used flat context closure [ROOTLAB] As Q is empty the flat context closure was sound AND complete.

(2) Obligation:

Q restricted rewrite system:
The TRS R consists of the following rules:

a(a(x)) → a(b(a(x)))
a(a(a(x))) → a(a(b(a(a(x)))))
a(a(b(x))) → a(b(b(a(b(x)))))
a(a(a(a(x)))) → a(a(a(b(a(a(a(x)))))))
a(a(a(b(x)))) → a(a(b(b(a(a(b(x)))))))
a(a(b(a(x)))) → a(b(a(b(a(b(a(x)))))))
a(a(b(b(x)))) → a(b(b(b(a(b(b(x)))))))
a(a(x)) → a(b(x))
b(a(x)) → b(b(x))
a(a(b(x))) → a(b(b(b(x))))
b(a(b(x))) → b(b(b(b(x))))
a(a(b(a(x)))) → a(b(a(b(b(a(x))))))
b(a(b(a(x)))) → b(b(a(b(b(a(x))))))
a(a(b(b(x)))) → a(b(b(b(b(b(x))))))
b(a(b(b(x)))) → b(b(b(b(b(b(x))))))
a(a(b(a(a(x))))) → a(b(a(a(b(b(a(a(x))))))))
b(a(b(a(a(x))))) → b(b(a(a(b(b(a(a(x))))))))
a(a(b(a(b(x))))) → a(b(a(b(b(b(a(b(x))))))))
b(a(b(a(b(x))))) → b(b(a(b(b(b(a(b(x))))))))
a(a(b(b(a(x))))) → a(b(b(a(b(b(b(a(x))))))))
b(a(b(b(a(x))))) → b(b(b(a(b(b(b(a(x))))))))
a(a(b(b(b(x))))) → a(b(b(b(b(b(b(b(x))))))))
b(a(b(b(b(x))))) → b(b(b(b(b(b(b(b(x))))))))

Q is empty.

(3) RootLabelingProof (EQUIVALENT transformation)

We used plain root labeling [ROOTLAB] with the following heuristic: LabelAll: All function symbols get labeled
As Q is empty the root labeling was sound AND complete.

(4) Obligation:

Q restricted rewrite system:
The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.

(5) DependencyPairsProof (EQUIVALENT transformation)

Using Dependency Pairs [AG00,LPAR04] we result in the following initial DP problem.

(6) Obligation:

Q DP problem:
The TRS P consists of the following rules:

A_{A_1}(a_{a_1}(x)) → B_{A_1}(a_{a_1}(x))
A_{A_1}(a_{b_1}(x)) → B_{A_1}(a_{b_1}(x))
A_{A_1}(a_{a_1}(a_{a_1}(x))) → A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
A_{A_1}(a_{a_1}(a_{a_1}(x))) → B_{A_1}(a_{a_1}(a_{a_1}(x)))
A_{A_1}(a_{a_1}(a_{b_1}(x))) → A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
A_{A_1}(a_{a_1}(a_{b_1}(x))) → B_{A_1}(a_{a_1}(a_{b_1}(x)))
A_{A_1}(a_{b_1}(b_{a_1}(x))) → B_{A_1}(a_{b_1}(b_{a_1}(x)))
A_{A_1}(a_{b_1}(b_{b_1}(x))) → B_{A_1}(a_{b_1}(b_{b_1}(x)))
A_{A_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
A_{A_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x))))))
A_{A_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → B_{A_1}(a_{a_1}(a_{a_1}(a_{a_1}(x))))
A_{A_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
A_{A_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x))))))
A_{A_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → B_{A_1}(a_{a_1}(a_{a_1}(a_{b_1}(x))))
A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(x))))
A_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
A_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(x))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → B_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x))))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(x))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → B_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x))))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → B_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(x))))
A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(x))))
A_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(x))))
A_{A_1}(a_{a_1}(x)) → B_{A_1}(x)
B_{A_1}(a_{a_1}(x)) → B_{A_1}(x)
A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x)))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x)))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x)))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x)))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))))
A_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))))
A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
B_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
B_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))

The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

(7) DependencyGraphProof (EQUIVALENT transformation)

The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 2 SCCs with 38 less nodes.

(8) Complex Obligation (AND)

(9) Obligation:

Q DP problem:
The TRS P consists of the following rules:

B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))))
B_{A_1}(a_{a_1}(x)) → B_{A_1}(x)
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))
A_{A_1}(a_{b_1}(x)) → B_{A_1}(a_{b_1}(x))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))

The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

(10) QDPOrderProof (EQUIVALENT transformation)

We use the reduction pair processor [LPAR04,JAR06].


The following pairs can be oriented strictly and are deleted.


B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))))
B_{A_1}(a_{a_1}(x)) → B_{A_1}(x)
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → A_{A_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))
The remaining pairs can at least be oriented weakly.
Used ordering: Polynomial interpretation [POLO]:

POL(A_{A_1}(x1)) = 1 + x1   
POL(B_{A_1}(x1)) = 1 + x1   
POL(a_{a_1}(x1)) = 1 + x1   
POL(a_{b_1}(x1)) = x1   
POL(b_{a_1}(x1)) = 1 + x1   
POL(b_{b_1}(x1)) = 1   

The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented:

a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

(11) Obligation:

Q DP problem:
The TRS P consists of the following rules:

A_{A_1}(a_{b_1}(x)) → B_{A_1}(a_{b_1}(x))
B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))))

The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

(12) DependencyGraphProof (EQUIVALENT transformation)

The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 1 SCC with 1 less node.

(13) Obligation:

Q DP problem:
The TRS P consists of the following rules:

B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))))

The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

(14) QDPOrderProof (EQUIVALENT transformation)

We use the reduction pair processor [LPAR04,JAR06].


The following pairs can be oriented strictly and are deleted.


B_{A_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → B_{A_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))))
The remaining pairs can at least be oriented weakly.
Used ordering: Polynomial interpretation [POLO]:

POL(B_{A_1}(x1)) = x1   
POL(a_{a_1}(x1)) = 1 + x1   
POL(a_{b_1}(x1)) = x1   
POL(b_{a_1}(x1)) = 1 + x1   
POL(b_{b_1}(x1)) = 0   

The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented:

a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

(15) Obligation:

Q DP problem:
P is empty.
The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

(16) PisEmptyProof (EQUIVALENT transformation)

The TRS P is empty. Hence, there is no (P,Q,R) chain.

(17) YES

(18) Obligation:

Q DP problem:
The TRS P consists of the following rules:

A_{A_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
A_{A_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))

The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

(19) QDPOrderProof (EQUIVALENT transformation)

We use the reduction pair processor [LPAR04,JAR06].


The following pairs can be oriented strictly and are deleted.


A_{A_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
A_{A_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → A_{A_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
The remaining pairs can at least be oriented weakly.
Used ordering: Polynomial interpretation [POLO]:

POL(A_{A_1}(x1)) = x1   
POL(a_{a_1}(x1)) = 1 + x1   
POL(a_{b_1}(x1)) = 0   
POL(b_{a_1}(x1)) = 0   
POL(b_{b_1}(x1)) = 0   

The following usable rules [FROCOS05] with respect to the argument filtering of the ordering [JAR06] were oriented:

a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

(20) Obligation:

Q DP problem:
P is empty.
The TRS R consists of the following rules:

a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(a_{a_1}(x)))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{a_1}(a_{b_1}(x)))
a_{a_1}(a_{a_1}(a_{a_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x)))))
a_{a_1}(a_{a_1}(a_{b_1}(x))) → a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x)))))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x)))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x)))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))) → a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))) → a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))))))
a_{a_1}(a_{a_1}(x)) → a_{b_1}(b_{a_1}(x))
a_{a_1}(a_{b_1}(x)) → a_{b_1}(b_{b_1}(x))
b_{a_1}(a_{a_1}(x)) → b_{b_1}(b_{a_1}(x))
b_{a_1}(a_{b_1}(x)) → b_{b_1}(b_{b_1}(x))
a_{a_1}(a_{b_1}(b_{a_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
a_{a_1}(a_{b_1}(b_{b_1}(x))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
b_{a_1}(a_{b_1}(b_{a_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))
b_{a_1}(a_{b_1}(b_{b_1}(x))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(x)))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(x)))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(a_{b_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
a_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{a_1}(x))))))))
b_{a_1}(a_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))) → b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(b_{b_1}(x))))))))

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

(21) PisEmptyProof (EQUIVALENT transformation)

The TRS P is empty. Hence, there is no (P,Q,R) chain.

(22) YES