NO Termination w.r.t. Q proof of /home/cern_httpd/provide/research/cycsrs/tpdb/TPDB-d9b80194f163/SRS_Standard/Waldmann_07_size12/size-12-alpha-3-num-91-shift.srs

(0) Obligation:

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

B(x) → W(M(V(x)))
M(x) → x
M(V(a(x))) → V(Xa(x))
M(V(b(x))) → V(Xb(x))
M(V(c(x))) → V(Xc(x))
Xa(a(x)) → a(Xa(x))
Xa(b(x)) → b(Xa(x))
Xa(c(x)) → c(Xa(x))
Xb(a(x)) → a(Xb(x))
Xb(b(x)) → b(Xb(x))
Xb(c(x)) → c(Xb(x))
Xc(a(x)) → a(Xc(x))
Xc(b(x)) → b(Xc(x))
Xc(c(x)) → c(Xc(x))
Xa(E(x)) → a(E(x))
Xb(E(x)) → b(E(x))
Xc(E(x)) → c(E(x))
W(V(x)) → R(L(x))
L(a(x)) → Ya(L(x))
L(b(x)) → Yb(L(x))
L(c(x)) → Yc(L(x))
L(a(x)) → D(x)
L(a(a(x))) → D(b(b(c(x))))
L(c(x)) → D(x)
L(c(b(x))) → D(b(c(a(x))))
Ya(D(x)) → D(a(x))
Yb(D(x)) → D(b(x))
Yc(D(x)) → D(c(x))
R(D(x)) → B(x)

Q is empty.

(1) NonTerminationProof (COMPLETE transformation)

We used the non-termination processor [OPPELT08] to show that the SRS problem is infinite.

Found the self-embedding DerivationStructure:
B c b EB c b E

B c b EB c b E
by OverlapClosure OC 2
B c bB c Xb
by OverlapClosure OC 2
BW V
by OverlapClosure OC 3
BW M V
by original rule (OC 1)
M
by original rule (OC 1)
W V c bB c Xb
by OverlapClosure OC 3
W V c bR D c Xb
by OverlapClosure OC 3
W V c bR Yc D Xb
by OverlapClosure OC 3
W V c bR Yc L a Xb
by OverlapClosure OC 3
W V c bR L c a Xb
by OverlapClosure OC 2
W V c bR L c Xb a
by OverlapClosure OC 3
W V c bR L Xb c a
by OverlapClosure OC 3
W V c bB b c a
by OverlapClosure OC 3
W V c bR D b c a
by OverlapClosure OC 2
W VR L
by original rule (OC 1)
L c bD b c a
by original rule (OC 1)
R DB
by original rule (OC 1)
B bR L Xb
by OverlapClosure OC 3
B bW V Xb
by OverlapClosure OC 2
BW M V
by original rule (OC 1)
M V bV Xb
by original rule (OC 1)
W VR L
by original rule (OC 1)
Xb cc Xb
by original rule (OC 1)
Xb aa Xb
by original rule (OC 1)
L cYc L
by original rule (OC 1)
L aD
by original rule (OC 1)
Yc DD c
by original rule (OC 1)
R DB
by original rule (OC 1)
Xb Eb E
by original rule (OC 1)

(2) NO