Left Termination of the query pattern
bin_tree(g)
w.r.t. the given Prolog program could successfully be proven:

0 Prolog
1 PrologToPrologProblemTransformerProof (⇒, 0 ms)
2 Prolog
3 PrologToPiTRSProof (⇒, 5 ms)
4 PiTRS
5 DependencyPairsProof (⇔, 0 ms)
6 PiDP
7 DependencyGraphProof (⇔, 0 ms)
8 PiDP
9 PiDPToQDPProof (⇒, 35 ms)
10 QDP
11 QDPSizeChangeProof (⇔, 0 ms)
12 YES

(0) Obligation:

Clauses:

bin_tree(void) :- !.
bin_tree(T) :- ','(left(T, L), ','(right(T, R), ','(bin_tree(L), bin_tree(R)))).
left(void, void).
left(tree(X1, L, X2), L).
right(void, void).
right(tree(X3, X4, R), R).

Query: bin_tree(g)

(1) PrologToPrologProblemTransformerProof (SOUND transformation)

Built Prolog problem from termination graph ICLP10.

(2) Obligation:

Clauses:

bin_treeA(void).
bin_treeA(tree(T19, T20, T21)) :- bin_treeA(T20).
bin_treeA(tree(T19, T20, T21)) :- ','(bin_treeA(T20), bin_treeA(T21)).

Query: bin_treeA(g)

(3) PrologToPiTRSProof (SOUND transformation)

We use the technique of [TOCL09]. With regard to the inferred argument filtering the predicates were used in the following modes:
bin_treeA_in: (b)
Transforming Prolog into the following Term Rewriting System:
Pi-finite rewrite system:
The TRS R consists of the following rules:

bin_treeA_in_g(void) → bin_treeA_out_g(void)
bin_treeA_in_g(tree(T19, T20, T21)) → U1_g(T19, T20, T21, bin_treeA_in_g(T20))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → bin_treeA_out_g(tree(T19, T20, T21))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → U2_g(T19, T20, T21, bin_treeA_in_g(T21))
U2_g(T19, T20, T21, bin_treeA_out_g(T21)) → bin_treeA_out_g(tree(T19, T20, T21))

The argument filtering Pi contains the following mapping:
bin_treeA_in_g(x1)  =  bin_treeA_in_g(x1)
void  =  void
bin_treeA_out_g(x1)  =  bin_treeA_out_g
tree(x1, x2, x3)  =  tree(x1, x2, x3)
U1_g(x1, x2, x3, x4)  =  U1_g(x3, x4)
U2_g(x1, x2, x3, x4)  =  U2_g(x4)

Infinitary Constructor Rewriting Termination of PiTRS implies Termination of Prolog

(4) Obligation:

Pi-finite rewrite system:
The TRS R consists of the following rules:

bin_treeA_in_g(void) → bin_treeA_out_g(void)
bin_treeA_in_g(tree(T19, T20, T21)) → U1_g(T19, T20, T21, bin_treeA_in_g(T20))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → bin_treeA_out_g(tree(T19, T20, T21))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → U2_g(T19, T20, T21, bin_treeA_in_g(T21))
U2_g(T19, T20, T21, bin_treeA_out_g(T21)) → bin_treeA_out_g(tree(T19, T20, T21))

The argument filtering Pi contains the following mapping:
bin_treeA_in_g(x1)  =  bin_treeA_in_g(x1)
void  =  void
bin_treeA_out_g(x1)  =  bin_treeA_out_g
tree(x1, x2, x3)  =  tree(x1, x2, x3)
U1_g(x1, x2, x3, x4)  =  U1_g(x3, x4)
U2_g(x1, x2, x3, x4)  =  U2_g(x4)

(5) DependencyPairsProof (EQUIVALENT transformation)

Using Dependency Pairs [AG00,LOPSTR] we result in the following initial DP problem:
Pi DP problem:
The TRS P consists of the following rules:

BIN_TREEA_IN_G(tree(T19, T20, T21)) → U1_G(T19, T20, T21, bin_treeA_in_g(T20))
BIN_TREEA_IN_G(tree(T19, T20, T21)) → BIN_TREEA_IN_G(T20)
U1_G(T19, T20, T21, bin_treeA_out_g(T20)) → U2_G(T19, T20, T21, bin_treeA_in_g(T21))
U1_G(T19, T20, T21, bin_treeA_out_g(T20)) → BIN_TREEA_IN_G(T21)

The TRS R consists of the following rules:

bin_treeA_in_g(void) → bin_treeA_out_g(void)
bin_treeA_in_g(tree(T19, T20, T21)) → U1_g(T19, T20, T21, bin_treeA_in_g(T20))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → bin_treeA_out_g(tree(T19, T20, T21))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → U2_g(T19, T20, T21, bin_treeA_in_g(T21))
U2_g(T19, T20, T21, bin_treeA_out_g(T21)) → bin_treeA_out_g(tree(T19, T20, T21))

The argument filtering Pi contains the following mapping:
bin_treeA_in_g(x1)  =  bin_treeA_in_g(x1)
void  =  void
bin_treeA_out_g(x1)  =  bin_treeA_out_g
tree(x1, x2, x3)  =  tree(x1, x2, x3)
U1_g(x1, x2, x3, x4)  =  U1_g(x3, x4)
U2_g(x1, x2, x3, x4)  =  U2_g(x4)
BIN_TREEA_IN_G(x1)  =  BIN_TREEA_IN_G(x1)
U1_G(x1, x2, x3, x4)  =  U1_G(x3, x4)
U2_G(x1, x2, x3, x4)  =  U2_G(x4)

We have to consider all (P,R,Pi)-chains

(6) Obligation:

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

BIN_TREEA_IN_G(tree(T19, T20, T21)) → U1_G(T19, T20, T21, bin_treeA_in_g(T20))
BIN_TREEA_IN_G(tree(T19, T20, T21)) → BIN_TREEA_IN_G(T20)
U1_G(T19, T20, T21, bin_treeA_out_g(T20)) → U2_G(T19, T20, T21, bin_treeA_in_g(T21))
U1_G(T19, T20, T21, bin_treeA_out_g(T20)) → BIN_TREEA_IN_G(T21)

The TRS R consists of the following rules:

bin_treeA_in_g(void) → bin_treeA_out_g(void)
bin_treeA_in_g(tree(T19, T20, T21)) → U1_g(T19, T20, T21, bin_treeA_in_g(T20))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → bin_treeA_out_g(tree(T19, T20, T21))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → U2_g(T19, T20, T21, bin_treeA_in_g(T21))
U2_g(T19, T20, T21, bin_treeA_out_g(T21)) → bin_treeA_out_g(tree(T19, T20, T21))

The argument filtering Pi contains the following mapping:
bin_treeA_in_g(x1)  =  bin_treeA_in_g(x1)
void  =  void
bin_treeA_out_g(x1)  =  bin_treeA_out_g
tree(x1, x2, x3)  =  tree(x1, x2, x3)
U1_g(x1, x2, x3, x4)  =  U1_g(x3, x4)
U2_g(x1, x2, x3, x4)  =  U2_g(x4)
BIN_TREEA_IN_G(x1)  =  BIN_TREEA_IN_G(x1)
U1_G(x1, x2, x3, x4)  =  U1_G(x3, x4)
U2_G(x1, x2, x3, x4)  =  U2_G(x4)

We have to consider all (P,R,Pi)-chains

(7) DependencyGraphProof (EQUIVALENT transformation)

The approximation of the Dependency Graph [LOPSTR] contains 1 SCC with 1 less node.

(8) Obligation:

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

U1_G(T19, T20, T21, bin_treeA_out_g(T20)) → BIN_TREEA_IN_G(T21)
BIN_TREEA_IN_G(tree(T19, T20, T21)) → U1_G(T19, T20, T21, bin_treeA_in_g(T20))
BIN_TREEA_IN_G(tree(T19, T20, T21)) → BIN_TREEA_IN_G(T20)

The TRS R consists of the following rules:

bin_treeA_in_g(void) → bin_treeA_out_g(void)
bin_treeA_in_g(tree(T19, T20, T21)) → U1_g(T19, T20, T21, bin_treeA_in_g(T20))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → bin_treeA_out_g(tree(T19, T20, T21))
U1_g(T19, T20, T21, bin_treeA_out_g(T20)) → U2_g(T19, T20, T21, bin_treeA_in_g(T21))
U2_g(T19, T20, T21, bin_treeA_out_g(T21)) → bin_treeA_out_g(tree(T19, T20, T21))

The argument filtering Pi contains the following mapping:
bin_treeA_in_g(x1)  =  bin_treeA_in_g(x1)
void  =  void
bin_treeA_out_g(x1)  =  bin_treeA_out_g
tree(x1, x2, x3)  =  tree(x1, x2, x3)
U1_g(x1, x2, x3, x4)  =  U1_g(x3, x4)
U2_g(x1, x2, x3, x4)  =  U2_g(x4)
BIN_TREEA_IN_G(x1)  =  BIN_TREEA_IN_G(x1)
U1_G(x1, x2, x3, x4)  =  U1_G(x3, x4)

We have to consider all (P,R,Pi)-chains

(9) PiDPToQDPProof (SOUND transformation)

Transforming (infinitary) constructor rewriting Pi-DP problem [LOPSTR] into ordinary QDP problem [LPAR04] by application of Pi.

(10) Obligation:

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

U1_G(T21, bin_treeA_out_g) → BIN_TREEA_IN_G(T21)
BIN_TREEA_IN_G(tree(T19, T20, T21)) → U1_G(T21, bin_treeA_in_g(T20))
BIN_TREEA_IN_G(tree(T19, T20, T21)) → BIN_TREEA_IN_G(T20)

The TRS R consists of the following rules:

bin_treeA_in_g(void) → bin_treeA_out_g
bin_treeA_in_g(tree(T19, T20, T21)) → U1_g(T21, bin_treeA_in_g(T20))
U1_g(T21, bin_treeA_out_g) → bin_treeA_out_g
U1_g(T21, bin_treeA_out_g) → U2_g(bin_treeA_in_g(T21))
U2_g(bin_treeA_out_g) → bin_treeA_out_g

The set Q consists of the following terms:

bin_treeA_in_g(x0)
U1_g(x0, x1)
U2_g(x0)

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

(11) QDPSizeChangeProof (EQUIVALENT transformation)

By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem.

From the DPs we obtained the following set of size-change graphs:

  • BIN_TREEA_IN_G(tree(T19, T20, T21)) → U1_G(T21, bin_treeA_in_g(T20))
    The graph contains the following edges 1 > 1

  • BIN_TREEA_IN_G(tree(T19, T20, T21)) → BIN_TREEA_IN_G(T20)
    The graph contains the following edges 1 > 1

  • U1_G(T21, bin_treeA_out_g) → BIN_TREEA_IN_G(T21)
    The graph contains the following edges 1 >= 1

(12) YES