TSTP Solution File: LCL361-1 by CARINE---0.734
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%------------------------------------------------------------------------------
% File : CARINE---0.734
% Problem : LCL361-1 : TPTP v5.0.0. Released v2.3.0.
% Transfm : add_equality
% Format : carine
% Command : carine %s t=%d xo=off uct=32000
% Computer : art04.cs.miami.edu
% Model : i686 i686
% CPU : Intel(R) Pentium(R) 4 CPU 2.80GHz @ 2793MHz
% Memory : 2018MB
% OS : Linux 2.6.26.8-57.fc8
% CPULimit : 300s
% DateTime : Sun Nov 28 00:59:36 EST 2010
% Result : Unsatisfiable 0.36s
% Output : Refutation 0.36s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----ERROR: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% Command entered:
% /home/graph/tptp/Systems/CARINE---0.734/carine /tmp/SystemOnTPTP3293/LCL/LCL361-1+noeq.car t=300 xo=off uct=32000
% CARINE version 0.734 (Dec 2003)
% Initializing tables ... done.
% Parsing ..... done.
% Calculating time slices ... done.
% Building Lookup Tables ... done.
% Looking for a proof at depth = 1 ...
% t = 0 secs [nr = 7] [nf = 0] [nu = 0] [ut = 4]
% Looking for a proof at depth = 2 ...
% +================================================+
% | |
% | Congratulations!!! ........ A proof was found. |
% | |
% +================================================+
% Base Clauses and Unit Clauses used in proof:
% ============================================
% Base Clauses:
% -------------
% B0: ~is_a_theorem_1(implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0()))))
% B1: is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))))
% B4: ~is_a_theorem_1(x0) | ~is_a_theorem_1(implies_2(x0,x1)) | is_a_theorem_1(x1)
% Unit Clauses:
% --------------
% U1: < d0 v6 dv3 f5 c0 t11 td4 b > is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))))
% U2: < d0 v3 dv2 f3 c0 t6 td4 b > is_a_theorem_1(implies_2(x0,implies_2(not_1(x0),x1)))
% U4: < d2 v6 dv3 f13 c7 t26 td7 > ~is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))),implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0())))))
% U46: < d2 v12 dv6 f19 c7 t38 td8 > ~is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))),implies_2(implies_2(implies_2(x3,x4),implies_2(implies_2(x4,x5),implies_2(x3,x5))),implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0()))))))
% U50: < d2 v18 dv9 f25 c7 t50 td9 > ~is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))),implies_2(implies_2(implies_2(x3,x4),implies_2(implies_2(x4,x5),implies_2(x3,x5))),implies_2(implies_2(implies_2(x6,x7),implies_2(implies_2(x7,x8),implies_2(x6,x8))),implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0())))))))
% U57: < d2 v5 dv3 f5 c0 t10 td5 > is_a_theorem_1(implies_2(implies_2(implies_2(not_1(x0),x1),x2),implies_2(x0,x2)))
% U79: < d2 v7 dv4 f7 c0 t14 td6 > is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),x2),implies_2(implies_2(implies_2(not_1(x0),x3),x1),x2)))
% --------------- Start of Proof ---------------
% Derivation of unit clause U1:
% is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2)))) ....... U1
% Derivation of unit clause U2:
% is_a_theorem_1(implies_2(x0,implies_2(not_1(x0),x1))) ....... U2
% Derivation of unit clause U4:
% ~is_a_theorem_1(implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0())))) ....... B0
% ~is_a_theorem_1(x0) | ~is_a_theorem_1(implies_2(x0,x1)) | is_a_theorem_1(x1) ....... B4
% ~is_a_theorem_1(x0) | ~is_a_theorem_1(implies_2(x0, implies_2(x_0(), implies_2(implies_2(implies_2(not_1(x_0()), x_0()), x_0()), implies_2(implies_2(y_0(), x_0()), x_0()))))) ....... R1 [B0:L0, B4:L2]
% is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2)))) ....... U1
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0, x1), implies_2(implies_2(x1, x2), implies_2(x0, x2))), implies_2(x_0(), implies_2(implies_2(implies_2(not_1(x_0()), x_0()), x_0()), implies_2(implies_2(y_0(), x_0()), x_0()))))) ....... R2 [R1:L0, U1:L0]
% Derivation of unit clause U46:
% is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2)))) ....... B1
% ~is_a_theorem_1(x0) | ~is_a_theorem_1(implies_2(x0,x1)) | is_a_theorem_1(x1) ....... B4
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0, x1), implies_2(implies_2(x1, x2), implies_2(x0, x2))), x3)) | is_a_theorem_1(x3) ....... R1 [B1:L0, B4:L0]
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))),implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0()))))) ....... U4
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0, x1), implies_2(implies_2(x1, x2), implies_2(x0, x2))), implies_2(implies_2(implies_2(x3, x4), implies_2(implies_2(x4, x5), implies_2(x3, x5))), implies_2(x_0(), implies_2(implies_2(implies_2(not_1(x_0()), x_0()), x_0()), implies_2(implies_2(y_0(), x_0()), x_0())))))) ....... R2 [R1:L1, U4:L0]
% Derivation of unit clause U50:
% is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2)))) ....... B1
% ~is_a_theorem_1(x0) | ~is_a_theorem_1(implies_2(x0,x1)) | is_a_theorem_1(x1) ....... B4
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0, x1), implies_2(implies_2(x1, x2), implies_2(x0, x2))), x3)) | is_a_theorem_1(x3) ....... R1 [B1:L0, B4:L0]
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))),implies_2(implies_2(implies_2(x3,x4),implies_2(implies_2(x4,x5),implies_2(x3,x5))),implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0())))))) ....... U46
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0, x1), implies_2(implies_2(x1, x2), implies_2(x0, x2))), implies_2(implies_2(implies_2(x3, x4), implies_2(implies_2(x4, x5), implies_2(x3, x5))), implies_2(implies_2(implies_2(x6, x7), implies_2(implies_2(x7, x8), implies_2(x6, x8))), implies_2(x_0(), implies_2(implies_2(implies_2(not_1(x_0()), x_0()), x_0()), implies_2(implies_2(y_0(), x_0()), x_0()))))))) ....... R2 [R1:L1, U46:L0]
% Derivation of unit clause U57:
% is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2)))) ....... B1
% ~is_a_theorem_1(x0) | ~is_a_theorem_1(implies_2(x0,x1)) | is_a_theorem_1(x1) ....... B4
% ~is_a_theorem_1(implies_2(x0, x1)) | is_a_theorem_1(implies_2(implies_2(x1, x2), implies_2(x0, x2))) ....... R1 [B1:L0, B4:L1]
% is_a_theorem_1(implies_2(x0,implies_2(not_1(x0),x1))) ....... U2
% is_a_theorem_1(implies_2(implies_2(implies_2(not_1(x0), x1), x2), implies_2(x0, x2))) ....... R2 [R1:L0, U2:L0]
% Derivation of unit clause U79:
% is_a_theorem_1(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2)))) ....... B1
% ~is_a_theorem_1(x0) | ~is_a_theorem_1(implies_2(x0,x1)) | is_a_theorem_1(x1) ....... B4
% ~is_a_theorem_1(implies_2(x0, x1)) | is_a_theorem_1(implies_2(implies_2(x1, x2), implies_2(x0, x2))) ....... R1 [B1:L0, B4:L1]
% is_a_theorem_1(implies_2(implies_2(implies_2(not_1(x0),x1),x2),implies_2(x0,x2))) ....... U57
% is_a_theorem_1(implies_2(implies_2(implies_2(x0, x1), x2), implies_2(implies_2(implies_2(not_1(x0), x3), x1), x2))) ....... R2 [R1:L0, U57:L0]
% Derivation of the empty clause:
% is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),x2),implies_2(implies_2(implies_2(not_1(x0),x3),x1),x2))) ....... U79
% ~is_a_theorem_1(implies_2(implies_2(implies_2(x0,x1),implies_2(implies_2(x1,x2),implies_2(x0,x2))),implies_2(implies_2(implies_2(x3,x4),implies_2(implies_2(x4,x5),implies_2(x3,x5))),implies_2(implies_2(implies_2(x6,x7),implies_2(implies_2(x7,x8),implies_2(x6,x8))),implies_2(x_0(),implies_2(implies_2(implies_2(not_1(x_0()),x_0()),x_0()),implies_2(implies_2(y_0(),x_0()),x_0()))))))) ....... U50
% [] ....... R1 [U79:L0, U50:L0]
% --------------- End of Proof ---------------
% PROOF FOUND!
% ---------------------------------------------
% | Statistics |
% ---------------------------------------------
% Profile 3: Performance Statistics:
% ==================================
% Total number of generated clauses: 110
% resolvents: 110 factors: 0
% Number of unit clauses generated: 100
% % unit clauses generated to total clauses generated: 90.91
% Number of unit clauses constructed and retained at depth [x]:
% =============================================================
% [0] = 4 [2] = 76
% Total = 80
% Number of generated clauses having [x] literals:
% ------------------------------------------------
% [1] = 100 [2] = 10
% Average size of a generated clause: 2.0
% Number of unit clauses per predicate list:
% ==========================================
% [0] is_a_theorem_1 (+)64 (-)16
% ------------------
% Total: (+)64 (-)16
% Total number of unit clauses retained: 80
% Number of clauses skipped because of their length: 2
% N base clauses skippped in resolve-with-all-base-clauses
% because of the shortest resolvents table: 0
% Number of successful unifications: 120
% Number of unification failures: 7
% Number of unit to unit unification failures: 1017
% N literal unification failure due to lookup root_id table: 7
% N base clause resolution failure due to lookup table: 0
% N UC-BCL resolution dropped due to lookup table: 0
% Max entries in substitution set: 5
% N unit clauses dropped because they exceeded max values: 24
% N unit clauses dropped because too much nesting: 0
% N unit clauses not constrcuted because table was full: 0
% N unit clauses dropped because UCFA table was full: 0
% Max number of terms in a unit clause: 62
% Max term depth in a unit clause: 10
% Number of states in UCFA table: 1165
% Total number of terms of all unit clauses in table: 2273
% Max allowed number of states in UCFA: 528000
% Ratio n states used/total allowed states: 0.00
% Ratio n states used/total unit clauses terms: 0.51
% Number of symbols (columns) in UCFA: 39
% Profile 2: Number of calls to:
% ==============================
% PTUnify() = 127
% ConstructUnitClause() = 100
% Profile 1: Time spent in:
% =========================
% ConstructUnitClause() : 0.00 secs
% --------------------------------------------------------
% | |
% Inferences per sec: inf
% | |
% --------------------------------------------------------
% Elapsed time: 0 secs
% CPU time: 0.35 secs
%
%------------------------------------------------------------------------------