TSTP Solution File: SYN213-1 by SOS---2.0
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : SOS---2.0
% Problem : SYN213-1 : TPTP v8.1.0. Released v1.1.0.
% Transfm : none
% Format : tptp:raw
% Command : sos-script %s
% Computer : n009.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 600s
% DateTime : Thu Jul 21 12:10:57 EDT 2022
% Result : Unsatisfiable 32.19s 32.48s
% Output : Refutation 32.19s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.11/0.12 % Problem : SYN213-1 : TPTP v8.1.0. Released v1.1.0.
% 0.11/0.13 % Command : sos-script %s
% 0.12/0.34 % Computer : n009.cluster.edu
% 0.12/0.34 % Model : x86_64 x86_64
% 0.12/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.34 % Memory : 8042.1875MB
% 0.12/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.34 % CPULimit : 300
% 0.12/0.34 % WCLimit : 600
% 0.12/0.34 % DateTime : Tue Jul 12 00:12:07 EDT 2022
% 0.12/0.34 % CPUTime :
% 0.12/0.39 ----- Otter 3.2, August 2001 -----
% 0.12/0.39 The process was started by sandbox on n009.cluster.edu,
% 0.12/0.39 Tue Jul 12 00:12:07 2022
% 0.12/0.39 The command was "./sos". The process ID is 6859.
% 0.12/0.39
% 0.12/0.39 set(prolog_style_variables).
% 0.12/0.39 set(auto).
% 0.12/0.39 dependent: set(auto1).
% 0.12/0.39 dependent: set(process_input).
% 0.12/0.39 dependent: clear(print_kept).
% 0.12/0.39 dependent: clear(print_new_demod).
% 0.12/0.39 dependent: clear(print_back_demod).
% 0.12/0.39 dependent: clear(print_back_sub).
% 0.12/0.39 dependent: set(control_memory).
% 0.12/0.39 dependent: assign(max_mem, 12000).
% 0.12/0.39 dependent: assign(pick_given_ratio, 4).
% 0.12/0.39 dependent: assign(stats_level, 1).
% 0.12/0.39 dependent: assign(pick_semantic_ratio, 3).
% 0.12/0.39 dependent: assign(sos_limit, 5000).
% 0.12/0.39 dependent: assign(max_weight, 60).
% 0.12/0.39 clear(print_given).
% 0.12/0.39
% 0.12/0.39 list(usable).
% 0.12/0.39
% 0.12/0.39 SCAN INPUT: prop=0, horn=1, equality=0, symmetry=0, max_lits=5.
% 0.12/0.39
% 0.12/0.39 This is a Horn set without equality. The strategy will
% 0.12/0.39 be hyperresolution, with satellites in sos and nuclei
% 0.12/0.39 in usable.
% 0.12/0.39
% 0.12/0.39 dependent: set(hyper_res).
% 0.12/0.39 dependent: clear(order_hyper).
% 0.12/0.39
% 0.12/0.39 ------------> process usable:
% 0.12/0.39 Following clause subsumed by 13 during input processing: 0 [] {-} m1(A,A,A)| -q0(B,C)| -q0(B,A).
% 0.12/0.39 Following clause subsumed by 14 during input processing: 0 [] {-} m1(A,A,A)| -m0(B,C,A).
% 0.12/0.39 Following clause subsumed by 14 during input processing: 0 [] {-} m1(A,A,A)| -l0(A)| -k0(A)| -m0(A,A,A).
% 0.12/0.39 Following clause subsumed by 12 during input processing: 0 [] {-} m1(e,e,e)| -r0(e).
% 0.12/0.39 Following clause subsumed by 63 during input processing: 0 [] {-} p1(A,A,A)| -n0(e,b)| -k0(b)| -k0(A)| -k1(B).
% 0.12/0.39 Following clause subsumed by 64 during input processing: 0 [] {-} p1(A,A,B)| -p0(B,A)| -r0(A).
% 0.12/0.39 Following clause subsumed by 63 during input processing: 0 [] {-} p1(e,e,e)| -r0(e)| -k0(e).
% 0.12/0.39 Following clause subsumed by 88 during input processing: 0 [] {-} q1(A,A,A)| -s0(A)| -m0(B,B,C).
% 0.12/0.39 Following clause subsumed by 88 during input processing: 0 [] {-} q1(A,A,A)| -s0(A).
% 0.12/0.39 Following clause subsumed by 88 during input processing: 0 [] {-} q1(d,d,d)| -k0(e)| -s0(d).
% 0.12/0.39 Following clause subsumed by 105 during input processing: 0 [] {-} q1(b,b,b)| -r0(b).
% 0.12/0.39 Following clause subsumed by 99 during input processing: 0 [] {-} q1(A,A,A)| -m0(B,C,A).
% 0.12/0.39 Following clause subsumed by 99 during input processing: 0 [] {-} q1(A,A,A)| -m0(A,B,A).
% 0.12/0.39 Following clause subsumed by 105 during input processing: 0 [] {-} q1(A,A,A)| -m0(c,A,A)| -r0(A).
% 0.12/0.39 Following clause subsumed by 142 during input processing: 0 [] {-} p2(A,A,A)| -s1(A)| -k1(A).
% 0.12/0.39 Following clause subsumed by 224 during input processing: 0 [] {-} p3(A,A,A)| -n2(A)| -q2(B,C,A)| -s1(B).
% 0.12/0.39 Following clause subsumed by 224 during input processing: 0 [] {-} p3(A,A,A)| -k1(A)| -n2(A).
% 0.12/0.39 13 back subsumes 9.
% 0.12/0.39 14 back subsumes 6.
% 0.12/0.39 28 back subsumes 21.
% 0.12/0.39 28 back subsumes 17.
% 0.12/0.39 40 back subsumes 39.
% 0.12/0.39 52 back subsumes 51.
% 0.12/0.39 77 back subsumes 68.
% 0.12/0.39 77 back subsumes 65.
% 0.12/0.39 142 back subsumes 134.
% 0.12/0.39 194 back subsumes 180.
% 0.12/0.39 216 back subsumes 213.
% 0.12/0.39 216 back subsumes 212.
% 0.12/0.39 244 back subsumes 239.
% 0.12/0.39
% 0.12/0.39 ------------> process sos:
% 0.12/0.39 Following clause subsumed by 321 during input processing: 0 [] {-} p0(b,c).
% 0.12/0.39 Following clause subsumed by 324 during input processing: 0 [] {-} q0(d,d).
% 0.12/0.39 321 back subsumes 317.
% 0.12/0.39 324 back subsumes 309.
% 0.12/0.39 326 back subsumes 315.
% 0.12/0.39 326 back subsumes 311.
% 0.12/0.39
% 0.12/0.39 ======= end of input processing =======
% 0.21/0.51
% 0.21/0.51 Model 1 (0.00 seconds, 0 Inserts)
% 0.21/0.51
% 0.21/0.51 Stopped by limit on number of solutions
% 0.21/0.51
% 0.21/0.51
% 0.21/0.51 -------------- Softie stats --------------
% 0.21/0.51
% 0.21/0.51 UPDATE_STOP: 300
% 0.21/0.51 SFINDER_TIME_LIMIT: 2
% 0.21/0.51 SHORT_CLAUSE_CUTOFF: 4
% 0.21/0.51 number of clauses in intial UL: 294
% 0.21/0.51 number of clauses initially in problem: 326
% 0.21/0.51 percentage of clauses intially in UL: 90
% 0.21/0.51 percentage of distinct symbols occuring in initial UL: 100
% 0.21/0.51 percent of all initial clauses that are short: 100
% 0.21/0.51 absolute distinct symbol count: 53
% 0.21/0.51 distinct predicate count: 48
% 0.21/0.51 distinct function count: 0
% 0.21/0.51 distinct constant count: 5
% 0.21/0.51
% 0.21/0.51 ---------- no more Softie stats ----------
% 0.21/0.51
% 0.21/0.51
% 0.21/0.51
% 0.21/0.51 =========== start of search ===========
% 11.11/11.36
% 11.11/11.36 Model 2 (0.00 seconds, 0 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on number of solutions
% 11.11/11.36
% 11.11/11.36 Model 3 (0.00 seconds, 0 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on number of solutions
% 11.11/11.36
% 11.11/11.36 Model 4 (0.00 seconds, 0 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on number of solutions
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 5 [ 1 3 12122 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Model 6 (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on number of solutions
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 7 [ 2 2 2707 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 8 [ 2 2 9417 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 9 [ 4 1 2023 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 10 [ 2 2 6345 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 11 [ 2 4 14402 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 12 [ 4 3 17534 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 13 [ 8 2 5131 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 14 [ 13 2 7863 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 15 [ 11 2 3837 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 16 [ 13 3 7579 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 17 [ 15 1 3816 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 18 [ 15 3 11491 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 19 [ 14 2 2231 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 20 [ 18 3 10144 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 21 [ 15 2 9571 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 22 [ 18 2 4045 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 23 [ 23 4 16133 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 24 [ 31 2 3778 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 25 [ 14 2 6703 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 26 [ 25 3 9270 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 27 [ 21 3 6706 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 28 [ 17 3 12341 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 29 [ 30 2 6361 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 30 [ 18 2 9380 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 31 [ 25 1 4120 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 32 [ 36 3 9450 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 33 [ 29 2 4384 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 34 [ 32 2 5374 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 35 [ 36 3 12148 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 36 [ 30 2 11807 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 37 [ 23 2 10051 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 38 [ 21 2 5640 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 39 [ 33 2 4958 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 40 [ 28 2 4658 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 41 [ 29 2 7895 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 42 [ 39 2 3374 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 43 [ 28 2 9715 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 44 [ 25 2 7907 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 45 [ 29 3 14142 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 11.11/11.36 Model 46 [ 37 2 7166 ] (0.00 seconds, 250000 Inserts)
% 11.11/11.36
% 11.11/11.36 Stopped by limit on insertions
% 11.11/11.36
% 25.97/26.17 Model 47 [ 32 2 6207 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 48 [ 31 2 5101 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 49 [ 26 2 9170 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 50 [ 31 2 2759 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 51 [ 46 2 6319 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 52 [ 42 2 4431 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 53 [ 34 2 8876 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 54 [ 38 1 4588 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 55 [ 37 2 4385 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 56 [ 37 2 5490 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 57 [ 39 2 2834 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 58 [ 33 2 11654 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 59 [ 33 1 3470 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 60 [ 35 1 3852 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 61 [ 31 2 6613 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 62 [ 33 1 3905 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 63 [ 44 3 10738 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 64 [ 44 2 8259 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 65 [ 33 2 4300 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 66 [ 39 2 5176 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 67 [ 35 3 11053 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 68 [ 35 2 3410 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 69 [ 46 1 3627 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 70 [ 73 2 2010 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 71 [ 41 3 12525 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 72 [ 44 2 7571 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 73 [ 97 2 7770 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 74 [ 53 2 3592 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 75 [ 45 2 4683 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 76 [ 44 2 5593 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 77 [ 40 3 8983 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 78 [ 47 2 8247 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 79 [ 37 3 13878 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 80 [ 45 2 3639 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 81 [ 20 3 11648 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 82 [ 58 2 2455 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 83 [ 56 2 2274 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 84 [ 51 2 2464 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 85 [ 70 2 3679 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 86 [ 52 2 3883 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 87 [ 44 3 7841 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 88 [ 53 1 2874 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 89 [ 44 3 12222 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 25.97/26.17 Model 90 [ 94 3 6385 ] (0.00 seconds, 250000 Inserts)
% 25.97/26.17
% 25.97/26.17 Stopped by limit on insertions
% 25.97/26.17
% 32.19/32.48 Model 91 [ 41 2 5166 ] (0.00 seco
% 32.19/32.48 �-- HEY sandbox, WE HAVE A PROOF!! --
% 32.19/32.48 nds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 92 [ 55 2 10116 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 93 [ 56 2 2133 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 94 [ 65 3 6683 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 95 [ 45 2 5013 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 96 [ 34 3 8535 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 97 [ 46 3 11092 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 98 [ 63 2 8314 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 99 [ 87 2 3675 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 100 [ 48 2 10127 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 101 [ 57 2 5641 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 102 [ 92 2 5343 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 103 [ 45 2 7206 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 104 [ 51 2 4798 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 105 [ 66 2 8374 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 106 [ 50 2 3902 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 107 [ 62 2 5548 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 108 [ 42 2 9683 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 Stopped by limit on insertions
% 32.19/32.48
% 32.19/32.48 Model 109 [ 118 3 7728 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 ----> UNIT CONFLICT at 32.03 sec ----> 680 [binary,679.1,307.1] {+} $F.
% 32.19/32.48
% 32.19/32.48 Length of proof is 18. Level of proof is 6.
% 32.19/32.48
% 32.19/32.48 ---------------- PROOF ----------------
% 32.19/32.48 % SZS status Unsatisfiable
% 32.19/32.48 % SZS output start Refutation
% 32.19/32.48
% 32.19/32.48 3 [] {+} l1(A,B)| -p0(C,A)| -r0(D)| -m0(B,A,C).
% 32.19/32.48 54 [] {+} n1(A,A,B)| -m0(C,D,D)| -m0(B,C,A).
% 32.19/32.48 77 [] {+} p1(A,A,A)| -p0(B,A).
% 32.19/32.48 109 [] {+} s1(A)| -p0(A,A).
% 32.19/32.48 110 [] {+} s1(A)| -q0(A,B)| -s1(C).
% 32.19/32.48 116 [] {+} l2(A,A)| -p0(B,B)| -s1(C)| -m0(D,C,A).
% 32.19/32.48 157 [] {+} p2(A,A,A)| -l1(B,A).
% 32.19/32.48 159 [] {+} q2(A,B,B)| -k0(B)| -p1(A,A,A).
% 32.19/32.48 168 [] {+} q2(A,A,B)| -l1(B,A).
% 32.19/32.48 171 [] {+} s2(A)| -q2(b,A,b)| -s1(b).
% 32.19/32.48 220 [] {+} n3(A)| -p2(B,C,A).
% 32.19/32.48 226 [] {+} p3(A,A,A)| -l2(A,A).
% 32.19/32.48 233 [] {+} q3(A,B)| -q2(C,A,B)| -n0(C,A).
% 32.19/32.48 235 [] {+} q3(A,B)| -n1(C,A,B)| -s2(A)| -q3(B,A).
% 32.19/32.48 254 [] {+} l4(A)| -p3(B,C,A).
% 32.19/32.48 274 [] {+} r4(A)| -n3(A)| -q3(B,C)| -p0(D,A).
% 32.19/32.48 305 [] {+} s5(A)| -l4(A)| -r4(B).
% 32.19/32.48 307 [] {+} -s5(b).
% 32.19/32.48 320 [] {+} r0(e).
% 32.19/32.48 321 [] {-} p0(b,A).
% 32.19/32.48 324 [] {+} q0(A,d).
% 32.19/32.48 325 [] {+} p0(c,b).
% 32.19/32.48 326 [] {+} m0(A,d,B).
% 32.19/32.48 332 [] {+} m0(e,b,c).
% 32.19/32.48 335 [] {+} n0(e,e).
% 32.19/32.48 337 [] {+} k0(b).
% 32.19/32.48 377 [hyper,321,109] {+} s1(b).
% 32.19/32.48 384 [hyper,321,77] {+} p1(A,A,A).
% 32.19/32.48 397 [hyper,324,110,377] {+} s1(A).
% 32.19/32.48 406 [hyper,326,116,321,397] {-} l2(A,A).
% 32.19/32.48 409 [hyper,326,54,326] {+} n1(A,A,B).
% 32.19/32.48 415 [hyper,326,3,321,320] {+} l1(d,A).
% 32.19/32.48 433 [hyper,332,3,325,320] {+} l1(b,e).
% 32.19/32.48 436 [hyper,406,226] {+} p3(A,A,A).
% 32.19/32.48 450 [hyper,415,157] {+} p2(A,A,A).
% 32.19/32.48 457 [hyper,433,168] {+} q2(e,e,b).
% 32.19/32.48 514 [hyper,384,159,337] {+} q2(A,b,b).
% 32.19/32.48 603 [hyper,436,254] {+} l4(A).
% 32.19/32.48 643 [hyper,450,220] {+} n3(A).
% 32.19/32.48 653 [hyper,514,171,397] {+} s2(b).
% 32.19/32.48 662 [hyper,457,233,335] {+} q3(e,b).
% 32.19/32.48 669 [hyper,662,235,409,653] {+} q3(b,e).
% 32.19/32.48 676 [hyper,643,274,669,321] {+} r4(A).
% 32.19/32.48 679 [hyper,676,305,603] {-} s5(A).
% 32.19/32.48 680 [binary,679.1,307.1] {+} $F.
% 32.19/32.48
% 32.19/32.48 % SZS output end Refutation
% 32.19/32.48 ------------ end of proof -------------
% 32.19/32.48
% 32.19/32.48
% 32.19/32.48 �Search stopped by max_proofs option.
% 32.19/32.48
% 32.19/32.48
% 32.19/32.48 Search stopped by max_proofs option.
% 32.19/32.48
% 32.19/32.48 ============ end of search ============
% 32.19/32.48
% 32.19/32.48 ----------- soft-scott stats ----------
% 32.19/32.48
% 32.19/32.48 true clauses given 44 (26.3%)
% 32.19/32.48 false clauses given 123
% 32.19/32.48
% 32.19/32.48 FALSE TRUE
% 32.19/32.48 2 1 0
% 32.19/32.48 3 5 8
% 32.19/32.48 4 58 41
% 32.19/32.48 tot: 64 49 (43.4% true)
% 32.19/32.48
% 32.19/32.48
% 32.19/32.48 Model 109 [ 118 3 7728 ] (0.00 seconds, 250000 Inserts)
% 32.19/32.48
% 32.19/32.48 That finishes the proof of the theorem.
% 32.19/32.48
% 32.19/32.48 Process 6859 finished Tue Jul 12 00:12:39 2022
%------------------------------------------------------------------------------