TSTP Solution File: SEU401+2 by SRASS---0.1
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- Process Solution
%------------------------------------------------------------------------------
% File : SRASS---0.1
% Problem : SEU401+2 : TPTP v5.0.0. Released v3.3.0.
% Transfm : none
% Format : tptp
% Command : SRASS -q2 -a 0 10 10 10 -i3 -n60 %s
% Computer : art11.cs.miami.edu
% Model : i686 i686
% CPU : Intel(R) Pentium(R) 4 CPU 3.00GHz @ 3000MHz
% Memory : 2006MB
% OS : Linux 2.6.31.5-127.fc12.i686.PAE
% CPULimit : 300s
% DateTime : Thu Dec 30 04:56:47 EST 2010
% Result : Theorem 179.66s
% Output : Solution 181.33s
% Verified :
% SZS Type : None (Parsing solution fails)
% Syntax : Number of formulae : 0
% Comments :
%------------------------------------------------------------------------------
%----ERROR: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% Reading problem from /tmp/SystemOnTPTP9753/SEU401+2.tptp
% Adding relevance values
% Extracting the conjecture
% Sorting axioms by relevance
% Looking for THM ...
% not found
% Adding ~C to TBU ... ~s2_xboole_0__e6_39_3__yellow19__1:
% ---- Iteration 1 (0 axioms selected)
% Looking for TBU SAT ...
% yes
% Looking for TBU model ...
% not found
% Looking for CSA axiom ... antisymmetry_r2_hidden:
% CSA axiom antisymmetry_r2_hidden found
% Looking for CSA axiom ... existence_l1_pre_topc:
% existence_m1_subset_1:
% CSA axiom existence_m1_subset_1 found
% Looking for CSA axiom ... s1_tarski__e6_39_3__yellow19__1:
% CSA axiom s1_tarski__e6_39_3__yellow19__1 found
% ---- Iteration 2 (3 axioms selected)
% Looking for TBU SAT ...
% yes
% Looking for TBU model ...
% not found
% Looking for CSA axiom ... existence_l1_pre_topc:
% s1_xboole_0__e6_39_3__yellow19__1:
% t1_subset:
% CSA axiom t1_subset found
% Looking for CSA axiom ... t2_tarski:
% CSA axiom t2_tarski found
% Looking for CSA axiom ... t3_ordinal1:
% CSA axiom t3_ordinal1 found
% ---- Iteration 3 (6 axioms selected)
% Looking for TBU SAT ...
% no
% Looking for TBU UNS ...
% yes - theorem proved
% ---- Selection completed
% Selected axioms are ... :t3_ordinal1:t2_tarski:t1_subset:s1_tarski__e6_39_3__yellow19__1:existence_m1_subset_1:antisymmetry_r2_hidden (6)
% Unselected axioms are ... :existence_l1_pre_topc:s1_xboole_0__e6_39_3__yellow19__1:t7_tarski:t31_yellow19:s1_tarski__e6_39_3__yellow19__3:s1_xboole_0__e6_39_3__yellow19__2:dt_k6_pre_topc:fraenkel_a_3_3_yellow19:existence_m1_connsp_2:dt_k11_yellow_6:t29_waybel_9:redefinition_k6_waybel_9:existence_m1_yellow19:t23_yellow19:fraenkel_a_2_0_yellow19:t52_pre_topc:d2_yellow19:t13_yellow19:dt_m1_yellow19:fc2_tops_1:t9_yellow19:d1_yellow19:t3_yellow19:d18_yellow_6:dt_m1_connsp_2:dt_k6_waybel_9:t6_yellow_6:t48_pre_topc:dt_m2_yellow_6:existence_m2_yellow_6:l3_subset_1:l71_subset_1:rc1_tops_1:rc6_pre_topc:t41_yellow_6:t4_subset:s1_tarski__e1_40__pre_topc__1:s1_xboole_0__e1_40__pre_topc__1:s3_subset_1__e1_40__pre_topc:d13_pre_topc:d1_connsp_2:d2_subset_1:d5_yellow_6:fc26_waybel_9:s1_tarski__e2_37_1_1__pre_topc__1:t2_subset:t5_connsp_2:d8_waybel_0:d9_waybel_9:dt_k3_waybel_0:t16_waybel_9:d1_xboole_0:fraenkel_a_3_0_waybel_9:t46_pre_topc:commutativity_k2_struct_0:d1_tarski:d3_xboole_0:d4_xboole_0:rc7_pre_topc:s1_tarski__e16_22__wellord2__1:s1_tarski__e6_22__wellord2__1:s1_xboole_0__e2_37_1_1__pre_topc__1:s3_subset_1__e2_37_1_1__pre_topc:t24_ordinal1:t45_pre_topc:d1_enumset1:d1_tops_1:d2_tarski:d2_xboole_0:d3_ordinal1:d4_tarski:d5_waybel_7:fc22_waybel_9:rc4_yellow_6:t44_pre_topc:t55_tops_1:dt_k1_tops_1:dt_u1_pre_topc:t12_waybel_9:t23_relset_1:cc3_tops_1:d2_yellow_0:fraenkel_a_2_1_yellow19:fraenkel_a_2_2_lattice3:rc1_waybel_9:s1_tarski__e11_2_1__waybel_0__1:s1_xboole_0__e11_2_1__waybel_0__1:t26_orders_2:t28_yellow_6:t30_yellow_6:cc4_tops_1:fc6_tops_1:rc2_tops_1:t51_tops_1:d1_tops_2:d2_tops_2:d5_pre_topc:dt_k15_lattice3:dt_k16_lattice3:dt_k1_lattices:dt_k1_yellow19:dt_k2_lattices:dt_k5_lattices:l40_tops_1:rc3_tops_1:s1_tarski__e4_7_2__tops_2__1:t32_yellow_6:dt_l1_pre_topc:t11_yellow19:t20_yellow_6:d11_waybel_0:d12_waybel_0:d16_lattice3:d17_lattice3:d2_zfmisc_1:dt_k6_setfam_1:existence_l1_lattices:existence_l1_orders_2:existence_l1_struct_0:existence_l1_waybel_0:existence_l2_lattices:existence_l3_lattices:existence_m1_relset_1:existence_m2_relset_1:fc1_subset_1:l55_zfmisc_1:rc1_orders_2:rc1_xboole_0:rc2_xboole_0:rc3_struct_0:rc4_waybel_0:reflexivity_r1_tarski:symmetry_r1_xboole_0:t106_zfmisc_1:t1_xboole_1:t33_zfmisc_1:t3_subset:t3_xboole_0:commutativity_k4_lattices:d13_lattices:d3_lattice3:dt_k5_relset_1:rc5_waybel_0:redefinition_k2_struct_0:t21_yellow_6:t26_lattices:t91_tmap_1:commutativity_k3_lattices:d3_lattices:t31_yellow_6:cc2_tops_1:t7_boole:abstractness_v6_waybel_0:d12_yellow_6:d1_pre_topc:d1_zfmisc_1:d3_tarski:d8_yellow_6:redefinition_k5_relset_1:t44_tops_1:d3_yellow19:d7_waybel_9:s1_xboole_0__e6_22__wellord2:t13_compts_1:t23_ordinal1:fc15_yellow_6:s1_tarski__e4_7_1__tops_2__1:t10_ordinal1:t50_subset_1:t8_boole:d10_xboole_0:d1_setfam_1:d8_lattice3:d8_setfam_1:d9_lattice3:dt_k1_yellow_0:dt_k2_yellow_0:dt_k3_yellow_0:reflexivity_r3_orders_2:s1_tarski__e8_6__wellord2__1:s1_xboole_0__e8_6__wellord2__1:t65_zfmisc_1:d4_lattice3:d8_lattices:dt_k3_lattices:dt_k4_lattices:dt_k5_waybel_9:dt_u1_waybel_0:fraenkel_a_1_0_filter_1:fraenkel_a_2_3_lattice3:l23_zfmisc_1:redefinition_k10_filter_1:t25_orders_2:t35_funct_1:t46_zfmisc_1:t60_yellow_0:t61_yellow_0:commutativity_k3_xboole_0:d16_lattices:d1_lattices:d2_lattices:idempotence_k3_xboole_0:rc5_struct_0:redefinition_k3_lattices:redefinition_k4_lattices:t1_waybel_0:commutativity_k2_tarski:commutativity_k2_xboole_0:d2_tex_2:d4_subset_1:dt_k2_struct_0:idempotence_k2_xboole_0:t10_zfmisc_1:t20_yellow19:s1_tarski__e16_22__wellord2__2:s1_xboole_0__e16_22__wellord2__1:d5_subset_1:dt_k1_pre_topc:dt_k2_pre_topc:redefinition_k6_setfam_1:redefinition_k6_subset_1:t16_tops_2:t17_tops_2:t22_relset_1:t4_yellow19:cc1_tops_1:d1_relat_1:d1_struct_0:d1_waybel_0:d20_waybel_0:d2_relat_1:d9_orders_2:fc1_struct_0:fc5_pre_topc:t32_filter_1:cc2_funct_1:cc5_tops_1:d1_funct_1:fc3_tops_1:fc4_tops_1:fraenkel_a_2_3_yellow19:rc1_partfun1:t136_zfmisc_1:t5_subset:d3_pre_topc:dt_k10_filter_1:dt_k4_lattice3:dt_k4_relset_1:dt_k5_lattice3:fc1_yellow19:rc2_waybel_7:rc3_finset_1:rc4_finset_1:t12_pre_topc:t4_waybel_7:t54_subset_1:t5_tops_2:commutativity_k4_subset_1:commutativity_k5_subset_1:dt_k7_funct_2:dt_l1_waybel_0:dt_m1_struct_0:existence_m1_struct_0:fc3_yellow19:free_g1_waybel_0:idempotence_k4_subset_1:idempotence_k5_subset_1:involutiveness_k3_subset_1:involutiveness_k7_setfam_1:redefinition_m1_struct_0:redefinition_r3_orders_2:t29_tops_1:t30_tops_1:t5_tex_2:antisymmetry_r2_xboole_0:cc15_membered:cc19_membered:cc1_finsub_1:cc1_membered:cc20_membered:cc2_finsub_1:cc2_membered:cc3_membered:cc4_membered:d13_yellow_6:d7_yellow_0:d9_yellow_6:dt_k3_yellow_1:dt_l1_orders_2:fc17_yellow_6:fc9_tops_1:irreflexivity_r2_xboole_0:rc12_waybel_0:rc1_membered:rc2_orders_2:s1_tarski__e10_24__wellord2__2:s1_xboole_0__e10_24__wellord2__1:s2_finset_1__e11_2_1__waybel_0:t11_waybel_7:t14_yellow19:t15_pre_topc:t18_finset_1:t18_yellow19:t22_pre_topc:t6_boole:t8_waybel_0:t9_funct_2:dt_k2_yellow_1:dt_k3_yellow_6:dt_k7_yellow_2:dt_m1_yellow_6:existence_m1_yellow_6:fc1_funct_1:fc4_funct_1:fc7_yellow_1:l25_zfmisc_1:l28_zfmisc_1:l2_zfmisc_1:rc1_subset_1:rc2_subset_1:rc3_funct_1:rc7_yellow_6:s1_ordinal1__e8_6__wellord2:s1_tarski__e4_7_2__tops_2__2:s1_tarski__e6_27__finset_1__1:s1_xboole_0__e4_7_2__tops_2__1:t1_yellow_1:t31_ordinal1:t37_zfmisc_1:t3_boole:t4_boole:t4_xboole_0:t83_xboole_1:cc1_lattice3:cc1_yellow_3:cc2_lattice3:cc2_yellow_3:d1_mcart_1:d22_lattice3:d2_mcart_1:d2_ordinal1:d6_ordinal1:d8_filter_1:d8_xboole_0:dt_k2_funct_1:dt_k2_yellow19:fc2_funct_1:fc5_funct_1:free_g1_orders_2:l1_zfmisc_1:l50_zfmisc_1:rc1_pboole:rc3_waybel_7:rc4_funct_1:rc6_lattices:redefinition_k2_lattice3:t12_xboole_1:t13_tops_2:t1_boole:t28_xboole_1:t2_boole:t38_zfmisc_1:t39_xboole_1:t3_xboole_1:t40_xboole_1:t48_xboole_1:t69_enumset1:t6_yellow_0:t6_zfmisc_1:t7_lattice3:t8_zfmisc_1:t92_zfmisc_1:t9_tarski:t9_zfmisc_1:cc16_membered:cc2_finset_1:dt_k1_pcomps_1:dt_k2_subset_1:dt_k3_subset_1:dt_k4_subset_1:dt_k5_pre_topc:dt_k5_setfam_1:dt_k5_subset_1:dt_k6_subset_1:dt_k7_setfam_1:dt_k9_filter_1:fc5_yellow19:fc8_tops_1:fraenkel_a_3_1_yellow19:rc1_waybel_0:rc2_tex_2:rc7_waybel_0:redefinition_k1_pcomps_1:redefinition_k3_yellow_6:redefinition_k7_yellow_2:reflexivity_r3_lattices:t99_zfmisc_1:d11_relat_1:d12_relat_1:d13_relat_1:d13_yellow_0:d1_funct_2:d21_lattice3:d2_lattice3:d4_relat_1:d5_relat_1:d6_pre_topc:d8_pre_topc:d8_relat_1:dt_k1_waybel_0:dt_k6_yellow_6:fc5_yellow_1:fc6_membered:l3_wellord1:rc6_yellow_6:rc8_waybel_0:redefinition_k5_pre_topc:s1_tarski__e10_24__wellord2__1:s1_tarski__e4_27_3_1__finset_1__1:s1_xboole_0__e4_27_3_1__finset_1:t11_tops_2:t12_tops_2:t17_pre_topc:t19_yellow_6:t1_lattice3:t23_lattices:t3_lattice3:t44_yellow_0:t56_relat_1:t8_waybel_7:cc11_waybel_0:cc1_waybel_3:cc2_yellow_0:cc3_waybel_3:cc5_waybel_0:d10_relat_1:d14_relat_1:d1_wellord1:d4_relat_2:d5_orders_2:d5_ordinal2:d6_orders_2:d6_relat_2:d7_relat_1:d9_yellow_0:dt_k1_yellow_1:fc2_relat_1:fc35_membered:fc36_membered:fc3_relat_1:fc41_membered:fc6_yellow_1:fraenkel_a_2_2_yellow19:rc10_waybel_0:rc1_lattice3:rc2_waybel_0:rc9_waybel_0:redefinition_k1_waybel_0:redefinition_k7_funct_2:s1_funct_1__e4_7_2__tops_2__1:s1_tarski__e4_7_1__tops_2__2:s1_tarski__e6_21__wellord2__1:s1_xboole_0__e4_7_1__tops_2__1:s1_xboole_0__e6_21__wellord2__1:s2_ordinal1__e18_27__finset_1__1:t34_funct_1:t43_subset_1:cc1_finset_1:d11_grcat_1:d14_yellow_0:d1_binop_1:d4_yellow_0:d8_yellow_0:dt_u1_lattices:dt_u2_lattices:fc15_waybel_0:fc1_relat_1:fc2_subset_1:fc2_xboole_0:fc33_membered:fc34_membered:fc3_subset_1:fc3_xboole_0:fc40_membered:rc1_finset_1:rc1_yellow_3:redefinition_k1_domain_1:s1_funct_1__e10_24__wellord2__1:s1_funct_1__e4_7_1__tops_2__1:s2_funct_1__e4_7_1__tops_2:s2_funct_1__e4_7_2__tops_2:t2_lattice3:t2_yellow_1:t34_lattice3:cc1_relat_1:cc2_arytm_3:d3_compts_1:dt_l1_lattices:dt_l2_lattices:fc1_xboole_0:fc1_zfmisc_1:fc4_subset_1:fc5_tops_1:fc6_waybel_0:rc1_arytm_3:rc1_funct_1:rc1_funct_2:rc1_relat_1:rc2_relat_1:redefinition_k4_subset_1:redefinition_k5_setfam_1:redefinition_k5_subset_1:t10_tops_2:t118_zfmisc_1:t119_zfmisc_1:t13_finset_1:t143_relat_1:t15_yellow_0:t166_relat_1:t16_relset_1:t16_yellow_0:t17_xboole_1:t19_xboole_1:t20_relat_1:t26_xboole_1:t2_xboole_1:t33_xboole_1:t36_xboole_1:t46_setfam_1:t50_lattice3:t63_xboole_1:t74_relat_1:t7_xboole_1:t8_xboole_1:cc1_funct_1:cc1_relset_1:cc6_tops_1:d3_relat_1:d4_yellow19:fc10_finset_1:fc11_finset_1:fc12_finset_1:fc14_finset_1:fc1_pre_topc:fc27_membered:fc28_membered:fc2_yellow_0:fc31_membered:fc32_membered:fc37_membered:fc39_membered:fc9_finset_1:rc4_tops_1:rc5_tops_1:redefinition_k1_yellow_1:redefinition_m2_relset_1:redefinition_r3_lattices:reflexivity_r2_wellord2:s1_tarski__e18_27__finset_1__1:s1_xboole_0__e18_27__finset_1__1:symmetry_r2_wellord2:t15_finset_1:t28_lattice3:t29_lattice3:t30_lattice3:t30_yellow_0:t31_lattice3:t45_xboole_1:t47_setfam_1:t48_setfam_1:cc10_waybel_1:cc13_waybel_0:cc17_membered:cc1_funct_2:cc3_yellow_3:cc5_waybel_1:cc6_waybel_3:cc7_yellow_0:connectedness_r1_ordinal1:d10_yellow_0:d1_relat_2:d2_pre_topc:d5_tarski:d8_relat_2:dt_g1_orders_2:dt_g1_waybel_0:dt_g3_lattices:dt_k2_partfun1:dt_k7_grcat_1:dt_k8_funct_2:dt_m2_relset_1:dt_u1_orders_2:fc2_pre_topc:fc2_yellow19:fc4_lattice3:l2_wellord1:l32_xboole_1:l3_zfmisc_1:l4_zfmisc_1:rc3_lattices:redefinition_k1_toler_1:reflexivity_r1_ordinal1:t115_relat_1:t140_relat_1:t16_wellord1:t1_zfmisc_1:t30_relat_1:t37_xboole_1:t39_zfmisc_1:t46_funct_2:t4_yellow_1:t60_xboole_1:t6_funct_2:t7_mcart_1:t86_relat_1:abstractness_v1_orders_2:cc10_waybel_0:cc3_yellow_0:cc4_waybel_3:cc7_waybel_1:cc9_waybel_0:d12_funct_1:d13_funct_1:d1_ordinal1:d2_yellow_1:d5_funct_1:d7_xboole_0:d8_funct_1:dt_k1_domain_1:dt_k3_yellow19:dt_k8_filter_1:dt_m1_yellow_0:existence_m1_yellow_0:fc10_tops_1:fc12_relat_1:fc13_finset_1:fc1_ordinal1:fc3_funct_1:fc3_lattices:free_g3_lattices:rc2_partfun1:rc4_waybel_7:redefinition_k4_relset_1:redefinition_k8_funct_2:redefinition_k8_relset_1:s2_funct_1__e16_22__wellord2__1:s3_funct_1__e16_22__wellord2:t17_finset_1:t21_ordinal1:t22_funct_1:t23_funct_1:t29_yellow_0:t33_ordinal1:t41_ordinal1:t49_wellord1:t54_wellord1:t60_relat_1:t62_funct_1:t70_funct_1:t71_relat_1:t8_funct_1:cc1_ordinal1:cc2_ordinal1:cc6_waybel_1:d1_relset_1:d4_ordinal1:dt_k1_lattice3:dt_k1_wellord2:dt_k2_wellord1:dt_k3_lattice3:dt_k4_relat_1:dt_k5_relat_1:dt_k6_relat_1:dt_k7_relat_1:dt_k8_relat_1:dt_k8_relset_1:fc1_finset_1:fc29_membered:fc2_finset_1:fc2_orders_2:fc30_membered:fc38_membered:fc4_yellow19:fc7_tops_1:rc1_ordinal1:rc2_funct_1:rc2_lattice3:rc3_relat_1:redefinition_r1_ordinal1:s1_funct_1__e16_22__wellord2__1:s1_ordinal2__e18_27__finset_1:s1_xboole_0__e6_27__finset_1:t117_relat_1:t14_relset_1:t178_relat_1:t18_yellow_1:t21_funct_2:t26_wellord2:t42_ordinal1:t88_relat_1:cc10_membered:d11_yellow_0:d2_compts_1:dt_k2_binop_1:fc10_relat_1:fc11_relat_1:fc13_relat_1:fc1_lattice3:fc3_waybel_0:fc4_relat_1:fc5_relat_1:fc5_waybel_0:fc6_relat_1:fc7_relat_1:fc8_relat_1:fc9_relat_1:rc11_waybel_0:redefinition_k6_partfun1:t21_funct_1:t25_wellord1:t2_yellow19:t32_ordinal1:t54_funct_1:t72_funct_1:cc5_funct_2:cc5_lattices:cc6_funct_2:d4_funct_1:fc2_lattice2:fc2_waybel_0:fc3_lattice2:fc3_ordinal1:fc4_lattice2:fc5_lattice2:involutiveness_k4_relat_1:l4_wellord1:rc2_funct_2:rc2_ordinal1:rc3_partfun1:redefinition_k2_binop_1:s1_relat_1__e6_21__wellord2:s2_funct_1__e10_24__wellord2:t28_wellord2:t42_yellow_0:abstractness_v3_lattices:cc12_waybel_0:cc18_membered:cc1_yellow_0:cc3_lattices:cc4_lattices:cc5_waybel_3:d1_finset_1:fc13_yellow_3:fc1_orders_2:fc1_tops_1:fc1_yellow_1:fc2_lattice3:fc4_waybel_0:l1_wellord1:l82_funct_1:rc11_lattices:rc1_yellow_0:redefinition_k2_partfun1:t119_relat_1:t145_relat_1:t146_relat_1:t160_relat_1:t26_finset_1:t37_relat_1:t64_relat_1:t65_relat_1:t68_funct_1:t90_relat_1:t94_relat_1:cc14_waybel_0:cc1_arytm_3:cc1_knaster:cc1_lattices:cc2_lattices:d14_relat_2:d4_wellord2:d6_wellord1:dt_k1_toler_1:dt_k2_lattice3:fc1_finsub_1:rc2_yellow_0:t145_funct_1:t15_yellow19:t17_wellord1:t18_wellord1:t19_wellord1:t55_funct_1:cc1_yellow_2:cc3_ordinal1:cc8_waybel_1:cc9_waybel_1:d1_wellord2:d7_wellord1:dt_l3_lattices:fc1_waybel_0:fc1_yellow_0:fc2_arytm_3:fc4_yellow_1:rc10_lattices:rc12_lattices:rc2_finset_1:rc3_ordinal1:rc4_waybel_1:rc5_waybel_1:redefinition_r2_wellord2:t12_relset_1:t2_wellord2:t3_wellord2:t57_funct_1:t5_wellord2:cc2_funct_2:cc2_waybel_3:cc3_arytm_3:cc3_funct_2:cc4_funct_2:cc4_waybel_4:cc4_yellow_0:cc5_yellow_0:d12_relat_2:d6_relat_1:dt_k6_partfun1:fc1_waybel_1:fc2_yellow_1:fc3_yellow_1:fc4_ordinal1:fc8_yellow_1:l29_wellord1:rc13_waybel_0:rc1_ordinal2:rc1_waybel_3:rc1_waybel_6:rc9_lattices:t116_relat_1:t118_relat_1:t144_relat_1:t167_relat_1:t174_relat_1:t21_wellord1:t22_wellord1:t23_wellord1:t24_wellord1:t25_relat_1:t31_wellord1:t32_wellord1:t44_relat_1:t45_relat_1:t46_relat_1:t47_relat_1:t4_wellord2:t6_wellord2:t7_wellord2:t8_wellord1:t99_relat_1:cc11_membered:cc6_lattices:cc7_lattices:d1_lattice3:d1_yellow_1:d3_wellord1:d4_wellord1:d9_funct_1:d9_relat_2:fc8_yellow_6:fc9_waybel_1:rc13_lattices:rc1_waybel_7:t146_funct_1:t20_wellord1:t21_relat_1:t25_wellord2:t39_wellord1:cc12_membered:fc1_ordinal2:fc2_ordinal1:fc2_waybel_7:rc2_waybel_3:t147_funct_1:d2_wellord1:fc1_waybel_7:fc2_partfun1:fc3_lattice3:fc3_orders_2:l30_wellord2:t53_wellord1:cc13_membered:cc1_partfun1:d16_relat_2:fc1_knaster:t5_wellord1:cc14_membered:d5_wellord1:dt_k10_relat_1:dt_k1_binop_1:dt_k1_enumset1:dt_k1_funct_1:dt_k1_mcart_1:dt_k1_ordinal1:dt_k1_relat_1:dt_k1_setfam_1:dt_k1_tarski:dt_k1_wellord1:dt_k1_xboole_0:dt_k1_zfmisc_1:dt_k2_mcart_1:dt_k2_relat_1:dt_k2_tarski:dt_k2_xboole_0:dt_k2_zfmisc_1:dt_k3_relat_1:dt_k3_tarski:dt_k3_xboole_0:dt_k4_tarski:dt_k4_xboole_0:dt_k5_ordinal2:dt_k9_relat_1:dt_l1_struct_0:dt_m1_relset_1:dt_m1_subset_1:dt_u1_struct_0 (924)
% SZS status THM for /tmp/SystemOnTPTP9753/SEU401+2.tptp
% Looking for THM ...
% found
% SZS output start Solution for /tmp/SystemOnTPTP9753/SEU401+2.tptp
% TreeLimitedRun: ----------------------------------------------------------
% TreeLimitedRun: /home/graph/tptp/Systems/EP---1.2/eproof --print-statistics -xAuto -tAuto --cpu-limit=600 --proof-time-unlimited --memory-limit=Auto --tstp-in --tstp-out /tmp/SRASS.s.p
% TreeLimitedRun: CPU time limit is 600s
% TreeLimitedRun: WC time limit is 1200s
% TreeLimitedRun: PID is 12505
% TreeLimitedRun: ----------------------------------------------------------
% PrfWatch: 0.00 CPU 0.02 WC
% # Preprocessing time : 0.025 s
% # Problem is unsatisfiable (or provable), constructing proof object
% # SZS status Theorem
% # SZS output start CNFRefutation.
% fof(2, axiom,![X1]:![X2]:(![X3]:(in(X3,X1)<=>in(X3,X2))=>X1=X2),file('/tmp/SRASS.s.p', t2_tarski)).
% fof(3, axiom,![X1]:![X2]:(in(X1,X2)=>element(X1,X2)),file('/tmp/SRASS.s.p', t1_subset)).
% fof(7, conjecture,![X1]:![X2]:![X3]:(((((((~(empty_carrier(X1))&topological_space(X1))&top_str(X1))&~(empty_carrier(X2)))&transitive_relstr(X2))&directed_relstr(X2))&net_str(X2,X1))=>![X4]:![X5]:![X6]:((![X7]:(in(X7,X5)<=>(in(X7,the_carrier(X2))&?[X8]:(netstr_induced_subset(X8,X1,X2)&?[X9]:(((element(X9,the_carrier(X2))&X4=topstr_closure(X1,X8))&X7=X9)&X8=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X9)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X9)))))))&![X7]:(in(X7,X6)<=>(in(X7,the_carrier(X2))&?[X10]:(netstr_induced_subset(X10,X1,X2)&?[X11]:(((element(X11,the_carrier(X2))&X4=topstr_closure(X1,X10))&X7=X11)&X10=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X11)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X11))))))))=>X5=X6)),file('/tmp/SRASS.s.p', s2_xboole_0__e6_39_3__yellow19__1)).
% fof(8, negated_conjecture,~(![X1]:![X2]:![X3]:(((((((~(empty_carrier(X1))&topological_space(X1))&top_str(X1))&~(empty_carrier(X2)))&transitive_relstr(X2))&directed_relstr(X2))&net_str(X2,X1))=>![X4]:![X5]:![X6]:((![X7]:(in(X7,X5)<=>(in(X7,the_carrier(X2))&?[X8]:(netstr_induced_subset(X8,X1,X2)&?[X9]:(((element(X9,the_carrier(X2))&X4=topstr_closure(X1,X8))&X7=X9)&X8=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X9)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X9)))))))&![X7]:(in(X7,X6)<=>(in(X7,the_carrier(X2))&?[X10]:(netstr_induced_subset(X10,X1,X2)&?[X11]:(((element(X11,the_carrier(X2))&X4=topstr_closure(X1,X10))&X7=X11)&X10=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X11)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X11))))))))=>X5=X6))),inference(assume_negation,[status(cth)],[7])).
% fof(11, negated_conjecture,~(![X1]:![X2]:![X3]:(((((((~(empty_carrier(X1))&topological_space(X1))&top_str(X1))&~(empty_carrier(X2)))&transitive_relstr(X2))&directed_relstr(X2))&net_str(X2,X1))=>![X4]:![X5]:![X6]:((![X7]:(in(X7,X5)<=>(in(X7,the_carrier(X2))&?[X8]:(netstr_induced_subset(X8,X1,X2)&?[X9]:(((element(X9,the_carrier(X2))&X4=topstr_closure(X1,X8))&X7=X9)&X8=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X9)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X9)))))))&![X7]:(in(X7,X6)<=>(in(X7,the_carrier(X2))&?[X10]:(netstr_induced_subset(X10,X1,X2)&?[X11]:(((element(X11,the_carrier(X2))&X4=topstr_closure(X1,X10))&X7=X11)&X10=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X11)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X11))))))))=>X5=X6))),inference(fof_simplification,[status(thm)],[8,theory(equality)])).
% fof(12, plain,![X6]:![X5]:![X4]:![X2]:![X1]:(epred1_5(X1,X2,X4,X5,X6)=>(![X7]:(in(X7,X5)<=>(in(X7,the_carrier(X2))&?[X8]:(netstr_induced_subset(X8,X1,X2)&?[X9]:(((element(X9,the_carrier(X2))&X4=topstr_closure(X1,X8))&X7=X9)&X8=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X9)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X9)))))))&![X7]:(in(X7,X6)<=>(in(X7,the_carrier(X2))&?[X10]:(netstr_induced_subset(X10,X1,X2)&?[X11]:(((element(X11,the_carrier(X2))&X4=topstr_closure(X1,X10))&X7=X11)&X10=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X11)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X11))))))))),introduced(definition)).
% fof(13, negated_conjecture,~(![X1]:![X2]:![X3]:(((((((~(empty_carrier(X1))&topological_space(X1))&top_str(X1))&~(empty_carrier(X2)))&transitive_relstr(X2))&directed_relstr(X2))&net_str(X2,X1))=>![X4]:![X5]:![X6]:(epred1_5(X1,X2,X4,X5,X6)=>X5=X6))),inference(apply_def,[status(esa)],[11,12,theory(equality)])).
% fof(17, plain,![X1]:![X2]:(?[X3]:((~(in(X3,X1))|~(in(X3,X2)))&(in(X3,X1)|in(X3,X2)))|X1=X2),inference(fof_nnf,[status(thm)],[2])).
% fof(18, plain,![X4]:![X5]:(?[X6]:((~(in(X6,X4))|~(in(X6,X5)))&(in(X6,X4)|in(X6,X5)))|X4=X5),inference(variable_rename,[status(thm)],[17])).
% fof(19, plain,![X4]:![X5]:(((~(in(esk1_2(X4,X5),X4))|~(in(esk1_2(X4,X5),X5)))&(in(esk1_2(X4,X5),X4)|in(esk1_2(X4,X5),X5)))|X4=X5),inference(skolemize,[status(esa)],[18])).
% fof(20, plain,![X4]:![X5]:(((~(in(esk1_2(X4,X5),X4))|~(in(esk1_2(X4,X5),X5)))|X4=X5)&((in(esk1_2(X4,X5),X4)|in(esk1_2(X4,X5),X5))|X4=X5)),inference(distribute,[status(thm)],[19])).
% cnf(21,plain,(X1=X2|in(esk1_2(X1,X2),X2)|in(esk1_2(X1,X2),X1)),inference(split_conjunct,[status(thm)],[20])).
% cnf(22,plain,(X1=X2|~in(esk1_2(X1,X2),X2)|~in(esk1_2(X1,X2),X1)),inference(split_conjunct,[status(thm)],[20])).
% fof(23, plain,![X1]:![X2]:(~(in(X1,X2))|element(X1,X2)),inference(fof_nnf,[status(thm)],[3])).
% fof(24, plain,![X3]:![X4]:(~(in(X3,X4))|element(X3,X4)),inference(variable_rename,[status(thm)],[23])).
% cnf(25,plain,(element(X1,X2)|~in(X1,X2)),inference(split_conjunct,[status(thm)],[24])).
% fof(141, negated_conjecture,?[X1]:?[X2]:?[X3]:(((((((~(empty_carrier(X1))&topological_space(X1))&top_str(X1))&~(empty_carrier(X2)))&transitive_relstr(X2))&directed_relstr(X2))&net_str(X2,X1))&?[X4]:?[X5]:?[X6]:(epred1_5(X1,X2,X4,X5,X6)&~(X5=X6))),inference(fof_nnf,[status(thm)],[13])).
% fof(142, negated_conjecture,?[X7]:?[X8]:?[X9]:(((((((~(empty_carrier(X7))&topological_space(X7))&top_str(X7))&~(empty_carrier(X8)))&transitive_relstr(X8))&directed_relstr(X8))&net_str(X8,X7))&?[X10]:?[X11]:?[X12]:(epred1_5(X7,X8,X10,X11,X12)&~(X11=X12))),inference(variable_rename,[status(thm)],[141])).
% fof(143, negated_conjecture,(((((((~(empty_carrier(esk14_0))&topological_space(esk14_0))&top_str(esk14_0))&~(empty_carrier(esk15_0)))&transitive_relstr(esk15_0))&directed_relstr(esk15_0))&net_str(esk15_0,esk14_0))&(epred1_5(esk14_0,esk15_0,esk17_0,esk18_0,esk19_0)&~(esk18_0=esk19_0))),inference(skolemize,[status(esa)],[142])).
% cnf(144,negated_conjecture,(esk18_0!=esk19_0),inference(split_conjunct,[status(thm)],[143])).
% cnf(145,negated_conjecture,(epred1_5(esk14_0,esk15_0,esk17_0,esk18_0,esk19_0)),inference(split_conjunct,[status(thm)],[143])).
% fof(153, plain,![X6]:![X5]:![X4]:![X2]:![X1]:(~(epred1_5(X1,X2,X4,X5,X6))|(![X7]:((~(in(X7,X5))|(in(X7,the_carrier(X2))&?[X8]:(netstr_induced_subset(X8,X1,X2)&?[X9]:(((element(X9,the_carrier(X2))&X4=topstr_closure(X1,X8))&X7=X9)&X8=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X9)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X9)))))))&((~(in(X7,the_carrier(X2)))|![X8]:(~(netstr_induced_subset(X8,X1,X2))|![X9]:(((~(element(X9,the_carrier(X2)))|~(X4=topstr_closure(X1,X8)))|~(X7=X9))|~(X8=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X9)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X9)))))))|in(X7,X5)))&![X7]:((~(in(X7,X6))|(in(X7,the_carrier(X2))&?[X10]:(netstr_induced_subset(X10,X1,X2)&?[X11]:(((element(X11,the_carrier(X2))&X4=topstr_closure(X1,X10))&X7=X11)&X10=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X11)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X11)))))))&((~(in(X7,the_carrier(X2)))|![X10]:(~(netstr_induced_subset(X10,X1,X2))|![X11]:(((~(element(X11,the_carrier(X2)))|~(X4=topstr_closure(X1,X10)))|~(X7=X11))|~(X10=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X11)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X11)))))))|in(X7,X6))))),inference(fof_nnf,[status(thm)],[12])).
% fof(154, plain,![X12]:![X13]:![X14]:![X15]:![X16]:(~(epred1_5(X16,X15,X14,X13,X12))|(![X17]:((~(in(X17,X13))|(in(X17,the_carrier(X15))&?[X18]:(netstr_induced_subset(X18,X16,X15)&?[X19]:(((element(X19,the_carrier(X15))&X14=topstr_closure(X16,X18))&X17=X19)&X18=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X19)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X19)))))))&((~(in(X17,the_carrier(X15)))|![X20]:(~(netstr_induced_subset(X20,X16,X15))|![X21]:(((~(element(X21,the_carrier(X15)))|~(X14=topstr_closure(X16,X20)))|~(X17=X21))|~(X20=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X21)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X21)))))))|in(X17,X13)))&![X22]:((~(in(X22,X12))|(in(X22,the_carrier(X15))&?[X23]:(netstr_induced_subset(X23,X16,X15)&?[X24]:(((element(X24,the_carrier(X15))&X14=topstr_closure(X16,X23))&X22=X24)&X23=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X24)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X24)))))))&((~(in(X22,the_carrier(X15)))|![X25]:(~(netstr_induced_subset(X25,X16,X15))|![X26]:(((~(element(X26,the_carrier(X15)))|~(X14=topstr_closure(X16,X25)))|~(X22=X26))|~(X25=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X26)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X26)))))))|in(X22,X12))))),inference(variable_rename,[status(thm)],[153])).
% fof(155, plain,![X12]:![X13]:![X14]:![X15]:![X16]:(~(epred1_5(X16,X15,X14,X13,X12))|(![X17]:((~(in(X17,X13))|(in(X17,the_carrier(X15))&(netstr_induced_subset(esk20_6(X12,X13,X14,X15,X16,X17),X16,X15)&(((element(esk21_6(X12,X13,X14,X15,X16,X17),the_carrier(X15))&X14=topstr_closure(X16,esk20_6(X12,X13,X14,X15,X16,X17)))&X17=esk21_6(X12,X13,X14,X15,X16,X17))&esk20_6(X12,X13,X14,X15,X16,X17)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,esk21_6(X12,X13,X14,X15,X16,X17))),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,esk21_6(X12,X13,X14,X15,X16,X17))))))))&((~(in(X17,the_carrier(X15)))|![X20]:(~(netstr_induced_subset(X20,X16,X15))|![X21]:(((~(element(X21,the_carrier(X15)))|~(X14=topstr_closure(X16,X20)))|~(X17=X21))|~(X20=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X21)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X21)))))))|in(X17,X13)))&![X22]:((~(in(X22,X12))|(in(X22,the_carrier(X15))&(netstr_induced_subset(esk22_6(X12,X13,X14,X15,X16,X22),X16,X15)&(((element(esk23_6(X12,X13,X14,X15,X16,X22),the_carrier(X15))&X14=topstr_closure(X16,esk22_6(X12,X13,X14,X15,X16,X22)))&X22=esk23_6(X12,X13,X14,X15,X16,X22))&esk22_6(X12,X13,X14,X15,X16,X22)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,esk23_6(X12,X13,X14,X15,X16,X22))),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,esk23_6(X12,X13,X14,X15,X16,X22))))))))&((~(in(X22,the_carrier(X15)))|![X25]:(~(netstr_induced_subset(X25,X16,X15))|![X26]:(((~(element(X26,the_carrier(X15)))|~(X14=topstr_closure(X16,X25)))|~(X22=X26))|~(X25=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X26)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X26)))))))|in(X22,X12))))),inference(skolemize,[status(esa)],[154])).
% fof(156, plain,![X12]:![X13]:![X14]:![X15]:![X16]:![X17]:![X20]:![X21]:![X22]:![X25]:![X26]:(((((((((~(element(X26,the_carrier(X15)))|~(X14=topstr_closure(X16,X25)))|~(X22=X26))|~(X25=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X26)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X26)))))|~(netstr_induced_subset(X25,X16,X15)))|~(in(X22,the_carrier(X15))))|in(X22,X12))&(~(in(X22,X12))|(in(X22,the_carrier(X15))&(netstr_induced_subset(esk22_6(X12,X13,X14,X15,X16,X22),X16,X15)&(((element(esk23_6(X12,X13,X14,X15,X16,X22),the_carrier(X15))&X14=topstr_closure(X16,esk22_6(X12,X13,X14,X15,X16,X22)))&X22=esk23_6(X12,X13,X14,X15,X16,X22))&esk22_6(X12,X13,X14,X15,X16,X22)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,esk23_6(X12,X13,X14,X15,X16,X22))),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,esk23_6(X12,X13,X14,X15,X16,X22)))))))))&(((((((~(element(X21,the_carrier(X15)))|~(X14=topstr_closure(X16,X20)))|~(X17=X21))|~(X20=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X21)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X21)))))|~(netstr_induced_subset(X20,X16,X15)))|~(in(X17,the_carrier(X15))))|in(X17,X13))&(~(in(X17,X13))|(in(X17,the_carrier(X15))&(netstr_induced_subset(esk20_6(X12,X13,X14,X15,X16,X17),X16,X15)&(((element(esk21_6(X12,X13,X14,X15,X16,X17),the_carrier(X15))&X14=topstr_closure(X16,esk20_6(X12,X13,X14,X15,X16,X17)))&X17=esk21_6(X12,X13,X14,X15,X16,X17))&esk20_6(X12,X13,X14,X15,X16,X17)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,esk21_6(X12,X13,X14,X15,X16,X17))),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,esk21_6(X12,X13,X14,X15,X16,X17))))))))))|~(epred1_5(X16,X15,X14,X13,X12))),inference(shift_quantors,[status(thm)],[155])).
% fof(157, plain,![X12]:![X13]:![X14]:![X15]:![X16]:![X17]:![X20]:![X21]:![X22]:![X25]:![X26]:(((((((((~(element(X26,the_carrier(X15)))|~(X14=topstr_closure(X16,X25)))|~(X22=X26))|~(X25=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X26)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X26)))))|~(netstr_induced_subset(X25,X16,X15)))|~(in(X22,the_carrier(X15))))|in(X22,X12))|~(epred1_5(X16,X15,X14,X13,X12)))&(((in(X22,the_carrier(X15))|~(in(X22,X12)))|~(epred1_5(X16,X15,X14,X13,X12)))&(((netstr_induced_subset(esk22_6(X12,X13,X14,X15,X16,X22),X16,X15)|~(in(X22,X12)))|~(epred1_5(X16,X15,X14,X13,X12)))&(((((element(esk23_6(X12,X13,X14,X15,X16,X22),the_carrier(X15))|~(in(X22,X12)))|~(epred1_5(X16,X15,X14,X13,X12)))&((X14=topstr_closure(X16,esk22_6(X12,X13,X14,X15,X16,X22))|~(in(X22,X12)))|~(epred1_5(X16,X15,X14,X13,X12))))&((X22=esk23_6(X12,X13,X14,X15,X16,X22)|~(in(X22,X12)))|~(epred1_5(X16,X15,X14,X13,X12))))&((esk22_6(X12,X13,X14,X15,X16,X22)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,esk23_6(X12,X13,X14,X15,X16,X22))),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,esk23_6(X12,X13,X14,X15,X16,X22))))|~(in(X22,X12)))|~(epred1_5(X16,X15,X14,X13,X12)))))))&((((((((~(element(X21,the_carrier(X15)))|~(X14=topstr_closure(X16,X20)))|~(X17=X21))|~(X20=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,X21)),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,X21)))))|~(netstr_induced_subset(X20,X16,X15)))|~(in(X17,the_carrier(X15))))|in(X17,X13))|~(epred1_5(X16,X15,X14,X13,X12)))&(((in(X17,the_carrier(X15))|~(in(X17,X13)))|~(epred1_5(X16,X15,X14,X13,X12)))&(((netstr_induced_subset(esk20_6(X12,X13,X14,X15,X16,X17),X16,X15)|~(in(X17,X13)))|~(epred1_5(X16,X15,X14,X13,X12)))&(((((element(esk21_6(X12,X13,X14,X15,X16,X17),the_carrier(X15))|~(in(X17,X13)))|~(epred1_5(X16,X15,X14,X13,X12)))&((X14=topstr_closure(X16,esk20_6(X12,X13,X14,X15,X16,X17))|~(in(X17,X13)))|~(epred1_5(X16,X15,X14,X13,X12))))&((X17=esk21_6(X12,X13,X14,X15,X16,X17)|~(in(X17,X13)))|~(epred1_5(X16,X15,X14,X13,X12))))&((esk20_6(X12,X13,X14,X15,X16,X17)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X16,X15,esk21_6(X12,X13,X14,X15,X16,X17))),the_carrier(X16),the_mapping(X16,subnetstr_of_element(X16,X15,esk21_6(X12,X13,X14,X15,X16,X17))))|~(in(X17,X13)))|~(epred1_5(X16,X15,X14,X13,X12)))))))),inference(distribute,[status(thm)],[156])).
% cnf(158,plain,(esk20_6(X5,X4,X3,X2,X1,X6)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,esk21_6(X5,X4,X3,X2,X1,X6))),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,esk21_6(X5,X4,X3,X2,X1,X6))))|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X4)),inference(split_conjunct,[status(thm)],[157])).
% cnf(159,plain,(X6=esk21_6(X5,X4,X3,X2,X1,X6)|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X4)),inference(split_conjunct,[status(thm)],[157])).
% cnf(160,plain,(X3=topstr_closure(X1,esk20_6(X5,X4,X3,X2,X1,X6))|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X4)),inference(split_conjunct,[status(thm)],[157])).
% cnf(162,plain,(netstr_induced_subset(esk20_6(X5,X4,X3,X2,X1,X6),X1,X2)|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X4)),inference(split_conjunct,[status(thm)],[157])).
% cnf(163,plain,(in(X6,the_carrier(X2))|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X4)),inference(split_conjunct,[status(thm)],[157])).
% cnf(164,plain,(in(X6,X4)|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,the_carrier(X2))|~netstr_induced_subset(X7,X1,X2)|X7!=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X8)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X8)))|X6!=X8|X3!=topstr_closure(X1,X7)|~element(X8,the_carrier(X2))),inference(split_conjunct,[status(thm)],[157])).
% cnf(165,plain,(esk22_6(X5,X4,X3,X2,X1,X6)=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,esk23_6(X5,X4,X3,X2,X1,X6))),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,esk23_6(X5,X4,X3,X2,X1,X6))))|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X5)),inference(split_conjunct,[status(thm)],[157])).
% cnf(166,plain,(X6=esk23_6(X5,X4,X3,X2,X1,X6)|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X5)),inference(split_conjunct,[status(thm)],[157])).
% cnf(167,plain,(X3=topstr_closure(X1,esk22_6(X5,X4,X3,X2,X1,X6))|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X5)),inference(split_conjunct,[status(thm)],[157])).
% cnf(169,plain,(netstr_induced_subset(esk22_6(X5,X4,X3,X2,X1,X6),X1,X2)|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X5)),inference(split_conjunct,[status(thm)],[157])).
% cnf(170,plain,(in(X6,the_carrier(X2))|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,X5)),inference(split_conjunct,[status(thm)],[157])).
% cnf(171,plain,(in(X6,X5)|~epred1_5(X1,X2,X3,X4,X5)|~in(X6,the_carrier(X2))|~netstr_induced_subset(X7,X1,X2)|X7!=relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X8)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X8)))|X6!=X8|X3!=topstr_closure(X1,X7)|~element(X8,the_carrier(X2))),inference(split_conjunct,[status(thm)],[157])).
% cnf(192,plain,(in(X1,X2)|relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1)))!=X5|topstr_closure(X3,X5)!=X6|~epred1_5(X3,X4,X6,X7,X2)|~netstr_induced_subset(X5,X3,X4)|~element(X1,the_carrier(X4))|~in(X1,the_carrier(X4))),inference(er,[status(thm)],[171,theory(equality)])).
% cnf(193,plain,(in(X1,X2)|relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1)))!=X5|topstr_closure(X3,X5)!=X6|~epred1_5(X3,X4,X6,X2,X7)|~netstr_induced_subset(X5,X3,X4)|~element(X1,the_carrier(X4))|~in(X1,the_carrier(X4))),inference(er,[status(thm)],[164,theory(equality)])).
% cnf(200,plain,(in(X1,X2)|relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1)))!=X5|topstr_closure(X3,X5)!=X6|~epred1_5(X3,X4,X6,X7,X2)|~netstr_induced_subset(X5,X3,X4)|~in(X1,the_carrier(X4))),inference(csr,[status(thm)],[192,25])).
% cnf(202,plain,(in(X1,X2)|relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1)))!=X5|topstr_closure(X3,X5)!=X6|~epred1_5(X3,X4,X6,X2,X7)|~netstr_induced_subset(X5,X3,X4)|~in(X1,the_carrier(X4))),inference(csr,[status(thm)],[193,25])).
% cnf(215,negated_conjecture,(in(X1,the_carrier(esk15_0))|~in(X1,esk19_0)),inference(spm,[status(thm)],[170,145,theory(equality)])).
% cnf(216,negated_conjecture,(in(X1,the_carrier(esk15_0))|~in(X1,esk18_0)),inference(spm,[status(thm)],[163,145,theory(equality)])).
% cnf(276,plain,(in(X1,X2)|topstr_closure(X3,relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1))))!=X5|~epred1_5(X3,X4,X5,X6,X2)|~netstr_induced_subset(relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1))),X3,X4)|~in(X1,the_carrier(X4))),inference(er,[status(thm)],[200,theory(equality)])).
% cnf(289,plain,(in(X1,X2)|topstr_closure(X3,relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1))))!=X5|~epred1_5(X3,X4,X5,X2,X6)|~netstr_induced_subset(relation_rng_as_subset(the_carrier(subnetstr_of_element(X3,X4,X1)),the_carrier(X3),the_mapping(X3,subnetstr_of_element(X3,X4,X1))),X3,X4)|~in(X1,the_carrier(X4))),inference(er,[status(thm)],[202,theory(equality)])).
% cnf(326,plain,(relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X6)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X6)))=esk20_6(X3,X4,X5,X2,X1,X6)|~epred1_5(X1,X2,X5,X4,X3)|~in(X6,X4)),inference(spm,[status(thm)],[158,159,theory(equality)])).
% cnf(330,plain,(relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X2,X6)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X2,X6)))=esk22_6(X3,X4,X5,X2,X1,X6)|~epred1_5(X1,X2,X5,X4,X3)|~in(X6,X3)),inference(spm,[status(thm)],[165,166,theory(equality)])).
% cnf(995,plain,(topstr_closure(X1,relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X5,X6)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X5,X6))))=X4|~epred1_5(X1,X5,X4,X3,X2)|~in(X6,X3)),inference(spm,[status(thm)],[160,326,theory(equality)])).
% cnf(996,plain,(netstr_induced_subset(relation_rng_as_subset(the_carrier(subnetstr_of_element(X5,X4,X6)),the_carrier(X5),the_mapping(X5,subnetstr_of_element(X5,X4,X6))),X5,X4)|~epred1_5(X5,X4,X3,X2,X1)|~in(X6,X2)),inference(spm,[status(thm)],[162,326,theory(equality)])).
% cnf(1698,negated_conjecture,(netstr_induced_subset(relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))),esk14_0,esk15_0)|~in(X1,esk18_0)),inference(spm,[status(thm)],[996,145,theory(equality)])).
% cnf(2022,negated_conjecture,(topstr_closure(esk14_0,relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))))=esk17_0|~in(X1,esk18_0)),inference(spm,[status(thm)],[995,145,theory(equality)])).
% cnf(2405,plain,(topstr_closure(X1,relation_rng_as_subset(the_carrier(subnetstr_of_element(X1,X5,X6)),the_carrier(X1),the_mapping(X1,subnetstr_of_element(X1,X5,X6))))=X4|~epred1_5(X1,X5,X4,X3,X2)|~in(X6,X2)),inference(spm,[status(thm)],[167,330,theory(equality)])).
% cnf(2406,plain,(netstr_induced_subset(relation_rng_as_subset(the_carrier(subnetstr_of_element(X5,X4,X6)),the_carrier(X5),the_mapping(X5,subnetstr_of_element(X5,X4,X6))),X5,X4)|~epred1_5(X5,X4,X3,X2,X1)|~in(X6,X1)),inference(spm,[status(thm)],[169,330,theory(equality)])).
% cnf(2455,negated_conjecture,(netstr_induced_subset(relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))),esk14_0,esk15_0)|~in(X1,esk19_0)),inference(spm,[status(thm)],[2406,145,theory(equality)])).
% cnf(2573,negated_conjecture,(topstr_closure(esk14_0,relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))))=esk17_0|~in(X1,esk19_0)),inference(spm,[status(thm)],[2405,145,theory(equality)])).
% cnf(12017,negated_conjecture,(in(X1,X2)|topstr_closure(esk14_0,relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))))!=X3|~epred1_5(esk14_0,esk15_0,X3,X4,X2)|~in(X1,the_carrier(esk15_0))|~in(X1,esk18_0)),inference(spm,[status(thm)],[276,1698,theory(equality)])).
% cnf(12253,negated_conjecture,(in(X1,X2)|topstr_closure(esk14_0,relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))))!=X3|~epred1_5(esk14_0,esk15_0,X3,X4,X2)|~in(X1,esk18_0)),inference(csr,[status(thm)],[12017,216])).
% cnf(12270,negated_conjecture,(in(X1,X2)|esk17_0!=X3|~epred1_5(esk14_0,esk15_0,X3,X4,X2)|~in(X1,esk18_0)),inference(spm,[status(thm)],[12253,2022,theory(equality)])).
% cnf(12520,negated_conjecture,(in(X1,esk19_0)|~in(X1,esk18_0)),inference(spm,[status(thm)],[12270,145,theory(equality)])).
% cnf(12547,negated_conjecture,(X1=esk19_0|~in(esk1_2(X1,esk19_0),X1)|~in(esk1_2(X1,esk19_0),esk18_0)),inference(spm,[status(thm)],[22,12520,theory(equality)])).
% cnf(13918,negated_conjecture,(in(X1,X2)|topstr_closure(esk14_0,relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))))!=X3|~epred1_5(esk14_0,esk15_0,X3,X2,X4)|~in(X1,the_carrier(esk15_0))|~in(X1,esk19_0)),inference(spm,[status(thm)],[289,2455,theory(equality)])).
% cnf(19015,negated_conjecture,(in(X1,X2)|topstr_closure(esk14_0,relation_rng_as_subset(the_carrier(subnetstr_of_element(esk14_0,esk15_0,X1)),the_carrier(esk14_0),the_mapping(esk14_0,subnetstr_of_element(esk14_0,esk15_0,X1))))!=X3|~epred1_5(esk14_0,esk15_0,X3,X2,X4)|~in(X1,esk19_0)),inference(csr,[status(thm)],[13918,215])).
% cnf(19033,negated_conjecture,(in(X1,X2)|esk17_0!=X3|~epred1_5(esk14_0,esk15_0,X3,X2,X4)|~in(X1,esk19_0)),inference(spm,[status(thm)],[19015,2573,theory(equality)])).
% cnf(19259,negated_conjecture,(in(X1,esk18_0)|~in(X1,esk19_0)),inference(spm,[status(thm)],[19033,145,theory(equality)])).
% cnf(19260,negated_conjecture,(in(esk1_2(X1,esk19_0),esk18_0)|X1=esk19_0|in(esk1_2(X1,esk19_0),X1)),inference(spm,[status(thm)],[19259,21,theory(equality)])).
% cnf(19263,negated_conjecture,(esk18_0=esk19_0|in(esk1_2(esk18_0,esk19_0),esk18_0)),inference(ef,[status(thm)],[19260,theory(equality)])).
% cnf(19356,negated_conjecture,(in(esk1_2(esk18_0,esk19_0),esk18_0)),inference(sr,[status(thm)],[19263,144,theory(equality)])).
% cnf(19360,negated_conjecture,(esk18_0=esk19_0|~in(esk1_2(esk18_0,esk19_0),esk18_0)),inference(spm,[status(thm)],[12547,19356,theory(equality)])).
% cnf(19361,negated_conjecture,(esk18_0=esk19_0|$false),inference(rw,[status(thm)],[19360,19356,theory(equality)])).
% cnf(19362,negated_conjecture,(esk18_0=esk19_0),inference(cn,[status(thm)],[19361,theory(equality)])).
% cnf(19363,negated_conjecture,($false),inference(sr,[status(thm)],[19362,144,theory(equality)])).
% cnf(19364,negated_conjecture,($false),19363,['proof']).
% # SZS output end CNFRefutation
% # Processed clauses : 980
% # ...of these trivial : 0
% # ...subsumed : 254
% # ...remaining for further processing: 726
% # Other redundant clauses eliminated : 34
% # Clauses deleted for lack of memory : 0
% # Backward-subsumed : 31
% # Backward-rewritten : 0
% # Generated clauses : 10546
% # ...of the previous two non-trivial : 10525
% # Contextual simplify-reflections : 309
% # Paramodulations : 10477
% # Factorizations : 22
% # Equation resolutions : 60
% # Current number of processed clauses: 547
% # Positive orientable unit clauses: 8
% # Positive unorientable unit clauses: 0
% # Negative unit clauses : 6
% # Non-unit-clauses : 533
% # Current number of unprocessed clauses: 9017
% # ...number of literals in the above : 86481
% # Clause-clause subsumption calls (NU) : 14294
% # Rec. Clause-clause subsumption calls : 5435
% # Unit Clause-clause subsumption calls : 230
% # Rewrite failures with RHS unbound : 0
% # Indexed BW rewrite attempts : 0
% # Indexed BW rewrite successes : 0
% # Backwards rewriting index: 163 leaves, 2.74+/-3.302 terms/leaf
% # Paramod-from index: 47 leaves, 1.49+/-0.965 terms/leaf
% # Paramod-into index: 117 leaves, 2.06+/-2.177 terms/leaf
% # -------------------------------------------------
% # User time : 0.806 s
% # System time : 0.030 s
% # Total time : 0.836 s
% # Maximum resident set size: 0 pages
% PrfWatch: 1.32 CPU 1.39 WC
% FINAL PrfWatch: 1.32 CPU 1.39 WC
% SZS output end Solution for /tmp/SystemOnTPTP9753/SEU401+2.tptp
%
%------------------------------------------------------------------------------