TSTP Solution File: SEU384+1 by Prover9---1109a
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : Prover9---1109a
% Problem : SEU384+1 : TPTP v8.1.0. Released v3.3.0.
% Transfm : none
% Format : tptp:raw
% Command : tptp2X_and_run_prover9 %d %s
% Computer : n018.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 : Tue Jul 19 13:31:26 EDT 2022
% Result : Timeout 300.06s 300.32s
% Output : None
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.12 % Problem : SEU384+1 : TPTP v8.1.0. Released v3.3.0.
% 0.07/0.13 % Command : tptp2X_and_run_prover9 %d %s
% 0.13/0.34 % Computer : n018.cluster.edu
% 0.13/0.34 % Model : x86_64 x86_64
% 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34 % Memory : 8042.1875MB
% 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34 % CPULimit : 300
% 0.13/0.34 % WCLimit : 600
% 0.13/0.34 % DateTime : Sun Jun 19 03:45:04 EDT 2022
% 0.13/0.34 % CPUTime :
% 0.43/1.04 ============================== Prover9 ===============================
% 0.43/1.04 Prover9 (32) version 2009-11A, November 2009.
% 0.43/1.04 Process 17146 was started by sandbox2 on n018.cluster.edu,
% 0.43/1.04 Sun Jun 19 03:45:04 2022
% 0.43/1.04 The command was "/export/starexec/sandbox2/solver/bin/prover9 -t 300 -f /tmp/Prover9_16766_n018.cluster.edu".
% 0.43/1.04 ============================== end of head ===========================
% 0.43/1.04
% 0.43/1.04 ============================== INPUT =================================
% 0.43/1.04
% 0.43/1.04 % Reading from file /tmp/Prover9_16766_n018.cluster.edu
% 0.43/1.04
% 0.43/1.04 set(prolog_style_variables).
% 0.43/1.04 set(auto2).
% 0.43/1.04 % set(auto2) -> set(auto).
% 0.43/1.04 % set(auto) -> set(auto_inference).
% 0.43/1.04 % set(auto) -> set(auto_setup).
% 0.43/1.04 % set(auto_setup) -> set(predicate_elim).
% 0.43/1.04 % set(auto_setup) -> assign(eq_defs, unfold).
% 0.43/1.04 % set(auto) -> set(auto_limits).
% 0.43/1.04 % set(auto_limits) -> assign(max_weight, "100.000").
% 0.43/1.04 % set(auto_limits) -> assign(sos_limit, 20000).
% 0.43/1.04 % set(auto) -> set(auto_denials).
% 0.43/1.04 % set(auto) -> set(auto_process).
% 0.43/1.04 % set(auto2) -> assign(new_constants, 1).
% 0.43/1.04 % set(auto2) -> assign(fold_denial_max, 3).
% 0.43/1.04 % set(auto2) -> assign(max_weight, "200.000").
% 0.43/1.04 % set(auto2) -> assign(max_hours, 1).
% 0.43/1.04 % assign(max_hours, 1) -> assign(max_seconds, 3600).
% 0.43/1.04 % set(auto2) -> assign(max_seconds, 0).
% 0.43/1.04 % set(auto2) -> assign(max_minutes, 5).
% 0.43/1.04 % assign(max_minutes, 5) -> assign(max_seconds, 300).
% 0.43/1.04 % set(auto2) -> set(sort_initial_sos).
% 0.43/1.04 % set(auto2) -> assign(sos_limit, -1).
% 0.43/1.04 % set(auto2) -> assign(lrs_ticks, 3000).
% 0.43/1.04 % set(auto2) -> assign(max_megs, 400).
% 0.43/1.04 % set(auto2) -> assign(stats, some).
% 0.43/1.04 % set(auto2) -> clear(echo_input).
% 0.43/1.04 % set(auto2) -> set(quiet).
% 0.43/1.04 % set(auto2) -> clear(print_initial_clauses).
% 0.43/1.04 % set(auto2) -> clear(print_given).
% 0.43/1.04 assign(lrs_ticks,-1).
% 0.43/1.04 assign(sos_limit,10000).
% 0.43/1.04 assign(order,kbo).
% 0.43/1.04 set(lex_order_vars).
% 0.43/1.04 clear(print_given).
% 0.43/1.04
% 0.43/1.04 % formulas(sos). % not echoed (74 formulas)
% 0.43/1.04
% 0.43/1.04 ============================== end of input ==========================
% 0.43/1.04
% 0.43/1.04 % From the command line: assign(max_seconds, 300).
% 0.43/1.04
% 0.43/1.04 ============================== PROCESS NON-CLAUSAL FORMULAS ==========
% 0.43/1.04
% 0.43/1.04 % Formulas that are not ordinary clauses:
% 0.43/1.04 1 (all A all B (one_sorted_str(A) & net_str(B,A) -> (strict_net_str(B,A) -> B = net_str_of(A,the_carrier(B),the_InternalRel(B),the_mapping(A,B))))) # label(abstractness_v6_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 2 (all A all B (in(A,B) -> -in(B,A))) # label(antisymmetry_r2_hidden) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 3 (all A (empty(A) -> finite(A))) # label(cc1_finset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 4 (all A (preboolean(A) -> cup_closed(A) & diff_closed(A))) # label(cc1_finsub_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 5 (all A (empty(A) -> function(A))) # label(cc1_funct_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 6 (all A all B all C (relation_of2(C,A,B) -> (function(C) & v1_partfun1(C,A,B) -> function(C) & quasi_total(C,A,B)))) # label(cc1_funct_2) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 7 (all A all B all C (element(C,powerset(cartesian_product2(A,B))) -> relation(C))) # label(cc1_relset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 8 (all A (finite(A) -> (all B (element(B,powerset(A)) -> finite(B))))) # label(cc2_finset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 9 (all A (cup_closed(A) & diff_closed(A) -> preboolean(A))) # label(cc2_finsub_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 10 (all A (relation(A) & empty(A) & function(A) -> relation(A) & function(A) & one_to_one(A))) # label(cc2_funct_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 11 (all A all B (-empty(B) -> (all C (relation_of2(C,A,B) -> (function(C) & quasi_total(C,A,B) -> function(C) & v1_partfun1(C,A,B) & quasi_total(C,A,B)))))) # label(cc5_funct_2) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.04 12 (all A all B (-empty(A) & -empty(B) -> (all C (relation_of2(C,A,B) -> (function(C) & quasi_total(C,A,B) -> function(C) & -empty(C) & v1_partfun1(C,A,B) & quasi_total(C,A,B)))))) # label(cc6_funct_2) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 13 (all A all B (A = B <-> subset(A,B) & subset(B,A))) # label(d10_xboole_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 14 (all A all B (subset(A,B) <-> (all C (in(C,A) -> in(C,B))))) # label(d3_tarski) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 15 (all A (-empty_carrier(A) & one_sorted_str(A) -> (all B (-empty_carrier(B) & net_str(B,A) -> (all C (element(C,the_carrier(B)) -> (all D (strict_net_str(D,A) & net_str(D,A) -> (D = netstr_restr_to_element(A,B,C) <-> (all E (in(E,the_carrier(D)) <-> (exists F (element(F,the_carrier(B)) & F = E & related(B,C,F))))) & the_InternalRel(D) = relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) & the_mapping(A,D) = partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D))))))))))) # label(d7_waybel_9) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 16 (all A all B all C all D (one_sorted_str(A) & relation_of2(C,B,B) & function(D) & quasi_total(D,B,the_carrier(A)) & relation_of2(D,B,the_carrier(A)) -> strict_net_str(net_str_of(A,B,C,D),A) & net_str(net_str_of(A,B,C,D),A))) # label(dt_g1_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 17 (all A all B (relation(A) -> relation_of2_as_subset(relation_restriction_as_relation_of(A,B),B,B))) # label(dt_k1_toler_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 18 $T # label(dt_k1_xboole_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 19 $T # label(dt_k1_zfmisc_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 20 (all A all B all C all D (function(C) & relation_of2(C,A,B) -> function(partfun_dom_restriction(A,B,C,D)) & relation_of2_as_subset(partfun_dom_restriction(A,B,C,D),A,B))) # label(dt_k2_partfun1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 21 (all A all B (relation(A) -> relation(relation_restriction(A,B)))) # label(dt_k2_wellord1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 22 $T # label(dt_k2_zfmisc_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 23 (all A all B all C (-empty_carrier(A) & one_sorted_str(A) & -empty_carrier(B) & net_str(B,A) & element(C,the_carrier(B)) -> strict_net_str(netstr_restr_to_element(A,B,C),A) & net_str(netstr_restr_to_element(A,B,C),A))) # label(dt_k5_waybel_9) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 24 (all A all B (relation(A) -> relation(relation_dom_restriction(A,B)))) # label(dt_k7_relat_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 25 (all A (rel_str(A) -> one_sorted_str(A))) # label(dt_l1_orders_2) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 26 $T # label(dt_l1_struct_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 27 (all A (one_sorted_str(A) -> (all B (net_str(B,A) -> rel_str(B))))) # label(dt_l1_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 28 $T # label(dt_m1_relset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 29 $T # label(dt_m1_subset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 30 (all A all B all C (relation_of2_as_subset(C,A,B) -> element(C,powerset(cartesian_product2(A,B))))) # label(dt_m2_relset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 31 (all A (rel_str(A) -> relation_of2_as_subset(the_InternalRel(A),the_carrier(A),the_carrier(A)))) # label(dt_u1_orders_2) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 32 $T # label(dt_u1_struct_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 33 (all A all B (one_sorted_str(A) & net_str(B,A) -> function(the_mapping(A,B)) & quasi_total(the_mapping(A,B),the_carrier(B),the_carrier(A)) & relation_of2_as_subset(the_mapping(A,B),the_carrier(B),the_carrier(A)))) # label(dt_u1_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 34 (exists A rel_str(A)) # label(existence_l1_orders_2) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 35 (exists A one_sorted_str(A)) # label(existence_l1_struct_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 36 (all A (one_sorted_str(A) -> (exists B net_str(B,A)))) # label(existence_l1_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 37 (all A all B exists C relation_of2(C,A,B)) # label(existence_m1_relset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 38 (all A exists B element(B,A)) # label(existence_m1_subset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 39 (all A all B exists C relation_of2_as_subset(C,A,B)) # label(existence_m2_relset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 40 (all A all B (finite(A) & finite(B) -> finite(cartesian_product2(A,B)))) # label(fc14_finset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 41 (all A all B (-empty_carrier(A) & one_sorted_str(A) & -empty_carrier(B) & net_str(B,A) -> -empty(the_mapping(A,B)) & relation(the_mapping(A,B)) & function(the_mapping(A,B)) & quasi_total(the_mapping(A,B),the_carrier(B),the_carrier(A)))) # label(fc15_yellow_6) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 42 (all A (-empty(powerset(A)) & cup_closed(powerset(A)) & diff_closed(powerset(A)) & preboolean(powerset(A)))) # label(fc1_finsub_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 43 (all A (-empty_carrier(A) & one_sorted_str(A) -> -empty(the_carrier(A)))) # label(fc1_struct_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 44 (all A all B (relation(A) & function(A) -> relation(relation_dom_restriction(A,B)) & function(relation_dom_restriction(A,B)))) # label(fc4_funct_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 45 (all A all B all C all D (one_sorted_str(A) & -empty(B) & relation_of2(C,B,B) & function(D) & quasi_total(D,B,the_carrier(A)) & relation_of2(D,B,the_carrier(A)) -> -empty_carrier(net_str_of(A,B,C,D)) & strict_net_str(net_str_of(A,B,C,D),A))) # label(fc6_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 46 (all A all B all C all D (-empty_carrier(B) & one_sorted_str(B) & -empty_carrier(C) & net_str(C,B) & element(D,the_carrier(C)) -> (in(A,a_3_0_waybel_9(B,C,D)) <-> (exists E (element(E,the_carrier(C)) & A = E & related(C,D,E)))))) # label(fraenkel_a_3_0_waybel_9) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 47 (all A all B all C all D (one_sorted_str(A) & relation_of2(C,B,B) & function(D) & quasi_total(D,B,the_carrier(A)) & relation_of2(D,B,the_carrier(A)) -> (all E all F all G all H (net_str_of(A,B,C,D) = net_str_of(E,F,G,H) -> A = E & B = F & C = G & D = H)))) # label(free_g1_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 48 (exists A (-empty(A) & finite(A))) # label(rc1_finset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 49 (exists A (relation(A) & function(A))) # label(rc1_funct_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 50 (all A all B exists C (relation_of2(C,A,B) & relation(C) & function(C) & quasi_total(C,A,B))) # label(rc1_funct_2) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 51 (exists A empty(A)) # label(rc1_xboole_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 52 (exists A (relation(A) & empty(A) & function(A))) # label(rc2_funct_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 53 (exists A -empty(A)) # label(rc2_xboole_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 54 (all A (-empty(A) -> (exists B (element(B,powerset(A)) & -empty(B) & finite(B))))) # label(rc3_finset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 55 (exists A (relation(A) & function(A) & one_to_one(A))) # label(rc3_funct_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 56 (exists A (one_sorted_str(A) & -empty_carrier(A))) # label(rc3_struct_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 57 (all A (-empty(A) -> (exists B (element(B,powerset(A)) & -empty(B) & finite(B))))) # label(rc4_finset_1) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 58 (all A (one_sorted_str(A) -> (exists B (net_str(B,A) & strict_net_str(B,A))))) # label(rc4_waybel_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 59 (all A (-empty_carrier(A) & one_sorted_str(A) -> (exists B (element(B,powerset(the_carrier(A))) & -empty(B))))) # label(rc5_struct_0) # label(axiom) # label(non_clause). [assumption].
% 0.43/1.05 60 (all A all B (relation(A) -> relation_restriction_as_relation_of(A,B) = relation_restriction(A,B))) # label(redefinition_k1_toler_1) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 61 (all A all B all C all D (function(C) & relation_of2(C,A,B) -> partfun_dom_restriction(A,B,C,D) = relation_dom_restriction(C,D))) # label(redefinition_k2_partfun1) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 62 (all A all B all C (relation_of2_as_subset(C,A,B) <-> relation_of2(C,A,B))) # label(redefinition_m2_relset_1) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 63 (all A all B subset(A,A)) # label(reflexivity_r1_tarski) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 64 (all A all B (in(A,B) -> element(A,B))) # label(t1_subset) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 65 (all A all B (element(A,B) -> empty(B) | in(A,B))) # label(t2_subset) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 66 (all A all B ((all C (in(C,A) <-> in(C,B))) -> A = B)) # label(t2_tarski) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 67 (all A all B (element(A,powerset(B)) <-> subset(A,B))) # label(t3_subset) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 68 (all A all B all C (in(A,B) & element(B,powerset(C)) -> element(A,C))) # label(t4_subset) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 69 (all A all B all C -(in(A,B) & element(B,powerset(C)) & empty(C))) # label(t5_subset) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 70 (all A (empty(A) -> A = empty_set)) # label(t6_boole) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 71 (all A all B -(in(A,B) & empty(B))) # label(t7_boole) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 72 (all A all B -(empty(A) & A != B & empty(B))) # label(t8_boole) # label(axiom) # label(non_clause). [assumption].
% 0.79/1.05 73 -(all A (-empty_carrier(A) & one_sorted_str(A) -> (all B (-empty_carrier(B) & net_str(B,A) -> (all C (element(C,the_carrier(B)) -> the_carrier(netstr_restr_to_element(A,B,C)) = a_3_0_waybel_9(A,B,C))))))) # label(t12_waybel_9) # label(negated_conjecture) # label(non_clause). [assumption].
% 0.79/1.05
% 0.79/1.05 ============================== end of process non-clausal formulas ===
% 0.79/1.05
% 0.79/1.05 ============================== PROCESS INITIAL CLAUSES ===============
% 0.79/1.05
% 0.79/1.05 ============================== PREDICATE ELIMINATION =================
% 0.79/1.05 74 -rel_str(A) | one_sorted_str(A) # label(dt_l1_orders_2) # label(axiom). [clausify(25)].
% 0.79/1.05 75 -one_sorted_str(A) | -net_str(B,A) | -strict_net_str(B,A) | net_str_of(A,the_carrier(B),the_InternalRel(B),the_mapping(A,B)) = B # label(abstractness_v6_waybel_0) # label(axiom). [clausify(1)].
% 0.79/1.05 76 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | -in(E,the_carrier(D)) | element(f2(A,B,C,D,E),the_carrier(B)) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 77 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | -in(E,the_carrier(D)) | f2(A,B,C,D,E) = E # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 78 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | -in(E,the_carrier(D)) | related(B,C,f2(A,B,C,D,E)) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 79 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | in(E,the_carrier(D)) | -element(F,the_carrier(B)) | F != E | -related(B,C,F) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 80 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) = the_InternalRel(D) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 81 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) = the_mapping(A,D) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 82 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | element(f4(A,B,C,D),the_carrier(B)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 83 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | f4(A,B,C,D) = f3(A,B,C,D) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 84 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | related(B,C,f4(A,B,C,D)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 85 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | -in(f3(A,B,C,D),the_carrier(D)) | -element(E,the_carrier(B)) | E != f3(A,B,C,D) | -related(B,C,E) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D) # label(d7_waybel_9) # label(axiom). [clausify(15)].
% 0.79/1.05 86 -one_sorted_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | strict_net_str(net_str_of(A,C,B,D),A) # label(dt_g1_waybel_0) # label(axiom). [clausify(16)].
% 0.79/1.05 87 -one_sorted_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | net_str(net_str_of(A,C,B,D),A) # label(dt_g1_waybel_0) # label(axiom). [clausify(16)].
% 0.79/1.05 88 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | strict_net_str(netstr_restr_to_element(A,B,C),A) # label(dt_k5_waybel_9) # label(axiom). [clausify(23)].
% 0.79/1.05 89 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | net_str(netstr_restr_to_element(A,B,C),A) # label(dt_k5_waybel_9) # label(axiom). [clausify(23)].
% 0.79/1.05 Derived: -rel_str(A) | -net_str(B,A) | -strict_net_str(B,A) | net_str_of(A,the_carrier(B),the_InternalRel(B),the_mapping(A,B)) = B. [resolve(74,b,75,a)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | -in(E,the_carrier(D)) | element(f2(A,B,C,D,E),the_carrier(B)). [resolve(74,b,76,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | -in(E,the_carrier(D)) | f2(A,B,C,D,E) = E. [resolve(74,b,77,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | -in(E,the_carrier(D)) | related(B,C,f2(A,B,C,D,E)). [resolve(74,b,78,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | in(E,the_carrier(D)) | -element(F,the_carrier(B)) | F != E | -related(B,C,F). [resolve(74,b,79,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) = the_InternalRel(D). [resolve(74,b,80,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) = the_mapping(A,D). [resolve(74,b,81,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | element(f4(A,B,C,D),the_carrier(B)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D). [resolve(74,b,82,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | f4(A,B,C,D) = f3(A,B,C,D) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D). [resolve(74,b,83,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | related(B,C,f4(A,B,C,D)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D). [resolve(74,b,84,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | -in(f3(A,B,C,D),the_carrier(D)) | -element(E,the_carrier(B)) | E != f3(A,B,C,D) | -related(B,C,E) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D). [resolve(74,b,85,b)].
% 0.79/1.05 Derived: -rel_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | strict_net_str(net_str_of(A,C,B,D),A). [resolve(74,b,86,a)].
% 0.79/1.05 Derived: -rel_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | net_str(net_str_of(A,C,B,D),A). [resolve(74,b,87,a)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | strict_net_str(netstr_restr_to_element(A,B,C),A). [resolve(74,b,88,b)].
% 0.79/1.05 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | net_str(netstr_restr_to_element(A,B,C),A). [resolve(74,b,89,b)].
% 0.79/1.05 90 -one_sorted_str(A) | -net_str(B,A) | rel_str(B) # label(dt_l1_waybel_0) # label(axiom). [clausify(27)].
% 0.79/1.05 Derived: -net_str(A,B) | rel_str(A) | -rel_str(B). [resolve(90,a,74,b)].
% 0.79/1.05 91 -one_sorted_str(A) | -net_str(B,A) | function(the_mapping(A,B)) # label(dt_u1_waybel_0) # label(axiom). [clausify(33)].
% 0.79/1.05 Derived: -net_str(A,B) | function(the_mapping(B,A)) | -rel_str(B). [resolve(91,a,74,b)].
% 0.79/1.05 92 -one_sorted_str(A) | -net_str(B,A) | quasi_total(the_mapping(A,B),the_carrier(B),the_carrier(A)) # label(dt_u1_waybel_0) # label(axiom). [clausify(33)].
% 0.79/1.05 Derived: -net_str(A,B) | quasi_total(the_mapping(B,A),the_carrier(A),the_carrier(B)) | -rel_str(B). [resolve(92,a,74,b)].
% 0.79/1.05 93 -one_sorted_str(A) | -net_str(B,A) | relation_of2_as_subset(the_mapping(A,B),the_carrier(B),the_carrier(A)) # label(dt_u1_waybel_0) # label(axiom). [clausify(33)].
% 0.79/1.05 Derived: -net_str(A,B) | relation_of2_as_subset(the_mapping(B,A),the_carrier(A),the_carrier(B)) | -rel_str(B). [resolve(93,a,74,b)].
% 0.79/1.05 94 one_sorted_str(c2) # label(existence_l1_struct_0) # label(axiom). [clausify(35)].
% 0.79/1.05 Derived: -net_str(A,c2) | -strict_net_str(A,c2) | net_str_of(c2,the_carrier(A),the_InternalRel(A),the_mapping(c2,A)) = A. [resolve(94,a,75,a)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | -in(D,the_carrier(C)) | element(f2(c2,A,B,C,D),the_carrier(A)). [resolve(94,a,76,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | -in(D,the_carrier(C)) | f2(c2,A,B,C,D) = D. [resolve(94,a,77,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | -in(D,the_carrier(C)) | related(A,B,f2(c2,A,B,C,D)). [resolve(94,a,78,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | in(D,the_carrier(C)) | -element(E,the_carrier(A)) | E != D | -related(A,B,E). [resolve(94,a,79,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) = the_InternalRel(C). [resolve(94,a,80,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) = the_mapping(c2,C). [resolve(94,a,81,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | in(f3(c2,A,B,C),the_carrier(C)) | element(f4(c2,A,B,C),the_carrier(A)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C). [resolve(94,a,82,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | in(f3(c2,A,B,C),the_carrier(C)) | f4(c2,A,B,C) = f3(c2,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C). [resolve(94,a,83,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | in(f3(c2,A,B,C),the_carrier(C)) | related(A,B,f4(c2,A,B,C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C). [resolve(94,a,84,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | -in(f3(c2,A,B,C),the_carrier(C)) | -element(D,the_carrier(A)) | D != f3(c2,A,B,C) | -related(A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C). [resolve(94,a,85,b)].
% 0.79/1.05 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c2)) | -relation_of2(C,B,the_carrier(c2)) | strict_net_str(net_str_of(c2,B,A,C),c2). [resolve(94,a,86,a)].
% 0.79/1.05 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c2)) | -relation_of2(C,B,the_carrier(c2)) | net_str(net_str_of(c2,B,A,C),c2). [resolve(94,a,87,a)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | strict_net_str(netstr_restr_to_element(c2,A,B),c2). [resolve(94,a,88,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | net_str(netstr_restr_to_element(c2,A,B),c2). [resolve(94,a,89,b)].
% 0.79/1.05 Derived: -net_str(A,c2) | rel_str(A). [resolve(94,a,90,a)].
% 0.79/1.05 Derived: -net_str(A,c2) | function(the_mapping(c2,A)). [resolve(94,a,91,a)].
% 0.79/1.05 Derived: -net_str(A,c2) | quasi_total(the_mapping(c2,A),the_carrier(A),the_carrier(c2)). [resolve(94,a,92,a)].
% 0.79/1.05 Derived: -net_str(A,c2) | relation_of2_as_subset(the_mapping(c2,A),the_carrier(A),the_carrier(c2)). [resolve(94,a,93,a)].
% 0.79/1.05 95 -one_sorted_str(A) | net_str(f5(A),A) # label(existence_l1_waybel_0) # label(axiom). [clausify(36)].
% 0.79/1.05 Derived: net_str(f5(A),A) | -rel_str(A). [resolve(95,a,74,b)].
% 0.79/1.05 Derived: net_str(f5(c2),c2). [resolve(95,a,94,a)].
% 0.79/1.05 96 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -empty(the_mapping(A,B)) # label(fc15_yellow_6) # label(axiom). [clausify(41)].
% 0.79/1.05 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -empty(the_mapping(A,B)) | -rel_str(A). [resolve(96,b,74,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -empty(the_mapping(c2,A)). [resolve(96,b,94,a)].
% 0.79/1.05 97 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | relation(the_mapping(A,B)) # label(fc15_yellow_6) # label(axiom). [clausify(41)].
% 0.79/1.05 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | relation(the_mapping(A,B)) | -rel_str(A). [resolve(97,b,74,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | relation(the_mapping(c2,A)). [resolve(97,b,94,a)].
% 0.79/1.05 98 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | function(the_mapping(A,B)) # label(fc15_yellow_6) # label(axiom). [clausify(41)].
% 0.79/1.05 99 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | quasi_total(the_mapping(A,B),the_carrier(B),the_carrier(A)) # label(fc15_yellow_6) # label(axiom). [clausify(41)].
% 0.79/1.05 100 empty_carrier(A) | -one_sorted_str(A) | -empty(the_carrier(A)) # label(fc1_struct_0) # label(axiom). [clausify(43)].
% 0.79/1.05 Derived: empty_carrier(A) | -empty(the_carrier(A)) | -rel_str(A). [resolve(100,b,74,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | -empty(the_carrier(c2)). [resolve(100,b,94,a)].
% 0.79/1.05 101 -one_sorted_str(A) | empty(B) | -relation_of2(C,B,B) | -function(D) | -quasi_total(D,B,the_carrier(A)) | -relation_of2(D,B,the_carrier(A)) | -empty_carrier(net_str_of(A,B,C,D)) # label(fc6_waybel_0) # label(axiom). [clausify(45)].
% 0.79/1.05 Derived: empty(A) | -relation_of2(B,A,A) | -function(C) | -quasi_total(C,A,the_carrier(D)) | -relation_of2(C,A,the_carrier(D)) | -empty_carrier(net_str_of(D,A,B,C)) | -rel_str(D). [resolve(101,a,74,b)].
% 0.79/1.05 Derived: empty(A) | -relation_of2(B,A,A) | -function(C) | -quasi_total(C,A,the_carrier(c2)) | -relation_of2(C,A,the_carrier(c2)) | -empty_carrier(net_str_of(c2,A,B,C)). [resolve(101,a,94,a)].
% 0.79/1.05 102 -one_sorted_str(A) | empty(B) | -relation_of2(C,B,B) | -function(D) | -quasi_total(D,B,the_carrier(A)) | -relation_of2(D,B,the_carrier(A)) | strict_net_str(net_str_of(A,B,C,D),A) # label(fc6_waybel_0) # label(axiom). [clausify(45)].
% 0.79/1.05 103 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | element(f9(D,A,B,C),the_carrier(B)) # label(fraenkel_a_3_0_waybel_9) # label(axiom). [clausify(46)].
% 0.79/1.05 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | element(f9(D,A,B,C),the_carrier(B)) | -rel_str(A). [resolve(103,b,74,b)].
% 0.79/1.05 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | element(f9(C,c2,A,B),the_carrier(A)). [resolve(103,b,94,a)].
% 0.79/1.06 104 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | f9(D,A,B,C) = D # label(fraenkel_a_3_0_waybel_9) # label(axiom). [clausify(46)].
% 0.79/1.06 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | f9(D,A,B,C) = D | -rel_str(A). [resolve(104,b,74,b)].
% 0.79/1.06 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | f9(C,c2,A,B) = C. [resolve(104,b,94,a)].
% 0.79/1.06 105 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | related(B,C,f9(D,A,B,C)) # label(fraenkel_a_3_0_waybel_9) # label(axiom). [clausify(46)].
% 0.79/1.06 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | related(B,C,f9(D,A,B,C)) | -rel_str(A). [resolve(105,b,74,b)].
% 0.79/1.06 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | related(A,B,f9(C,c2,A,B)). [resolve(105,b,94,a)].
% 0.79/1.06 106 empty_carrier(A) | -one_sorted_str(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(E,the_carrier(B)) | E != D | -related(B,C,E) # label(fraenkel_a_3_0_waybel_9) # label(axiom). [clausify(46)].
% 0.79/1.06 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(E,the_carrier(B)) | E != D | -related(B,C,E) | -rel_str(A). [resolve(106,b,74,b)].
% 0.79/1.06 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(D,the_carrier(A)) | D != C | -related(A,B,D). [resolve(106,b,94,a)].
% 0.79/1.06 107 -one_sorted_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | net_str_of(E,F,V6,V7) != net_str_of(A,C,B,D) | E = A # label(free_g1_waybel_0) # label(axiom). [clausify(47)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(D)) | -relation_of2(C,B,the_carrier(D)) | net_str_of(E,F,V6,V7) != net_str_of(D,B,A,C) | E = D | -rel_str(D). [resolve(107,a,74,b)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c2)) | -relation_of2(C,B,the_carrier(c2)) | net_str_of(D,E,F,V6) != net_str_of(c2,B,A,C) | D = c2. [resolve(107,a,94,a)].
% 0.79/1.06 108 -one_sorted_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | net_str_of(E,F,V6,V7) != net_str_of(A,C,B,D) | F = C # label(free_g1_waybel_0) # label(axiom). [clausify(47)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(D)) | -relation_of2(C,B,the_carrier(D)) | net_str_of(E,F,V6,V7) != net_str_of(D,B,A,C) | F = B | -rel_str(D). [resolve(108,a,74,b)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c2)) | -relation_of2(C,B,the_carrier(c2)) | net_str_of(D,E,F,V6) != net_str_of(c2,B,A,C) | E = B. [resolve(108,a,94,a)].
% 0.79/1.06 109 -one_sorted_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | net_str_of(E,F,V6,V7) != net_str_of(A,C,B,D) | V6 = B # label(free_g1_waybel_0) # label(axiom). [clausify(47)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(D)) | -relation_of2(C,B,the_carrier(D)) | net_str_of(E,F,V6,V7) != net_str_of(D,B,A,C) | V6 = A | -rel_str(D). [resolve(109,a,74,b)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c2)) | -relation_of2(C,B,the_carrier(c2)) | net_str_of(D,E,F,V6) != net_str_of(c2,B,A,C) | F = A. [resolve(109,a,94,a)].
% 0.79/1.06 110 -one_sorted_str(A) | -relation_of2(B,C,C) | -function(D) | -quasi_total(D,C,the_carrier(A)) | -relation_of2(D,C,the_carrier(A)) | net_str_of(E,F,V6,V7) != net_str_of(A,C,B,D) | V7 = D # label(free_g1_waybel_0) # label(axiom). [clausify(47)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(D)) | -relation_of2(C,B,the_carrier(D)) | net_str_of(E,F,V6,V7) != net_str_of(D,B,A,C) | V7 = C | -rel_str(D). [resolve(110,a,74,b)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c2)) | -relation_of2(C,B,the_carrier(c2)) | net_str_of(D,E,F,V6) != net_str_of(c2,B,A,C) | V6 = C. [resolve(110,a,94,a)].
% 0.79/1.06 111 one_sorted_str(c9) # label(rc3_struct_0) # label(axiom). [clausify(56)].
% 0.79/1.06 Derived: -net_str(A,c9) | -strict_net_str(A,c9) | net_str_of(c9,the_carrier(A),the_InternalRel(A),the_mapping(c9,A)) = A. [resolve(111,a,75,a)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | element(f2(c9,A,B,C,D),the_carrier(A)). [resolve(111,a,76,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | f2(c9,A,B,C,D) = D. [resolve(111,a,77,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | related(A,B,f2(c9,A,B,C,D)). [resolve(111,a,78,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(E,the_carrier(A)) | E != D | -related(A,B,E). [resolve(111,a,79,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) = the_InternalRel(C). [resolve(111,a,80,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) = the_mapping(c9,C). [resolve(111,a,81,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | element(f4(c9,A,B,C),the_carrier(A)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C). [resolve(111,a,82,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | f4(c9,A,B,C) = f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C). [resolve(111,a,83,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | related(A,B,f4(c9,A,B,C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C). [resolve(111,a,84,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(D,the_carrier(A)) | D != f3(c9,A,B,C) | -related(A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C). [resolve(111,a,85,b)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c9)) | -relation_of2(C,B,the_carrier(c9)) | strict_net_str(net_str_of(c9,B,A,C),c9). [resolve(111,a,86,a)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c9)) | -relation_of2(C,B,the_carrier(c9)) | net_str(net_str_of(c9,B,A,C),c9). [resolve(111,a,87,a)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | strict_net_str(netstr_restr_to_element(c9,A,B),c9). [resolve(111,a,88,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | net_str(netstr_restr_to_element(c9,A,B),c9). [resolve(111,a,89,b)].
% 0.79/1.06 Derived: -net_str(A,c9) | rel_str(A). [resolve(111,a,90,a)].
% 0.79/1.06 Derived: -net_str(A,c9) | function(the_mapping(c9,A)). [resolve(111,a,91,a)].
% 0.79/1.06 Derived: -net_str(A,c9) | quasi_total(the_mapping(c9,A),the_carrier(A),the_carrier(c9)). [resolve(111,a,92,a)].
% 0.79/1.06 Derived: -net_str(A,c9) | relation_of2_as_subset(the_mapping(c9,A),the_carrier(A),the_carrier(c9)). [resolve(111,a,93,a)].
% 0.79/1.06 Derived: net_str(f5(c9),c9). [resolve(111,a,95,a)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -empty(the_mapping(c9,A)). [resolve(111,a,96,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | relation(the_mapping(c9,A)). [resolve(111,a,97,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | -empty(the_carrier(c9)). [resolve(111,a,100,b)].
% 0.79/1.06 Derived: empty(A) | -relation_of2(B,A,A) | -function(C) | -quasi_total(C,A,the_carrier(c9)) | -relation_of2(C,A,the_carrier(c9)) | -empty_carrier(net_str_of(c9,A,B,C)). [resolve(111,a,101,a)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | element(f9(C,c9,A,B),the_carrier(A)). [resolve(111,a,103,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | f9(C,c9,A,B) = C. [resolve(111,a,104,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | related(A,B,f9(C,c9,A,B)). [resolve(111,a,105,b)].
% 0.79/1.06 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(D,the_carrier(A)) | D != C | -related(A,B,D). [resolve(111,a,106,b)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c9)) | -relation_of2(C,B,the_carrier(c9)) | net_str_of(D,E,F,V6) != net_str_of(c9,B,A,C) | D = c9. [resolve(111,a,107,a)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c9)) | -relation_of2(C,B,the_carrier(c9)) | net_str_of(D,E,F,V6) != net_str_of(c9,B,A,C) | E = B. [resolve(111,a,108,a)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c9)) | -relation_of2(C,B,the_carrier(c9)) | net_str_of(D,E,F,V6) != net_str_of(c9,B,A,C) | F = A. [resolve(111,a,109,a)].
% 0.79/1.06 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c9)) | -relation_of2(C,B,the_carrier(c9)) | net_str_of(D,E,F,V6) != net_str_of(c9,B,A,C) | V6 = C. [resolve(111,a,110,a)].
% 0.79/1.06 112 -one_sorted_str(A) | net_str(f13(A),A) # label(rc4_waybel_0) # label(axiom). [clausify(58)].
% 0.79/1.06 Derived: net_str(f13(A),A) | -rel_str(A). [resolve(112,a,74,b)].
% 0.79/1.06 Derived: net_str(f13(c2),c2). [resolve(112,a,94,a)].
% 0.79/1.06 Derived: net_str(f13(c9),c9). [resolve(112,a,111,a)].
% 0.79/1.06 113 -one_sorted_str(A) | strict_net_str(f13(A),A) # label(rc4_waybel_0) # label(axiom). [clausify(58)].
% 0.79/1.06 Derived: strict_net_str(f13(A),A) | -rel_str(A). [resolve(113,a,74,b)].
% 0.79/1.06 Derived: strict_net_str(f13(c2),c2). [resolve(113,a,94,a)].
% 0.79/1.06 Derived: strict_net_str(f13(c9),c9). [resolve(113,a,111,a)].
% 0.79/1.06 114 empty_carrier(A) | -one_sorted_str(A) | element(f14(A),powerset(the_carrier(A))) # label(rc5_struct_0) # label(axiom). [clausify(59)].
% 0.79/1.06 Derived: empty_carrier(A) | element(f14(A),powerset(the_carrier(A))) | -rel_str(A). [resolve(114,b,74,b)].
% 0.79/1.06 Derived: empty_carrier(c2) | element(f14(c2),powerset(the_carrier(c2))). [resolve(114,b,94,a)].
% 0.79/1.06 Derived: empty_carrier(c9) | element(f14(c9),powerset(the_carrier(c9))). [resolve(114,b,111,a)].
% 0.79/1.06 115 empty_carrier(A) | -one_sorted_str(A) | -empty(f14(A)) # label(rc5_struct_0) # label(axiom). [clausify(59)].
% 0.79/1.06 Derived: empty_carrier(A) | -empty(f14(A)) | -rel_str(A). [resolve(115,b,74,b)].
% 0.79/1.06 Derived: empty_carrier(c2) | -empty(f14(c2)). [resolve(115,b,94,a)].
% 0.79/1.06 Derived: empty_carrier(c9) | -empty(f14(c9)). [resolve(115,b,111,a)].
% 0.79/1.06 116 one_sorted_str(c10) # label(t12_waybel_9) # label(negated_conjecture). [clausify(73)].
% 0.79/1.06 Derived: -net_str(A,c10) | -strict_net_str(A,c10) | net_str_of(c10,the_carrier(A),the_InternalRel(A),the_mapping(c10,A)) = A. [resolve(116,a,75,a)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | element(f2(c10,A,B,C,D),the_carrier(A)). [resolve(116,a,76,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | f2(c10,A,B,C,D) = D. [resolve(116,a,77,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | related(A,B,f2(c10,A,B,C,D)). [resolve(116,a,78,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(E,the_carrier(A)) | E != D | -related(A,B,E). [resolve(116,a,79,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) = the_InternalRel(C). [resolve(116,a,80,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) = the_mapping(c10,C). [resolve(116,a,81,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | element(f4(c10,A,B,C),the_carrier(A)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C). [resolve(116,a,82,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | f4(c10,A,B,C) = f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C). [resolve(116,a,83,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | related(A,B,f4(c10,A,B,C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C). [resolve(116,a,84,b)].
% 0.79/1.06 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(D,the_carrier(A)) | D != f3(c10,A,B,C) | -related(A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C). [resolve(116,a,85,b)].
% 0.79/1.07 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c10)) | -relation_of2(C,B,the_carrier(c10)) | strict_net_str(net_str_of(c10,B,A,C),c10). [resolve(116,a,86,a)].
% 0.79/1.07 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c10)) | -relation_of2(C,B,the_carrier(c10)) | net_str(net_str_of(c10,B,A,C),c10). [resolve(116,a,87,a)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | strict_net_str(netstr_restr_to_element(c10,A,B),c10). [resolve(116,a,88,b)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | net_str(netstr_restr_to_element(c10,A,B),c10). [resolve(116,a,89,b)].
% 0.79/1.07 Derived: -net_str(A,c10) | rel_str(A). [resolve(116,a,90,a)].
% 0.79/1.07 Derived: -net_str(A,c10) | function(the_mapping(c10,A)). [resolve(116,a,91,a)].
% 0.79/1.07 Derived: -net_str(A,c10) | quasi_total(the_mapping(c10,A),the_carrier(A),the_carrier(c10)). [resolve(116,a,92,a)].
% 0.79/1.07 Derived: -net_str(A,c10) | relation_of2_as_subset(the_mapping(c10,A),the_carrier(A),the_carrier(c10)). [resolve(116,a,93,a)].
% 0.79/1.07 Derived: net_str(f5(c10),c10). [resolve(116,a,95,a)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -empty(the_mapping(c10,A)). [resolve(116,a,96,b)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | relation(the_mapping(c10,A)). [resolve(116,a,97,b)].
% 0.79/1.07 Derived: empty_carrier(c10) | -empty(the_carrier(c10)). [resolve(116,a,100,b)].
% 0.79/1.07 Derived: empty(A) | -relation_of2(B,A,A) | -function(C) | -quasi_total(C,A,the_carrier(c10)) | -relation_of2(C,A,the_carrier(c10)) | -empty_carrier(net_str_of(c10,A,B,C)). [resolve(116,a,101,a)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | element(f9(C,c10,A,B),the_carrier(A)). [resolve(116,a,103,b)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | f9(C,c10,A,B) = C. [resolve(116,a,104,b)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | related(A,B,f9(C,c10,A,B)). [resolve(116,a,105,b)].
% 0.79/1.07 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(D,the_carrier(A)) | D != C | -related(A,B,D). [resolve(116,a,106,b)].
% 0.79/1.07 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c10)) | -relation_of2(C,B,the_carrier(c10)) | net_str_of(D,E,F,V6) != net_str_of(c10,B,A,C) | D = c10. [resolve(116,a,107,a)].
% 0.79/1.07 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c10)) | -relation_of2(C,B,the_carrier(c10)) | net_str_of(D,E,F,V6) != net_str_of(c10,B,A,C) | E = B. [resolve(116,a,108,a)].
% 0.79/1.07 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c10)) | -relation_of2(C,B,the_carrier(c10)) | net_str_of(D,E,F,V6) != net_str_of(c10,B,A,C) | F = A. [resolve(116,a,109,a)].
% 0.79/1.07 Derived: -relation_of2(A,B,B) | -function(C) | -quasi_total(C,B,the_carrier(c10)) | -relation_of2(C,B,the_carrier(c10)) | net_str_of(D,E,F,V6) != net_str_of(c10,B,A,C) | V6 = C. [resolve(116,a,110,a)].
% 0.79/1.07 Derived: net_str(f13(c10),c10). [resolve(116,a,112,a)].
% 0.79/1.07 Derived: strict_net_str(f13(c10),c10). [resolve(116,a,113,a)].
% 0.79/1.07 Derived: empty_carrier(c10) | element(f14(c10),powerset(the_carrier(c10))). [resolve(116,a,114,b)].
% 0.79/1.07 Derived: empty_carrier(c10) | -empty(f14(c10)). [resolve(116,a,115,b)].
% 0.79/1.07 117 -cup_closed(A) | -diff_closed(A) | preboolean(A) # label(cc2_finsub_1) # label(axiom). [clausify(9)].
% 0.79/1.07 118 -preboolean(A) | cup_closed(A) # label(cc1_finsub_1) # label(axiom). [clausify(4)].
% 0.83/1.10 119 -preboolean(A) | diff_closed(A) # label(cc1_finsub_1) # label(axiom). [clausify(4)].
% 0.83/1.10 120 preboolean(powerset(A)) # label(fc1_finsub_1) # label(axiom). [clausify(42)].
% 0.83/1.10 Derived: cup_closed(powerset(A)). [resolve(120,a,118,a)].
% 0.83/1.10 Derived: diff_closed(powerset(A)). [resolve(120,a,119,a)].
% 0.83/1.10 121 empty(A) | -relation_of2(B,C,A) | -function(B) | -quasi_total(B,C,A) | v1_partfun1(B,C,A) # label(cc5_funct_2) # label(axiom). [clausify(11)].
% 0.83/1.10 122 -relation_of2(A,B,C) | -function(A) | -v1_partfun1(A,B,C) | quasi_total(A,B,C) # label(cc1_funct_2) # label(axiom). [clausify(6)].
% 0.83/1.10 123 empty(A) | empty(B) | -relation_of2(C,A,B) | -function(C) | -quasi_total(C,A,B) | v1_partfun1(C,A,B) # label(cc6_funct_2) # label(axiom). [clausify(12)].
% 0.83/1.10 124 -relation_of2_as_subset(A,B,C) | element(A,powerset(cartesian_product2(B,C))) # label(dt_m2_relset_1) # label(axiom). [clausify(30)].
% 0.83/1.10 125 -relation(A) | relation_of2_as_subset(relation_restriction_as_relation_of(A,B),B,B) # label(dt_k1_toler_1) # label(axiom). [clausify(17)].
% 0.83/1.10 126 -function(A) | -relation_of2(A,B,C) | relation_of2_as_subset(partfun_dom_restriction(B,C,A,D),B,C) # label(dt_k2_partfun1) # label(axiom). [clausify(20)].
% 0.83/1.10 Derived: element(relation_restriction_as_relation_of(A,B),powerset(cartesian_product2(B,B))) | -relation(A). [resolve(124,a,125,b)].
% 0.83/1.10 Derived: element(partfun_dom_restriction(A,B,C,D),powerset(cartesian_product2(A,B))) | -function(C) | -relation_of2(C,A,B). [resolve(124,a,126,c)].
% 0.83/1.10 127 -rel_str(A) | relation_of2_as_subset(the_InternalRel(A),the_carrier(A),the_carrier(A)) # label(dt_u1_orders_2) # label(axiom). [clausify(31)].
% 0.83/1.10 Derived: -rel_str(A) | element(the_InternalRel(A),powerset(cartesian_product2(the_carrier(A),the_carrier(A)))). [resolve(127,b,124,a)].
% 0.83/1.10 128 relation_of2_as_subset(f8(A,B),A,B) # label(existence_m2_relset_1) # label(axiom). [clausify(39)].
% 0.83/1.10 Derived: element(f8(A,B),powerset(cartesian_product2(A,B))). [resolve(128,a,124,a)].
% 0.83/1.10 129 -relation_of2_as_subset(A,B,C) | relation_of2(A,B,C) # label(redefinition_m2_relset_1) # label(axiom). [clausify(62)].
% 0.83/1.10 Derived: relation_of2(relation_restriction_as_relation_of(A,B),B,B) | -relation(A). [resolve(129,a,125,b)].
% 0.83/1.10 Derived: relation_of2(partfun_dom_restriction(A,B,C,D),A,B) | -function(C) | -relation_of2(C,A,B). [resolve(129,a,126,c)].
% 0.83/1.10 Derived: relation_of2(the_InternalRel(A),the_carrier(A),the_carrier(A)) | -rel_str(A). [resolve(129,a,127,b)].
% 0.83/1.10 Derived: relation_of2(f8(A,B),A,B). [resolve(129,a,128,a)].
% 0.83/1.10 130 relation_of2_as_subset(A,B,C) | -relation_of2(A,B,C) # label(redefinition_m2_relset_1) # label(axiom). [clausify(62)].
% 0.83/1.10 Derived: -relation_of2(A,B,C) | element(A,powerset(cartesian_product2(B,C))). [resolve(130,a,124,a)].
% 0.83/1.10 131 -net_str(A,B) | relation_of2_as_subset(the_mapping(B,A),the_carrier(A),the_carrier(B)) | -rel_str(B). [resolve(93,a,74,b)].
% 0.83/1.10 Derived: -net_str(A,B) | -rel_str(B) | element(the_mapping(B,A),powerset(cartesian_product2(the_carrier(A),the_carrier(B)))). [resolve(131,b,124,a)].
% 0.83/1.10 Derived: -net_str(A,B) | -rel_str(B) | relation_of2(the_mapping(B,A),the_carrier(A),the_carrier(B)). [resolve(131,b,129,a)].
% 0.83/1.10 132 -net_str(A,c2) | relation_of2_as_subset(the_mapping(c2,A),the_carrier(A),the_carrier(c2)). [resolve(94,a,93,a)].
% 0.83/1.10 Derived: -net_str(A,c2) | element(the_mapping(c2,A),powerset(cartesian_product2(the_carrier(A),the_carrier(c2)))). [resolve(132,b,124,a)].
% 0.83/1.10 Derived: -net_str(A,c2) | relation_of2(the_mapping(c2,A),the_carrier(A),the_carrier(c2)). [resolve(132,b,129,a)].
% 0.83/1.10 133 -net_str(A,c9) | relation_of2_as_subset(the_mapping(c9,A),the_carrier(A),the_carrier(c9)). [resolve(111,a,93,a)].
% 0.83/1.10 Derived: -net_str(A,c9) | element(the_mapping(c9,A),powerset(cartesian_product2(the_carrier(A),the_carrier(c9)))). [resolve(133,b,124,a)].
% 0.83/1.10 Derived: -net_str(A,c9) | relation_of2(the_mapping(c9,A),the_carrier(A),the_carrier(c9)). [resolve(133,b,129,a)].
% 0.83/1.10 134 -net_str(A,c10) | relation_of2_as_subset(the_mapping(c10,A),the_carrier(A),the_carrier(c10)). [resolve(116,a,93,a)].
% 0.83/1.10 Derived: -net_str(A,c10) | element(the_mapping(c10,A),powerset(cartesian_product2(the_carrier(A),the_carrier(c10)))). [resolve(134,b,124,a)].
% 0.83/1.12 Derived: -net_str(A,c10) | relation_of2(the_mapping(c10,A),the_carrier(A),the_carrier(c10)). [resolve(134,b,129,a)].
% 0.83/1.12 135 -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | in(E,the_carrier(D)) | -element(F,the_carrier(B)) | F != E | -related(B,C,F). [resolve(74,b,79,b)].
% 0.83/1.12 136 -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | -in(E,the_carrier(D)) | related(B,C,f2(A,B,C,D,E)). [resolve(74,b,78,b)].
% 0.83/1.12 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) != D | in(E,the_carrier(D)) | -element(f2(F,B,C,V6,V7),the_carrier(B)) | f2(F,B,C,V6,V7) != E | -rel_str(F) | empty_carrier(F) | empty_carrier(B) | -net_str(B,F) | -element(C,the_carrier(B)) | -strict_net_str(V6,F) | -net_str(V6,F) | netstr_restr_to_element(F,B,C) != V6 | -in(V7,the_carrier(V6)). [resolve(135,l,136,j)].
% 0.83/1.12 137 -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | related(B,C,f4(A,B,C,D)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D). [resolve(74,b,84,b)].
% 0.83/1.12 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | in(f3(A,B,C,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D) | -rel_str(E) | empty_carrier(E) | empty_carrier(B) | -net_str(B,E) | -element(C,the_carrier(B)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,B,C) != F | in(V6,the_carrier(F)) | -element(f4(A,B,C,D),the_carrier(B)) | f4(A,B,C,D) != V6. [resolve(137,j,135,l)].
% 0.83/1.12 138 -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | -in(f3(A,B,C,D),the_carrier(D)) | -element(E,the_carrier(B)) | E != f3(A,B,C,D) | -related(B,C,E) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D). [resolve(74,b,85,b)].
% 0.83/1.12 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | -in(f3(A,B,C,D),the_carrier(D)) | -element(f2(E,B,C,F,V6),the_carrier(B)) | f2(E,B,C,F,V6) != f3(A,B,C,D) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D) | -rel_str(E) | empty_carrier(E) | empty_carrier(B) | -net_str(B,E) | -element(C,the_carrier(B)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,B,C) != F | -in(V6,the_carrier(F)). [resolve(138,l,136,j)].
% 0.83/1.12 Derived: -rel_str(A) | empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -strict_net_str(D,A) | -net_str(D,A) | netstr_restr_to_element(A,B,C) = D | -in(f3(A,B,C,D),the_carrier(D)) | -element(f4(E,B,C,F),the_carrier(B)) | f4(E,B,C,F) != f3(A,B,C,D) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(B),the_carrier(A),the_mapping(A,B),the_carrier(D)) != the_mapping(A,D) | -rel_str(E) | empty_carrier(E) | empty_carrier(B) | -net_str(B,E) | -element(C,the_carrier(B)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,B,C) = F | in(f3(E,B,C,F),the_carrier(F)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(B),the_carrier(E),the_mapping(E,B),the_carrier(F)) != the_mapping(E,F). [resolve(138,l,137,j)].
% 0.83/1.12 139 empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | -in(D,the_carrier(C)) | related(A,B,f2(c2,A,B,C,D)). [resolve(94,a,78,b)].
% 0.83/1.12 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | -in(D,the_carrier(C)) | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) != F | in(V6,the_carrier(F)) | -element(f2(c2,A,B,C,D),the_carrier(A)) | f2(c2,A,B,C,D) != V6. [resolve(139,i,135,l)].
% 0.83/1.12 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | -in(D,the_carrier(C)) | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) = F | -in(f3(E,A,B,F),the_carrier(F)) | -element(f2(c2,A,B,C,D),the_carrier(A)) | f2(c2,A,B,C,D) != f3(E,A,B,F) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(A),the_carrier(E),the_mapping(E,A),the_carrier(F)) != the_mapping(E,F). [resolve(139,i,138,l)].
% 0.83/1.12 140 empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | in(D,the_carrier(C)) | -element(E,the_carrier(A)) | E != D | -related(A,B,E). [resolve(94,a,79,b)].
% 0.83/1.12 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | in(D,the_carrier(C)) | -element(f2(E,A,B,F,V6),the_carrier(A)) | f2(E,A,B,F,V6) != D | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) != F | -in(V6,the_carrier(F)). [resolve(140,k,136,j)].
% 0.83/1.12 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | in(D,the_carrier(C)) | -element(f4(E,A,B,F),the_carrier(A)) | f4(E,A,B,F) != D | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) = F | in(f3(E,A,B,F),the_carrier(F)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(A),the_carrier(E),the_mapping(E,A),the_carrier(F)) != the_mapping(E,F). [resolve(140,k,137,j)].
% 0.83/1.12 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) != C | in(D,the_carrier(C)) | -element(f2(c2,A,B,E,F),the_carrier(A)) | f2(c2,A,B,E,F) != D | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) != E | -in(F,the_carrier(E)). [resolve(140,k,139,i)].
% 0.83/1.12 141 empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | in(f3(c2,A,B,C),the_carrier(C)) | related(A,B,f4(c2,A,B,C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C). [resolve(94,a,84,b)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | in(f3(c2,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | in(F,the_carrier(E)) | -element(f4(c2,A,B,C),the_carrier(A)) | f4(c2,A,B,C) != F. [resolve(141,i,135,l)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | in(f3(c2,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | -in(f3(D,A,B,E),the_carrier(E)) | -element(f4(c2,A,B,C),the_carrier(A)) | f4(c2,A,B,C) != f3(D,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(141,i,138,l)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | in(f3(c2,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | in(E,the_carrier(D)) | -element(f4(c2,A,B,C),the_carrier(A)) | f4(c2,A,B,C) != E. [resolve(141,i,140,k)].
% 0.88/1.13 142 empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | -in(f3(c2,A,B,C),the_carrier(C)) | -element(D,the_carrier(A)) | D != f3(c2,A,B,C) | -related(A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C). [resolve(94,a,85,b)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | -in(f3(c2,A,B,C),the_carrier(C)) | -element(f2(D,A,B,E,F),the_carrier(A)) | f2(D,A,B,E,F) != f3(c2,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | -in(F,the_carrier(E)). [resolve(142,k,136,j)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | -in(f3(c2,A,B,C),the_carrier(C)) | -element(f4(D,A,B,E),the_carrier(A)) | f4(D,A,B,E) != f3(c2,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | in(f3(D,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(142,k,137,j)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | -in(f3(c2,A,B,C),the_carrier(C)) | -element(f2(c2,A,B,D,E),the_carrier(A)) | f2(c2,A,B,D,E) != f3(c2,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | -in(E,the_carrier(D)). [resolve(142,k,139,i)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(C,c2) | -net_str(C,c2) | netstr_restr_to_element(c2,A,B) = C | -in(f3(c2,A,B,C),the_carrier(C)) | -element(f4(c2,A,B,D),the_carrier(A)) | f4(c2,A,B,D) != f3(c2,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(C)) != the_mapping(c2,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | in(f3(c2,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(142,k,141,i)].
% 0.88/1.13 143 empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | related(B,C,f9(D,A,B,C)) | -rel_str(A). [resolve(105,b,74,b)].
% 0.88/1.13 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | -rel_str(A) | -rel_str(E) | empty_carrier(E) | empty_carrier(B) | -net_str(B,E) | -element(C,the_carrier(B)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,B,C) != F | in(V6,the_carrier(F)) | -element(f9(D,A,B,C),the_carrier(B)) | f9(D,A,B,C) != V6. [resolve(143,f,135,l)].
% 0.88/1.13 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | -rel_str(A) | -rel_str(E) | empty_carrier(E) | empty_carrier(B) | -net_str(B,E) | -element(C,the_carrier(B)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,B,C) = F | -in(f3(E,B,C,F),the_carrier(F)) | -element(f9(D,A,B,C),the_carrier(B)) | f9(D,A,B,C) != f3(E,B,C,F) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(B),the_carrier(E),the_mapping(E,B),the_carrier(F)) != the_mapping(E,F). [resolve(143,f,138,l)].
% 0.88/1.13 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | -rel_str(A) | empty_carrier(c2) | empty_carrier(B) | -net_str(B,c2) | -element(C,the_carrier(B)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,B,C) != E | in(F,the_carrier(E)) | -element(f9(D,A,B,C),the_carrier(B)) | f9(D,A,B,C) != F. [resolve(143,f,140,k)].
% 0.88/1.13 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | -in(D,a_3_0_waybel_9(A,B,C)) | -rel_str(A) | empty_carrier(c2) | empty_carrier(B) | -net_str(B,c2) | -element(C,the_carrier(B)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,B,C) = E | -in(f3(c2,B,C,E),the_carrier(E)) | -element(f9(D,A,B,C),the_carrier(B)) | f9(D,A,B,C) != f3(c2,B,C,E) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(B),the_carrier(c2),the_mapping(c2,B),the_carrier(E)) != the_mapping(c2,E). [resolve(143,f,142,k)].
% 0.88/1.13 144 empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | related(A,B,f9(C,c2,A,B)). [resolve(105,b,94,a)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | in(F,the_carrier(E)) | -element(f9(C,c2,A,B),the_carrier(A)) | f9(C,c2,A,B) != F. [resolve(144,f,135,l)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | -in(f3(D,A,B,E),the_carrier(E)) | -element(f9(C,c2,A,B),the_carrier(A)) | f9(C,c2,A,B) != f3(D,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(144,f,138,l)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | in(E,the_carrier(D)) | -element(f9(C,c2,A,B),the_carrier(A)) | f9(C,c2,A,B) != E. [resolve(144,f,140,k)].
% 0.88/1.13 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c2,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | -in(f3(c2,A,B,D),the_carrier(D)) | -element(f9(C,c2,A,B),the_carrier(A)) | f9(C,c2,A,B) != f3(c2,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(144,f,142,k)].
% 0.88/1.13 145 empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(E,the_carrier(B)) | E != D | -related(B,C,E) | -rel_str(A). [resolve(106,b,74,b)].
% 0.88/1.13 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(f2(E,B,C,F,V6),the_carrier(B)) | f2(E,B,C,F,V6) != D | -rel_str(A) | -rel_str(E) | empty_carrier(E) | empty_carrier(B) | -net_str(B,E) | -element(C,the_carrier(B)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,B,C) != F | -in(V6,the_carrier(F)). [resolve(145,h,136,j)].
% 0.88/1.13 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(f4(E,B,C,F),the_carrier(B)) | f4(E,B,C,F) != D | -rel_str(A) | -rel_str(E) | empty_carrier(E) | empty_carrier(B) | -net_str(B,E) | -element(C,the_carrier(B)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,B,C) = F | in(f3(E,B,C,F),the_carrier(F)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(B),the_carrier(E),the_mapping(E,B),the_carrier(F)) != the_mapping(E,F). [resolve(145,h,137,j)].
% 0.88/1.13 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(f2(c2,B,C,E,F),the_carrier(B)) | f2(c2,B,C,E,F) != D | -rel_str(A) | empty_carrier(c2) | empty_carrier(B) | -net_str(B,c2) | -element(C,the_carrier(B)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,B,C) != E | -in(F,the_carrier(E)). [resolve(145,h,139,i)].
% 0.88/1.14 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(f4(c2,B,C,E),the_carrier(B)) | f4(c2,B,C,E) != D | -rel_str(A) | empty_carrier(c2) | empty_carrier(B) | -net_str(B,c2) | -element(C,the_carrier(B)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,B,C) = E | in(f3(c2,B,C,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(B),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(B),the_carrier(c2),the_mapping(c2,B),the_carrier(E)) != the_mapping(c2,E). [resolve(145,h,141,i)].
% 0.88/1.14 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(f9(E,F,B,C),the_carrier(B)) | f9(E,F,B,C) != D | -rel_str(A) | empty_carrier(F) | empty_carrier(B) | -net_str(B,F) | -element(C,the_carrier(B)) | -in(E,a_3_0_waybel_9(F,B,C)) | -rel_str(F). [resolve(145,h,143,f)].
% 0.88/1.14 Derived: empty_carrier(A) | empty_carrier(B) | -net_str(B,A) | -element(C,the_carrier(B)) | in(D,a_3_0_waybel_9(A,B,C)) | -element(f9(E,c2,B,C),the_carrier(B)) | f9(E,c2,B,C) != D | -rel_str(A) | empty_carrier(c2) | empty_carrier(B) | -net_str(B,c2) | -element(C,the_carrier(B)) | -in(E,a_3_0_waybel_9(c2,B,C)). [resolve(145,h,144,f)].
% 0.88/1.14 146 empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(D,the_carrier(A)) | D != C | -related(A,B,D). [resolve(106,b,94,a)].
% 0.88/1.14 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(f2(D,A,B,E,F),the_carrier(A)) | f2(D,A,B,E,F) != C | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | -in(F,the_carrier(E)). [resolve(146,h,136,j)].
% 0.88/1.14 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(f4(D,A,B,E),the_carrier(A)) | f4(D,A,B,E) != C | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | in(f3(D,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(146,h,137,j)].
% 0.88/1.14 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(f2(c2,A,B,D,E),the_carrier(A)) | f2(c2,A,B,D,E) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | -in(E,the_carrier(D)). [resolve(146,h,139,i)].
% 0.88/1.14 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(f4(c2,A,B,D),the_carrier(A)) | f4(c2,A,B,D) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | in(f3(c2,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(146,h,141,i)].
% 0.88/1.14 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(f9(D,E,A,B),the_carrier(A)) | f9(D,E,A,B) != C | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(E,A,B)) | -rel_str(E). [resolve(146,h,143,f)].
% 0.88/1.14 Derived: empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c2,A,B)) | -element(f9(D,c2,A,B),the_carrier(A)) | f9(D,c2,A,B) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c2,A,B)). [resolve(146,h,144,f)].
% 0.88/1.14 147 empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | related(A,B,f2(c9,A,B,C,D)). [resolve(111,a,78,b)].
% 0.88/1.14 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) != F | in(V6,the_carrier(F)) | -element(f2(c9,A,B,C,D),the_carrier(A)) | f2(c9,A,B,C,D) != V6. [resolve(147,i,135,l)].
% 0.88/1.14 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) = F | -in(f3(E,A,B,F),the_carrier(F)) | -element(f2(c9,A,B,C,D),the_carrier(A)) | f2(c9,A,B,C,D) != f3(E,A,B,F) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(A),the_carrier(E),the_mapping(E,A),the_carrier(F)) != the_mapping(E,F). [resolve(147,i,138,l)].
% 0.88/1.14 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) != E | in(F,the_carrier(E)) | -element(f2(c9,A,B,C,D),the_carrier(A)) | f2(c9,A,B,C,D) != F. [resolve(147,i,140,k)].
% 0.88/1.14 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) = E | -in(f3(c2,A,B,E),the_carrier(E)) | -element(f2(c9,A,B,C,D),the_carrier(A)) | f2(c9,A,B,C,D) != f3(c2,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(E)) != the_mapping(c2,E). [resolve(147,i,142,k)].
% 0.88/1.14 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | in(F,a_3_0_waybel_9(E,A,B)) | -element(f2(c9,A,B,C,D),the_carrier(A)) | f2(c9,A,B,C,D) != F | -rel_str(E). [resolve(147,i,145,h)].
% 0.88/1.14 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(E,a_3_0_waybel_9(c2,A,B)) | -element(f2(c9,A,B,C,D),the_carrier(A)) | f2(c9,A,B,C,D) != E. [resolve(147,i,146,h)].
% 0.88/1.14 148 empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(E,the_carrier(A)) | E != D | -related(A,B,E). [resolve(111,a,79,b)].
% 0.88/1.14 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(f2(E,A,B,F,V6),the_carrier(A)) | f2(E,A,B,F,V6) != D | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) != F | -in(V6,the_carrier(F)). [resolve(148,k,136,j)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(f4(E,A,B,F),the_carrier(A)) | f4(E,A,B,F) != D | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) = F | in(f3(E,A,B,F),the_carrier(F)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(A),the_carrier(E),the_mapping(E,A),the_carrier(F)) != the_mapping(E,F). [resolve(148,k,137,j)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(f2(c2,A,B,E,F),the_carrier(A)) | f2(c2,A,B,E,F) != D | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) != E | -in(F,the_carrier(E)). [resolve(148,k,139,i)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(f4(c2,A,B,E),the_carrier(A)) | f4(c2,A,B,E) != D | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) = E | in(f3(c2,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(E)) != the_mapping(c2,E). [resolve(148,k,141,i)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(f9(E,F,A,B),the_carrier(A)) | f9(E,F,A,B) != D | empty_carrier(F) | empty_carrier(A) | -net_str(A,F) | -element(B,the_carrier(A)) | -in(E,a_3_0_waybel_9(F,A,B)) | -rel_str(F). [resolve(148,k,143,f)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(f9(E,c2,A,B),the_carrier(A)) | f9(E,c2,A,B) != D | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(E,a_3_0_waybel_9(c2,A,B)). [resolve(148,k,144,f)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) != C | in(D,the_carrier(C)) | -element(f2(c9,A,B,E,F),the_carrier(A)) | f2(c9,A,B,E,F) != D | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(E,c9) | -net_str(E,c9) | netstr_restr_to_element(c9,A,B) != E | -in(F,the_carrier(E)). [resolve(148,k,147,i)].
% 0.88/1.15 149 empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | related(A,B,f4(c9,A,B,C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C). [resolve(111,a,84,b)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | in(F,the_carrier(E)) | -element(f4(c9,A,B,C),the_carrier(A)) | f4(c9,A,B,C) != F. [resolve(149,i,135,l)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | -in(f3(D,A,B,E),the_carrier(E)) | -element(f4(c9,A,B,C),the_carrier(A)) | f4(c9,A,B,C) != f3(D,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(149,i,138,l)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | in(E,the_carrier(D)) | -element(f4(c9,A,B,C),the_carrier(A)) | f4(c9,A,B,C) != E. [resolve(149,i,140,k)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | -in(f3(c2,A,B,D),the_carrier(D)) | -element(f4(c9,A,B,C),the_carrier(A)) | f4(c9,A,B,C) != f3(c2,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(149,i,142,k)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | in(E,a_3_0_waybel_9(D,A,B)) | -element(f4(c9,A,B,C),the_carrier(A)) | f4(c9,A,B,C) != E | -rel_str(D). [resolve(149,i,145,h)].
% 0.88/1.15 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(D,a_3_0_waybel_9(c2,A,B)) | -element(f4(c9,A,B,C),the_carrier(A)) | f4(c9,A,B,C) != D. [resolve(149,i,146,h)].
% 0.88/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | in(f3(c9,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | in(E,the_carrier(D)) | -element(f4(c9,A,B,C),the_carrier(A)) | f4(c9,A,B,C) != E. [resolve(149,i,148,k)].
% 0.88/1.16 150 empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(D,the_carrier(A)) | D != f3(c9,A,B,C) | -related(A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C). [resolve(111,a,85,b)].
% 0.88/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f2(D,A,B,E,F),the_carrier(A)) | f2(D,A,B,E,F) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | -in(F,the_carrier(E)). [resolve(150,k,136,j)].
% 0.88/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f4(D,A,B,E),the_carrier(A)) | f4(D,A,B,E) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | in(f3(D,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(150,k,137,j)].
% 0.88/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f2(c2,A,B,D,E),the_carrier(A)) | f2(c2,A,B,D,E) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | -in(E,the_carrier(D)). [resolve(150,k,139,i)].
% 0.88/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f4(c2,A,B,D),the_carrier(A)) | f4(c2,A,B,D) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | in(f3(c2,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(150,k,141,i)].
% 0.91/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f9(D,E,A,B),the_carrier(A)) | f9(D,E,A,B) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(E,A,B)) | -rel_str(E). [resolve(150,k,143,f)].
% 0.91/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f9(D,c2,A,B),the_carrier(A)) | f9(D,c2,A,B) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c2,A,B)). [resolve(150,k,144,f)].
% 0.91/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f2(c9,A,B,D,E),the_carrier(A)) | f2(c9,A,B,D,E) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | -in(E,the_carrier(D)). [resolve(150,k,147,i)].
% 0.91/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(C,c9) | -net_str(C,c9) | netstr_restr_to_element(c9,A,B) = C | -in(f3(c9,A,B,C),the_carrier(C)) | -element(f4(c9,A,B,D),the_carrier(A)) | f4(c9,A,B,D) != f3(c9,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(C)) != the_mapping(c9,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) = D | in(f3(c9,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(D)) != the_mapping(c9,D). [resolve(150,k,149,i)].
% 0.91/1.16 151 empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | related(A,B,f9(C,c9,A,B)). [resolve(111,a,105,b)].
% 0.91/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | in(F,the_carrier(E)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != F. [resolve(151,f,135,l)].
% 0.91/1.16 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | -in(f3(D,A,B,E),the_carrier(E)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != f3(D,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(151,f,138,l)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | in(E,the_carrier(D)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != E. [resolve(151,f,140,k)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | -in(f3(c2,A,B,D),the_carrier(D)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != f3(c2,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(151,f,142,k)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | in(E,a_3_0_waybel_9(D,A,B)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != E | -rel_str(D). [resolve(151,f,145,h)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(D,a_3_0_waybel_9(c2,A,B)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != D. [resolve(151,f,146,h)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | in(E,the_carrier(D)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != E. [resolve(151,f,148,k)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c9,A,B)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) = D | -in(f3(c9,A,B,D),the_carrier(D)) | -element(f9(C,c9,A,B),the_carrier(A)) | f9(C,c9,A,B) != f3(c9,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(D)) != the_mapping(c9,D). [resolve(151,f,150,k)].
% 0.91/1.17 152 empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(D,the_carrier(A)) | D != C | -related(A,B,D). [resolve(111,a,106,b)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f2(D,A,B,E,F),the_carrier(A)) | f2(D,A,B,E,F) != C | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | -in(F,the_carrier(E)). [resolve(152,h,136,j)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f4(D,A,B,E),the_carrier(A)) | f4(D,A,B,E) != C | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | in(f3(D,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(152,h,137,j)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f2(c2,A,B,D,E),the_carrier(A)) | f2(c2,A,B,D,E) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | -in(E,the_carrier(D)). [resolve(152,h,139,i)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f4(c2,A,B,D),the_carrier(A)) | f4(c2,A,B,D) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | in(f3(c2,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(152,h,141,i)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f9(D,E,A,B),the_carrier(A)) | f9(D,E,A,B) != C | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(E,A,B)) | -rel_str(E). [resolve(152,h,143,f)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f9(D,c2,A,B),the_carrier(A)) | f9(D,c2,A,B) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c2,A,B)). [resolve(152,h,144,f)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f2(c9,A,B,D,E),the_carrier(A)) | f2(c9,A,B,D,E) != C | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | -in(E,the_carrier(D)). [resolve(152,h,147,i)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f4(c9,A,B,D),the_carrier(A)) | f4(c9,A,B,D) != C | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) = D | in(f3(c9,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(D)) != the_mapping(c9,D). [resolve(152,h,149,i)].
% 0.91/1.17 Derived: empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c9,A,B)) | -element(f9(D,c9,A,B),the_carrier(A)) | f9(D,c9,A,B) != C | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c9,A,B)). [resolve(152,h,151,f)].
% 0.91/1.17 153 empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | related(A,B,f2(c10,A,B,C,D)). [resolve(116,a,78,b)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) != F | in(V6,the_carrier(F)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != V6. [resolve(153,i,135,l)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) = F | -in(f3(E,A,B,F),the_carrier(F)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != f3(E,A,B,F) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(A),the_carrier(E),the_mapping(E,A),the_carrier(F)) != the_mapping(E,F). [resolve(153,i,138,l)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) != E | in(F,the_carrier(E)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != F. [resolve(153,i,140,k)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) = E | -in(f3(c2,A,B,E),the_carrier(E)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != f3(c2,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(E)) != the_mapping(c2,E). [resolve(153,i,142,k)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | in(F,a_3_0_waybel_9(E,A,B)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != F | -rel_str(E). [resolve(153,i,145,h)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(E,a_3_0_waybel_9(c2,A,B)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != E. [resolve(153,i,146,h)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(E,c9) | -net_str(E,c9) | netstr_restr_to_element(c9,A,B) != E | in(F,the_carrier(E)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != F. [resolve(153,i,148,k)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(E,c9) | -net_str(E,c9) | netstr_restr_to_element(c9,A,B) = E | -in(f3(c9,A,B,E),the_carrier(E)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != f3(c9,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(E)) != the_mapping(c9,E). [resolve(153,i,150,k)].
% 0.91/1.17 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | -in(D,the_carrier(C)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(E,a_3_0_waybel_9(c9,A,B)) | -element(f2(c10,A,B,C,D),the_carrier(A)) | f2(c10,A,B,C,D) != E. [resolve(153,i,152,h)].
% 0.91/1.18 154 empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(E,the_carrier(A)) | E != D | -related(A,B,E). [resolve(116,a,79,b)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f2(E,A,B,F,V6),the_carrier(A)) | f2(E,A,B,F,V6) != D | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) != F | -in(V6,the_carrier(F)). [resolve(154,k,136,j)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f4(E,A,B,F),the_carrier(A)) | f4(E,A,B,F) != D | -rel_str(E) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -strict_net_str(F,E) | -net_str(F,E) | netstr_restr_to_element(E,A,B) = F | in(f3(E,A,B,F),the_carrier(F)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(F)) != the_InternalRel(F) | partfun_dom_restriction(the_carrier(A),the_carrier(E),the_mapping(E,A),the_carrier(F)) != the_mapping(E,F). [resolve(154,k,137,j)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f2(c2,A,B,E,F),the_carrier(A)) | f2(c2,A,B,E,F) != D | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) != E | -in(F,the_carrier(E)). [resolve(154,k,139,i)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f4(c2,A,B,E),the_carrier(A)) | f4(c2,A,B,E) != D | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(E,c2) | -net_str(E,c2) | netstr_restr_to_element(c2,A,B) = E | in(f3(c2,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(E)) != the_mapping(c2,E). [resolve(154,k,141,i)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f9(E,F,A,B),the_carrier(A)) | f9(E,F,A,B) != D | empty_carrier(F) | empty_carrier(A) | -net_str(A,F) | -element(B,the_carrier(A)) | -in(E,a_3_0_waybel_9(F,A,B)) | -rel_str(F). [resolve(154,k,143,f)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f9(E,c2,A,B),the_carrier(A)) | f9(E,c2,A,B) != D | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(E,a_3_0_waybel_9(c2,A,B)). [resolve(154,k,144,f)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f2(c9,A,B,E,F),the_carrier(A)) | f2(c9,A,B,E,F) != D | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(E,c9) | -net_str(E,c9) | netstr_restr_to_element(c9,A,B) != E | -in(F,the_carrier(E)). [resolve(154,k,147,i)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f4(c9,A,B,E),the_carrier(A)) | f4(c9,A,B,E) != D | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(E,c9) | -net_str(E,c9) | netstr_restr_to_element(c9,A,B) = E | in(f3(c9,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(E)) != the_mapping(c9,E). [resolve(154,k,149,i)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f9(E,c9,A,B),the_carrier(A)) | f9(E,c9,A,B) != D | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(E,a_3_0_waybel_9(c9,A,B)). [resolve(154,k,151,f)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) != C | in(D,the_carrier(C)) | -element(f2(c10,A,B,E,F),the_carrier(A)) | f2(c10,A,B,E,F) != D | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(E,c10) | -net_str(E,c10) | netstr_restr_to_element(c10,A,B) != E | -in(F,the_carrier(E)). [resolve(154,k,153,i)].
% 0.91/1.18 155 empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | related(A,B,f4(c10,A,B,C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C). [resolve(116,a,84,b)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | in(F,the_carrier(E)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != F. [resolve(155,i,135,l)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | -in(f3(D,A,B,E),the_carrier(E)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != f3(D,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(155,i,138,l)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | in(E,the_carrier(D)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != E. [resolve(155,i,140,k)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | -in(f3(c2,A,B,D),the_carrier(D)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != f3(c2,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(155,i,142,k)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | in(E,a_3_0_waybel_9(D,A,B)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != E | -rel_str(D). [resolve(155,i,145,h)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(D,a_3_0_waybel_9(c2,A,B)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != D. [resolve(155,i,146,h)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | in(E,the_carrier(D)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != E. [resolve(155,i,148,k)].
% 0.91/1.18 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) = D | -in(f3(c9,A,B,D),the_carrier(D)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != f3(c9,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(D)) != the_mapping(c9,D). [resolve(155,i,150,k)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(D,a_3_0_waybel_9(c9,A,B)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != D. [resolve(155,i,152,h)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | in(f3(c10,A,B,C),the_carrier(C)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(D,c10) | -net_str(D,c10) | netstr_restr_to_element(c10,A,B) != D | in(E,the_carrier(D)) | -element(f4(c10,A,B,C),the_carrier(A)) | f4(c10,A,B,C) != E. [resolve(155,i,154,k)].
% 0.91/1.19 156 empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(D,the_carrier(A)) | D != f3(c10,A,B,C) | -related(A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C). [resolve(116,a,85,b)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f2(D,A,B,E,F),the_carrier(A)) | f2(D,A,B,E,F) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | -in(F,the_carrier(E)). [resolve(156,k,136,j)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f4(D,A,B,E),the_carrier(A)) | f4(D,A,B,E) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | in(f3(D,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(156,k,137,j)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f2(c2,A,B,D,E),the_carrier(A)) | f2(c2,A,B,D,E) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | -in(E,the_carrier(D)). [resolve(156,k,139,i)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f4(c2,A,B,D),the_carrier(A)) | f4(c2,A,B,D) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | in(f3(c2,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(156,k,141,i)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f9(D,E,A,B),the_carrier(A)) | f9(D,E,A,B) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(E,A,B)) | -rel_str(E). [resolve(156,k,143,f)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f9(D,c2,A,B),the_carrier(A)) | f9(D,c2,A,B) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c2,A,B)). [resolve(156,k,144,f)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f2(c9,A,B,D,E),the_carrier(A)) | f2(c9,A,B,D,E) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | -in(E,the_carrier(D)). [resolve(156,k,147,i)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f4(c9,A,B,D),the_carrier(A)) | f4(c9,A,B,D) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) = D | in(f3(c9,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(D)) != the_mapping(c9,D). [resolve(156,k,149,i)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f9(D,c9,A,B),the_carrier(A)) | f9(D,c9,A,B) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c9,A,B)). [resolve(156,k,151,f)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f2(c10,A,B,D,E),the_carrier(A)) | f2(c10,A,B,D,E) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(D,c10) | -net_str(D,c10) | netstr_restr_to_element(c10,A,B) != D | -in(E,the_carrier(D)). [resolve(156,k,153,i)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(C,c10) | -net_str(C,c10) | netstr_restr_to_element(c10,A,B) = C | -in(f3(c10,A,B,C),the_carrier(C)) | -element(f4(c10,A,B,D),the_carrier(A)) | f4(c10,A,B,D) != f3(c10,A,B,C) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(C)) != the_InternalRel(C) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(C)) != the_mapping(c10,C) | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(D,c10) | -net_str(D,c10) | netstr_restr_to_element(c10,A,B) = D | in(f3(c10,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(D)) != the_mapping(c10,D). [resolve(156,k,155,i)].
% 0.91/1.19 157 empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | related(A,B,f9(C,c10,A,B)). [resolve(116,a,105,b)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | in(F,the_carrier(E)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != F. [resolve(157,f,135,l)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | -in(f3(D,A,B,E),the_carrier(E)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != f3(D,A,B,E) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(157,f,138,l)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | in(E,the_carrier(D)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != E. [resolve(157,f,140,k)].
% 0.91/1.19 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | -in(f3(c2,A,B,D),the_carrier(D)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != f3(c2,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(157,f,142,k)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | in(E,a_3_0_waybel_9(D,A,B)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != E | -rel_str(D). [resolve(157,f,145,h)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | in(D,a_3_0_waybel_9(c2,A,B)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != D. [resolve(157,f,146,h)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | in(E,the_carrier(D)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != E. [resolve(157,f,148,k)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) = D | -in(f3(c9,A,B,D),the_carrier(D)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != f3(c9,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(D)) != the_mapping(c9,D). [resolve(157,f,150,k)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | in(D,a_3_0_waybel_9(c9,A,B)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != D. [resolve(157,f,152,h)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(D,c10) | -net_str(D,c10) | netstr_restr_to_element(c10,A,B) != D | in(E,the_carrier(D)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != E. [resolve(157,f,154,k)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(C,a_3_0_waybel_9(c10,A,B)) | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(D,c10) | -net_str(D,c10) | netstr_restr_to_element(c10,A,B) = D | -in(f3(c10,A,B,D),the_carrier(D)) | -element(f9(C,c10,A,B),the_carrier(A)) | f9(C,c10,A,B) != f3(c10,A,B,D) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(D)) != the_mapping(c10,D). [resolve(157,f,156,k)].
% 0.91/1.20 158 empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(D,the_carrier(A)) | D != C | -related(A,B,D). [resolve(116,a,106,b)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f2(D,A,B,E,F),the_carrier(A)) | f2(D,A,B,E,F) != C | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) != E | -in(F,the_carrier(E)). [resolve(158,h,136,j)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f4(D,A,B,E),the_carrier(A)) | f4(D,A,B,E) != C | -rel_str(D) | empty_carrier(D) | empty_carrier(A) | -net_str(A,D) | -element(B,the_carrier(A)) | -strict_net_str(E,D) | -net_str(E,D) | netstr_restr_to_element(D,A,B) = E | in(f3(D,A,B,E),the_carrier(E)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(E)) != the_InternalRel(E) | partfun_dom_restriction(the_carrier(A),the_carrier(D),the_mapping(D,A),the_carrier(E)) != the_mapping(D,E). [resolve(158,h,137,j)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f2(c2,A,B,D,E),the_carrier(A)) | f2(c2,A,B,D,E) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) != D | -in(E,the_carrier(D)). [resolve(158,h,139,i)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f4(c2,A,B,D),the_carrier(A)) | f4(c2,A,B,D) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -strict_net_str(D,c2) | -net_str(D,c2) | netstr_restr_to_element(c2,A,B) = D | in(f3(c2,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c2),the_mapping(c2,A),the_carrier(D)) != the_mapping(c2,D). [resolve(158,h,141,i)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f9(D,E,A,B),the_carrier(A)) | f9(D,E,A,B) != C | empty_carrier(E) | empty_carrier(A) | -net_str(A,E) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(E,A,B)) | -rel_str(E). [resolve(158,h,143,f)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f9(D,c2,A,B),the_carrier(A)) | f9(D,c2,A,B) != C | empty_carrier(c2) | empty_carrier(A) | -net_str(A,c2) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c2,A,B)). [resolve(158,h,144,f)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f2(c9,A,B,D,E),the_carrier(A)) | f2(c9,A,B,D,E) != C | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) != D | -in(E,the_carrier(D)). [resolve(158,h,147,i)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f4(c9,A,B,D),the_carrier(A)) | f4(c9,A,B,D) != C | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -strict_net_str(D,c9) | -net_str(D,c9) | netstr_restr_to_element(c9,A,B) = D | in(f3(c9,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c9),the_mapping(c9,A),the_carrier(D)) != the_mapping(c9,D). [resolve(158,h,149,i)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f9(D,c9,A,B),the_carrier(A)) | f9(D,c9,A,B) != C | empty_carrier(c9) | empty_carrier(A) | -net_str(A,c9) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c9,A,B)). [resolve(158,h,151,f)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f2(c10,A,B,D,E),the_carrier(A)) | f2(c10,A,B,D,E) != C | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(D,c10) | -net_str(D,c10) | netstr_restr_to_element(c10,A,B) != D | -in(E,the_carrier(D)). [resolve(158,h,153,i)].
% 0.91/1.20 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f4(c10,A,B,D),the_carrier(A)) | f4(c10,A,B,D) != C | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -strict_net_str(D,c10) | -net_str(D,c10) | netstr_restr_to_element(c10,A,B) = D | in(f3(c10,A,B,D),the_carrier(D)) | relation_restriction_as_relation_of(the_InternalRel(A),the_carrier(D)) != the_InternalRel(D) | partfun_dom_restriction(the_carrier(A),the_carrier(c10),the_mapping(c10,A),the_carrier(D)) != the_mapping(c10,D). [resolve(158,h,155,i)].
% 4.58/4.85 Derived: empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | in(C,a_3_0_waybel_9(c10,A,B)) | -element(f9(D,c10,A,B),the_carrier(A)) | f9(D,c10,A,B) != C | empty_carrier(c10) | empty_carrier(A) | -net_str(A,c10) | -element(B,the_carrier(A)) | -in(D,a_3_0_waybel_9(c10,A,B)). [resolve(158,h,157,f)].
% 4.58/4.85
% 4.58/4.85 ============================== end predicate elimination =============
% 4.58/4.85
% 4.58/4.85 Auto_denials: (non-Horn, no changes).
% 4.58/4.85
% 4.58/4.85 Term ordering decisions:
% 4.58/4.85 Function symbol KB weights: empty_set=1. c1=1. c2=1. c3=1. c4=1. c5=1. c6=1. c7=1. c8=1. c9=1. c10=1. c11=1. c12=1. the_mapping=1. relation_restriction_as_relation_of=1. cartesian_product2=1. relation_dom_restriction=1. relation_restriction=1. f1=1. f6=1. f8=1. f10=1. f15=1. the_carrier=1. the_InternalRel=1. powerset=1. f5=1. f7=1. f11=1. f12=1. f13=1. f14=1. netstr_restr_to_element=1. a_3_0_waybel_9=1. partfun_dom_restriction=1. net_str_of=1. f3=1. f4=1. f9=1. f2=1.
% 4.58/4.85
% 4.58/4.85 ============================== end of process initial clauses ========
% 4.58/4.85
% 4.58/4.85 ============================== CLAUSES FOR SEARCH ====================
% 4.58/4.85
% 4.58/4.85 ============================== end of clauses for search =============
% 4.58/4.85
% 4.58/4.85 ============================== SEARCH ================================
% 4.58/4.85
% 4.58/4.85 % Starting search at 0.52 seconds.
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=189.000, iters=3394
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=171.000, iters=3370
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=169.000, iters=3388
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=168.000, iters=3379
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=160.000, iters=3335
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=159.000, iters=3333
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=154.000, iters=3333
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=153.000, iters=3380
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=150.000, iters=3348
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=149.000, iters=3349
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=147.000, iters=3360
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=141.000, iters=3391
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=139.000, iters=3350
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=138.000, iters=3373
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=137.000, iters=3374
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=135.000, iters=3363
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=134.000, iters=3386
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=133.000, iters=3361
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=132.000, iters=3352
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=131.000, iters=3362
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=129.000, iters=3381
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=128.000, iters=3369
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=126.000, iters=3341
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=125.000, iters=3402
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=124.000, iters=3377
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=123.000, iters=3348
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=122.000, iters=3333
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=121.000, iters=3370
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=120.000, iters=3333
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=119.000, iters=3347
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=118.000, iters=3348
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=117.000, iters=3333
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=108.000, iters=3868
% 4.58/4.85
% 4.58/4.85 Low Water (keep): wt=105.000, iters=3715
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5628, wt=200.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5266, wt=195.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5259, wt=193.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5254, wt=191.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5428, wt=188.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8131, wt=186.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8130, wt=185.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5410, wt=184.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5389, wt=183.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5621, wt=181.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5622, wt=178.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5371, wt=175.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=5309, wt=174.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8259, wt=173.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8469, wt=172.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8475, wt=171.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8431, wt=170.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8478, wt=169.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace): id=8369, wt=168.000
% 4.58/4.85
% 4.58/4.85 Low Water (displace)Cputime limit exceeded (core dumped)
%------------------------------------------------------------------------------