TSTP Solution File: ALG075+1 by Princess---230619
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%------------------------------------------------------------------------------
% File : Princess---230619
% Problem : ALG075+1 : TPTP v8.1.2. Released v2.7.0.
% Transfm : none
% Format : tptp
% Command : princess -inputFormat=tptp +threads -portfolio=casc +printProof -timeoutSec=%d %s
% Computer : n021.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 : 300s
% DateTime : Wed Aug 30 16:36:12 EDT 2023
% Result : Theorem 9.54s 2.22s
% Output : Proof 16.50s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.13 % Problem : ALG075+1 : TPTP v8.1.2. Released v2.7.0.
% 0.00/0.14 % Command : princess -inputFormat=tptp +threads -portfolio=casc +printProof -timeoutSec=%d %s
% 0.13/0.35 % Computer : n021.cluster.edu
% 0.13/0.35 % Model : x86_64 x86_64
% 0.13/0.35 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.35 % Memory : 8042.1875MB
% 0.13/0.35 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.35 % CPULimit : 300
% 0.13/0.35 % WCLimit : 300
% 0.13/0.35 % DateTime : Mon Aug 28 04:44:13 EDT 2023
% 0.13/0.35 % CPUTime :
% 0.20/0.62 ________ _____
% 0.20/0.62 ___ __ \_________(_)________________________________
% 0.20/0.62 __ /_/ /_ ___/_ /__ __ \ ___/ _ \_ ___/_ ___/
% 0.20/0.62 _ ____/_ / _ / _ / / / /__ / __/(__ )_(__ )
% 0.20/0.62 /_/ /_/ /_/ /_/ /_/\___/ \___//____/ /____/
% 0.20/0.62
% 0.20/0.62 A Theorem Prover for First-Order Logic modulo Linear Integer Arithmetic
% 0.20/0.62 (2023-06-19)
% 0.20/0.62
% 0.20/0.62 (c) Philipp Rümmer, 2009-2023
% 0.20/0.62 Contributors: Peter Backeman, Peter Baumgartner, Angelo Brillout, Zafer Esen,
% 0.20/0.62 Amanda Stjerna.
% 0.20/0.62 Free software under BSD-3-Clause.
% 0.20/0.62
% 0.20/0.62 For more information, visit http://www.philipp.ruemmer.org/princess.shtml
% 0.20/0.62
% 0.20/0.62 Loading /export/starexec/sandbox2/benchmark/theBenchmark.p ...
% 0.20/0.63 Running up to 7 provers in parallel.
% 0.20/0.64 Prover 1: Options: +triggersInConjecture -genTotalityAxioms -tightFunctionScopes -clausifier=none -reverseFunctionalityPropagation -boolFunsAsPreds -triggerStrategy=maximal -realRatSaturationRounds=0 +ignoreQuantifiers -constructProofs=always -generateTriggers=all -randomSeed=-1571432423
% 0.20/0.64 Prover 2: Options: +triggersInConjecture +genTotalityAxioms -tightFunctionScopes -clausifier=simple +reverseFunctionalityPropagation +boolFunsAsPreds -triggerStrategy=allMinimalAndEmpty -realRatSaturationRounds=1 -ignoreQuantifiers -constructProofs=never -generateTriggers=all -randomSeed=-1065072994
% 0.20/0.64 Prover 0: Options: +triggersInConjecture +genTotalityAxioms +tightFunctionScopes -clausifier=simple -reverseFunctionalityPropagation -boolFunsAsPreds -triggerStrategy=allUni -realRatSaturationRounds=0 -ignoreQuantifiers -constructProofs=never -generateTriggers=all -randomSeed=1042961893
% 0.20/0.64 Prover 4: Options: +triggersInConjecture -genTotalityAxioms -tightFunctionScopes -clausifier=simple -reverseFunctionalityPropagation -boolFunsAsPreds -triggerStrategy=allUni -realRatSaturationRounds=0 +ignoreQuantifiers -constructProofs=always -generateTriggers=all -randomSeed=1868514696
% 0.20/0.64 Prover 3: Options: +triggersInConjecture -genTotalityAxioms -tightFunctionScopes -clausifier=none -reverseFunctionalityPropagation -boolFunsAsPreds -triggerStrategy=maximal -realRatSaturationRounds=1 +ignoreQuantifiers -constructProofs=never -generateTriggers=all -randomSeed=1922548996
% 0.20/0.64 Prover 5: Options: +triggersInConjecture -genTotalityAxioms +tightFunctionScopes -clausifier=none +reverseFunctionalityPropagation +boolFunsAsPreds -triggerStrategy=allMaximal -realRatSaturationRounds=1 -ignoreQuantifiers -constructProofs=never -generateTriggers=complete -randomSeed=1259561288
% 0.20/0.64 Prover 6: Options: -triggersInConjecture -genTotalityAxioms +tightFunctionScopes -clausifier=none +reverseFunctionalityPropagation -boolFunsAsPreds -triggerStrategy=maximalOutermost -realRatSaturationRounds=0 -ignoreQuantifiers -constructProofs=never -generateTriggers=all -randomSeed=-1399714365
% 3.32/1.17 Prover 1: Preprocessing ...
% 3.32/1.17 Prover 4: Preprocessing ...
% 3.74/1.22 Prover 3: Preprocessing ...
% 3.74/1.22 Prover 6: Preprocessing ...
% 3.74/1.22 Prover 2: Preprocessing ...
% 3.74/1.22 Prover 5: Preprocessing ...
% 3.74/1.23 Prover 0: Preprocessing ...
% 6.63/1.66 Prover 4: Constructing countermodel ...
% 6.63/1.67 Prover 1: Constructing countermodel ...
% 6.63/1.67 Prover 0: Constructing countermodel ...
% 6.63/1.67 Prover 2: Constructing countermodel ...
% 6.63/1.69 Prover 6: Constructing countermodel ...
% 6.63/1.69 Prover 3: Constructing countermodel ...
% 8.04/1.85 Prover 5: Constructing countermodel ...
% 9.54/2.22 Prover 0: proved (1579ms)
% 9.54/2.22
% 9.54/2.22 % SZS status Theorem for /export/starexec/sandbox2/benchmark/theBenchmark.p
% 9.54/2.22
% 9.54/2.22 Prover 6: stopped
% 9.54/2.22 Prover 3: stopped
% 9.54/2.23 Prover 5: stopped
% 10.34/2.24 Prover 2: stopped
% 10.34/2.25 Prover 7: Options: +triggersInConjecture -genTotalityAxioms +tightFunctionScopes -clausifier=simple +reverseFunctionalityPropagation +boolFunsAsPreds -triggerStrategy=allUni -realRatSaturationRounds=1 +ignoreQuantifiers -constructProofs=always -generateTriggers=all -randomSeed=-236303470
% 10.34/2.25 Prover 8: Options: +triggersInConjecture +genTotalityAxioms -tightFunctionScopes -clausifier=none -reverseFunctionalityPropagation -boolFunsAsPreds -triggerStrategy=maximal -realRatSaturationRounds=0 +ignoreQuantifiers -constructProofs=always -generateTriggers=all -randomSeed=-200781089
% 10.34/2.25 Prover 10: Options: +triggersInConjecture -genTotalityAxioms +tightFunctionScopes -clausifier=simple -reverseFunctionalityPropagation +boolFunsAsPreds -triggerStrategy=maximal -realRatSaturationRounds=1 +ignoreQuantifiers -constructProofs=always -generateTriggers=all -randomSeed=919308125
% 10.34/2.25 Prover 11: Options: +triggersInConjecture -genTotalityAxioms +tightFunctionScopes -clausifier=simple -reverseFunctionalityPropagation -boolFunsAsPreds -triggerStrategy=allUni -realRatSaturationRounds=1 +ignoreQuantifiers -constructProofs=always -generateTriggers=all -randomSeed=-1509710984
% 10.34/2.25 Prover 13: Options: +triggersInConjecture -genTotalityAxioms -tightFunctionScopes -clausifier=simple -reverseFunctionalityPropagation +boolFunsAsPreds -triggerStrategy=maximal -realRatSaturationRounds=0 +ignoreQuantifiers -constructProofs=always -generateTriggers=complete -randomSeed=1138197443
% 11.66/2.33 Prover 8: Preprocessing ...
% 11.66/2.35 Prover 11: Preprocessing ...
% 11.66/2.35 Prover 10: Preprocessing ...
% 11.66/2.37 Prover 7: Preprocessing ...
% 11.66/2.38 Prover 13: Preprocessing ...
% 12.45/2.42 Prover 8: Constructing countermodel ...
% 12.45/2.48 Prover 10: Constructing countermodel ...
% 13.08/2.50 Prover 7: Constructing countermodel ...
% 13.08/2.50 Prover 11: Constructing countermodel ...
% 13.08/2.55 Prover 13: Constructing countermodel ...
% 16.10/2.90 Prover 1: Found proof (size 170)
% 16.10/2.91 Prover 1: proved (2268ms)
% 16.10/2.91 Prover 10: stopped
% 16.10/2.91 Prover 8: stopped
% 16.10/2.91 Prover 13: stopped
% 16.10/2.91 Prover 7: stopped
% 16.10/2.91 Prover 11: stopped
% 16.10/2.91 Prover 4: stopped
% 16.10/2.91
% 16.10/2.91 % SZS status Theorem for /export/starexec/sandbox2/benchmark/theBenchmark.p
% 16.10/2.91
% 16.10/2.95 % SZS output start Proof for theBenchmark
% 16.10/2.95 Assumptions after simplification:
% 16.10/2.95 ---------------------------------
% 16.10/2.95
% 16.10/2.95 (ax1)
% 16.10/2.96 ~ (e14 = e13) & ~ (e14 = e12) & ~ (e14 = e10) & ~ (e14 = e11) & ~ (e13 =
% 16.10/2.96 e12) & ~ (e13 = e10) & ~ (e13 = e11) & ~ (e12 = e10) & ~ (e12 = e11) &
% 16.10/2.96 ~ (e10 = e11) & $i(e14) & $i(e13) & $i(e12) & $i(e10) & $i(e11)
% 16.10/2.96
% 16.10/2.96 (ax2)
% 16.10/2.96 ~ (e24 = e23) & ~ (e24 = e22) & ~ (e24 = e20) & ~ (e24 = e21) & ~ (e23 =
% 16.10/2.96 e22) & ~ (e23 = e20) & ~ (e23 = e21) & ~ (e22 = e20) & ~ (e22 = e21) &
% 16.10/2.96 ~ (e20 = e21) & $i(e24) & $i(e23) & $i(e22) & $i(e20) & $i(e21)
% 16.10/2.96
% 16.10/2.96 (ax4)
% 16.50/2.99 op1(e14, e14) = e12 & op1(e14, e13) = e10 & op1(e14, e12) = e11 & op1(e14,
% 16.50/2.99 e10) = e14 & op1(e14, e11) = e13 & op1(e13, e14) = e10 & op1(e13, e13) = e11
% 16.50/2.99 & op1(e13, e12) = e14 & op1(e13, e10) = e13 & op1(e13, e11) = e12 & op1(e12,
% 16.50/2.99 e14) = e11 & op1(e12, e13) = e14 & op1(e12, e12) = e13 & op1(e12, e10) = e12
% 16.50/2.99 & op1(e12, e11) = e10 & op1(e10, e14) = e14 & op1(e10, e13) = e13 & op1(e10,
% 16.50/2.99 e12) = e12 & op1(e10, e10) = e10 & op1(e10, e11) = e11 & op1(e11, e14) = e13
% 16.50/2.99 & op1(e11, e13) = e12 & op1(e11, e12) = e10 & op1(e11, e10) = e11 & op1(e11,
% 16.50/2.99 e11) = e14 & $i(e14) & $i(e13) & $i(e12) & $i(e10) & $i(e11)
% 16.50/2.99
% 16.50/2.99 (ax5)
% 16.50/2.99 op2(e24, e24) = e20 & op2(e24, e23) = e22 & op2(e24, e22) = e21 & op2(e24,
% 16.50/2.99 e20) = e24 & op2(e24, e21) = e23 & op2(e23, e24) = e21 & op2(e23, e23) = e20
% 16.50/2.99 & op2(e23, e22) = e24 & op2(e23, e20) = e23 & op2(e23, e21) = e22 & op2(e22,
% 16.50/2.99 e24) = e23 & op2(e22, e23) = e21 & op2(e22, e22) = e20 & op2(e22, e20) = e22
% 16.50/2.99 & op2(e22, e21) = e24 & op2(e20, e24) = e24 & op2(e20, e23) = e23 & op2(e20,
% 16.50/2.99 e22) = e22 & op2(e20, e20) = e20 & op2(e20, e21) = e21 & op2(e21, e24) = e22
% 16.50/2.99 & op2(e21, e23) = e24 & op2(e21, e22) = e23 & op2(e21, e20) = e21 & op2(e21,
% 16.50/2.99 e21) = e20 & $i(e24) & $i(e23) & $i(e22) & $i(e20) & $i(e21)
% 16.50/2.99
% 16.50/2.99 (co1)
% 16.50/3.02 $i(e24) & $i(e23) & $i(e22) & $i(e20) & $i(e21) & $i(e14) & $i(e13) & $i(e12)
% 16.50/3.02 & $i(e10) & $i(e11) & ? [v0: $i] : ? [v1: $i] : ? [v2: $i] : ? [v3: $i] :
% 16.50/3.02 ? [v4: $i] : ? [v5: $i] : ? [v6: $i] : ? [v7: $i] : ? [v8: $i] : ? [v9:
% 16.50/3.02 $i] : ? [v10: $i] : ? [v11: $i] : ? [v12: $i] : ? [v13: $i] : ? [v14:
% 16.50/3.02 $i] : ? [v15: $i] : ? [v16: $i] : ? [v17: $i] : ? [v18: $i] : ? [v19:
% 16.50/3.02 $i] : ? [v20: $i] : ? [v21: $i] : ? [v22: $i] : ? [v23: $i] : ? [v24:
% 16.50/3.02 $i] : ? [v25: $i] : ? [v26: $i] : ? [v27: $i] : ? [v28: $i] : ? [v29:
% 16.50/3.02 $i] : ? [v30: $i] : ? [v31: $i] : ? [v32: $i] : ? [v33: $i] : ? [v34:
% 16.50/3.02 $i] : ? [v35: $i] : ? [v36: $i] : ? [v37: $i] : ? [v38: $i] : ? [v39:
% 16.50/3.02 $i] : ? [v40: $i] : ? [v41: $i] : ? [v42: $i] : ? [v43: $i] : ? [v44:
% 16.50/3.02 $i] : ? [v45: $i] : ? [v46: $i] : ? [v47: $i] : ? [v48: $i] : ? [v49:
% 16.50/3.02 $i] : ? [v50: $i] : ? [v51: $i] : ? [v52: $i] : ? [v53: $i] : ? [v54:
% 16.50/3.02 $i] : ? [v55: $i] : ? [v56: $i] : ? [v57: $i] : ? [v58: $i] : ? [v59:
% 16.50/3.02 $i] : ? [v60: $i] : ? [v61: $i] : ? [v62: $i] : ? [v63: $i] : ? [v64:
% 16.50/3.02 $i] : ? [v65: $i] : ? [v66: $i] : ? [v67: $i] : ? [v68: $i] : ? [v69:
% 16.50/3.02 $i] : ? [v70: $i] : ? [v71: $i] : ? [v72: $i] : ? [v73: $i] : ? [v74:
% 16.50/3.02 $i] : ? [v75: $i] : ? [v76: $i] : ? [v77: $i] : ? [v78: $i] : ? [v79:
% 16.50/3.02 $i] : ? [v80: $i] : ? [v81: $i] : ? [v82: $i] : ? [v83: $i] : ? [v84:
% 16.50/3.02 $i] : ? [v85: $i] : ? [v86: $i] : ? [v87: $i] : ? [v88: $i] : ? [v89:
% 16.50/3.02 $i] : ? [v90: $i] : ? [v91: $i] : ? [v92: $i] : ? [v93: $i] : ? [v94:
% 16.50/3.02 $i] : ? [v95: $i] : ? [v96: $i] : ? [v97: $i] : ? [v98: $i] : ? [v99:
% 16.50/3.02 $i] : ? [v100: $i] : ? [v101: $i] : ? [v102: $i] : ? [v103: $i] : ?
% 16.50/3.02 [v104: $i] : ? [v105: $i] : ? [v106: $i] : ? [v107: $i] : ? [v108: $i] :
% 16.50/3.02 ? [v109: $i] : (h(v58) = v59 & h(v56) = v57 & h(v54) = v55 & h(v52) = v53 &
% 16.50/3.02 h(v50) = v51 & h(v48) = v49 & h(v46) = v47 & h(v44) = v45 & h(v42) = v43 &
% 16.50/3.02 h(v40) = v41 & h(v38) = v39 & h(v36) = v37 & h(v34) = v35 & h(v32) = v33 &
% 16.50/3.02 h(v30) = v31 & h(v28) = v29 & h(v26) = v27 & h(v24) = v25 & h(v22) = v23 &
% 16.50/3.02 h(v20) = v21 & h(v18) = v19 & h(v16) = v17 & h(v14) = v15 & h(v12) = v13 &
% 16.50/3.02 h(v10) = v11 & h(v9) = e24 & h(v8) = e23 & h(v7) = e22 & h(v6) = e21 & h(v5)
% 16.50/3.02 = e20 & h(e14) = v4 & h(e13) = v3 & h(e12) = v2 & h(e10) = v0 & h(e11) = v1
% 16.50/3.02 & j(v108) = v109 & j(v106) = v107 & j(v104) = v105 & j(v102) = v103 &
% 16.50/3.02 j(v100) = v101 & j(v98) = v99 & j(v96) = v97 & j(v94) = v95 & j(v92) = v93 &
% 16.50/3.02 j(v90) = v91 & j(v88) = v89 & j(v86) = v87 & j(v84) = v85 & j(v82) = v83 &
% 16.50/3.02 j(v80) = v81 & j(v78) = v79 & j(v76) = v77 & j(v74) = v75 & j(v72) = v73 &
% 16.50/3.02 j(v70) = v71 & j(v68) = v69 & j(v66) = v67 & j(v64) = v65 & j(v62) = v63 &
% 16.50/3.02 j(v60) = v61 & j(v4) = e14 & j(v3) = e13 & j(v2) = e12 & j(v1) = e11 & j(v0)
% 16.50/3.02 = e10 & j(e24) = v9 & j(e23) = v8 & j(e22) = v7 & j(e20) = v5 & j(e21) = v6
% 16.50/3.02 & op2(v4, v4) = v59 & op2(v4, v3) = v57 & op2(v4, v2) = v55 & op2(v4, v1) =
% 16.50/3.02 v53 & op2(v4, v0) = v51 & op2(v3, v4) = v49 & op2(v3, v3) = v47 & op2(v3,
% 16.50/3.02 v2) = v45 & op2(v3, v1) = v43 & op2(v3, v0) = v41 & op2(v2, v4) = v39 &
% 16.50/3.02 op2(v2, v3) = v37 & op2(v2, v2) = v35 & op2(v2, v1) = v33 & op2(v2, v0) =
% 16.50/3.02 v31 & op2(v1, v4) = v29 & op2(v1, v3) = v27 & op2(v1, v2) = v25 & op2(v1,
% 16.50/3.02 v1) = v23 & op2(v1, v0) = v21 & op2(v0, v4) = v19 & op2(v0, v3) = v17 &
% 16.50/3.02 op2(v0, v2) = v15 & op2(v0, v1) = v13 & op2(v0, v0) = v11 & op2(e24, e24) =
% 16.50/3.02 v108 & op2(e24, e23) = v106 & op2(e24, e22) = v104 & op2(e24, e20) = v100 &
% 16.50/3.02 op2(e24, e21) = v102 & op2(e23, e24) = v98 & op2(e23, e23) = v96 & op2(e23,
% 16.50/3.02 e22) = v94 & op2(e23, e20) = v90 & op2(e23, e21) = v92 & op2(e22, e24) =
% 16.50/3.02 v88 & op2(e22, e23) = v86 & op2(e22, e22) = v84 & op2(e22, e20) = v80 &
% 16.50/3.02 op2(e22, e21) = v82 & op2(e20, e24) = v68 & op2(e20, e23) = v66 & op2(e20,
% 16.50/3.02 e22) = v64 & op2(e20, e20) = v60 & op2(e20, e21) = v62 & op2(e21, e24) =
% 16.50/3.02 v78 & op2(e21, e23) = v76 & op2(e21, e22) = v74 & op2(e21, e20) = v70 &
% 16.50/3.02 op2(e21, e21) = v72 & op1(v9, v9) = v109 & op1(v9, v8) = v107 & op1(v9, v7)
% 16.50/3.02 = v105 & op1(v9, v6) = v103 & op1(v9, v5) = v101 & op1(v8, v9) = v99 &
% 16.50/3.02 op1(v8, v8) = v97 & op1(v8, v7) = v95 & op1(v8, v6) = v93 & op1(v8, v5) =
% 16.50/3.02 v91 & op1(v7, v9) = v89 & op1(v7, v8) = v87 & op1(v7, v7) = v85 & op1(v7,
% 16.50/3.02 v6) = v83 & op1(v7, v5) = v81 & op1(v6, v9) = v79 & op1(v6, v8) = v77 &
% 16.50/3.02 op1(v6, v7) = v75 & op1(v6, v6) = v73 & op1(v6, v5) = v71 & op1(v5, v9) =
% 16.50/3.02 v69 & op1(v5, v8) = v67 & op1(v5, v7) = v65 & op1(v5, v6) = v63 & op1(v5,
% 16.50/3.02 v5) = v61 & op1(e14, e14) = v58 & op1(e14, e13) = v56 & op1(e14, e12) =
% 16.50/3.02 v54 & op1(e14, e10) = v50 & op1(e14, e11) = v52 & op1(e13, e14) = v48 &
% 16.50/3.02 op1(e13, e13) = v46 & op1(e13, e12) = v44 & op1(e13, e10) = v40 & op1(e13,
% 16.50/3.02 e11) = v42 & op1(e12, e14) = v38 & op1(e12, e13) = v36 & op1(e12, e12) =
% 16.50/3.02 v34 & op1(e12, e10) = v30 & op1(e12, e11) = v32 & op1(e10, e14) = v18 &
% 16.50/3.02 op1(e10, e13) = v16 & op1(e10, e12) = v14 & op1(e10, e10) = v10 & op1(e10,
% 16.50/3.02 e11) = v12 & op1(e11, e14) = v28 & op1(e11, e13) = v26 & op1(e11, e12) =
% 16.50/3.02 v24 & op1(e11, e10) = v20 & op1(e11, e11) = v22 & $i(v109) & $i(v108) &
% 16.50/3.02 $i(v107) & $i(v106) & $i(v105) & $i(v104) & $i(v103) & $i(v102) & $i(v101) &
% 16.50/3.02 $i(v100) & $i(v99) & $i(v98) & $i(v97) & $i(v96) & $i(v95) & $i(v94) &
% 16.50/3.02 $i(v93) & $i(v92) & $i(v91) & $i(v90) & $i(v89) & $i(v88) & $i(v87) &
% 16.50/3.02 $i(v86) & $i(v85) & $i(v84) & $i(v83) & $i(v82) & $i(v81) & $i(v80) &
% 16.50/3.02 $i(v79) & $i(v78) & $i(v77) & $i(v76) & $i(v75) & $i(v74) & $i(v73) &
% 16.50/3.02 $i(v72) & $i(v71) & $i(v70) & $i(v69) & $i(v68) & $i(v67) & $i(v66) &
% 16.50/3.02 $i(v65) & $i(v64) & $i(v63) & $i(v62) & $i(v61) & $i(v60) & $i(v59) &
% 16.50/3.02 $i(v58) & $i(v57) & $i(v56) & $i(v55) & $i(v54) & $i(v53) & $i(v52) &
% 16.50/3.02 $i(v51) & $i(v50) & $i(v49) & $i(v48) & $i(v47) & $i(v46) & $i(v45) &
% 16.50/3.02 $i(v44) & $i(v43) & $i(v42) & $i(v41) & $i(v40) & $i(v39) & $i(v38) &
% 16.50/3.02 $i(v37) & $i(v36) & $i(v35) & $i(v34) & $i(v33) & $i(v32) & $i(v31) &
% 16.50/3.02 $i(v30) & $i(v29) & $i(v28) & $i(v27) & $i(v26) & $i(v25) & $i(v24) &
% 16.50/3.02 $i(v23) & $i(v22) & $i(v21) & $i(v20) & $i(v19) & $i(v18) & $i(v17) &
% 16.50/3.02 $i(v16) & $i(v15) & $i(v14) & $i(v13) & $i(v12) & $i(v11) & $i(v10) & $i(v9)
% 16.50/3.02 & $i(v8) & $i(v7) & $i(v6) & $i(v5) & $i(v4) & $i(v3) & $i(v2) & $i(v1) &
% 16.50/3.02 $i(v0) & (v9 = e14 | v9 = e13 | v9 = e12 | v9 = e10 | v9 = e11) & (v8 = e14
% 16.50/3.02 | v8 = e13 | v8 = e12 | v8 = e10 | v8 = e11) & (v7 = e14 | v7 = e13 | v7 =
% 16.50/3.02 e12 | v7 = e10 | v7 = e11) & (v6 = e14 | v6 = e13 | v6 = e12 | v6 = e10 |
% 16.50/3.02 v6 = e11) & (v5 = e14 | v5 = e13 | v5 = e12 | v5 = e10 | v5 = e11) & (v4 =
% 16.50/3.02 e24 | v4 = e23 | v4 = e22 | v4 = e20 | v4 = e21) & (v3 = e24 | v3 = e23 |
% 16.50/3.02 v3 = e22 | v3 = e20 | v3 = e21) & (v2 = e24 | v2 = e23 | v2 = e22 | v2 =
% 16.50/3.02 e20 | v2 = e21) & (v1 = e24 | v1 = e23 | v1 = e22 | v1 = e20 | v1 = e21) &
% 16.50/3.02 (v0 = e24 | v0 = e23 | v0 = e22 | v0 = e20 | v0 = e21))
% 16.50/3.02
% 16.50/3.02 (function-axioms)
% 16.50/3.02 ! [v0: $i] : ! [v1: $i] : ! [v2: $i] : ! [v3: $i] : (v1 = v0 | ~ (op2(v3,
% 16.50/3.02 v2) = v1) | ~ (op2(v3, v2) = v0)) & ! [v0: $i] : ! [v1: $i] : ! [v2:
% 16.50/3.02 $i] : ! [v3: $i] : (v1 = v0 | ~ (op1(v3, v2) = v1) | ~ (op1(v3, v2) =
% 16.50/3.02 v0)) & ! [v0: $i] : ! [v1: $i] : ! [v2: $i] : (v1 = v0 | ~ (h(v2) =
% 16.50/3.02 v1) | ~ (h(v2) = v0)) & ! [v0: $i] : ! [v1: $i] : ! [v2: $i] : (v1 =
% 16.50/3.02 v0 | ~ (j(v2) = v1) | ~ (j(v2) = v0))
% 16.50/3.02
% 16.50/3.02 Further assumptions not needed in the proof:
% 16.50/3.02 --------------------------------------------
% 16.50/3.02 ax3
% 16.50/3.02
% 16.50/3.02 Those formulas are unsatisfiable:
% 16.50/3.02 ---------------------------------
% 16.50/3.02
% 16.50/3.02 Begin of proof
% 16.50/3.02 |
% 16.50/3.02 | ALPHA: (ax1) implies:
% 16.50/3.02 | (1) ~ (e13 = e11)
% 16.50/3.02 | (2) ~ (e13 = e12)
% 16.50/3.02 | (3) ~ (e14 = e12)
% 16.50/3.02 |
% 16.50/3.02 | ALPHA: (ax2) implies:
% 16.50/3.02 | (4) ~ (e22 = e20)
% 16.50/3.02 | (5) ~ (e23 = e20)
% 16.50/3.02 | (6) ~ (e24 = e20)
% 16.50/3.02 |
% 16.50/3.02 | ALPHA: (ax4) implies:
% 16.50/3.02 | (7) op1(e11, e11) = e14
% 16.50/3.02 | (8) op1(e11, e12) = e10
% 16.50/3.02 | (9) op1(e10, e10) = e10
% 16.50/3.03 | (10) op1(e12, e11) = e10
% 16.50/3.03 | (11) op1(e12, e12) = e13
% 16.50/3.03 | (12) op1(e13, e11) = e12
% 16.50/3.03 | (13) op1(e13, e13) = e11
% 16.50/3.03 | (14) op1(e13, e14) = e10
% 16.50/3.03 | (15) op1(e14, e13) = e10
% 16.50/3.03 | (16) op1(e14, e14) = e12
% 16.50/3.03 |
% 16.50/3.03 | ALPHA: (ax5) implies:
% 16.50/3.03 | (17) op2(e21, e21) = e20
% 16.50/3.03 | (18) op2(e21, e24) = e22
% 16.50/3.03 | (19) op2(e20, e20) = e20
% 16.50/3.03 | (20) op2(e20, e22) = e22
% 16.50/3.03 | (21) op2(e22, e20) = e22
% 16.50/3.03 | (22) op2(e22, e22) = e20
% 16.50/3.03 | (23) op2(e23, e21) = e22
% 16.50/3.03 | (24) op2(e23, e23) = e20
% 16.50/3.03 | (25) op2(e24, e23) = e22
% 16.50/3.03 | (26) op2(e24, e24) = e20
% 16.50/3.03 |
% 16.50/3.03 | ALPHA: (co1) implies:
% 16.50/3.04 | (27) ? [v0: $i] : ? [v1: $i] : ? [v2: $i] : ? [v3: $i] : ? [v4: $i] :
% 16.50/3.04 | ? [v5: $i] : ? [v6: $i] : ? [v7: $i] : ? [v8: $i] : ? [v9: $i] :
% 16.50/3.04 | ? [v10: $i] : ? [v11: $i] : ? [v12: $i] : ? [v13: $i] : ? [v14:
% 16.50/3.04 | $i] : ? [v15: $i] : ? [v16: $i] : ? [v17: $i] : ? [v18: $i] : ?
% 16.50/3.04 | [v19: $i] : ? [v20: $i] : ? [v21: $i] : ? [v22: $i] : ? [v23: $i]
% 16.50/3.04 | : ? [v24: $i] : ? [v25: $i] : ? [v26: $i] : ? [v27: $i] : ? [v28:
% 16.50/3.04 | $i] : ? [v29: $i] : ? [v30: $i] : ? [v31: $i] : ? [v32: $i] : ?
% 16.50/3.04 | [v33: $i] : ? [v34: $i] : ? [v35: $i] : ? [v36: $i] : ? [v37: $i]
% 16.50/3.04 | : ? [v38: $i] : ? [v39: $i] : ? [v40: $i] : ? [v41: $i] : ? [v42:
% 16.50/3.04 | $i] : ? [v43: $i] : ? [v44: $i] : ? [v45: $i] : ? [v46: $i] : ?
% 16.50/3.04 | [v47: $i] : ? [v48: $i] : ? [v49: $i] : ? [v50: $i] : ? [v51: $i]
% 16.50/3.04 | : ? [v52: $i] : ? [v53: $i] : ? [v54: $i] : ? [v55: $i] : ? [v56:
% 16.50/3.04 | $i] : ? [v57: $i] : ? [v58: $i] : ? [v59: $i] : ? [v60: $i] : ?
% 16.50/3.04 | [v61: $i] : ? [v62: $i] : ? [v63: $i] : ? [v64: $i] : ? [v65: $i]
% 16.50/3.04 | : ? [v66: $i] : ? [v67: $i] : ? [v68: $i] : ? [v69: $i] : ? [v70:
% 16.50/3.04 | $i] : ? [v71: $i] : ? [v72: $i] : ? [v73: $i] : ? [v74: $i] : ?
% 16.50/3.04 | [v75: $i] : ? [v76: $i] : ? [v77: $i] : ? [v78: $i] : ? [v79: $i]
% 16.50/3.04 | : ? [v80: $i] : ? [v81: $i] : ? [v82: $i] : ? [v83: $i] : ? [v84:
% 16.50/3.04 | $i] : ? [v85: $i] : ? [v86: $i] : ? [v87: $i] : ? [v88: $i] : ?
% 16.50/3.04 | [v89: $i] : ? [v90: $i] : ? [v91: $i] : ? [v92: $i] : ? [v93: $i]
% 16.50/3.04 | : ? [v94: $i] : ? [v95: $i] : ? [v96: $i] : ? [v97: $i] : ? [v98:
% 16.50/3.04 | $i] : ? [v99: $i] : ? [v100: $i] : ? [v101: $i] : ? [v102: $i] :
% 16.50/3.04 | ? [v103: $i] : ? [v104: $i] : ? [v105: $i] : ? [v106: $i] : ?
% 16.50/3.04 | [v107: $i] : ? [v108: $i] : ? [v109: $i] : (h(v58) = v59 & h(v56) =
% 16.50/3.04 | v57 & h(v54) = v55 & h(v52) = v53 & h(v50) = v51 & h(v48) = v49 &
% 16.50/3.04 | h(v46) = v47 & h(v44) = v45 & h(v42) = v43 & h(v40) = v41 & h(v38) =
% 16.50/3.04 | v39 & h(v36) = v37 & h(v34) = v35 & h(v32) = v33 & h(v30) = v31 &
% 16.50/3.04 | h(v28) = v29 & h(v26) = v27 & h(v24) = v25 & h(v22) = v23 & h(v20) =
% 16.50/3.04 | v21 & h(v18) = v19 & h(v16) = v17 & h(v14) = v15 & h(v12) = v13 &
% 16.50/3.04 | h(v10) = v11 & h(v9) = e24 & h(v8) = e23 & h(v7) = e22 & h(v6) = e21
% 16.50/3.04 | & h(v5) = e20 & h(e14) = v4 & h(e13) = v3 & h(e12) = v2 & h(e10) =
% 16.50/3.04 | v0 & h(e11) = v1 & j(v108) = v109 & j(v106) = v107 & j(v104) = v105
% 16.50/3.04 | & j(v102) = v103 & j(v100) = v101 & j(v98) = v99 & j(v96) = v97 &
% 16.50/3.04 | j(v94) = v95 & j(v92) = v93 & j(v90) = v91 & j(v88) = v89 & j(v86) =
% 16.50/3.04 | v87 & j(v84) = v85 & j(v82) = v83 & j(v80) = v81 & j(v78) = v79 &
% 16.50/3.04 | j(v76) = v77 & j(v74) = v75 & j(v72) = v73 & j(v70) = v71 & j(v68) =
% 16.50/3.04 | v69 & j(v66) = v67 & j(v64) = v65 & j(v62) = v63 & j(v60) = v61 &
% 16.50/3.04 | j(v4) = e14 & j(v3) = e13 & j(v2) = e12 & j(v1) = e11 & j(v0) = e10
% 16.50/3.04 | & j(e24) = v9 & j(e23) = v8 & j(e22) = v7 & j(e20) = v5 & j(e21) =
% 16.50/3.04 | v6 & op2(v4, v4) = v59 & op2(v4, v3) = v57 & op2(v4, v2) = v55 &
% 16.50/3.04 | op2(v4, v1) = v53 & op2(v4, v0) = v51 & op2(v3, v4) = v49 & op2(v3,
% 16.50/3.04 | v3) = v47 & op2(v3, v2) = v45 & op2(v3, v1) = v43 & op2(v3, v0) =
% 16.50/3.04 | v41 & op2(v2, v4) = v39 & op2(v2, v3) = v37 & op2(v2, v2) = v35 &
% 16.50/3.04 | op2(v2, v1) = v33 & op2(v2, v0) = v31 & op2(v1, v4) = v29 & op2(v1,
% 16.50/3.04 | v3) = v27 & op2(v1, v2) = v25 & op2(v1, v1) = v23 & op2(v1, v0) =
% 16.50/3.04 | v21 & op2(v0, v4) = v19 & op2(v0, v3) = v17 & op2(v0, v2) = v15 &
% 16.50/3.04 | op2(v0, v1) = v13 & op2(v0, v0) = v11 & op2(e24, e24) = v108 &
% 16.50/3.04 | op2(e24, e23) = v106 & op2(e24, e22) = v104 & op2(e24, e20) = v100 &
% 16.50/3.05 | op2(e24, e21) = v102 & op2(e23, e24) = v98 & op2(e23, e23) = v96 &
% 16.50/3.05 | op2(e23, e22) = v94 & op2(e23, e20) = v90 & op2(e23, e21) = v92 &
% 16.50/3.05 | op2(e22, e24) = v88 & op2(e22, e23) = v86 & op2(e22, e22) = v84 &
% 16.50/3.05 | op2(e22, e20) = v80 & op2(e22, e21) = v82 & op2(e20, e24) = v68 &
% 16.50/3.05 | op2(e20, e23) = v66 & op2(e20, e22) = v64 & op2(e20, e20) = v60 &
% 16.50/3.05 | op2(e20, e21) = v62 & op2(e21, e24) = v78 & op2(e21, e23) = v76 &
% 16.50/3.05 | op2(e21, e22) = v74 & op2(e21, e20) = v70 & op2(e21, e21) = v72 &
% 16.50/3.05 | op1(v9, v9) = v109 & op1(v9, v8) = v107 & op1(v9, v7) = v105 &
% 16.50/3.05 | op1(v9, v6) = v103 & op1(v9, v5) = v101 & op1(v8, v9) = v99 &
% 16.50/3.05 | op1(v8, v8) = v97 & op1(v8, v7) = v95 & op1(v8, v6) = v93 & op1(v8,
% 16.50/3.05 | v5) = v91 & op1(v7, v9) = v89 & op1(v7, v8) = v87 & op1(v7, v7) =
% 16.50/3.05 | v85 & op1(v7, v6) = v83 & op1(v7, v5) = v81 & op1(v6, v9) = v79 &
% 16.50/3.05 | op1(v6, v8) = v77 & op1(v6, v7) = v75 & op1(v6, v6) = v73 & op1(v6,
% 16.50/3.05 | v5) = v71 & op1(v5, v9) = v69 & op1(v5, v8) = v67 & op1(v5, v7) =
% 16.50/3.05 | v65 & op1(v5, v6) = v63 & op1(v5, v5) = v61 & op1(e14, e14) = v58 &
% 16.50/3.05 | op1(e14, e13) = v56 & op1(e14, e12) = v54 & op1(e14, e10) = v50 &
% 16.50/3.05 | op1(e14, e11) = v52 & op1(e13, e14) = v48 & op1(e13, e13) = v46 &
% 16.50/3.05 | op1(e13, e12) = v44 & op1(e13, e10) = v40 & op1(e13, e11) = v42 &
% 16.50/3.05 | op1(e12, e14) = v38 & op1(e12, e13) = v36 & op1(e12, e12) = v34 &
% 16.50/3.05 | op1(e12, e10) = v30 & op1(e12, e11) = v32 & op1(e10, e14) = v18 &
% 16.50/3.05 | op1(e10, e13) = v16 & op1(e10, e12) = v14 & op1(e10, e10) = v10 &
% 16.50/3.05 | op1(e10, e11) = v12 & op1(e11, e14) = v28 & op1(e11, e13) = v26 &
% 16.50/3.05 | op1(e11, e12) = v24 & op1(e11, e10) = v20 & op1(e11, e11) = v22 &
% 16.50/3.05 | $i(v109) & $i(v108) & $i(v107) & $i(v106) & $i(v105) & $i(v104) &
% 16.50/3.05 | $i(v103) & $i(v102) & $i(v101) & $i(v100) & $i(v99) & $i(v98) &
% 16.50/3.05 | $i(v97) & $i(v96) & $i(v95) & $i(v94) & $i(v93) & $i(v92) & $i(v91)
% 16.50/3.05 | & $i(v90) & $i(v89) & $i(v88) & $i(v87) & $i(v86) & $i(v85) &
% 16.50/3.05 | $i(v84) & $i(v83) & $i(v82) & $i(v81) & $i(v80) & $i(v79) & $i(v78)
% 16.50/3.05 | & $i(v77) & $i(v76) & $i(v75) & $i(v74) & $i(v73) & $i(v72) &
% 16.50/3.05 | $i(v71) & $i(v70) & $i(v69) & $i(v68) & $i(v67) & $i(v66) & $i(v65)
% 16.50/3.05 | & $i(v64) & $i(v63) & $i(v62) & $i(v61) & $i(v60) & $i(v59) &
% 16.50/3.05 | $i(v58) & $i(v57) & $i(v56) & $i(v55) & $i(v54) & $i(v53) & $i(v52)
% 16.50/3.05 | & $i(v51) & $i(v50) & $i(v49) & $i(v48) & $i(v47) & $i(v46) &
% 16.50/3.05 | $i(v45) & $i(v44) & $i(v43) & $i(v42) & $i(v41) & $i(v40) & $i(v39)
% 16.50/3.05 | & $i(v38) & $i(v37) & $i(v36) & $i(v35) & $i(v34) & $i(v33) &
% 16.50/3.05 | $i(v32) & $i(v31) & $i(v30) & $i(v29) & $i(v28) & $i(v27) & $i(v26)
% 16.50/3.05 | & $i(v25) & $i(v24) & $i(v23) & $i(v22) & $i(v21) & $i(v20) &
% 16.50/3.05 | $i(v19) & $i(v18) & $i(v17) & $i(v16) & $i(v15) & $i(v14) & $i(v13)
% 16.50/3.05 | & $i(v12) & $i(v11) & $i(v10) & $i(v9) & $i(v8) & $i(v7) & $i(v6) &
% 16.50/3.05 | $i(v5) & $i(v4) & $i(v3) & $i(v2) & $i(v1) & $i(v0) & (v9 = e14 | v9
% 16.50/3.05 | = e13 | v9 = e12 | v9 = e10 | v9 = e11) & (v8 = e14 | v8 = e13 |
% 16.50/3.05 | v8 = e12 | v8 = e10 | v8 = e11) & (v7 = e14 | v7 = e13 | v7 = e12
% 16.50/3.05 | | v7 = e10 | v7 = e11) & (v6 = e14 | v6 = e13 | v6 = e12 | v6 =
% 16.50/3.05 | e10 | v6 = e11) & (v5 = e14 | v5 = e13 | v5 = e12 | v5 = e10 | v5
% 16.50/3.05 | = e11) & (v4 = e24 | v4 = e23 | v4 = e22 | v4 = e20 | v4 = e21) &
% 16.50/3.05 | (v3 = e24 | v3 = e23 | v3 = e22 | v3 = e20 | v3 = e21) & (v2 = e24 |
% 16.50/3.05 | v2 = e23 | v2 = e22 | v2 = e20 | v2 = e21) & (v1 = e24 | v1 = e23
% 16.50/3.05 | | v1 = e22 | v1 = e20 | v1 = e21) & (v0 = e24 | v0 = e23 | v0 =
% 16.50/3.05 | e22 | v0 = e20 | v0 = e21))
% 16.50/3.05 |
% 16.50/3.05 | ALPHA: (function-axioms) implies:
% 16.50/3.05 | (28) ! [v0: $i] : ! [v1: $i] : ! [v2: $i] : (v1 = v0 | ~ (j(v2) = v1) |
% 16.50/3.05 | ~ (j(v2) = v0))
% 16.50/3.05 | (29) ! [v0: $i] : ! [v1: $i] : ! [v2: $i] : (v1 = v0 | ~ (h(v2) = v1) |
% 16.50/3.05 | ~ (h(v2) = v0))
% 16.50/3.05 | (30) ! [v0: $i] : ! [v1: $i] : ! [v2: $i] : ! [v3: $i] : (v1 = v0 | ~
% 16.50/3.05 | (op1(v3, v2) = v1) | ~ (op1(v3, v2) = v0))
% 16.50/3.05 | (31) ! [v0: $i] : ! [v1: $i] : ! [v2: $i] : ! [v3: $i] : (v1 = v0 | ~
% 16.50/3.05 | (op2(v3, v2) = v1) | ~ (op2(v3, v2) = v0))
% 16.50/3.05 |
% 16.50/3.05 | DELTA: instantiating (27) with fresh symbols all_4_0, all_4_1, all_4_2,
% 16.50/3.05 | all_4_3, all_4_4, all_4_5, all_4_6, all_4_7, all_4_8, all_4_9,
% 16.50/3.05 | all_4_10, all_4_11, all_4_12, all_4_13, all_4_14, all_4_15, all_4_16,
% 16.50/3.05 | all_4_17, all_4_18, all_4_19, all_4_20, all_4_21, all_4_22, all_4_23,
% 16.50/3.05 | all_4_24, all_4_25, all_4_26, all_4_27, all_4_28, all_4_29, all_4_30,
% 16.50/3.05 | all_4_31, all_4_32, all_4_33, all_4_34, all_4_35, all_4_36, all_4_37,
% 16.50/3.05 | all_4_38, all_4_39, all_4_40, all_4_41, all_4_42, all_4_43, all_4_44,
% 16.50/3.05 | all_4_45, all_4_46, all_4_47, all_4_48, all_4_49, all_4_50, all_4_51,
% 16.50/3.05 | all_4_52, all_4_53, all_4_54, all_4_55, all_4_56, all_4_57, all_4_58,
% 16.50/3.05 | all_4_59, all_4_60, all_4_61, all_4_62, all_4_63, all_4_64, all_4_65,
% 16.50/3.05 | all_4_66, all_4_67, all_4_68, all_4_69, all_4_70, all_4_71, all_4_72,
% 16.50/3.05 | all_4_73, all_4_74, all_4_75, all_4_76, all_4_77, all_4_78, all_4_79,
% 16.50/3.05 | all_4_80, all_4_81, all_4_82, all_4_83, all_4_84, all_4_85, all_4_86,
% 16.50/3.05 | all_4_87, all_4_88, all_4_89, all_4_90, all_4_91, all_4_92, all_4_93,
% 16.50/3.05 | all_4_94, all_4_95, all_4_96, all_4_97, all_4_98, all_4_99, all_4_100,
% 16.50/3.05 | all_4_101, all_4_102, all_4_103, all_4_104, all_4_105, all_4_106,
% 16.50/3.05 | all_4_107, all_4_108, all_4_109 gives:
% 16.50/3.06 | (32) h(all_4_51) = all_4_50 & h(all_4_53) = all_4_52 & h(all_4_55) =
% 16.50/3.06 | all_4_54 & h(all_4_57) = all_4_56 & h(all_4_59) = all_4_58 &
% 16.50/3.06 | h(all_4_61) = all_4_60 & h(all_4_63) = all_4_62 & h(all_4_65) =
% 16.50/3.06 | all_4_64 & h(all_4_67) = all_4_66 & h(all_4_69) = all_4_68 &
% 16.50/3.06 | h(all_4_71) = all_4_70 & h(all_4_73) = all_4_72 & h(all_4_75) =
% 16.50/3.06 | all_4_74 & h(all_4_77) = all_4_76 & h(all_4_79) = all_4_78 &
% 16.50/3.06 | h(all_4_81) = all_4_80 & h(all_4_83) = all_4_82 & h(all_4_85) =
% 16.50/3.06 | all_4_84 & h(all_4_87) = all_4_86 & h(all_4_89) = all_4_88 &
% 16.50/3.06 | h(all_4_91) = all_4_90 & h(all_4_93) = all_4_92 & h(all_4_95) =
% 16.50/3.06 | all_4_94 & h(all_4_97) = all_4_96 & h(all_4_99) = all_4_98 &
% 16.50/3.06 | h(all_4_100) = e24 & h(all_4_101) = e23 & h(all_4_102) = e22 &
% 16.50/3.06 | h(all_4_103) = e21 & h(all_4_104) = e20 & h(e14) = all_4_105 & h(e13)
% 16.50/3.06 | = all_4_106 & h(e12) = all_4_107 & h(e10) = all_4_109 & h(e11) =
% 16.50/3.06 | all_4_108 & j(all_4_1) = all_4_0 & j(all_4_3) = all_4_2 & j(all_4_5) =
% 16.50/3.06 | all_4_4 & j(all_4_7) = all_4_6 & j(all_4_9) = all_4_8 & j(all_4_11) =
% 16.50/3.06 | all_4_10 & j(all_4_13) = all_4_12 & j(all_4_15) = all_4_14 &
% 16.50/3.06 | j(all_4_17) = all_4_16 & j(all_4_19) = all_4_18 & j(all_4_21) =
% 16.50/3.06 | all_4_20 & j(all_4_23) = all_4_22 & j(all_4_25) = all_4_24 &
% 16.50/3.06 | j(all_4_27) = all_4_26 & j(all_4_29) = all_4_28 & j(all_4_31) =
% 16.50/3.06 | all_4_30 & j(all_4_33) = all_4_32 & j(all_4_35) = all_4_34 &
% 16.50/3.06 | j(all_4_37) = all_4_36 & j(all_4_39) = all_4_38 & j(all_4_41) =
% 16.50/3.06 | all_4_40 & j(all_4_43) = all_4_42 & j(all_4_45) = all_4_44 &
% 16.50/3.06 | j(all_4_47) = all_4_46 & j(all_4_49) = all_4_48 & j(all_4_105) = e14 &
% 16.50/3.06 | j(all_4_106) = e13 & j(all_4_107) = e12 & j(all_4_108) = e11 &
% 16.50/3.06 | j(all_4_109) = e10 & j(e24) = all_4_100 & j(e23) = all_4_101 & j(e22)
% 16.50/3.06 | = all_4_102 & j(e20) = all_4_104 & j(e21) = all_4_103 & op2(all_4_105,
% 16.50/3.06 | all_4_105) = all_4_50 & op2(all_4_105, all_4_106) = all_4_52 &
% 16.50/3.06 | op2(all_4_105, all_4_107) = all_4_54 & op2(all_4_105, all_4_108) =
% 16.50/3.06 | all_4_56 & op2(all_4_105, all_4_109) = all_4_58 & op2(all_4_106,
% 16.50/3.06 | all_4_105) = all_4_60 & op2(all_4_106, all_4_106) = all_4_62 &
% 16.50/3.06 | op2(all_4_106, all_4_107) = all_4_64 & op2(all_4_106, all_4_108) =
% 16.50/3.06 | all_4_66 & op2(all_4_106, all_4_109) = all_4_68 & op2(all_4_107,
% 16.50/3.06 | all_4_105) = all_4_70 & op2(all_4_107, all_4_106) = all_4_72 &
% 16.50/3.06 | op2(all_4_107, all_4_107) = all_4_74 & op2(all_4_107, all_4_108) =
% 16.50/3.06 | all_4_76 & op2(all_4_107, all_4_109) = all_4_78 & op2(all_4_108,
% 16.50/3.06 | all_4_105) = all_4_80 & op2(all_4_108, all_4_106) = all_4_82 &
% 16.50/3.06 | op2(all_4_108, all_4_107) = all_4_84 & op2(all_4_108, all_4_108) =
% 16.50/3.06 | all_4_86 & op2(all_4_108, all_4_109) = all_4_88 & op2(all_4_109,
% 16.50/3.06 | all_4_105) = all_4_90 & op2(all_4_109, all_4_106) = all_4_92 &
% 16.50/3.06 | op2(all_4_109, all_4_107) = all_4_94 & op2(all_4_109, all_4_108) =
% 16.50/3.06 | all_4_96 & op2(all_4_109, all_4_109) = all_4_98 & op2(e24, e24) =
% 16.50/3.06 | all_4_1 & op2(e24, e23) = all_4_3 & op2(e24, e22) = all_4_5 & op2(e24,
% 16.50/3.06 | e20) = all_4_9 & op2(e24, e21) = all_4_7 & op2(e23, e24) = all_4_11
% 16.50/3.06 | & op2(e23, e23) = all_4_13 & op2(e23, e22) = all_4_15 & op2(e23, e20)
% 16.50/3.06 | = all_4_19 & op2(e23, e21) = all_4_17 & op2(e22, e24) = all_4_21 &
% 16.50/3.06 | op2(e22, e23) = all_4_23 & op2(e22, e22) = all_4_25 & op2(e22, e20) =
% 16.50/3.06 | all_4_29 & op2(e22, e21) = all_4_27 & op2(e20, e24) = all_4_41 &
% 16.50/3.06 | op2(e20, e23) = all_4_43 & op2(e20, e22) = all_4_45 & op2(e20, e20) =
% 16.50/3.06 | all_4_49 & op2(e20, e21) = all_4_47 & op2(e21, e24) = all_4_31 &
% 16.50/3.06 | op2(e21, e23) = all_4_33 & op2(e21, e22) = all_4_35 & op2(e21, e20) =
% 16.50/3.06 | all_4_39 & op2(e21, e21) = all_4_37 & op1(all_4_100, all_4_100) =
% 16.50/3.06 | all_4_0 & op1(all_4_100, all_4_101) = all_4_2 & op1(all_4_100,
% 16.50/3.06 | all_4_102) = all_4_4 & op1(all_4_100, all_4_103) = all_4_6 &
% 16.50/3.06 | op1(all_4_100, all_4_104) = all_4_8 & op1(all_4_101, all_4_100) =
% 16.50/3.06 | all_4_10 & op1(all_4_101, all_4_101) = all_4_12 & op1(all_4_101,
% 16.50/3.06 | all_4_102) = all_4_14 & op1(all_4_101, all_4_103) = all_4_16 &
% 16.50/3.06 | op1(all_4_101, all_4_104) = all_4_18 & op1(all_4_102, all_4_100) =
% 16.50/3.06 | all_4_20 & op1(all_4_102, all_4_101) = all_4_22 & op1(all_4_102,
% 16.50/3.06 | all_4_102) = all_4_24 & op1(all_4_102, all_4_103) = all_4_26 &
% 16.50/3.06 | op1(all_4_102, all_4_104) = all_4_28 & op1(all_4_103, all_4_100) =
% 16.50/3.06 | all_4_30 & op1(all_4_103, all_4_101) = all_4_32 & op1(all_4_103,
% 16.50/3.06 | all_4_102) = all_4_34 & op1(all_4_103, all_4_103) = all_4_36 &
% 16.50/3.06 | op1(all_4_103, all_4_104) = all_4_38 & op1(all_4_104, all_4_100) =
% 16.50/3.06 | all_4_40 & op1(all_4_104, all_4_101) = all_4_42 & op1(all_4_104,
% 16.50/3.06 | all_4_102) = all_4_44 & op1(all_4_104, all_4_103) = all_4_46 &
% 16.50/3.06 | op1(all_4_104, all_4_104) = all_4_48 & op1(e14, e14) = all_4_51 &
% 16.50/3.06 | op1(e14, e13) = all_4_53 & op1(e14, e12) = all_4_55 & op1(e14, e10) =
% 16.50/3.06 | all_4_59 & op1(e14, e11) = all_4_57 & op1(e13, e14) = all_4_61 &
% 16.50/3.06 | op1(e13, e13) = all_4_63 & op1(e13, e12) = all_4_65 & op1(e13, e10) =
% 16.50/3.06 | all_4_69 & op1(e13, e11) = all_4_67 & op1(e12, e14) = all_4_71 &
% 16.50/3.06 | op1(e12, e13) = all_4_73 & op1(e12, e12) = all_4_75 & op1(e12, e10) =
% 16.50/3.06 | all_4_79 & op1(e12, e11) = all_4_77 & op1(e10, e14) = all_4_91 &
% 16.50/3.06 | op1(e10, e13) = all_4_93 & op1(e10, e12) = all_4_95 & op1(e10, e10) =
% 16.50/3.06 | all_4_99 & op1(e10, e11) = all_4_97 & op1(e11, e14) = all_4_81 &
% 16.50/3.06 | op1(e11, e13) = all_4_83 & op1(e11, e12) = all_4_85 & op1(e11, e10) =
% 16.50/3.06 | all_4_89 & op1(e11, e11) = all_4_87 & $i(all_4_0) & $i(all_4_1) &
% 16.50/3.06 | $i(all_4_2) & $i(all_4_3) & $i(all_4_4) & $i(all_4_5) & $i(all_4_6) &
% 16.50/3.06 | $i(all_4_7) & $i(all_4_8) & $i(all_4_9) & $i(all_4_10) & $i(all_4_11)
% 16.50/3.06 | & $i(all_4_12) & $i(all_4_13) & $i(all_4_14) & $i(all_4_15) &
% 16.50/3.06 | $i(all_4_16) & $i(all_4_17) & $i(all_4_18) & $i(all_4_19) &
% 16.50/3.06 | $i(all_4_20) & $i(all_4_21) & $i(all_4_22) & $i(all_4_23) &
% 16.50/3.06 | $i(all_4_24) & $i(all_4_25) & $i(all_4_26) & $i(all_4_27) &
% 16.50/3.06 | $i(all_4_28) & $i(all_4_29) & $i(all_4_30) & $i(all_4_31) &
% 16.50/3.06 | $i(all_4_32) & $i(all_4_33) & $i(all_4_34) & $i(all_4_35) &
% 16.50/3.06 | $i(all_4_36) & $i(all_4_37) & $i(all_4_38) & $i(all_4_39) &
% 16.50/3.06 | $i(all_4_40) & $i(all_4_41) & $i(all_4_42) & $i(all_4_43) &
% 16.50/3.06 | $i(all_4_44) & $i(all_4_45) & $i(all_4_46) & $i(all_4_47) &
% 16.50/3.06 | $i(all_4_48) & $i(all_4_49) & $i(all_4_50) & $i(all_4_51) &
% 16.50/3.06 | $i(all_4_52) & $i(all_4_53) & $i(all_4_54) & $i(all_4_55) &
% 16.50/3.06 | $i(all_4_56) & $i(all_4_57) & $i(all_4_58) & $i(all_4_59) &
% 16.50/3.06 | $i(all_4_60) & $i(all_4_61) & $i(all_4_62) & $i(all_4_63) &
% 16.50/3.06 | $i(all_4_64) & $i(all_4_65) & $i(all_4_66) & $i(all_4_67) &
% 16.50/3.06 | $i(all_4_68) & $i(all_4_69) & $i(all_4_70) & $i(all_4_71) &
% 16.50/3.06 | $i(all_4_72) & $i(all_4_73) & $i(all_4_74) & $i(all_4_75) &
% 16.50/3.06 | $i(all_4_76) & $i(all_4_77) & $i(all_4_78) & $i(all_4_79) &
% 16.50/3.06 | $i(all_4_80) & $i(all_4_81) & $i(all_4_82) & $i(all_4_83) &
% 16.50/3.06 | $i(all_4_84) & $i(all_4_85) & $i(all_4_86) & $i(all_4_87) &
% 16.50/3.06 | $i(all_4_88) & $i(all_4_89) & $i(all_4_90) & $i(all_4_91) &
% 16.50/3.06 | $i(all_4_92) & $i(all_4_93) & $i(all_4_94) & $i(all_4_95) &
% 16.50/3.06 | $i(all_4_96) & $i(all_4_97) & $i(all_4_98) & $i(all_4_99) &
% 16.50/3.06 | $i(all_4_100) & $i(all_4_101) & $i(all_4_102) & $i(all_4_103) &
% 16.50/3.06 | $i(all_4_104) & $i(all_4_105) & $i(all_4_106) & $i(all_4_107) &
% 16.50/3.06 | $i(all_4_108) & $i(all_4_109) & (all_4_100 = e14 | all_4_100 = e13 |
% 16.50/3.06 | all_4_100 = e12 | all_4_100 = e10 | all_4_100 = e11) & (all_4_101 =
% 16.50/3.06 | e14 | all_4_101 = e13 | all_4_101 = e12 | all_4_101 = e10 |
% 16.50/3.06 | all_4_101 = e11) & (all_4_102 = e14 | all_4_102 = e13 | all_4_102 =
% 16.50/3.06 | e12 | all_4_102 = e10 | all_4_102 = e11) & (all_4_103 = e14 |
% 16.50/3.06 | all_4_103 = e13 | all_4_103 = e12 | all_4_103 = e10 | all_4_103 =
% 16.50/3.06 | e11) & (all_4_104 = e14 | all_4_104 = e13 | all_4_104 = e12 |
% 16.50/3.06 | all_4_104 = e10 | all_4_104 = e11) & (all_4_105 = e24 | all_4_105 =
% 16.50/3.06 | e23 | all_4_105 = e22 | all_4_105 = e20 | all_4_105 = e21) &
% 16.50/3.06 | (all_4_106 = e24 | all_4_106 = e23 | all_4_106 = e22 | all_4_106 = e20
% 16.50/3.06 | | all_4_106 = e21) & (all_4_107 = e24 | all_4_107 = e23 | all_4_107
% 16.50/3.06 | = e22 | all_4_107 = e20 | all_4_107 = e21) & (all_4_108 = e24 |
% 16.50/3.06 | all_4_108 = e23 | all_4_108 = e22 | all_4_108 = e20 | all_4_108 =
% 16.50/3.06 | e21) & (all_4_109 = e24 | all_4_109 = e23 | all_4_109 = e22 |
% 16.50/3.06 | all_4_109 = e20 | all_4_109 = e21)
% 16.50/3.06 |
% 16.50/3.06 | ALPHA: (32) implies:
% 16.50/3.07 | (33) op1(e11, e11) = all_4_87
% 16.50/3.07 | (34) op1(e11, e12) = all_4_85
% 16.50/3.07 | (35) op1(e10, e10) = all_4_99
% 16.50/3.07 | (36) op1(e12, e11) = all_4_77
% 16.50/3.07 | (37) op1(e12, e12) = all_4_75
% 16.50/3.07 | (38) op1(e13, e11) = all_4_67
% 16.50/3.07 | (39) op1(e13, e13) = all_4_63
% 16.50/3.07 | (40) op1(e13, e14) = all_4_61
% 16.50/3.07 | (41) op1(e14, e13) = all_4_53
% 16.50/3.07 | (42) op1(e14, e14) = all_4_51
% 16.50/3.07 | (43) op1(all_4_104, all_4_104) = all_4_48
% 16.50/3.07 | (44) op1(all_4_102, all_4_104) = all_4_28
% 16.50/3.07 | (45) op1(all_4_102, all_4_102) = all_4_24
% 16.50/3.07 | (46) op2(e21, e21) = all_4_37
% 16.50/3.07 | (47) op2(e21, e24) = all_4_31
% 16.50/3.07 | (48) op2(e20, e20) = all_4_49
% 16.50/3.07 | (49) op2(e20, e22) = all_4_45
% 16.50/3.07 | (50) op2(e22, e20) = all_4_29
% 16.50/3.07 | (51) op2(e22, e22) = all_4_25
% 16.50/3.07 | (52) op2(e23, e21) = all_4_17
% 16.50/3.07 | (53) op2(e23, e23) = all_4_13
% 16.50/3.07 | (54) op2(e24, e23) = all_4_3
% 16.50/3.07 | (55) op2(e24, e24) = all_4_1
% 16.50/3.07 | (56) op2(all_4_109, all_4_109) = all_4_98
% 16.50/3.07 | (57) j(e20) = all_4_104
% 16.50/3.07 | (58) j(e22) = all_4_102
% 16.50/3.07 | (59) j(all_4_109) = e10
% 16.50/3.07 | (60) j(all_4_49) = all_4_48
% 16.50/3.07 | (61) j(all_4_45) = all_4_44
% 16.50/3.07 | (62) j(all_4_37) = all_4_36
% 16.50/3.07 | (63) j(all_4_31) = all_4_30
% 16.50/3.07 | (64) j(all_4_29) = all_4_28
% 16.50/3.07 | (65) j(all_4_25) = all_4_24
% 16.50/3.07 | (66) j(all_4_17) = all_4_16
% 16.50/3.07 | (67) j(all_4_13) = all_4_12
% 16.50/3.07 | (68) j(all_4_3) = all_4_2
% 16.50/3.07 | (69) j(all_4_1) = all_4_0
% 16.50/3.07 | (70) h(e10) = all_4_109
% 16.50/3.07 | (71) h(all_4_104) = e20
% 16.50/3.07 | (72) h(all_4_102) = e22
% 16.50/3.07 | (73) h(all_4_99) = all_4_98
% 16.50/3.07 | (74) h(all_4_85) = all_4_84
% 16.50/3.07 | (75) h(all_4_77) = all_4_76
% 16.50/3.07 | (76) h(all_4_61) = all_4_60
% 16.50/3.07 | (77) h(all_4_53) = all_4_52
% 16.50/3.07 | (78) all_4_109 = e24 | all_4_109 = e23 | all_4_109 = e22 | all_4_109 = e20
% 16.50/3.07 | | all_4_109 = e21
% 16.50/3.07 | (79) all_4_104 = e14 | all_4_104 = e13 | all_4_104 = e12 | all_4_104 = e10
% 16.50/3.07 | | all_4_104 = e11
% 16.50/3.07 | (80) all_4_102 = e14 | all_4_102 = e13 | all_4_102 = e12 | all_4_102 = e10
% 16.50/3.07 | | all_4_102 = e11
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e14, all_4_87, e11, e11, simplifying with
% 16.50/3.07 | (7), (33) gives:
% 16.50/3.07 | (81) all_4_87 = e14
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e10, all_4_85, e12, e11, simplifying with
% 16.50/3.07 | (8), (34) gives:
% 16.50/3.07 | (82) all_4_85 = e10
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e10, all_4_99, e10, e10, simplifying with
% 16.50/3.07 | (9), (35) gives:
% 16.50/3.07 | (83) all_4_99 = e10
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e10, all_4_77, e11, e12, simplifying with
% 16.50/3.07 | (10), (36) gives:
% 16.50/3.07 | (84) all_4_77 = e10
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e13, all_4_75, e12, e12, simplifying with
% 16.50/3.07 | (11), (37) gives:
% 16.50/3.07 | (85) all_4_75 = e13
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e12, all_4_67, e11, e13, simplifying with
% 16.50/3.07 | (12), (38) gives:
% 16.50/3.07 | (86) all_4_67 = e12
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e11, all_4_63, e13, e13, simplifying with
% 16.50/3.07 | (13), (39) gives:
% 16.50/3.07 | (87) all_4_63 = e11
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e10, all_4_61, e14, e13, simplifying with
% 16.50/3.07 | (14), (40) gives:
% 16.50/3.07 | (88) all_4_61 = e10
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e10, all_4_53, e13, e14, simplifying with
% 16.50/3.07 | (15), (41) gives:
% 16.50/3.07 | (89) all_4_53 = e10
% 16.50/3.07 |
% 16.50/3.07 | GROUND_INST: instantiating (30) with e12, all_4_51, e14, e14, simplifying with
% 16.50/3.07 | (16), (42) gives:
% 16.50/3.07 | (90) all_4_51 = e12
% 16.50/3.07 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e20, all_4_37, e21, e21, simplifying with
% 16.50/3.08 | (17), (46) gives:
% 16.50/3.08 | (91) all_4_37 = e20
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e22, all_4_31, e24, e21, simplifying with
% 16.50/3.08 | (18), (47) gives:
% 16.50/3.08 | (92) all_4_31 = e22
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e20, all_4_49, e20, e20, simplifying with
% 16.50/3.08 | (19), (48) gives:
% 16.50/3.08 | (93) all_4_49 = e20
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e22, all_4_45, e22, e20, simplifying with
% 16.50/3.08 | (20), (49) gives:
% 16.50/3.08 | (94) all_4_45 = e22
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e22, all_4_29, e20, e22, simplifying with
% 16.50/3.08 | (21), (50) gives:
% 16.50/3.08 | (95) all_4_29 = e22
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e20, all_4_25, e22, e22, simplifying with
% 16.50/3.08 | (22), (51) gives:
% 16.50/3.08 | (96) all_4_25 = e20
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e22, all_4_17, e21, e23, simplifying with
% 16.50/3.08 | (23), (52) gives:
% 16.50/3.08 | (97) all_4_17 = e22
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e20, all_4_13, e23, e23, simplifying with
% 16.50/3.08 | (24), (53) gives:
% 16.50/3.08 | (98) all_4_13 = e20
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e22, all_4_3, e23, e24, simplifying with
% 16.50/3.08 | (25), (54) gives:
% 16.50/3.08 | (99) all_4_3 = e22
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (31) with e20, all_4_1, e24, e24, simplifying with
% 16.50/3.08 | (26), (55) gives:
% 16.50/3.08 | (100) all_4_1 = e20
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (77), (89) imply:
% 16.50/3.08 | (101) h(e10) = all_4_52
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (76), (88) imply:
% 16.50/3.08 | (102) h(e10) = all_4_60
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (75), (84) imply:
% 16.50/3.08 | (103) h(e10) = all_4_76
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (74), (82) imply:
% 16.50/3.08 | (104) h(e10) = all_4_84
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (73), (83) imply:
% 16.50/3.08 | (105) h(e10) = all_4_98
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (69), (100) imply:
% 16.50/3.08 | (106) j(e20) = all_4_0
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (68), (99) imply:
% 16.50/3.08 | (107) j(e22) = all_4_2
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (67), (98) imply:
% 16.50/3.08 | (108) j(e20) = all_4_12
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (66), (97) imply:
% 16.50/3.08 | (109) j(e22) = all_4_16
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (65), (96) imply:
% 16.50/3.08 | (110) j(e20) = all_4_24
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (64), (95) imply:
% 16.50/3.08 | (111) j(e22) = all_4_28
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (63), (92) imply:
% 16.50/3.08 | (112) j(e22) = all_4_30
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (62), (91) imply:
% 16.50/3.08 | (113) j(e20) = all_4_36
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (61), (94) imply:
% 16.50/3.08 | (114) j(e22) = all_4_44
% 16.50/3.08 |
% 16.50/3.08 | REDUCE: (60), (93) imply:
% 16.50/3.08 | (115) j(e20) = all_4_48
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (28) with all_4_36, all_4_12, e20, simplifying with
% 16.50/3.08 | (108), (113) gives:
% 16.50/3.08 | (116) all_4_12 = all_4_36
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (28) with all_4_48, all_4_12, e20, simplifying with
% 16.50/3.08 | (108), (115) gives:
% 16.50/3.08 | (117) all_4_12 = all_4_48
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (28) with all_4_104, all_4_0, e20, simplifying with
% 16.50/3.08 | (57), (106) gives:
% 16.50/3.08 | (118) all_4_0 = all_4_104
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (28) with all_4_24, all_4_0, e20, simplifying with
% 16.50/3.08 | (106), (110) gives:
% 16.50/3.08 | (119) all_4_0 = all_4_24
% 16.50/3.08 |
% 16.50/3.08 | GROUND_INST: instantiating (28) with all_4_36, all_4_0, e20, simplifying with
% 16.50/3.08 | (106), (113) gives:
% 16.50/3.08 | (120) all_4_0 = all_4_36
% 16.50/3.08 |
% 16.50/3.09 | GROUND_INST: instantiating (28) with all_4_102, all_4_16, e22, simplifying
% 16.50/3.09 | with (58), (109) gives:
% 16.50/3.09 | (121) all_4_16 = all_4_102
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (28) with all_4_28, all_4_16, e22, simplifying with
% 16.50/3.09 | (109), (111) gives:
% 16.50/3.09 | (122) all_4_16 = all_4_28
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (28) with all_4_30, all_4_16, e22, simplifying with
% 16.50/3.09 | (109), (112) gives:
% 16.50/3.09 | (123) all_4_16 = all_4_30
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (28) with all_4_28, all_4_2, e22, simplifying with
% 16.50/3.09 | (107), (111) gives:
% 16.50/3.09 | (124) all_4_2 = all_4_28
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (28) with all_4_44, all_4_2, e22, simplifying with
% 16.50/3.09 | (107), (114) gives:
% 16.50/3.09 | (125) all_4_2 = all_4_44
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (29) with all_4_84, all_4_76, e10, simplifying with
% 16.50/3.09 | (103), (104) gives:
% 16.50/3.09 | (126) all_4_76 = all_4_84
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (29) with all_4_76, all_4_60, e10, simplifying with
% 16.50/3.09 | (102), (103) gives:
% 16.50/3.09 | (127) all_4_60 = all_4_76
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (29) with all_4_98, all_4_60, e10, simplifying with
% 16.50/3.09 | (102), (105) gives:
% 16.50/3.09 | (128) all_4_60 = all_4_98
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (29) with all_4_109, all_4_52, e10, simplifying
% 16.50/3.09 | with (70), (101) gives:
% 16.50/3.09 | (129) all_4_52 = all_4_109
% 16.50/3.09 |
% 16.50/3.09 | GROUND_INST: instantiating (29) with all_4_84, all_4_52, e10, simplifying with
% 16.50/3.09 | (101), (104) gives:
% 16.50/3.09 | (130) all_4_52 = all_4_84
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (119), (120) imply:
% 16.50/3.09 | (131) all_4_24 = all_4_36
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (118), (119) imply:
% 16.50/3.09 | (132) all_4_24 = all_4_104
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (124), (125) imply:
% 16.50/3.09 | (133) all_4_28 = all_4_44
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (133) implies:
% 16.50/3.09 | (134) all_4_28 = all_4_44
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (116), (117) imply:
% 16.50/3.09 | (135) all_4_36 = all_4_48
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (135) implies:
% 16.50/3.09 | (136) all_4_36 = all_4_48
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (122), (123) imply:
% 16.50/3.09 | (137) all_4_28 = all_4_30
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (137) implies:
% 16.50/3.09 | (138) all_4_28 = all_4_30
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (121), (123) imply:
% 16.50/3.09 | (139) all_4_30 = all_4_102
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (131), (132) imply:
% 16.50/3.09 | (140) all_4_36 = all_4_104
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (140) implies:
% 16.50/3.09 | (141) all_4_36 = all_4_104
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (134), (138) imply:
% 16.50/3.09 | (142) all_4_30 = all_4_44
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (142) implies:
% 16.50/3.09 | (143) all_4_30 = all_4_44
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (139), (143) imply:
% 16.50/3.09 | (144) all_4_44 = all_4_102
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (136), (141) imply:
% 16.50/3.09 | (145) all_4_48 = all_4_104
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (129), (130) imply:
% 16.50/3.09 | (146) all_4_84 = all_4_109
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (146) implies:
% 16.50/3.09 | (147) all_4_84 = all_4_109
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (127), (128) imply:
% 16.50/3.09 | (148) all_4_76 = all_4_98
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (148) implies:
% 16.50/3.09 | (149) all_4_76 = all_4_98
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (126), (149) imply:
% 16.50/3.09 | (150) all_4_84 = all_4_98
% 16.50/3.09 |
% 16.50/3.09 | SIMP: (150) implies:
% 16.50/3.09 | (151) all_4_84 = all_4_98
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (147), (151) imply:
% 16.50/3.09 | (152) all_4_98 = all_4_109
% 16.50/3.09 |
% 16.50/3.09 | COMBINE_EQS: (134), (144) imply:
% 16.50/3.09 | (153) all_4_28 = all_4_102
% 16.50/3.09 |
% 16.50/3.09 | REDUCE: (56), (152) imply:
% 16.50/3.09 | (154) op2(all_4_109, all_4_109) = all_4_109
% 16.50/3.09 |
% 16.50/3.09 | REDUCE: (45), (132) imply:
% 16.50/3.09 | (155) op1(all_4_102, all_4_102) = all_4_104
% 16.50/3.09 |
% 16.50/3.09 | REDUCE: (44), (153) imply:
% 16.50/3.09 | (156) op1(all_4_102, all_4_104) = all_4_102
% 16.50/3.09 |
% 16.50/3.09 | REDUCE: (43), (145) imply:
% 16.50/3.09 | (157) op1(all_4_104, all_4_104) = all_4_104
% 16.50/3.09 |
% 16.50/3.09 | BETA: splitting (78) gives:
% 16.50/3.09 |
% 16.50/3.09 | Case 1:
% 16.50/3.09 | |
% 16.50/3.09 | | (158) all_4_109 = e24
% 16.50/3.09 | |
% 16.50/3.09 | | REDUCE: (154), (158) imply:
% 16.50/3.09 | | (159) op2(e24, e24) = e24
% 16.50/3.09 | |
% 16.50/3.09 | | GROUND_INST: instantiating (31) with e20, e24, e24, e24, simplifying with
% 16.50/3.09 | | (26), (159) gives:
% 16.50/3.09 | | (160) e24 = e20
% 16.50/3.09 | |
% 16.50/3.09 | | REDUCE: (6), (160) imply:
% 16.50/3.09 | | (161) $false
% 16.50/3.10 | |
% 16.50/3.10 | | CLOSE: (161) is inconsistent.
% 16.50/3.10 | |
% 16.50/3.10 | Case 2:
% 16.50/3.10 | |
% 16.50/3.10 | | (162) all_4_109 = e23 | all_4_109 = e22 | all_4_109 = e20 | all_4_109 =
% 16.50/3.10 | | e21
% 16.50/3.10 | |
% 16.50/3.10 | | BETA: splitting (80) gives:
% 16.50/3.10 | |
% 16.50/3.10 | | Case 1:
% 16.50/3.10 | | |
% 16.50/3.10 | | | (163) all_4_102 = e14
% 16.50/3.10 | | |
% 16.50/3.10 | | | REDUCE: (155), (163) imply:
% 16.50/3.10 | | | (164) op1(e14, e14) = all_4_104
% 16.50/3.10 | | |
% 16.50/3.10 | | | GROUND_INST: instantiating (30) with e12, all_4_104, e14, e14, simplifying
% 16.50/3.10 | | | with (16), (164) gives:
% 16.50/3.10 | | | (165) all_4_104 = e12
% 16.50/3.10 | | |
% 16.50/3.10 | | | REDUCE: (157), (165) imply:
% 16.50/3.10 | | | (166) op1(e12, e12) = e12
% 16.50/3.10 | | |
% 16.50/3.10 | | | GROUND_INST: instantiating (30) with e13, e12, e12, e12, simplifying with
% 16.50/3.10 | | | (11), (166) gives:
% 16.50/3.10 | | | (167) e13 = e12
% 16.50/3.10 | | |
% 16.50/3.10 | | | REDUCE: (2), (167) imply:
% 16.50/3.10 | | | (168) $false
% 16.50/3.10 | | |
% 16.50/3.10 | | | CLOSE: (168) is inconsistent.
% 16.50/3.10 | | |
% 16.50/3.10 | | Case 2:
% 16.50/3.10 | | |
% 16.50/3.10 | | | (169) all_4_102 = e13 | all_4_102 = e12 | all_4_102 = e10 | all_4_102 =
% 16.50/3.10 | | | e11
% 16.50/3.10 | | |
% 16.50/3.10 | | | BETA: splitting (79) gives:
% 16.50/3.10 | | |
% 16.50/3.10 | | | Case 1:
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | (170) all_4_104 = e14
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | REDUCE: (157), (170) imply:
% 16.50/3.10 | | | | (171) op1(e14, e14) = e14
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | GROUND_INST: instantiating (30) with e12, e14, e14, e14, simplifying
% 16.50/3.10 | | | | with (16), (171) gives:
% 16.50/3.10 | | | | (172) e14 = e12
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | REDUCE: (3), (172) imply:
% 16.50/3.10 | | | | (173) $false
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | CLOSE: (173) is inconsistent.
% 16.50/3.10 | | | |
% 16.50/3.10 | | | Case 2:
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | (174) ~ (all_4_104 = e14)
% 16.50/3.10 | | | | (175) all_4_104 = e13 | all_4_104 = e12 | all_4_104 = e10 | all_4_104
% 16.50/3.10 | | | | = e11
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | BETA: splitting (162) gives:
% 16.50/3.10 | | | |
% 16.50/3.10 | | | | Case 1:
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | (176) all_4_109 = e23
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | REDUCE: (154), (176) imply:
% 16.50/3.10 | | | | | (177) op2(e23, e23) = e23
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | GROUND_INST: instantiating (31) with e20, e23, e23, e23, simplifying
% 16.50/3.10 | | | | | with (24), (177) gives:
% 16.50/3.10 | | | | | (178) e23 = e20
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | REDUCE: (5), (178) imply:
% 16.50/3.10 | | | | | (179) $false
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | CLOSE: (179) is inconsistent.
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | Case 2:
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | (180) all_4_109 = e22 | all_4_109 = e20 | all_4_109 = e21
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | BETA: splitting (169) gives:
% 16.50/3.10 | | | | |
% 16.50/3.10 | | | | | Case 1:
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | (181) all_4_102 = e13
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | REDUCE: (155), (181) imply:
% 16.50/3.10 | | | | | | (182) op1(e13, e13) = all_4_104
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | REDUCE: (156), (181) imply:
% 16.50/3.10 | | | | | | (183) op1(e13, all_4_104) = e13
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | GROUND_INST: instantiating (30) with e11, all_4_104, e13, e13,
% 16.50/3.10 | | | | | | simplifying with (13), (182) gives:
% 16.50/3.10 | | | | | | (184) all_4_104 = e11
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | REDUCE: (183), (184) imply:
% 16.50/3.10 | | | | | | (185) op1(e13, e11) = e13
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | GROUND_INST: instantiating (30) with e12, e13, e11, e13, simplifying
% 16.50/3.10 | | | | | | with (12), (185) gives:
% 16.50/3.10 | | | | | | (186) e13 = e12
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | REDUCE: (2), (186) imply:
% 16.50/3.10 | | | | | | (187) $false
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | CLOSE: (187) is inconsistent.
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | Case 2:
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | (188) all_4_102 = e12 | all_4_102 = e10 | all_4_102 = e11
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | BETA: splitting (175) gives:
% 16.50/3.10 | | | | | |
% 16.50/3.10 | | | | | | Case 1:
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | (189) all_4_104 = e13
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | REDUCE: (157), (189) imply:
% 16.50/3.10 | | | | | | | (190) op1(e13, e13) = e13
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | GROUND_INST: instantiating (30) with e11, e13, e13, e13,
% 16.50/3.10 | | | | | | | simplifying with (13), (190) gives:
% 16.50/3.10 | | | | | | | (191) e13 = e11
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | REDUCE: (1), (191) imply:
% 16.50/3.10 | | | | | | | (192) $false
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | CLOSE: (192) is inconsistent.
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | Case 2:
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | (193) ~ (all_4_104 = e13)
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | BETA: splitting (180) gives:
% 16.50/3.10 | | | | | | |
% 16.50/3.10 | | | | | | | Case 1:
% 16.50/3.10 | | | | | | | |
% 16.50/3.10 | | | | | | | | (194) all_4_109 = e22
% 16.50/3.10 | | | | | | | |
% 16.50/3.10 | | | | | | | | REDUCE: (154), (194) imply:
% 16.50/3.10 | | | | | | | | (195) op2(e22, e22) = e22
% 16.50/3.10 | | | | | | | |
% 16.50/3.10 | | | | | | | | GROUND_INST: instantiating (31) with e20, e22, e22, e22,
% 16.50/3.10 | | | | | | | | simplifying with (22), (195) gives:
% 16.50/3.10 | | | | | | | | (196) e22 = e20
% 16.50/3.10 | | | | | | | |
% 16.50/3.11 | | | | | | | | REDUCE: (4), (196) imply:
% 16.50/3.11 | | | | | | | | (197) $false
% 16.50/3.11 | | | | | | | |
% 16.50/3.11 | | | | | | | | CLOSE: (197) is inconsistent.
% 16.50/3.11 | | | | | | | |
% 16.50/3.11 | | | | | | | Case 2:
% 16.50/3.11 | | | | | | | |
% 16.50/3.11 | | | | | | | | (198) ~ (all_4_109 = e22)
% 16.50/3.11 | | | | | | | | (199) all_4_109 = e20 | all_4_109 = e21
% 16.50/3.11 | | | | | | | |
% 16.50/3.11 | | | | | | | | BETA: splitting (188) gives:
% 16.50/3.11 | | | | | | | |
% 16.50/3.11 | | | | | | | | Case 1:
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | (200) all_4_102 = e12
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | REDUCE: (155), (200) imply:
% 16.50/3.11 | | | | | | | | | (201) op1(e12, e12) = all_4_104
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | GROUND_INST: instantiating (30) with e13, all_4_104, e12, e12,
% 16.50/3.11 | | | | | | | | | simplifying with (11), (201) gives:
% 16.50/3.11 | | | | | | | | | (202) all_4_104 = e13
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | REDUCE: (193), (202) imply:
% 16.50/3.11 | | | | | | | | | (203) $false
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | CLOSE: (203) is inconsistent.
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | Case 2:
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | (204) all_4_102 = e10 | all_4_102 = e11
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | BETA: splitting (199) gives:
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | | Case 1:
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | (205) all_4_109 = e20
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (198), (205) imply:
% 16.50/3.11 | | | | | | | | | | (206) ~ (e22 = e20)
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (59), (205) imply:
% 16.50/3.11 | | | | | | | | | | (207) j(e20) = e10
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | GROUND_INST: instantiating (28) with all_4_104, e10, e20,
% 16.50/3.11 | | | | | | | | | | simplifying with (57), (207) gives:
% 16.50/3.11 | | | | | | | | | | (208) all_4_104 = e10
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (174), (208) imply:
% 16.50/3.11 | | | | | | | | | | (209) ~ (e14 = e10)
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | SIMP: (209) implies:
% 16.50/3.11 | | | | | | | | | | (210) ~ (e14 = e10)
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (71), (208) imply:
% 16.50/3.11 | | | | | | | | | | (211) h(e10) = e20
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (155), (208) imply:
% 16.50/3.11 | | | | | | | | | | (212) op1(all_4_102, all_4_102) = e10
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | BETA: splitting (204) gives:
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | Case 1:
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | (213) all_4_102 = e10
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | REDUCE: (72), (213) imply:
% 16.50/3.11 | | | | | | | | | | | (214) h(e10) = e22
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | GROUND_INST: instantiating (29) with e20, e22, e10, simplifying
% 16.50/3.11 | | | | | | | | | | | with (211), (214) gives:
% 16.50/3.11 | | | | | | | | | | | (215) e22 = e20
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | REDUCE: (4), (215) imply:
% 16.50/3.11 | | | | | | | | | | | (216) $false
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | CLOSE: (216) is inconsistent.
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | Case 2:
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | (217) all_4_102 = e11
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | REDUCE: (212), (217) imply:
% 16.50/3.11 | | | | | | | | | | | (218) op1(e11, e11) = e10
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | GROUND_INST: instantiating (30) with e14, e10, e11, e11,
% 16.50/3.11 | | | | | | | | | | | simplifying with (7), (218) gives:
% 16.50/3.11 | | | | | | | | | | | (219) e14 = e10
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | REDUCE: (210), (219) imply:
% 16.50/3.11 | | | | | | | | | | | (220) $false
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | | CLOSE: (220) is inconsistent.
% 16.50/3.11 | | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | End of split
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | Case 2:
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | (221) all_4_109 = e21
% 16.50/3.11 | | | | | | | | | | (222) ~ (all_4_109 = e20)
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (221), (222) imply:
% 16.50/3.11 | | | | | | | | | | (223) ~ (e20 = e21)
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | SIMP: (223) implies:
% 16.50/3.11 | | | | | | | | | | (224) ~ (e20 = e21)
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (154), (221) imply:
% 16.50/3.11 | | | | | | | | | | (225) op2(e21, e21) = e21
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | GROUND_INST: instantiating (31) with e20, e21, e21, e21,
% 16.50/3.11 | | | | | | | | | | simplifying with (17), (225) gives:
% 16.50/3.11 | | | | | | | | | | (226) e20 = e21
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | REDUCE: (224), (226) imply:
% 16.50/3.11 | | | | | | | | | | (227) $false
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | | CLOSE: (227) is inconsistent.
% 16.50/3.11 | | | | | | | | | |
% 16.50/3.11 | | | | | | | | | End of split
% 16.50/3.11 | | | | | | | | |
% 16.50/3.11 | | | | | | | | End of split
% 16.50/3.11 | | | | | | | |
% 16.50/3.11 | | | | | | | End of split
% 16.50/3.11 | | | | | | |
% 16.50/3.11 | | | | | | End of split
% 16.50/3.11 | | | | | |
% 16.50/3.11 | | | | | End of split
% 16.50/3.11 | | | | |
% 16.50/3.11 | | | | End of split
% 16.50/3.11 | | | |
% 16.50/3.11 | | | End of split
% 16.50/3.11 | | |
% 16.50/3.11 | | End of split
% 16.50/3.11 | |
% 16.50/3.11 | End of split
% 16.50/3.11 |
% 16.50/3.11 End of proof
% 16.50/3.11 % SZS output end Proof for theBenchmark
% 16.50/3.11
% 16.50/3.11 2495ms
%------------------------------------------------------------------------------