0.02/0.11 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.02/0.12 % Command : parallel-twee %s --tstp --conditional-encoding if --smaller --drop-non-horn --give-up-on-saturation --explain-encoding --formal-proof 0.12/0.33 % Computer : n005.cluster.edu 0.12/0.33 % Model : x86_64 x86_64 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.12/0.33 % Memory : 8042.1875MB 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64 0.12/0.33 % CPULimit : 1200 0.12/0.33 % WCLimit : 120 0.12/0.33 % DateTime : Tue Jul 13 11:23:03 EDT 2021 0.12/0.33 % CPUTime : 96.55/12.51 % SZS status Theorem 96.55/12.51 96.55/12.52 % SZS output start Proof 96.55/12.52 Take the following subset of the input axioms: 96.55/12.52 fof(axiom_1, axiom, ?[Y24]: ![X19]: ((id(X19, Y24) & r1(X19)) | (~r1(X19) & ~id(X19, Y24)))). 96.55/12.52 fof(axiom_2a, axiom, ![X2, X9]: ?[Y2]: (?[Y3]: (?[Y14]: (r4(X2, Y14, Y3) & r2(X9, Y14)) & id(Y3, Y2)) & ?[Y6]: (r3(Y6, X2, Y2) & r4(X2, X9, Y6)))). 96.55/12.52 fof(axiom_4a, axiom, ![X4]: ?[Y9]: (?[Y16]: (r1(Y16) & r3(X4, Y16, Y9)) & id(Y9, X4))). 96.55/12.52 fof(axiom_5, axiom, ![X20]: id(X20, X20)). 96.55/12.52 fof(axiom_7a, axiom, ![X7, Y10]: (~r2(X7, Y10) | ![Y20]: (~id(Y20, Y10) | ~r1(Y20)))). 96.55/12.52 fof(axiom_9, axiom, ![X28, X29, X30, X31]: (~id(X29, X31) | ((r2(X28, X29) & r2(X30, X31)) | ((~r2(X28, X29) & ~r2(X30, X31)) | ~id(X28, X30))))). 96.55/12.52 fof(xplusyidthree, conjecture, ?[Y2, Y3, Y1]: (?[Y4]: (id(Y3, Y4) & ?[Y5]: (?[Y6]: (?[Y7]: (r1(Y7) & r2(Y7, Y6)) & r2(Y6, Y5)) & r2(Y5, Y4))) & r3(Y1, Y2, Y3))). 96.55/12.52 96.55/12.52 Now clausify the problem and encode Horn clauses using encoding 3 of 96.55/12.52 http://www.cse.chalmers.se/~nicsma/papers/horn.pdf. 96.55/12.52 We repeatedly replace C & s=t => u=v by the two clauses: 96.55/12.52 fresh(y, y, x1...xn) = u 96.55/12.52 C => fresh(s, t, x1...xn) = v 96.55/12.52 where fresh is a fresh function symbol and x1..xn are the free 96.55/12.52 variables of u and v. 96.55/12.52 A predicate p(X) is encoded as p(X)=true (this is sound, because the 96.55/12.52 input problem has no model of domain size 1). 96.55/12.52 96.55/12.52 The encoding turns the above axioms into the following unit equations and goals: 96.55/12.52 96.55/12.52 Axiom 1 (axiom_5): id(X, X) = true2. 96.55/12.52 Axiom 2 (axiom_4a_2): r1(y16(X)) = true2. 96.55/12.52 Axiom 3 (axiom_4a): id(y9(X), X) = true2. 96.55/12.52 Axiom 4 (axiom_1_1): fresh17(X, X, Y) = true2. 96.55/12.52 Axiom 5 (axiom_2a_4): r2(X, y14(Y, X)) = true2. 96.55/12.52 Axiom 6 (axiom_9_1): fresh32(X, X, Y, Z) = true2. 96.55/12.52 Axiom 7 (axiom_1_1): fresh17(r1(X), true2, X) = id(X, y24). 96.55/12.52 Axiom 8 (axiom_4a_1): r3(X, y16(X), y9(X)) = true2. 96.55/12.52 Axiom 9 (axiom_9_1): fresh(X, X, Y, Z, W) = r2(Y, Z). 96.55/12.52 Axiom 10 (axiom_9_1): fresh31(X, X, Y, Z, W, V) = fresh32(id(Y, W), true2, Y, Z). 96.55/12.52 Axiom 11 (axiom_9_1): fresh31(r2(X, Y), true2, Z, W, X, Y) = fresh(id(W, Y), true2, Z, W, X). 96.55/12.52 96.55/12.52 Goal 1 (xplusyidthree): tuple(id(X, Y), r3(Z, W, X), r2(V, Y), r2(U, V), r2(T, U), r1(T)) = tuple(true2, true2, true2, true2, true2, true2). 96.55/12.52 The goal is true when: 96.55/12.52 X = y9(y14(W, y14(Z, y14(Y, y24)))) 96.55/12.52 Y = y14(W, y14(Z, y14(Y, y24))) 96.55/12.52 Z = y14(W, y14(Z, y14(Y, y24))) 96.55/12.52 W = y16(y14(W, y14(Z, y14(Y, y24)))) 96.55/12.52 V = y14(Z, y14(Y, y24)) 96.55/12.52 U = y14(Y, y24) 96.55/12.52 T = y16(X) 96.55/12.52 96.55/12.52 Proof: 96.55/12.52 tuple(id(y9(y14(W, y14(Z, y14(Y, y24)))), y14(W, y14(Z, y14(Y, y24)))), r3(y14(W, y14(Z, y14(Y, y24))), y16(y14(W, y14(Z, y14(Y, y24)))), y9(y14(W, y14(Z, y14(Y, y24))))), r2(y14(Z, y14(Y, y24)), y14(W, y14(Z, y14(Y, y24)))), r2(y14(Y, y24), y14(Z, y14(Y, y24))), r2(y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 8 (axiom_4a_1) } 96.55/12.52 tuple(id(y9(y14(W, y14(Z, y14(Y, y24)))), y14(W, y14(Z, y14(Y, y24)))), true2, r2(y14(Z, y14(Y, y24)), y14(W, y14(Z, y14(Y, y24)))), r2(y14(Y, y24), y14(Z, y14(Y, y24))), r2(y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 3 (axiom_4a) } 96.55/12.52 tuple(true2, true2, r2(y14(Z, y14(Y, y24)), y14(W, y14(Z, y14(Y, y24)))), r2(y14(Y, y24), y14(Z, y14(Y, y24))), r2(y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 5 (axiom_2a_4) } 96.55/12.52 tuple(true2, true2, true2, r2(y14(Y, y24), y14(Z, y14(Y, y24))), r2(y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 5 (axiom_2a_4) } 96.55/12.52 tuple(true2, true2, true2, true2, r2(y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 9 (axiom_9_1) R->L } 96.55/12.52 tuple(true2, true2, true2, true2, fresh(true2, true2, y16(X), y14(Y, y24), y24), r1(y16(X))) 96.55/12.52 = { by axiom 1 (axiom_5) R->L } 96.55/12.52 tuple(true2, true2, true2, true2, fresh(id(y14(Y, y24), y14(Y, y24)), true2, y16(X), y14(Y, y24), y24), r1(y16(X))) 96.55/12.52 = { by axiom 11 (axiom_9_1) R->L } 96.55/12.52 tuple(true2, true2, true2, true2, fresh31(r2(y24, y14(Y, y24)), true2, y16(X), y14(Y, y24), y24, y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 5 (axiom_2a_4) } 96.55/12.52 tuple(true2, true2, true2, true2, fresh31(true2, true2, y16(X), y14(Y, y24), y24, y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 10 (axiom_9_1) } 96.55/12.52 tuple(true2, true2, true2, true2, fresh32(id(y16(X), y24), true2, y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 7 (axiom_1_1) R->L } 96.55/12.52 tuple(true2, true2, true2, true2, fresh32(fresh17(r1(y16(X)), true2, y16(X)), true2, y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 2 (axiom_4a_2) } 96.55/12.52 tuple(true2, true2, true2, true2, fresh32(fresh17(true2, true2, y16(X)), true2, y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 4 (axiom_1_1) } 96.55/12.52 tuple(true2, true2, true2, true2, fresh32(true2, true2, y16(X), y14(Y, y24)), r1(y16(X))) 96.55/12.52 = { by axiom 6 (axiom_9_1) } 96.55/12.52 tuple(true2, true2, true2, true2, true2, r1(y16(X))) 96.55/12.52 = { by axiom 2 (axiom_4a_2) } 96.55/12.52 tuple(true2, true2, true2, true2, true2, true2) 96.55/12.52 % SZS output end Proof 96.55/12.52 96.55/12.52 RESULT: Theorem (the conjecture is true). 96.55/12.54 EOF