X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Fcontribs%2Fng_TPTP%2FGRP429-1.ma;fp=helm%2Fsoftware%2Fmatita%2Fcontribs%2Fng_TPTP%2FGRP429-1.ma;h=8c8aba52141c3e7542591b45f4a031b4b1d4b857;hb=11e495dda047bcdfa4267c06cad2d074fcffe3e3;hp=0000000000000000000000000000000000000000;hpb=b7587a7dd68463086e8a6b7c14f10c1dc33f64ba;p=helm.git diff --git a/helm/software/matita/contribs/ng_TPTP/GRP429-1.ma b/helm/software/matita/contribs/ng_TPTP/GRP429-1.ma new file mode 100644 index 000000000..8c8aba521 --- /dev/null +++ b/helm/software/matita/contribs/ng_TPTP/GRP429-1.ma @@ -0,0 +1,69 @@ +include "logic/equality.ma". + +(* Inclusion of: GRP429-1.p *) + +(* -------------------------------------------------------------------------- *) + +(* File : GRP429-1 : TPTP v3.2.0. Released v2.6.0. *) + +(* Domain : Group Theory *) + +(* Problem : Axiom for group theory, in product & inverse, part 3 *) + +(* Version : [McC93] (equality) axioms. *) + +(* English : *) + +(* Refs : [Neu81] Neumann (1981), Another Single Law for Groups *) + +(* : [McC93] McCune (1993), Single Axioms for Groups and Abelian Gr *) + +(* Source : [TPTP] *) + +(* Names : *) + +(* Status : Unsatisfiable *) + +(* Rating : 0.07 v3.2.0, 0.14 v3.1.0, 0.11 v2.7.0, 0.18 v2.6.0 *) + +(* Syntax : Number of clauses : 2 ( 0 non-Horn; 2 unit; 1 RR) *) + +(* Number of atoms : 2 ( 2 equality) *) + +(* Maximal clause size : 1 ( 1 average) *) + +(* Number of predicates : 1 ( 0 propositional; 2-2 arity) *) + +(* Number of functors : 5 ( 3 constant; 0-2 arity) *) + +(* Number of variables : 4 ( 0 singleton) *) + +(* Maximal term depth : 9 ( 4 average) *) + +(* Comments : A UEQ part of GRP057-1 *) + +(* -------------------------------------------------------------------------- *) +ntheorem prove_these_axioms_3: + ∀Univ:Type.∀A:Univ.∀B:Univ.∀C:Univ.∀D:Univ. +∀a3:Univ. +∀b3:Univ. +∀c3:Univ. +∀inverse:∀_:Univ.Univ. +∀multiply:∀_:Univ.∀_:Univ.Univ. +∀H0:∀A:Univ.∀B:Univ.∀C:Univ.∀D:Univ.eq Univ (multiply A (inverse (multiply (multiply (inverse (multiply (inverse B) (multiply (inverse A) C))) D) (inverse (multiply B D))))) C.eq Univ (multiply (multiply a3 b3) c3) (multiply a3 (multiply b3 c3)) +. +#Univ. +#A. +#B. +#C. +#D. +#a3. +#b3. +#c3. +#inverse. +#multiply. +#H0. +nauto by H0; +nqed. + +(* -------------------------------------------------------------------------- *)