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; Milawa - A Reflective Theorem Prover
; Copyright (C) 2005-2009 Kookamara LLC
;
; Contact:
;
; Kookamara LLC
; 11410 Windermere Meadows
; Austin, TX 78759, USA
; http://www.kookamara.com/
;
; License: (An MIT/X11-style license)
;
; Permission is hereby granted, free of charge, to any person obtaining a
; copy of this software and associated documentation files (the "Software"),
; to deal in the Software without restriction, including without limitation
; the rights to use, copy, modify, merge, publish, distribute, sublicense,
; and/or sell copies of the Software, and to permit persons to whom the
; Software is furnished to do so, subject to the following conditions:
;
; The above copyright notice and this permission notice shall be included in
; all copies or substantial portions of the Software.
;
; THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR
; IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
; FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE
; AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER
; LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING
; FROM, OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER
; DEALINGS IN THE SOFTWARE.
;
; Original author: Jared Davis <jared@kookamara.com>
(in-package "MILAWA")
(include-book "proofp")
(%interactive)
(%autoadmit logic.appeal-identity)
(%autoprove logic.appeal-identity-under-iff
(%enable default logic.appeal-identity))
(%autoprove logic.method-of-logic.appeal-identity
(%enable default logic.appeal-identity logic.method))
(%autoprove logic.conclusion-of-logic.appeal-identity
(%enable default logic.appeal-identity logic.conclusion))
(%autoprove logic.subproofs-of-logic.appeal-identity
(%enable default logic.appeal-identity logic.subproofs))
(%autoprove logic.extras-of-logic.appeal-identity
(%enable default logic.appeal-identity logic.extras))
(local (%disable default forcing-true-listp-of-logic.subproofs))
(%autoprove logic.axiom-okp-of-logic.appeal-identity
(%enable default logic.axiom-okp))
(%autoprove logic.theorem-okp-of-logic.appeal-identity
(%enable default logic.theorem-okp))
(%autoprove logic.propositional-schema-okp-of-logic.appeal-identity
(%enable default logic.propositional-schema-okp))
(%autoprove logic.functional-equality-okp-of-logic.appeal-identity
(%enable default logic.functional-equality-okp))
(%autoprove logic.expansion-okp-of-logic.appeal-identity
(%enable default logic.expansion-okp))
(%autoprove logic.contraction-okp-of-logic.appeal-identity
(%enable default logic.contraction-okp))
(%autoprove logic.associativity-okp-of-logic.appeal-identity
(%enable default logic.associativity-okp))
(%autoprove logic.cut-okp-of-logic.appeal-identity
(%enable default logic.cut-okp))
(%autoprove logic.instantiation-okp-of-logic.appeal-identity
(%enable default logic.instantiation-okp))
(%autoprove logic.beta-reduction-okp-of-logic.appeal-identity
(%enable default logic.beta-reduction-okp))
(%autoprove logic.induction-okp-of-logic.appeal-identity
(%enable default logic.induction-okp))
(%autoprove logic.base-eval-okp-of-logic.appeal-identity
(%enable default logic.base-eval-okp))
(%autoprove logic.appeal-step-okp-of-logic.appeal-identity
(%enable default logic.appeal-step-okp))
(%autoprove logic.appealp-of-logic.appeal-identity
(%restrict default definition-of-logic.appealp (equal x 'x))
(%enable default logic.appeal-identity))
(%autoprove logic.proofp-of-logic.appeal-identity
(%restrict default definition-of-logic.proofp (or (equal x '(logic.appeal-identity x))
(equal x 'x))))
(%ensure-exactly-these-rules-are-missing "../../logic/appeal-identity"
logic.skip-okp-of-logic.appeal-identity)
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