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(* Title: ZF/Constructible/MetaExists.thy
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ID: $Id$
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Author: Lawrence C Paulson, Cambridge University Computer Laboratory
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*)
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header{*The meta-existential quantifier*}
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theory MetaExists = Main:
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text{*Allows quantification over any term having sort @{text logic}. Used to
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quantify over classes. Yields a proposition rather than a FOL formula.*}
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constdefs
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ex :: "(('a::logic) => prop) => prop" (binder "?? " 0)
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"ex(P) == (!!Q. (!!x. PROP P(x) ==> PROP Q) ==> PROP Q)"
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syntax (xsymbols)
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"?? " :: "[idts, o] => o" ("(3\<Or>_./ _)" [0, 0] 0)
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lemma meta_exI: "PROP P(x) ==> (?? x. PROP P(x))"
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proof (unfold ex_def)
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assume P: "PROP P(x)"
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fix Q
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assume PQ: "\<And>x. PROP P(x) \<Longrightarrow> PROP Q"
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from P show "PROP Q" by (rule PQ)
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qed
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lemma meta_exE: "[| ?? x. PROP P(x); !!x. PROP P(x) ==> PROP R |] ==> PROP R"
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proof (unfold ex_def)
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assume QPQ: "\<And>Q. (\<And>x. PROP P(x) \<Longrightarrow> PROP Q) \<Longrightarrow> PROP Q"
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assume PR: "\<And>x. PROP P(x) \<Longrightarrow> PROP R"
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from PR show "PROP R" by (rule QPQ)
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qed
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end
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