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(* Title: HOL/UNITY/FP
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ID: $Id$
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Author: Lawrence C Paulson, Cambridge University Computer Laboratory
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Copyright 1998 University of Cambridge
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From Misra, "A Logic for Concurrent Programming", 1994
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*)
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header{*Fixed Point of a Program*}
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theory FP = UNITY:
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constdefs
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FP_Orig :: "'a program => 'a set"
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"FP_Orig F == Union{A. ALL B. F : stable (A Int B)}"
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FP :: "'a program => 'a set"
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"FP F == {s. F : stable {s}}"
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lemma stable_FP_Orig_Int: "F : stable (FP_Orig F Int B)"
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apply (unfold FP_Orig_def stable_def)
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apply (subst Int_Union2)
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apply (blast intro: constrains_UN)
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done
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lemma FP_Orig_weakest:
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"(!!B. F : stable (A Int B)) ==> A <= FP_Orig F"
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by (unfold FP_Orig_def stable_def, blast)
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lemma stable_FP_Int: "F : stable (FP F Int B)"
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apply (subgoal_tac "FP F Int B = (UN x:B. FP F Int {x}) ")
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prefer 2 apply blast
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apply (simp (no_asm_simp) add: Int_insert_right)
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apply (unfold FP_def stable_def)
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apply (rule constrains_UN)
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apply (simp (no_asm))
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done
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lemma FP_equivalence: "FP F = FP_Orig F"
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apply (rule equalityI)
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apply (rule stable_FP_Int [THEN FP_Orig_weakest])
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apply (unfold FP_Orig_def FP_def, clarify)
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apply (drule_tac x = "{x}" in spec)
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apply (simp add: Int_insert_right)
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done
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lemma FP_weakest:
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"(!!B. F : stable (A Int B)) ==> A <= FP F"
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by (simp add: FP_equivalence FP_Orig_weakest)
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lemma Compl_FP:
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"-(FP F) = (UN act: Acts F. -{s. act``{s} <= {s}})"
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by (simp add: FP_def stable_def constrains_def, blast)
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lemma Diff_FP: "A - (FP F) = (UN act: Acts F. A - {s. act``{s} <= {s}})"
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by (simp add: Diff_eq Compl_FP)
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end
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