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src/HOLCF/fix.thy
author wenzelm
Mon, 13 Mar 2000 13:21:39 +0100
changeset 8434 5e4bba59bfaa
parent 243 c22b85994e17
permissions -rw-r--r--
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c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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(*  Title: 	HOLCF/fix.thy
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    ID:         $Id$
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    Author: 	Franz Regensburger
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    Copyright   1993  Technische Universitaet Muenchen
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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definitions for fixed point operator and admissibility













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*)













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Fix = Cfun3 +













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consts













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iterate :: "nat=>('a->'a)=>'a=>'a"













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Ifix    :: "('a->'a)=>'a"













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fix     :: "('a->'a)->'a"













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adm          :: "('a=>bool)=>bool"













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admw         :: "('a=>bool)=>bool"













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chain_finite :: "'a=>bool"













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flat         :: "'a=>bool"













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rules













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iterate_def   "iterate(n,F,c) == nat_rec(n,c,%n x.F[x])"













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Ifix_def      "Ifix(F) == lub(range(%i.iterate(i,F,UU)))"













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fix_def       "fix == (LAM f. Ifix(f))"













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adm_def       "adm(P) == !Y. is_chain(Y) --> \













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\                        (!i.P(Y(i))) --> P(lub(range(Y)))"













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admw_def      "admw(P)== (!F.((!n.P(iterate(n,F,UU)))-->\













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\			 P(lub(range(%i.iterate(i,F,UU))))))" 













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chain_finite_def  "chain_finite(x::'a)==\













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\                        !Y. is_chain(Y::nat=>'a) --> (? n.max_in_chain(n,Y))"













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flat_def          "flat(x::'a) ==\













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\                        ! x y. x::'a << y --> (x = UU) | (x=y)"













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end













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isabelle