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src/HOLCF/porder.thy
author wenzelm
Sun, 15 Oct 2000 19:50:35 +0200
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c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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(*  Title: 	HOLCF/porder.thy
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    ID:         $Id$
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    Author: 	Franz Regensburger
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    Copyright   1993 Technische Universitaet Muenchen
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Conservative extension of theory Porder0 by constant definitions 








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*)













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Porder = Porder0 +








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consts	








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	"<|"	::	"['a set,'a::po] => bool"	(infixl 55)













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	"<<|"	::	"['a set,'a::po] => bool"	(infixl 55)













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	lub	::	"'a set => 'a::po"













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	is_tord	::	"'a::po set => bool"













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	is_chain ::	"(nat=>'a::po) => bool"













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	max_in_chain :: "[nat,nat=>'a::po]=>bool"













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	finite_chain :: "(nat=>'a::po)=>bool"













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rules













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(* class definitions *)













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is_ub		"S  <| x == ! y.y:S --> y<<x"













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is_lub		"S <<| x == S <| x & (! u. S <| u  --> x << u)"













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lub		"lub(S) = (@x. S <<| x)"













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(* Arbitrary chains are total orders    *)                  













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is_tord		"is_tord(S) == ! x y. x:S & y:S --> (x<<y | y<<x)"













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(* Here we use countable chains and I prefer to code them as functions! *)













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is_chain	"is_chain(F) == (! i.F(i) << F(Suc(i)))"













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(* finite chains, needed for monotony of continouous functions *)













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max_in_chain_def "max_in_chain(i,C) == ! j. i <= j --> C(i) = C(j)" 













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finite_chain_def "finite_chain(C) == is_chain(C) & (? i. max_in_chain(i,C))"













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end 















isabelle