| author | nipkow |
| Thu, 15 Mar 2001 13:57:10 +0100 | |
| changeset 11209 | a8cb33f6cf9c |
| parent 243 | c22b85994e17 |
| permissions | -rw-r--r-- |
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(* Title: HOLCF/void.ML |
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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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Lemmas for void.thy. |
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These lemmas are prototype lemmas for class porder |
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see class theory porder.thy |
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*) |
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open Void; |
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(* ------------------------------------------------------------------------ *) |
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(* A non-emptyness result for Void *) |
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(* ------------------------------------------------------------------------ *) |
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val VoidI = prove_goalw Void.thy [UU_void_Rep_def,Void_def] |
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" UU_void_Rep : Void" |
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(fn prems => |
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[ |
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(rtac (mem_Collect_eq RS ssubst) 1), |
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(rtac refl 1) |
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]); |
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(* ------------------------------------------------------------------------ *) |
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(* less_void is a partial ordering on void *) |
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(* ------------------------------------------------------------------------ *) |
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val refl_less_void = prove_goalw Void.thy [ less_void_def ] "less_void(x,x)" |
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(fn prems => |
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[ |
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(fast_tac HOL_cs 1) |
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]); |
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val antisym_less_void = prove_goalw Void.thy [ less_void_def ] |
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"[|less_void(x,y); less_void(y,x)|] ==> x = y" |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(rtac (Rep_Void_inverse RS subst) 1), |
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(etac subst 1), |
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(rtac (Rep_Void_inverse RS sym) 1) |
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]); |
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val trans_less_void = prove_goalw Void.thy [ less_void_def ] |
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"[|less_void(x,y); less_void(y,z)|] ==> less_void(x,z)" |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(fast_tac HOL_cs 1) |
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]); |
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(* ------------------------------------------------------------------------ *) |
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(* a technical lemma about void: *) |
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(* every element in void is represented by UU_void_Rep *) |
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(* ------------------------------------------------------------------------ *) |
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val unique_void = prove_goal Void.thy "Rep_Void(x) = UU_void_Rep" |
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(fn prems => |
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[ |
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(rtac (mem_Collect_eq RS subst) 1), |
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(fold_goals_tac [Void_def]), |
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(rtac Rep_Void 1) |
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]); |
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