| author | nipkow |
| Mon, 20 Jun 1994 12:03:16 +0200 | |
| changeset 430 | 89e1986125fe |
| parent 243 | c22b85994e17 |
| child 892 | d0dc8d057929 |
| permissions | -rw-r--r-- |
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(* Title: HOLCF/ccc1.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 ccc1.thy |
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*) |
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open ccc1; |
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(* ------------------------------------------------------------------------ *) |
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(* Access to definitions *) |
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(* ------------------------------------------------------------------------ *) |
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val ID1 = prove_goalw ccc1.thy [ID_def] "ID[x]=x" |
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(fn prems => |
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[ |
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(rtac (beta_cfun RS ssubst) 1), |
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(rtac contX_id 1), |
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(rtac refl 1) |
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]); |
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val cfcomp1 = prove_goalw ccc1.thy [oo_def] "(f oo g)=(LAM x.f[g[x]])" |
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(fn prems => |
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[ |
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(rtac (beta_cfun RS ssubst) 1), |
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(contX_tacR 1), |
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(rtac (beta_cfun RS ssubst) 1), |
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(contX_tacR 1), |
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(rtac refl 1) |
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]); |
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val cfcomp2 = prove_goal ccc1.thy "(f oo g)[x]=f[g[x]]" |
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(fn prems => |
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[ |
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(rtac (cfcomp1 RS ssubst) 1), |
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(rtac (beta_cfun RS ssubst) 1), |
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(contX_tacR 1), |
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(rtac refl 1) |
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]); |
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(* ------------------------------------------------------------------------ *) |
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(* Show that interpretation of (pcpo,_->_) is a ategory *) |
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(* The class of objects is interpretation of syntactical class pcpo *) |
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(* The class of arrows between objects 'a and 'b is interpret. of 'a -> 'b *) |
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(* The identity arrow is interpretation of ID *) |
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(* The composition of f and g is interpretation of oo *) |
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(* ------------------------------------------------------------------------ *) |
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val ID2 = prove_goal ccc1.thy "f oo ID = f " |
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(fn prems => |
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[ |
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(rtac ext_cfun 1), |
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(rtac (cfcomp2 RS ssubst) 1), |
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(rtac (ID1 RS ssubst) 1), |
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(rtac refl 1) |
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]); |
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val ID3 = prove_goal ccc1.thy "ID oo f = f " |
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(fn prems => |
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[ |
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(rtac ext_cfun 1), |
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(rtac (cfcomp2 RS ssubst) 1), |
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(rtac (ID1 RS ssubst) 1), |
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(rtac refl 1) |
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]); |
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val assoc_oo = prove_goal ccc1.thy "f oo (g oo h) = (f oo g) oo h" |
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(fn prems => |
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[ |
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(rtac ext_cfun 1), |
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(res_inst_tac [("s","f[g[h[x]]]")] trans 1),
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(rtac (cfcomp2 RS ssubst) 1), |
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(rtac (cfcomp2 RS ssubst) 1), |
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(rtac refl 1), |
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(rtac (cfcomp2 RS ssubst) 1), |
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(rtac (cfcomp2 RS ssubst) 1), |
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(rtac refl 1) |
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]); |
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(* ------------------------------------------------------------------------ *) |
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(* Merge the different rewrite rules for the simplifier *) |
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(* ------------------------------------------------------------------------ *) |
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val ccc1_ss = Cfun_ss addsimps Cprod_rews addsimps Sprod_rews addsimps |
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Ssum_rews addsimps lift_rews addsimps [ID1,ID2,ID3,cfcomp2]; |
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