| author | wenzelm |
| Sun, 29 Nov 1998 13:14:45 +0100 | |
| changeset 5986 | 6ebbc9e7cc20 |
| parent 243 | c22b85994e17 |
| permissions | -rw-r--r-- |
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(* Title: HOLCF/holcfb.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 Holcfb.thy |
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*) |
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open Holcfb; |
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(* ------------------------------------------------------------------------ *) |
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(* <::nat=>nat=>bool is well-founded *) |
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(* ------------------------------------------------------------------------ *) |
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val well_founded_nat = prove_goal Nat.thy |
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"!P. P(x::nat) --> (? y. P(y) & (! x. P(x) --> y <= x))" |
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(fn prems => |
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[ |
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(res_inst_tac [("n","x")] less_induct 1),
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(strip_tac 1), |
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(res_inst_tac [("Q","? k.k<n & P(k)")] (excluded_middle RS disjE) 1),
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(etac exE 2), |
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(etac conjE 2), |
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(rtac mp 2), |
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(etac allE 2), |
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(etac impE 2), |
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(atac 2), |
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(etac spec 2), |
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(atac 2), |
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(res_inst_tac [("x","n")] exI 1),
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(rtac conjI 1), |
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(atac 1), |
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(strip_tac 1), |
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(rtac leI 1), |
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(fast_tac HOL_cs 1) |
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]); |
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(* ------------------------------------------------------------------------ *) |
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(* Lemmas for selecting the least element in a nonempty set *) |
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(* ------------------------------------------------------------------------ *) |
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val theleast = prove_goalw Holcfb.thy [theleast_def] |
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"P(x) ==> P(theleast(P)) & (!x.P(x)--> theleast(P) <= x)" |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(rtac (well_founded_nat RS spec RS mp RS exE) 1), |
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(atac 1), |
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(rtac selectI 1), |
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(atac 1) |
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]); |
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val theleast1= theleast RS conjunct1; |
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(* ?P1(?x1) ==> ?P1(theleast(?P1)) *) |
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val theleast2 = prove_goal Holcfb.thy "P(x) ==> theleast(P) <= x" |
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(fn prems => |
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[ |
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(rtac (theleast RS conjunct2 RS spec RS mp) 1), |
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(resolve_tac prems 1), |
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(resolve_tac prems 1) |
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]); |
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(* ------------------------------------------------------------------------ *) |
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(* Some lemmas in HOL.thy *) |
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(* ------------------------------------------------------------------------ *) |
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val de_morgan1 = prove_goal HOL.thy "(~a & ~b)=(~(a | b))" |
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(fn prems => |
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[ |
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(rtac iffI 1), |
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(fast_tac HOL_cs 1), |
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(fast_tac HOL_cs 1) |
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]); |
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val de_morgan2 = prove_goal HOL.thy "(~a | ~b)=(~(a & b))" |
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(fn prems => |
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[ |
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(rtac iffI 1), |
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(fast_tac HOL_cs 1), |
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(fast_tac HOL_cs 1) |
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]); |
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val notall2ex = prove_goal HOL.thy "(~ (!x.P(x))) = (? x.~P(x))" |
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(fn prems => |
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[ |
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(rtac iffI 1), |
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(fast_tac HOL_cs 1), |
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(fast_tac HOL_cs 1) |
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]); |
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val notex2all = prove_goal HOL.thy "(~ (? x.P(x))) = (!x.~P(x))" |
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(fn prems => |
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[ |
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(rtac iffI 1), |
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(fast_tac HOL_cs 1), |
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(fast_tac HOL_cs 1) |
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]); |
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val selectI2 = prove_goal HOL.thy "(? x. P(x)) ==> P(@ x.P(x))" |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(etac exE 1), |
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(etac selectI 1) |
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]); |
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val selectE = prove_goal HOL.thy "P(@ x.P(x)) ==> (? x. P(x))" |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(etac exI 1) |
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]); |
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val select_eq_Ex = prove_goal HOL.thy "(P(@ x.P(x))) = (? x. P(x))" |
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(fn prems => |
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[ |
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(rtac (iff RS mp RS mp) 1), |
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(strip_tac 1), |
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(etac selectE 1), |
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(strip_tac 1), |
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(etac selectI2 1) |
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]); |
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129 |
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val notnotI = prove_goal HOL.thy "P ==> ~~P" |
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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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val classical2 = prove_goal HOL.thy "[|Q ==> R; ~Q ==> R|]==>R" |
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(fn prems => |
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[ |
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(rtac disjE 1), |
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(rtac excluded_middle 1), |
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(eresolve_tac prems 1), |
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(eresolve_tac prems 1) |
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]); |
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val classical3 = (notE RS notI); |
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(* [| ?P ==> ~ ?P1; ?P ==> ?P1 |] ==> ~ ?P *) |
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152 |