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(* Title: CTT/rew.ML

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ID: $Id$

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Author: Lawrence C Paulson, Cambridge University Computer Laboratory

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Copyright 1991 University of Cambridge


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Simplifier for CTT, using Typedsimp.

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*)


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(*Make list of ProdE RS ProdE ... RS ProdE RS EqE


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for using assumptions as rewrite rules*)


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fun peEs 0 = []

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 peEs n = thm "EqE" :: map (curry (op RS) (thm "ProdE")) (peEs (n1));

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(*Tactic used for proving conditions for the cond_rls*)


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val prove_cond_tac = eresolve_tac (peEs 5);


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structure TSimp_data: TSIMP_DATA =


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struct

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val refl = thm "refl_elem"


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val sym = thm "sym_elem"


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val trans = thm "trans_elem"


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val refl_red = thm "refl_red"


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val trans_red = thm "trans_red"


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val red_if_equal = thm "red_if_equal"


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val default_rls = thms "comp_rls"


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val routine_tac = routine_tac (thms "routine_rls")

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end;


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structure TSimp = TSimpFun (TSimp_data);


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val standard_congr_rls = thms "intrL2_rls" @ thms "elimL_rls";

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(*Make a rewriting tactic from a normalization tactic*)


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fun make_rew_tac ntac =


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TRY eqintr_tac THEN TRYALL (resolve_tac [TSimp.split_eqn]) THEN


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ntac;


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fun rew_tac thms = make_rew_tac


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(TSimp.norm_tac(standard_congr_rls, thms));


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fun hyp_rew_tac thms = make_rew_tac


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(TSimp.cond_norm_tac(prove_cond_tac, standard_congr_rls, thms));
