Old_HOL: intr_elim.ML@a9f7ff3a464c (annotated)

128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	1	(* Title: HOL/intr_elim.ML
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	2	ID: $Id$
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	4	Copyright 1994 University of Cambridge
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	5
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	6	Introduction/elimination rule module -- for Inductive/Coinductive Definitions
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	7	*)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	8
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	9	signature INDUCTIVE_ARG = ( Description of a (co)inductive def )
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	10	sig
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	11	val thy : theory (new theory with inductive defs)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	12	val monos : thm list (monotonicity of each M operator)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	13	val con_defs : thm list (definitions of the constructors)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	14	end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	15
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	16	(internal items)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	17	signature INDUCTIVE_I =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	18	sig
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	19	val rec_tms : term list (the recursive sets)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	20	val intr_tms : term list (terms for the introduction rules)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	21	end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	22
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	23	signature INTR_ELIM =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	24	sig
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	25	val thy : theory (copy of input theory)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	26	val defs : thm list (definitions made in thy)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	27	val mono : thm (monotonicity for the lfp definition)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	28	val unfold : thm (fixed-point equation)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	29	val intrs : thm list (introduction rules)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	30	val elim : thm (case analysis theorem)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	31	val raw_induct : thm (raw induction rule from Fp.induct)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	32	val mk_cases : thm list -> string -> thm (generates case theorems)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	33	val rec_names : string list (names of recursive sets)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	34	end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	35
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	36	(prove intr/elim rules for a fixedpoint definition)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	37	functor Intr_elim_Fun
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	38	(structure Inductive: sig include INDUCTIVE_ARG INDUCTIVE_I end
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	39	and Fp: FP) : INTR_ELIM =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	40	struct
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	41	open Logic Inductive Ind_Syntax;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	42
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	43	val rec_names = map (#1 o dest_Const o head_of) rec_tms;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	44	val big_rec_name = space_implode "_" rec_names;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	45
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	46	val _ = deny (big_rec_name mem map ! (stamps_of_thy thy))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	47	("Definition " ^ big_rec_name ^
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	48	" would clash with the theory of the same name!");
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	49
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	50	(fetch fp definitions from the theory)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	51	val big_rec_def::part_rec_defs =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	52	map (get_def thy)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	53	(case rec_names of [_] => rec_names \| _ => big_rec_name::rec_names);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	54
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	55
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	56	val sign = sign_of thy;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	57
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	58	(********)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	59	val _ = writeln " Proving monotonicity...";
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	60
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	61	val Const("==",_) $ _ $ (Const(_,fpT) $ fp_abs) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	62	big_rec_def \|> rep_thm \|> #prop \|> unvarify;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	63
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	64	(For the type of the argument of mono)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	65	val [monoT] = binder_types fpT;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	66
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	67	val mono =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	68	prove_goalw_cterm []
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	69	(cterm_of sign (mk_tprop (Const("mono", monoT-->boolT) $ fp_abs)))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	70	(fn _ =>
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	71	[rtac monoI 1,
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	72	REPEAT (ares_tac (basic_monos @ monos) 1)]);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	73
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	74	val unfold = standard (mono RS (big_rec_def RS Fp.Tarski));
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	75
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	76	(********)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	77	val _ = writeln " Proving the introduction rules...";
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	78
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	79	fun intro_tacsf disjIn prems =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	80	[(insert prems and underlying sets)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	81	cut_facts_tac prems 1,
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	82	rtac (unfold RS ssubst) 1,
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	83	REPEAT (resolve_tac [Part_eqI,CollectI] 1),
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	84	(Now 1-2 subgoals: the disjunction, perhaps equality.)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	85	rtac disjIn 1,
140 f745ff8bdb91 {HOL,ZF}/indrule/quant_induct: replaced ssubst in eresolve_tac by lcp parents: 133 diff changeset	86	(Not ares_tac, since refl must be tried before any equality assumptions)
f745ff8bdb91 {HOL,ZF}/indrule/quant_induct: replaced ssubst in eresolve_tac by lcp parents: 133 diff changeset	87	REPEAT (resolve_tac [refl,exI,conjI] 1 ORELSE assume_tac 1)];
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	88
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	89	(combines disjI1 and disjI2 to access the corresponding nested disjunct...)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	90	val mk_disj_rls =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	91	let fun f rl = rl RS disjI1
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	92	and g rl = rl RS disjI2
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	93	in accesses_bal(f, g, asm_rl) end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	94
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	95	val intrs = map (uncurry (prove_goalw_cterm part_rec_defs))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	96	(map (cterm_of sign) intr_tms ~~
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	97	map intro_tacsf (mk_disj_rls(length intr_tms)));
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	98
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	99	(********)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	100	val _ = writeln " Proving the elimination rule...";
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	101
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	102	(Includes rules for Suc and Pair since they are common constructions)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	103	val elim_rls = [asm_rl, FalseE, Suc_neq_Zero, Zero_neq_Suc,
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	104	make_elim Suc_inject,
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	105	refl_thin, conjE, exE, disjE];
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	106
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	107	(Breaks down logical connectives in the monotonic function)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	108	val basic_elim_tac =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	109	REPEAT (SOMEGOAL (eresolve_tac (elim_rls@sumprod_free_SEs)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	110	ORELSE' bound_hyp_subst_tac))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	111	THEN prune_params_tac;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	112
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	113	val elim = rule_by_tactic basic_elim_tac (unfold RS equals_CollectD);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	114
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	115	(Applies freeness of the given constructors, which must* be unfolded by
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	116	the given defs. Cannot simply use the local con_defs because con_defs=[]
133 4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	117	for inference systems.
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	118	fun con_elim_tac defs =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	119	rewrite_goals_tac defs THEN basic_elim_tac THEN fold_tac defs;
133 4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	120	*)
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	121	fun con_elim_tac simps =
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	122	let val elim_tac = REPEAT o (eresolve_tac (elim_rls@sumprod_free_SEs))
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	123	in ALLGOALS(EVERY'[elim_tac,
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	124	asm_full_simp_tac (nat_ss addsimps simps),
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	125	elim_tac,
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	126	REPEAT o bound_hyp_subst_tac])
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	127	THEN prune_params_tac
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	128	end;
4a2bb4fbc168 Added IMP, which necessiated changes in intr_elim.tex (mk_cases). nipkow parents: 128 diff changeset	129
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	130
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	131	(String s should have the form t:Si where Si is an inductive set)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	132	fun mk_cases defs s =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	133	rule_by_tactic (con_elim_tac defs)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	134	(assume_read thy s RS elim);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	135
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	136	val defs = big_rec_def::part_rec_defs;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	137
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	138	val raw_induct = standard ([big_rec_def, mono] MRS Fp.induct);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	139	end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	140

author	wenzelm
	Wed, 21 Sep 1994 15:40:41 +0200
changeset 145	a9f7ff3a464c
parent 140	f745ff8bdb91
child 152	7d8781fc2c8e
permissions	-rw-r--r--