Old_HOL: ind_syntax.ML@fcf8024c920d (annotated)

128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	1	(* Title: HOL/ind_syntax.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	Abstract Syntax functions for Inductive Definitions
187 fcf8024c920d minor changes according to new hologic; wenzelm parents: 182 diff changeset	7	See also hologic.ML and ../Pure/section-utils.ML
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	8	*)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	9
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	10	(*The structure protects these items from redeclaration (somewhat!). The
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	11	datatype definitions in theory files refer to these items by name!
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	12	*)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	13	structure Ind_Syntax =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	14	struct
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	15
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	16	( Abstract syntax definitions for HOL )
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	17
187 fcf8024c920d minor changes according to new hologic; wenzelm parents: 182 diff changeset	18	open HOLogic;
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	19
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	20	fun Int_const T =
187 fcf8024c920d minor changes according to new hologic; wenzelm parents: 182 diff changeset	21	let val sT = mk_setT T
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	22	in Const("op Int", [sT,sT]--->sT) end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	23
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	24	fun mk_exists (Free(x,T),P) = exists_const T $ (absfree (x,T,P));
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	25
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	26	fun mk_all (Free(x,T),P) = all_const T $ (absfree (x,T,P));
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	27
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	28	(Creates All(%v.v:A --> P(v)) rather than Ball(A,P) )
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	29	fun mk_all_imp (A,P) =
187 fcf8024c920d minor changes according to new hologic; wenzelm parents: 182 diff changeset	30	let val T = dest_setT (fastype_of A)
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	31	in all_const T $ Abs("v", T, imp $ (mk_mem (Bound 0, A)) $ (P $ Bound 0))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	32	end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	33
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	34	( Cartesian product type )
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	35
187 fcf8024c920d minor changes according to new hologic; wenzelm parents: 182 diff changeset	36	val unitT = Type("unit",[]);
fcf8024c920d minor changes according to new hologic; wenzelm parents: 182 diff changeset	37
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	38	fun mk_prod (T1,T2) = Type("*", [T1,T2]);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	39
134 4b7da5a895e7 HOL/ind_syntax/factors: now returns only factors in the product type that lcp parents: 128 diff changeset	40	(Maps the type T1...Tn to [T1,...,Tn], if nested to the right)
4b7da5a895e7 HOL/ind_syntax/factors: now returns only factors in the product type that lcp parents: 128 diff changeset	41	fun factors (Type("*", [T1,T2])) = T1 :: factors T2
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	42	\| factors T = [T];
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	43
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	44	(Make a correctly typed ordered pair)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	45	fun mk_Pair (t1,t2) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	46	let val T1 = fastype_of t1
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	47	and T2 = fastype_of t2
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	48	in Const("Pair", [T1, T2] ---> mk_prod(T1,T2)) $ t1 $ t2 end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	49
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	50	fun split_const(Ta,Tb,Tc) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	51	Const("split", [[Ta,Tb]--->Tc, mk_prod(Ta,Tb)] ---> Tc);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	52
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	53	(*Given u expecting arguments of types [T1,...,Tn], create term of
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	54	type T1...Tn => Tc using split. Here * associates to the LEFT*)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	55	fun ap_split_l Tc u [ ] = Abs("null", unitT, u)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	56	\| ap_split_l Tc u [_] = u
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	57	\| ap_split_l Tc u (Ta::Tb::Ts) = ap_split_l Tc (split_const(Ta,Tb,Tc) $ u)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	58	(mk_prod(Ta,Tb) :: Ts);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	59
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	60	(*Given u expecting arguments of types [T1,...,Tn], create term of
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	61	type T1...Tn => i using split. Here * associates to the RIGHT*)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	62	fun ap_split Tc u [ ] = Abs("null", unitT, u)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	63	\| ap_split Tc u [_] = u
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	64	\| ap_split Tc u [Ta,Tb] = split_const(Ta,Tb,Tc) $ u
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	65	\| ap_split Tc u (Ta::Ts) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	66	split_const(Ta, foldr1 mk_prod Ts, Tc) $
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	67	(Abs("v", Ta, ap_split Tc (u $ Bound(length Ts - 2)) Ts));
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	68
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	69	( Disjoint sum type )
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	70
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	71	fun mk_sum (T1,T2) = Type("+", [T1,T2]);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	72	val Inl = Const("Inl", dummyT)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	73	and Inr = Const("Inr", dummyT); (correct types added later!)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	74	(val elim = Const("case", [iT-->iT, iT-->iT, iT]--->iT))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	75
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	76	fun summands (Type("+", [T1,T2])) = summands T1 @ summands T2
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	77	\| summands T = [T];
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	78
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	79	(Given the destination type, fills in correct types of an Inl/Inr nest)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	80	fun mend_sum_types (h,T) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	81	(case (h,T) of
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	82	(Const("Inl",_) $ h1, Type("+", [T1,T2])) =>
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	83	Const("Inl", T1 --> T) $ (mend_sum_types (h1, T1))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	84	\| (Const("Inr",_) $ h2, Type("+", [T1,T2])) =>
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	85	Const("Inr", T2 --> T) $ (mend_sum_types (h2, T2))
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	86	\| _ => h);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	87
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	88
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	89
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	90	(simple error-checking in the premises of an inductive definition)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	91	fun chk_prem rec_hd (Const("op &",_) $ _ $ _) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	92	error"Premises may not be conjuctive"
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	93	\| chk_prem rec_hd (Const("op :",_) $ t $ X) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	94	deny (Logic.occs(rec_hd,t)) "Recursion term on left of member symbol"
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	95	\| chk_prem rec_hd t =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	96	deny (Logic.occs(rec_hd,t)) "Recursion term in side formula";
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	97
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	98	(Return the conclusion of a rule, of the form t:X)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	99	fun rule_concl rl =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	100	let val Const("Trueprop",_) $ (Const("op :",_) $ t $ X) =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	101	Logic.strip_imp_concl rl
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	102	in (t,X) end;
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	103
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	104	(As above, but return error message if bad)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	105	fun rule_concl_msg sign rl = rule_concl rl
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	106	handle Bind => error ("Ill-formed conclusion of introduction rule: " ^
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	107	Sign.string_of_term sign rl);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	108
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	109	(For simplifying the elimination rule)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	110	val sumprod_free_SEs =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	111	Pair_inject ::
182 d5c6d1fb236b removed Sum-rules nipkow parents: 134 diff changeset	112	map make_elim [(Inl_neq_Inr, Inr_neq_Inl, Inl_inject, Inr_inject)];
128 89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	113
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	114	(*For deriving cases rules.
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	115	read_instantiate replaces a propositional variable by a formula variable*)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	116	val equals_CollectD =
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	117	read_instantiate [("W","?Q")]
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	118	(make_elim (equalityD1 RS subsetD RS CollectD));
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	119
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	120	(Delete needless equality assumptions)
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	121	val refl_thin = prove_goal HOL.thy "!!P. [\| a=a; P \|] ==> P"
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	122	(fn _ => [assume_tac 1]);
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	123
89669c58e506 INSTALLATION OF INDUCTIVE DEFINITIONS lcp parents: diff changeset	124	end;

author	wenzelm
	Fri, 25 Nov 1994 16:24:18 +0100
changeset 187	fcf8024c920d
parent 182	d5c6d1fb236b
permissions	-rw-r--r--