isabelle: src/HOL/Prolog/Type.thy@8ae6f7b0903b (annotated)

13208 965f95a3abd9 added the usual file headers oheimb parents: 12338 diff changeset	1	(* Title: HOL/Prolog/Type.thy
965f95a3abd9 added the usual file headers oheimb parents: 12338 diff changeset	2	ID: $Id$
965f95a3abd9 added the usual file headers oheimb parents: 12338 diff changeset	3	Author: David von Oheimb (based on a lecture on Lambda Prolog by Nadathur)
965f95a3abd9 added the usual file headers oheimb parents: 12338 diff changeset	4	*)
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	5
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	6	header {* Type inference *}
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	7
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	8	theory Type
5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	9	imports Func
5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	10	begin
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	11
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	12	typedecl ty
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	13
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	14	consts
5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	15	bool :: ty
5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	16	nat :: ty
21425 c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	17	arrow :: "ty => ty => ty" (infixr "->" 20)
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	18	typeof :: "[tm, ty] => bool"
5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	19	anyterm :: tm
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	20
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	21	axioms common_typeof: "
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	22	typeof (app M N) B :- typeof M (A -> B) & typeof N A..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	23
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	24	typeof (cond C L R) A :- typeof C bool & typeof L A & typeof R A..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	25	typeof (fix F) A :- (!x. typeof x A => typeof (F x) A)..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	26
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	27	typeof true bool..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	28	typeof false bool..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	29	typeof (M and N) bool :- typeof M bool & typeof N bool..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	30
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	31	typeof (M eq N) bool :- typeof M T & typeof N T ..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	32
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	33	typeof Z nat..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	34	typeof (S N) nat :- typeof N nat..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	35	typeof (M + N) nat :- typeof M nat & typeof N nat..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	36	typeof (M - N) nat :- typeof M nat & typeof N nat..
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	37	typeof (M * N) nat :- typeof M nat & typeof N nat"
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	38
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	39	axioms good_typeof: "
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	40	typeof (abs Bo) (A -> B) :- (!x. typeof x A => typeof (Bo x) B)"
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	41
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	42	axioms bad1_typeof: "
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	43	typeof (abs Bo) (A -> B) :- (typeof varterm A => typeof (Bo varterm) B)"
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	44
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	45	axioms bad2_typeof: "
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	46	typeof (abs Bo) (A -> B) :- (typeof anyterm A => typeof (Bo anyterm) B)"
8006e9009621 added HOL/Prolog oheimb parents: diff changeset	47
21425 c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	48
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	49	lemmas prog_Type = prog_Func good_typeof common_typeof
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	50
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	51	lemma "typeof (abs(%n. abs(%m. abs(%p. p and (n eq m))))) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	52	apply (prolog prog_Type)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	53	done
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	54
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	55	lemma "typeof (fix (%x. x)) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	56	apply (prolog prog_Type)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	57	done
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	58
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	59	lemma "typeof (fix (%fact. abs(%n. (app fact (n - Z))))) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	60	apply (prolog prog_Type)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	61	done
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	62
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	63	lemma "typeof (fix (%fact. abs(%n. cond (n eq Z) (S Z)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	64	(n * (app fact (n - (S Z))))))) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	65	apply (prolog prog_Type)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	66	done
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	67
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	68	lemma "typeof (abs(%v. Z)) ?T" (correct only solution (?A1 -> nat) )
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	69	apply (prolog prog_Type)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	70	done
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	71
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	72	lemma "typeof (abs(%v. Z)) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	73	apply (prolog bad1_typeof common_typeof) (* 1st result ok*)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	74	done
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	75
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	76	lemma "typeof (abs(%v. Z)) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	77	apply (prolog bad1_typeof common_typeof)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	78	back (* 2nd result (?A1 -> ?A1) wrong *)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	79	done
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	80
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	81	lemma "typeof (abs(%v. abs(%v. app v v))) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	82	apply (prolog prog_Type)? (correctly fails)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	83	oops
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	84
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	85	lemma "typeof (abs(%v. abs(%v. app v v))) ?T"
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	86	apply (prolog bad2_typeof common_typeof) (* wrong result ((?A3 -> ?B3) -> ?A3 -> ?B3)*)
c11ab38b78a7 HOL-Prolog: converted legacy ML scripts; wenzelm parents: 17311 diff changeset	87	done
17311 5b1d47d920ce converted to Isar theory format; wenzelm parents: 14981 diff changeset	88
9015 8006e9009621 added HOL/Prolog oheimb parents: diff changeset	89	end

author	huffman
	Mon, 11 Jun 2007 02:24:39 +0200
changeset 23305	8ae6f7b0903b
parent 21425	c11ab38b78a7
child 34974	18b41bba42b5
permissions	-rw-r--r--