isabelle: src/HOL/Product_Type.thy@4dff931b852f (annotated)

10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	1	(* Title: HOL/Product_Type.thy
01c2744a3786 * empty log message * nipkow parents: diff changeset	2	ID: $Id$
01c2744a3786 * empty log message * nipkow parents: diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
01c2744a3786 * empty log message * nipkow parents: diff changeset	4	Copyright 1992 University of Cambridge
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	5	*)
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	6
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	7	header {* Cartesian products *}
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	8
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	9	theory Product_Type = Fun
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	10	files ("Tools/split_rule.ML"):
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	11
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	12	subsection {* Unit *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	13
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	14	typedef unit = "{True}"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	15	proof
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	16	show "True : ?unit" by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	17	qed
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	18
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	19	constdefs
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	20	Unity :: unit ("'(')")
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	21	"() == Abs_unit True"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	22
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	23	lemma unit_eq: "u = ()"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	24	by (induct u) (simp add: unit_def Unity_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	25
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	26	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	27	Simplification procedure for @{thm [source] unit_eq}. Cannot use
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	28	this rule directly --- it loops!
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	29	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	30
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	31	ML_setup {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	32	local
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	33	val unit_pat = Thm.cterm_of (Theory.sign_of (the_context ())) (Free ("x", HOLogic.unitT));
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	34	val unit_meta_eq = standard (mk_meta_eq (thm "unit_eq"));
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	35	fun proc _ _ t =
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	36	if HOLogic.is_unit t then None
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	37	else Some unit_meta_eq
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	38	in val unit_eq_proc = Simplifier.mk_simproc "unit_eq" [unit_pat] proc end;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	39
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	40	Addsimprocs [unit_eq_proc];
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	41	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	42
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	43	lemma unit_all_eq1: "(!!x::unit. PROP P x) == PROP P ()"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	44	by simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	45
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	46	lemma unit_all_eq2: "(!!x::unit. PROP P) == PROP P"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	47	by (rule triv_forall_equality)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	48
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	49	lemma unit_induct [induct type: unit]: "P () ==> P x"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	50	by simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	51
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	52	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	53	This rewrite counters the effect of @{text unit_eq_proc} on @{term
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	54	[source] "%u::unit. f u"}, replacing it by @{term [source]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	55	f} rather than by @{term [source] "%u. f ()"}.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	56	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	57
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	58	lemma unit_abs_eta_conv [simp]: "(%u::unit. f ()) = f"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	59	by (rule ext) simp
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	60
01c2744a3786 * empty log message * nipkow parents: diff changeset	61
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	62	subsection {* Pairs *}
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	63
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	64	subsubsection {* Type definition *}
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	65
01c2744a3786 * empty log message * nipkow parents: diff changeset	66	constdefs
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	67	Pair_Rep :: "['a, 'b] => ['a, 'b] => bool"
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	68	"Pair_Rep == (%a b. %x y. x=a & y=b)"
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	69
01c2744a3786 * empty log message * nipkow parents: diff changeset	70	global
01c2744a3786 * empty log message * nipkow parents: diff changeset	71
01c2744a3786 * empty log message * nipkow parents: diff changeset	72	typedef (Prod)
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	73	('a, 'b) "*" (infixr 20)
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	74	= "{f. EX a b. f = Pair_Rep (a::'a) (b::'b)}"
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	75	proof
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	76	fix a b show "Pair_Rep a b : ?Prod"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	77	by blast
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	78	qed
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	79
12114 a8e860c86252 eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 11966 diff changeset	80	syntax (xsymbols)
11493 f3ff2549cdc8 added pair_imageI (also as intro rule) oheimb parents: 11451 diff changeset	81	"*" :: "[type, type] => type" ("(_ \<times>/ _)" [21, 20] 20)
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	82	syntax (HTML output)
11493 f3ff2549cdc8 added pair_imageI (also as intro rule) oheimb parents: 11451 diff changeset	83	"*" :: "[type, type] => type" ("(_ \<times>/ _)" [21, 20] 20)
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	84
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	85	local
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	86
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	87
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	88	subsubsection {* Abstract constants and syntax *}
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	89
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	90	global
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	91
01c2744a3786 * empty log message * nipkow parents: diff changeset	92	consts
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	93	fst :: "'a * 'b => 'a"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	94	snd :: "'a * 'b => 'b"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	95	split :: "[['a, 'b] => 'c, 'a * 'b] => 'c"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	96	prod_fun :: "['a => 'b, 'c => 'd, 'a * 'c] => 'b * 'd"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	97	Pair :: "['a, 'b] => 'a * 'b"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	98	Sigma :: "['a set, 'a => 'b set] => ('a * 'b) set"
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	99
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	100	local
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	101
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	102	text {*
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	103	Patterns -- extends pre-defined type @{typ pttrn} used in
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	104	abstractions.
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	105	*}
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	106
01c2744a3786 * empty log message * nipkow parents: diff changeset	107	nonterminals
01c2744a3786 * empty log message * nipkow parents: diff changeset	108	tuple_args patterns
01c2744a3786 * empty log message * nipkow parents: diff changeset	109
01c2744a3786 * empty log message * nipkow parents: diff changeset	110	syntax
01c2744a3786 * empty log message * nipkow parents: diff changeset	111	"_tuple" :: "'a => tuple_args => 'a * 'b" ("(1'(_,/ _'))")
01c2744a3786 * empty log message * nipkow parents: diff changeset	112	"_tuple_arg" :: "'a => tuple_args" ("_")
01c2744a3786 * empty log message * nipkow parents: diff changeset	113	"_tuple_args" :: "'a => tuple_args => tuple_args" ("_,/ _")
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	114	"_pattern" :: "[pttrn, patterns] => pttrn" ("'(_,/ _')")
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	115	"" :: "pttrn => patterns" ("_")
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	116	"_patterns" :: "[pttrn, patterns] => patterns" ("_,/ _")
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	117	"@Sigma" ::"[pttrn, 'a set, 'b set] => ('a * 'b) set" ("(3SIGMA _:_./ _)" 10)
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	118	"@Times" ::"['a set, 'a => 'b set] => ('a * 'b) set" (infixr "<*>" 80)
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	119
01c2744a3786 * empty log message * nipkow parents: diff changeset	120	translations
01c2744a3786 * empty log message * nipkow parents: diff changeset	121	"(x, y)" == "Pair x y"
01c2744a3786 * empty log message * nipkow parents: diff changeset	122	"_tuple x (_tuple_args y z)" == "_tuple x (_tuple_arg (_tuple y z))"
01c2744a3786 * empty log message * nipkow parents: diff changeset	123	"%(x,y,zs).b" == "split(%x (y,zs).b)"
01c2744a3786 * empty log message * nipkow parents: diff changeset	124	"%(x,y).b" == "split(%x y. b)"
01c2744a3786 * empty log message * nipkow parents: diff changeset	125	"_abs (Pair x y) t" => "%(x,y).t"
01c2744a3786 * empty log message * nipkow parents: diff changeset	126	(* The last rule accommodates tuples in `case C ... (x,y) ... => ...'
01c2744a3786 * empty log message * nipkow parents: diff changeset	127	The (x,y) is parsed as `Pair x y' because it is logic, not pttrn *)
01c2744a3786 * empty log message * nipkow parents: diff changeset	128
01c2744a3786 * empty log message * nipkow parents: diff changeset	129	"SIGMA x:A. B" => "Sigma A (%x. B)"
01c2744a3786 * empty log message * nipkow parents: diff changeset	130	"A <*> B" => "Sigma A (_K B)"
01c2744a3786 * empty log message * nipkow parents: diff changeset	131
12114 a8e860c86252 eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 11966 diff changeset	132	syntax (xsymbols)
11493 f3ff2549cdc8 added pair_imageI (also as intro rule) oheimb parents: 11451 diff changeset	133	"@Sigma" :: "[pttrn, 'a set, 'b set] => ('a * 'b) set" ("(3\<Sigma> _\<in>_./ _)" 10)
f3ff2549cdc8 added pair_imageI (also as intro rule) oheimb parents: 11451 diff changeset	134	"@Times" :: "['a set, 'a => 'b set] => ('a * 'b) set" ("_ \<times> _" [81, 80] 80)
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	135
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	136	print_translation {* [("Sigma", dependent_tr' ("@Sigma", "@Times"))] *}
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	137
01c2744a3786 * empty log message * nipkow parents: diff changeset	138
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	139	subsubsection {* Definitions *}
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	140
01c2744a3786 * empty log message * nipkow parents: diff changeset	141	defs
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	142	Pair_def: "Pair a b == Abs_Prod(Pair_Rep a b)"
11451 8abfb4f7bd02 partial restructuring to reduce dependence on Axiom of Choice paulson parents: 11425 diff changeset	143	fst_def: "fst p == THE a. EX b. p = (a, b)"
8abfb4f7bd02 partial restructuring to reduce dependence on Axiom of Choice paulson parents: 11425 diff changeset	144	snd_def: "snd p == THE b. EX a. p = (a, b)"
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	145	split_def: "split == (%c p. c (fst p) (snd p))"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	146	prod_fun_def: "prod_fun f g == split(%x y.(f(x), g(y)))"
a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	147	Sigma_def: "Sigma A B == UN x:A. UN y:B(x). {(x, y)}"
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	148
01c2744a3786 * empty log message * nipkow parents: diff changeset	149
11966 8fe2ee787608 tuned; wenzelm parents: 11838 diff changeset	150	subsubsection {* Lemmas and proof tool setup *}
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	151
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	152	lemma ProdI: "Pair_Rep a b : Prod"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	153	by (unfold Prod_def) blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	154
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	155	lemma Pair_Rep_inject: "Pair_Rep a b = Pair_Rep a' b' ==> a = a' & b = b'"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	156	apply (unfold Pair_Rep_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	157	apply (drule fun_cong [THEN fun_cong])
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	158	apply blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	159	done
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	160
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	161	lemma inj_on_Abs_Prod: "inj_on Abs_Prod Prod"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	162	apply (rule inj_on_inverseI)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	163	apply (erule Abs_Prod_inverse)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	164	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	165
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	166	lemma Pair_inject:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	167	"(a, b) = (a', b') ==> (a = a' ==> b = b' ==> R) ==> R"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	168	proof -
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	169	case rule_context [unfolded Pair_def]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	170	show ?thesis
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	171	apply (rule inj_on_Abs_Prod [THEN inj_onD, THEN Pair_Rep_inject, THEN conjE])
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	172	apply (rule rule_context ProdI)+
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	173	.
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	174	qed
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	175
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	176	lemma Pair_eq [iff]: "((a, b) = (a', b')) = (a = a' & b = b')"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	177	by (blast elim!: Pair_inject)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	178
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	179	lemma fst_conv [simp]: "fst (a, b) = a"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	180	by (unfold fst_def) blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	181
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	182	lemma snd_conv [simp]: "snd (a, b) = b"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	183	by (unfold snd_def) blast
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	184
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	185	lemma fst_eqD: "fst (x, y) = a ==> x = a"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	186	by simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	187
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	188	lemma snd_eqD: "snd (x, y) = a ==> y = a"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	189	by simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	190
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	191	lemma PairE_lemma: "EX x y. p = (x, y)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	192	apply (unfold Pair_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	193	apply (rule Rep_Prod [unfolded Prod_def, THEN CollectE])
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	194	apply (erule exE, erule exE, rule exI, rule exI)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	195	apply (rule Rep_Prod_inverse [symmetric, THEN trans])
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	196	apply (erule arg_cong)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	197	done
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	198
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	199	lemma PairE [cases type: *]: "(!!x y. p = (x, y) ==> Q) ==> Q"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	200	by (insert PairE_lemma [of p]) blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	201
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	202	ML_setup {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	203	local val PairE = thm "PairE" in
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	204	fun pair_tac s =
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	205	EVERY' [res_inst_tac [("p", s)] PairE, hyp_subst_tac, K prune_params_tac];
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	206	end;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	207	*}
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	208
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	209	lemma surjective_pairing: "p = (fst p, snd p)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	210	-- {* Do not add as rewrite rule: invalidates some proofs in IMP *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	211	by (cases p) simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	212
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	213	declare surjective_pairing [symmetric, simp]
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	214
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	215	lemma surj_pair [simp]: "EX x y. z = (x, y)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	216	apply (rule exI)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	217	apply (rule exI)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	218	apply (rule surjective_pairing)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	219	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	220
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	221	lemma split_paired_all: "(!!x. PROP P x) == (!!a b. PROP P (a, b))"
11820 015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	222	proof
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	223	fix a b
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	224	assume "!!x. PROP P x"
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	225	thus "PROP P (a, b)" .
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	226	next
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	227	fix x
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	228	assume "!!a b. PROP P (a, b)"
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	229	hence "PROP P (fst x, snd x)" .
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	230	thus "PROP P x" by simp
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	231	qed
015a82d4ee96 proper proof of split_paired_all (presently unused); wenzelm parents: 11777 diff changeset	232
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	233	lemmas split_tupled_all = split_paired_all unit_all_eq2
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	234
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	235	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	236	The rule @{thm [source] split_paired_all} does not work with the
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	237	Simplifier because it also affects premises in congrence rules,
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	238	where this can lead to premises of the form @{text "!!a b. ... =
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	239	?P(a, b)"} which cannot be solved by reflexivity.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	240	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	241
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	242	ML_setup "
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	243	(* replace parameters of product type by individual component parameters *)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	244	val safe_full_simp_tac = generic_simp_tac true (true, false, false);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	245	local (* filtering with exists_paired_all is an essential optimization *)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	246	fun exists_paired_all (Const (\"all\", _) $ Abs (_, T, t)) =
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	247	can HOLogic.dest_prodT T orelse exists_paired_all t
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	248	\| exists_paired_all (t $ u) = exists_paired_all t orelse exists_paired_all u
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	249	\| exists_paired_all (Abs (_, _, t)) = exists_paired_all t
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	250	\| exists_paired_all _ = false;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	251	val ss = HOL_basic_ss
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	252	addsimps [thm \"split_paired_all\", thm \"unit_all_eq2\", thm \"unit_abs_eta_conv\"]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	253	addsimprocs [unit_eq_proc];
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	254	in
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	255	val split_all_tac = SUBGOAL (fn (t, i) =>
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	256	if exists_paired_all t then safe_full_simp_tac ss i else no_tac);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	257	val unsafe_split_all_tac = SUBGOAL (fn (t, i) =>
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	258	if exists_paired_all t then full_simp_tac ss i else no_tac);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	259	fun split_all th =
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	260	if exists_paired_all (#prop (Thm.rep_thm th)) then full_simplify ss th else th;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	261	end;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	262
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	263	claset_ref() := claset() addSbefore (\"split_all_tac\", split_all_tac);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	264	"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	265
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	266	lemma split_paired_All [simp]: "(ALL x. P x) = (ALL a b. P (a, b))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	267	-- {* @{text "[iff]"} is not a good idea because it makes @{text blast} loop *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	268	by fast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	269
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	270	lemma prod_induct [induct type: *]: "!!x. (!!a b. P (a, b)) ==> P x"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	271	by fast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	272
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	273	lemma split_paired_Ex [simp]: "(EX x. P x) = (EX a b. P (a, b))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	274	by fast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	275
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	276	lemma split_conv [simp]: "split c (a, b) = c a b"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	277	by (simp add: split_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	278
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	279	lemmas split = split_conv -- {* for backwards compatibility *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	280
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	281	lemmas splitI = split_conv [THEN iffD2, standard]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	282	lemmas splitD = split_conv [THEN iffD1, standard]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	283
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	284	lemma split_Pair_apply: "split (%x y. f (x, y)) = f"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	285	-- {* Subsumes the old @{text split_Pair} when @{term f} is the identity function. *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	286	apply (rule ext)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	287	apply (tactic {* pair_tac "x" 1 *})
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	288	apply simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	289	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	290
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	291	lemma split_paired_The: "(THE x. P x) = (THE (a, b). P (a, b))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	292	-- {* Can't be added to simpset: loops! *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	293	by (simp add: split_Pair_apply)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	294
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	295	lemma The_split: "The (split P) = (THE xy. P (fst xy) (snd xy))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	296	by (simp add: split_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	297
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	298	lemma Pair_fst_snd_eq: "!!s t. (s = t) = (fst s = fst t & snd s = snd t)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	299	apply (simp only: split_tupled_all)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	300	apply simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	301	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	302
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	303	lemma prod_eqI [intro?]: "fst p = fst q ==> snd p = snd q ==> p = q"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	304	by (simp add: Pair_fst_snd_eq)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	305
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	306	lemma split_weak_cong: "p = q ==> split c p = split c q"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	307	-- {* Prevents simplification of @{term c}: much faster *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	308	by (erule arg_cong)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	309
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	310	lemma split_eta: "(%(x, y). f (x, y)) = f"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	311	apply (rule ext)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	312	apply (simp only: split_tupled_all)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	313	apply (rule split_conv)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	314	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	315
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	316	lemma cond_split_eta: "(!!x y. f x y = g (x, y)) ==> (%(x, y). f x y) = g"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	317	by (simp add: split_eta)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	318
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	319	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	320	Simplification procedure for @{thm [source] cond_split_eta}. Using
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	321	@{thm [source] split_eta} as a rewrite rule is not general enough,
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	322	and using @{thm [source] cond_split_eta} directly would render some
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	323	existing proofs very inefficient; similarly for @{text
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	324	split_beta}. *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	325
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	326	ML_setup {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	327
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	328	local
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	329	val cond_split_eta = thm "cond_split_eta";
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	330	fun Pair_pat k 0 (Bound m) = (m = k)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	331	\| Pair_pat k i (Const ("Pair", _) $ Bound m $ t) = i > 0 andalso
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	332	m = k+i andalso Pair_pat k (i-1) t
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	333	\| Pair_pat _ _ _ = false;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	334	fun no_args k i (Abs (_, _, t)) = no_args (k+1) i t
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	335	\| no_args k i (t $ u) = no_args k i t andalso no_args k i u
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	336	\| no_args k i (Bound m) = m < k orelse m > k+i
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	337	\| no_args _ _ _ = true;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	338	fun split_pat tp i (Abs (_,_,t)) = if tp 0 i t then Some (i,t) else None
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	339	\| split_pat tp i (Const ("split", _) $ Abs (_, _, t)) = split_pat tp (i+1) t
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	340	\| split_pat tp i _ = None;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	341	fun metaeq sg lhs rhs = mk_meta_eq (prove_goalw_cterm []
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	342	(cterm_of sg (HOLogic.mk_Trueprop (HOLogic.mk_eq (lhs,rhs))))
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	343	(K [simp_tac (HOL_basic_ss addsimps [cond_split_eta]) 1]));
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	344	val sign = sign_of (the_context ());
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	345	fun simproc name patstr = Simplifier.mk_simproc name
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	346	[Thm.read_cterm sign (patstr, HOLogic.termT)];
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	347
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	348	val beta_patstr = "split f z";
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	349	val eta_patstr = "split f";
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	350	fun beta_term_pat k i (Abs (_, _, t)) = beta_term_pat (k+1) i t
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	351	\| beta_term_pat k i (t $ u) = Pair_pat k i (t $ u) orelse
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	352	(beta_term_pat k i t andalso beta_term_pat k i u)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	353	\| beta_term_pat k i t = no_args k i t;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	354	fun eta_term_pat k i (f $ arg) = no_args k i f andalso Pair_pat k i arg
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	355	\| eta_term_pat _ _ _ = false;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	356	fun subst arg k i (Abs (x, T, t)) = Abs (x, T, subst arg (k+1) i t)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	357	\| subst arg k i (t $ u) = if Pair_pat k i (t $ u) then incr_boundvars k arg
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	358	else (subst arg k i t $ subst arg k i u)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	359	\| subst arg k i t = t;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	360	fun beta_proc sg _ (s as Const ("split", _) $ Abs (_, _, t) $ arg) =
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	361	(case split_pat beta_term_pat 1 t of
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	362	Some (i,f) => Some (metaeq sg s (subst arg 0 i f))
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	363	\| None => None)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	364	\| beta_proc _ _ _ = None;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	365	fun eta_proc sg _ (s as Const ("split", _) $ Abs (_, _, t)) =
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	366	(case split_pat eta_term_pat 1 t of
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	367	Some (_,ft) => Some (metaeq sg s (let val (f $ arg) = ft in f end))
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	368	\| None => None)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	369	\| eta_proc _ _ _ = None;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	370	in
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	371	val split_beta_proc = simproc "split_beta" beta_patstr beta_proc;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	372	val split_eta_proc = simproc "split_eta" eta_patstr eta_proc;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	373	end;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	374
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	375	Addsimprocs [split_beta_proc, split_eta_proc];
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	376	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	377
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	378	lemma split_beta: "(%(x, y). P x y) z = P (fst z) (snd z)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	379	by (subst surjective_pairing, rule split_conv)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	380
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	381	lemma split_split: "R (split c p) = (ALL x y. p = (x, y) --> R (c x y))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	382	-- {* For use with @{text split} and the Simplifier. *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	383	apply (subst surjective_pairing)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	384	apply (subst split_conv)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	385	apply blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	386	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	387
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	388	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	389	@{thm [source] split_split} could be declared as @{text "[split]"}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	390	done after the Splitter has been speeded up significantly;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	391	precompute the constants involved and don't do anything unless the
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	392	current goal contains one of those constants.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	393	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	394
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	395	lemma split_split_asm: "R (split c p) = (~(EX x y. p = (x, y) & (~R (c x y))))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	396	apply (subst split_split)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	397	apply simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	398	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	399
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	400
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	401	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	402	\medskip @{term split} used as a logical connective or set former.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	403
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	404	\medskip These rules are for use with @{text blast}; could instead
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	405	call @{text simp} using @{thm [source] split} as rewrite. *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	406
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	407	lemma splitI2: "!!p. [\| !!a b. p = (a, b) ==> c a b \|] ==> split c p"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	408	apply (simp only: split_tupled_all)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	409	apply (simp (no_asm_simp))
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	410	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	411
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	412	lemma splitI2': "!!p. [\| !!a b. (a, b) = p ==> c a b x \|] ==> split c p x"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	413	apply (simp only: split_tupled_all)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	414	apply (simp (no_asm_simp))
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	415	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	416
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	417	lemma splitE: "split c p ==> (!!x y. p = (x, y) ==> c x y ==> Q) ==> Q"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	418	by (induct p) (auto simp add: split_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	419
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	420	lemma splitE': "split c p z ==> (!!x y. p = (x, y) ==> c x y z ==> Q) ==> Q"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	421	by (induct p) (auto simp add: split_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	422
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	423	lemma splitE2:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	424	"[\| Q (split P z); !!x y. [\|z = (x, y); Q (P x y)\|] ==> R \|] ==> R"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	425	proof -
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	426	assume q: "Q (split P z)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	427	assume r: "!!x y. [\|z = (x, y); Q (P x y)\|] ==> R"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	428	show R
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	429	apply (rule r surjective_pairing)+
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	430	apply (rule split_beta [THEN subst], rule q)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	431	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	432	qed
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	433
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	434	lemma splitD': "split R (a,b) c ==> R a b c"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	435	by simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	436
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	437	lemma mem_splitI: "z: c a b ==> z: split c (a, b)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	438	by simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	439
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	440	lemma mem_splitI2: "!!p. [\| !!a b. p = (a, b) ==> z: c a b \|] ==> z: split c p"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	441	apply (simp only: split_tupled_all)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	442	apply simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	443	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	444
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	445	lemma mem_splitE: "[\| z: split c p; !!x y. [\| p = (x,y); z: c x y \|] ==> Q \|] ==> Q"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	446	proof -
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	447	case rule_context [unfolded split_def]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	448	show ?thesis by (rule rule_context surjective_pairing)+
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	449	qed
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	450
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	451	declare mem_splitI2 [intro!] mem_splitI [intro!] splitI2' [intro!] splitI2 [intro!] splitI [intro!]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	452	declare mem_splitE [elim!] splitE' [elim!] splitE [elim!]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	453
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	454	ML_setup "
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	455	local (* filtering with exists_p_split is an essential optimization *)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	456	fun exists_p_split (Const (\"split\",_) $ _ $ (Const (\"Pair\",_)$_$_)) = true
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	457	\| exists_p_split (t $ u) = exists_p_split t orelse exists_p_split u
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	458	\| exists_p_split (Abs (_, _, t)) = exists_p_split t
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	459	\| exists_p_split _ = false;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	460	val ss = HOL_basic_ss addsimps [thm \"split_conv\"];
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	461	in
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	462	val split_conv_tac = SUBGOAL (fn (t, i) =>
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	463	if exists_p_split t then safe_full_simp_tac ss i else no_tac);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	464	end;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	465	(* This prevents applications of splitE for already splitted arguments leading
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	466	to quite time-consuming computations (in particular for nested tuples) *)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	467	claset_ref() := claset() addSbefore (\"split_conv_tac\", split_conv_tac);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	468	"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	469
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	470	lemma split_eta_SetCompr [simp]: "(%u. EX x y. u = (x, y) & P (x, y)) = P"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	471	apply (rule ext)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	472	apply fast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	473	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	474
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	475	lemma split_eta_SetCompr2 [simp]: "(%u. EX x y. u = (x, y) & P x y) = split P"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	476	apply (rule ext)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	477	apply fast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	478	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	479
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	480	lemma split_part [simp]: "(%(a,b). P & Q a b) = (%ab. P & split Q ab)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	481	-- {* Allows simplifications of nested splits in case of independent predicates. *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	482	apply (rule ext)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	483	apply blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	484	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	485
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	486	lemma The_split_eq [simp]: "(THE (x',y'). x = x' & y = y') = (x, y)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	487	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	488
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	489	(*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	490	the following would be slightly more general,
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	491	but cannot be used as rewrite rule:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	492	### Cannot add premise as rewrite rule because it contains (type) unknowns:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	493	### ?y = .x
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	494	Goal "[\| P y; !!x. P x ==> x = y \|] ==> (@(x',y). x = x' & P y) = (x,y)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	495	by (rtac some_equality 1);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	496	by ( Simp_tac 1);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	497	by (split_all_tac 1);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	498	by (Asm_full_simp_tac 1);
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	499	qed "The_split_eq";
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	500	*)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	501
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	502	lemma injective_fst_snd: "!!x y. [\|fst x = fst y; snd x = snd y\|] ==> x = y"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	503	by auto
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	504
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	505
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	506	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	507	\bigskip @{term prod_fun} --- action of the product functor upon
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	508	functions.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	509	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	510
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	511	lemma prod_fun [simp]: "prod_fun f g (a, b) = (f a, g b)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	512	by (simp add: prod_fun_def)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	513
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	514	lemma prod_fun_compose: "prod_fun (f1 o f2) (g1 o g2) = (prod_fun f1 g1 o prod_fun f2 g2)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	515	apply (rule ext)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	516	apply (tactic {* pair_tac "x" 1 *})
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	517	apply simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	518	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	519
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	520	lemma prod_fun_ident [simp]: "prod_fun (%x. x) (%y. y) = (%z. z)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	521	apply (rule ext)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	522	apply (tactic {* pair_tac "z" 1 *})
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	523	apply simp
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	524	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	525
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	526	lemma prod_fun_imageI [intro]: "(a, b) : r ==> (f a, g b) : prod_fun f g ` r"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	527	apply (rule image_eqI)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	528	apply (rule prod_fun [symmetric])
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	529	apply assumption
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	530	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	531
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	532	lemma prod_fun_imageE [elim!]:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	533	"[\| c: (prod_fun f g)`r; !!x y. [\| c=(f(x),g(y)); (x,y):r \|] ==> P
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	534	\|] ==> P"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	535	proof -
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	536	case rule_context
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	537	assume major: "c: (prod_fun f g)`r"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	538	show ?thesis
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	539	apply (rule major [THEN imageE])
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	540	apply (rule_tac p = x in PairE)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	541	apply (rule rule_context)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	542	prefer 2
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	543	apply blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	544	apply (blast intro: prod_fun)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	545	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	546	qed
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	547
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	548
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	549	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	550	\bigskip Disjoint union of a family of sets -- Sigma.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	551	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	552
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	553	lemma SigmaI [intro!]: "[\| a:A; b:B(a) \|] ==> (a,b) : Sigma A B"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	554	by (unfold Sigma_def) blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	555
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	556
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	557	lemma SigmaE:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	558	"[\| c: Sigma A B;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	559	!!x y.[\| x:A; y:B(x); c=(x,y) \|] ==> P
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	560	\|] ==> P"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	561	-- {* The general elimination rule. *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	562	by (unfold Sigma_def) blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	563
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	564	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	565	Elimination of @{term "(a, b) : A \<times> B"} -- introduces no
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	566	eigenvariables.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	567	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	568
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	569	lemma SigmaD1: "(a, b) : Sigma A B ==> a : A"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	570	apply (erule SigmaE)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	571	apply blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	572	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	573
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	574	lemma SigmaD2: "(a, b) : Sigma A B ==> b : B a"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	575	apply (erule SigmaE)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	576	apply blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	577	done
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	578
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	579	lemma SigmaE2:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	580	"[\| (a, b) : Sigma A B;
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	581	[\| a:A; b:B(a) \|] ==> P
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	582	\|] ==> P"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	583	by (blast dest: SigmaD1 SigmaD2)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	584
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	585	declare SigmaE [elim!] SigmaE2 [elim!]
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	586
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	587	lemma Sigma_mono: "[\| A <= C; !!x. x:A ==> B x <= D x \|] ==> Sigma A B <= Sigma C D"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	588	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	589
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	590	lemma Sigma_empty1 [simp]: "Sigma {} B = {}"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	591	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	592
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	593	lemma Sigma_empty2 [simp]: "A <*> {} = {}"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	594	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	595
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	596	lemma UNIV_Times_UNIV [simp]: "UNIV <*> UNIV = UNIV"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	597	by auto
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	598
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	599	lemma Compl_Times_UNIV1 [simp]: "- (UNIV <> A) = UNIV <> (-A)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	600	by auto
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	601
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	602	lemma Compl_Times_UNIV2 [simp]: "- (A <> UNIV) = (-A) <> UNIV"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	603	by auto
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	604
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	605	lemma mem_Sigma_iff [iff]: "((a,b): Sigma A B) = (a:A & b:B(a))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	606	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	607
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	608	lemma Times_subset_cancel2: "x:C ==> (A <> C <= B <> C) = (A <= B)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	609	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	610
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	611	lemma Times_eq_cancel2: "x:C ==> (A <> C = B <> C) = (A = B)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	612	by (blast elim: equalityE)
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	613
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	614	lemma SetCompr_Sigma_eq:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	615	"Collect (split (%x y. P x & Q x y)) = (SIGMA x:Collect P. Collect (Q x))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	616	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	617
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	618	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	619	\bigskip Complex rules for Sigma.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	620	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	621
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	622	lemma Collect_split [simp]: "{(a,b). P a & Q b} = Collect P <*> Collect Q"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	623	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	624
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	625	lemma UN_Times_distrib:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	626	"(UN (a,b):(A <> B). E a <> F b) = (UNION A E) <*> (UNION B F)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	627	-- {* Suggested by Pierre Chartier *}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	628	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	629
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	630	lemma split_paired_Ball_Sigma [simp]:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	631	"(ALL z: Sigma A B. P z) = (ALL x:A. ALL y: B x. P(x,y))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	632	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	633
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	634	lemma split_paired_Bex_Sigma [simp]:
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	635	"(EX z: Sigma A B. P z) = (EX x:A. EX y: B x. P(x,y))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	636	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	637
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	638	lemma Sigma_Un_distrib1: "(SIGMA i:I Un J. C(i)) = (SIGMA i:I. C(i)) Un (SIGMA j:J. C(j))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	639	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	640
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	641	lemma Sigma_Un_distrib2: "(SIGMA i:I. A(i) Un B(i)) = (SIGMA i:I. A(i)) Un (SIGMA i:I. B(i))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	642	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	643
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	644	lemma Sigma_Int_distrib1: "(SIGMA i:I Int J. C(i)) = (SIGMA i:I. C(i)) Int (SIGMA j:J. C(j))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	645	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	646
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	647	lemma Sigma_Int_distrib2: "(SIGMA i:I. A(i) Int B(i)) = (SIGMA i:I. A(i)) Int (SIGMA i:I. B(i))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	648	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	649
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	650	lemma Sigma_Diff_distrib1: "(SIGMA i:I - J. C(i)) = (SIGMA i:I. C(i)) - (SIGMA j:J. C(j))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	651	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	652
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	653	lemma Sigma_Diff_distrib2: "(SIGMA i:I. A(i) - B(i)) = (SIGMA i:I. A(i)) - (SIGMA i:I. B(i))"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	654	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	655
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	656	lemma Sigma_Union: "Sigma (Union X) B = (UN A:X. Sigma A B)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	657	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	658
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	659	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	660	Non-dependent versions are needed to avoid the need for higher-order
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	661	matching, especially when the rules are re-oriented.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	662	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	663
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	664	lemma Times_Un_distrib1: "(A Un B) <> C = (A <> C) Un (B <*> C)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	665	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	666
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	667	lemma Times_Int_distrib1: "(A Int B) <> C = (A <> C) Int (B <*> C)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	668	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	669
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	670	lemma Times_Diff_distrib1: "(A - B) <> C = (A <> C) - (B <*> C)"
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	671	by blast
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	672
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	673
11493 f3ff2549cdc8 added pair_imageI (also as intro rule) oheimb parents: 11451 diff changeset	674	lemma pair_imageI [intro]: "(a, b) : A ==> f a b : (%(a, b). f a b) ` A"
11777 b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	675	apply (rule_tac x = "(a, b)" in image_eqI)
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	676	apply auto
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	677	done
b03c8a3fcc6d tuned; wenzelm parents: 11602 diff changeset	678
11493 f3ff2549cdc8 added pair_imageI (also as intro rule) oheimb parents: 11451 diff changeset	679
11838 02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	680	text {*
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	681	Setup of internal @{text split_rule}.
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	682	*}
02d75712061d got rid of ML proof scripts for Product_Type; wenzelm parents: 11820 diff changeset	683
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	684	constdefs
11425 4988fd27d6e6 tuned; wenzelm parents: 11032 diff changeset	685	internal_split :: "('a => 'b => 'c) => 'a * 'b => 'c"
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	686	"internal_split == split"
83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	687
83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	688	lemma internal_split_conv: "internal_split c (a, b) = c a b"
83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	689	by (simp only: internal_split_def split_conv)
83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	690
83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	691	hide const internal_split
83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	692
11025 a70b796d9af8 converted to Isar therory, adding attributes complete_split and split_format oheimb parents: 10289 diff changeset	693	use "Tools/split_rule.ML"
11032 83f723e86dac added hidden internal_split constant; wenzelm parents: 11025 diff changeset	694	setup SplitRule.setup
10213 01c2744a3786 * empty log message * nipkow parents: diff changeset	695
01c2744a3786 * empty log message * nipkow parents: diff changeset	696	end

author	wenzelm
	Thu, 15 Nov 2001 18:20:13 +0100
changeset 12207	4dff931b852f
parent 12114	a8e860c86252
child 12338	de0f4a63baa5
permissions	-rw-r--r--