isabelle: src/HOL/Datatype.thy@af38553e61ee (annotated)

5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	1	(* Title: HOL/Datatype.thy
4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	2	ID: $Id$
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	3	Author: Stefan Berghofer and Markus Wenzel, TU Muenchen
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	4	License: GPL (GNU GENERAL PUBLIC LICENSE)
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	5	*)
4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	6
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	7	header {* Datatypes *}
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	8
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	9	theory Datatype = Datatype_Universe:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	10
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	11	subsection {* Representing primitive types *}
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	12
5759 bf5d9e5b8cdf unit and bool are now represented as datatypes. berghofe parents: 5714 diff changeset	13	rep_datatype bool
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	14	distinct True_not_False False_not_True
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	15	induction bool_induct
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	16
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	17	declare case_split [cases type: bool]
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	18	-- "prefer plain propositional version"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	19
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	20	rep_datatype unit
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	21	induction unit_induct
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	22
4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	23	rep_datatype prod
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	24	inject Pair_eq
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	25	induction prod_induct
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	26
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	27	rep_datatype sum
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	28	distinct Inl_not_Inr Inr_not_Inl
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	29	inject Inl_eq Inr_eq
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	30	induction sum_induct
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	31
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	32	ML {*
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	33	val [sum_case_Inl, sum_case_Inr] = thms "sum.cases";
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	34	bind_thm ("sum_case_Inl", sum_case_Inl);
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	35	bind_thm ("sum_case_Inr", sum_case_Inr);
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	36	} -- { compatibility *}
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	37
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	38	lemma surjective_sum: "sum_case (%x::'a. f (Inl x)) (%y::'b. f (Inr y)) s = f(s)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	39	apply (rule_tac s = s in sumE)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	40	apply (erule ssubst)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	41	apply (rule sum_case_Inl)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	42	apply (erule ssubst)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	43	apply (rule sum_case_Inr)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	44	done
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	45
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	46	lemma sum_case_weak_cong: "s = t ==> sum_case f g s = sum_case f g t"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	47	-- {* Prevents simplification of @{text f} and @{text g}: much faster. *}
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	48	by (erule arg_cong)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	49
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	50	lemma sum_case_inject:
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	51	"sum_case f1 f2 = sum_case g1 g2 ==> (f1 = g1 ==> f2 = g2 ==> P) ==> P"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	52	proof -
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	53	assume a: "sum_case f1 f2 = sum_case g1 g2"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	54	assume r: "f1 = g1 ==> f2 = g2 ==> P"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	55	show P
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	56	apply (rule r)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	57	apply (rule ext)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	58	apply (cut_tac x = "Inl x" in a [THEN fun_cong])
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	59	apply simp
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	60	apply (rule ext)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	61	apply (cut_tac x = "Inr x" in a [THEN fun_cong])
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	62	apply simp
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	63	done
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	64	qed
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	65
13635 c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	66	constdefs
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	67	Suml :: "('a => 'c) => 'a + 'b => 'c"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	68	"Suml == (%f. sum_case f arbitrary)"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	69
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	70	Sumr :: "('b => 'c) => 'a + 'b => 'c"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	71	"Sumr == sum_case arbitrary"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	72
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	73	lemma Suml_inject: "Suml f = Suml g ==> f = g"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	74	by (unfold Suml_def) (erule sum_case_inject)
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	75
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	76	lemma Sumr_inject: "Sumr f = Sumr g ==> f = g"
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	77	by (unfold Sumr_def) (erule sum_case_inject)
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	78
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	79
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	80	subsection {* Finishing the datatype package setup *}
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	81
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	82	text {* Belongs to theory @{text Datatype_Universe}; hides popular names. *}
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	83	hide const Node Atom Leaf Numb Lim Split Case Suml Sumr
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	84	hide type node item
c41e88151b54 Added functions Suml and Sumr which are useful for constructing berghofe parents: 12918 diff changeset	85
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	86
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	87	subsection {* Further cases/induct rules for tuples *}
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	88
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	89	lemma prod_cases3 [case_names fields, cases type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	90	"(!!a b c. y = (a, b, c) ==> P) ==> P"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	91	apply (cases y)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	92	apply (case_tac b)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	93	apply blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	94	done
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	95
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	96	lemma prod_induct3 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	97	"(!!a b c. P (a, b, c)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	98	by (cases x) blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	99
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	100	lemma prod_cases4 [case_names fields, cases type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	101	"(!!a b c d. y = (a, b, c, d) ==> P) ==> P"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	102	apply (cases y)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	103	apply (case_tac c)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	104	apply blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	105	done
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	106
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	107	lemma prod_induct4 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	108	"(!!a b c d. P (a, b, c, d)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	109	by (cases x) blast
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	110
11954 3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	111	lemma prod_cases5 [case_names fields, cases type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	112	"(!!a b c d e. y = (a, b, c, d, e) ==> P) ==> P"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	113	apply (cases y)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	114	apply (case_tac d)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	115	apply blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	116	done
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	117
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	118	lemma prod_induct5 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	119	"(!!a b c d e. P (a, b, c, d, e)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	120	by (cases x) blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	121
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	122	lemma prod_cases6 [case_names fields, cases type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	123	"(!!a b c d e f. y = (a, b, c, d, e, f) ==> P) ==> P"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	124	apply (cases y)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	125	apply (case_tac e)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	126	apply blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	127	done
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	128
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	129	lemma prod_induct6 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	130	"(!!a b c d e f. P (a, b, c, d, e, f)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	131	by (cases x) blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	132
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	133	lemma prod_cases7 [case_names fields, cases type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	134	"(!!a b c d e f g. y = (a, b, c, d, e, f, g) ==> P) ==> P"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	135	apply (cases y)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	136	apply (case_tac f)
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	137	apply blast
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	138	done
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	139
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	140	lemma prod_induct7 [case_names fields, induct type]:
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	141	"(!!a b c d e f g. P (a, b, c, d, e, f, g)) ==> P x"
3d1780208bf3 made new-style theory; wenzelm parents: 10212 diff changeset	142	by (cases x) blast
5759 bf5d9e5b8cdf unit and bool are now represented as datatypes. berghofe parents: 5714 diff changeset	143
12918 bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	144
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	145	subsection {* The option type *}
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	146
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	147	datatype 'a option = None \| Some 'a
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	148
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	149	lemma not_None_eq [iff]: "(x ~= None) = (EX y. x = Some y)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	150	by (induct x) auto
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	151
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	152	lemma not_Some_eq [iff]: "(ALL y. x ~= Some y) = (x = None)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	153	by (induct x) auto
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	154
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	155	lemma option_caseE:
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	156	"(case x of None => P \| Some y => Q y) ==>
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	157	(x = None ==> P ==> R) ==>
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	158	(!!y. x = Some y ==> Q y ==> R) ==> R"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	159	by (cases x) simp_all
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	160
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	161
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	162	subsubsection {* Operations *}
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	163
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	164	consts
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	165	the :: "'a option => 'a"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	166	primrec
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	167	"the (Some x) = x"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	168
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	169	consts
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	170	o2s :: "'a option => 'a set"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	171	primrec
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	172	"o2s None = {}"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	173	"o2s (Some x) = {x}"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	174
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	175	lemma ospec [dest]: "(ALL x:o2s A. P x) ==> A = Some x ==> P x"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	176	by simp
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	177
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	178	ML_setup {* claset_ref() := claset() addSD2 ("ospec", thm "ospec") *}
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	179
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	180	lemma elem_o2s [iff]: "(x : o2s xo) = (xo = Some x)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	181	by (cases xo) auto
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	182
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	183	lemma o2s_empty_eq [simp]: "(o2s xo = {}) = (xo = None)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	184	by (cases xo) auto
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	185
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	186
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	187	constdefs
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	188	option_map :: "('a => 'b) => ('a option => 'b option)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	189	"option_map == %f y. case y of None => None \| Some x => Some (f x)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	190
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	191	lemma option_map_None [simp]: "option_map f None = None"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	192	by (simp add: option_map_def)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	193
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	194	lemma option_map_Some [simp]: "option_map f (Some x) = Some (f x)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	195	by (simp add: option_map_def)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	196
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	197	lemma option_map_eq_Some [iff]:
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	198	"(option_map f xo = Some y) = (EX z. xo = Some z & f z = y)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	199	by (simp add: option_map_def split add: option.split)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	200
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	201	lemma option_map_o_sum_case [simp]:
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	202	"option_map f o sum_case g h = sum_case (option_map f o g) (option_map f o h)"
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	203	apply (rule ext)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	204	apply (simp split add: sum.split)
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	205	done
bca45be2d25b theory Option has been assimilated by Datatype; wenzelm parents: 12029 diff changeset	206
5181 4ba3787d9709 New theory Datatype. Needed as an ancestor when defining datatypes. berghofe parents: diff changeset	207	end

author	kleing
	Sun, 06 Apr 2003 21:16:50 +0200
changeset 13901	af38553e61ee
parent 13635	c41e88151b54
child 14187	26dfcd0ac436
permissions	-rw-r--r--