isabelle: src/HOL/Option.thy@98370b26c2ce (annotated)

30246 8253519dfc90 Option.thy nipkow parents: diff changeset	1	(* Title: HOL/Option.thy
8253519dfc90 Option.thy nipkow parents: diff changeset	2	Author: Folklore
8253519dfc90 Option.thy nipkow parents: diff changeset	3	*)
8253519dfc90 Option.thy nipkow parents: diff changeset	4
8253519dfc90 Option.thy nipkow parents: diff changeset	5	header {* Datatype option *}
8253519dfc90 Option.thy nipkow parents: diff changeset	6
8253519dfc90 Option.thy nipkow parents: diff changeset	7	theory Option
30327 4d1185c77f4a moved instance option :: finite to Option.thy haftmann parents: 30246 diff changeset	8	imports Datatype Finite_Set
30246 8253519dfc90 Option.thy nipkow parents: diff changeset	9	begin
8253519dfc90 Option.thy nipkow parents: diff changeset	10
8253519dfc90 Option.thy nipkow parents: diff changeset	11	datatype 'a option = None \| Some 'a
8253519dfc90 Option.thy nipkow parents: diff changeset	12
8253519dfc90 Option.thy nipkow parents: diff changeset	13	lemma not_None_eq [iff]: "(x ~= None) = (EX y. x = Some y)"
8253519dfc90 Option.thy nipkow parents: diff changeset	14	by (induct x) auto
8253519dfc90 Option.thy nipkow parents: diff changeset	15
8253519dfc90 Option.thy nipkow parents: diff changeset	16	lemma not_Some_eq [iff]: "(ALL y. x ~= Some y) = (x = None)"
8253519dfc90 Option.thy nipkow parents: diff changeset	17	by (induct x) auto
8253519dfc90 Option.thy nipkow parents: diff changeset	18
8253519dfc90 Option.thy nipkow parents: diff changeset	19	text{*Although it may appear that both of these equalities are helpful
8253519dfc90 Option.thy nipkow parents: diff changeset	20	only when applied to assumptions, in practice it seems better to give
8253519dfc90 Option.thy nipkow parents: diff changeset	21	them the uniform iff attribute. *}
8253519dfc90 Option.thy nipkow parents: diff changeset	22
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	23	lemma inj_Some [simp]: "inj_on Some A"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	24	by (rule inj_onI) simp
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	25
30246 8253519dfc90 Option.thy nipkow parents: diff changeset	26	lemma option_caseE:
8253519dfc90 Option.thy nipkow parents: diff changeset	27	assumes c: "(case x of None => P \| Some y => Q y)"
8253519dfc90 Option.thy nipkow parents: diff changeset	28	obtains
8253519dfc90 Option.thy nipkow parents: diff changeset	29	(None) "x = None" and P
8253519dfc90 Option.thy nipkow parents: diff changeset	30	\| (Some) y where "x = Some y" and "Q y"
8253519dfc90 Option.thy nipkow parents: diff changeset	31	using c by (cases x) simp_all
8253519dfc90 Option.thy nipkow parents: diff changeset	32
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	33	lemma UNIV_option_conv: "UNIV = insert None (range Some)"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	34	by(auto intro: classical)
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	35
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	36	lemma finite_option_UNIV[simp]:
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	37	"finite (UNIV :: 'a option set) = finite (UNIV :: 'a set)"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	38	by(auto simp add: UNIV_option_conv elim: finite_imageD intro: inj_Some)
30246 8253519dfc90 Option.thy nipkow parents: diff changeset	39
30327 4d1185c77f4a moved instance option :: finite to Option.thy haftmann parents: 30246 diff changeset	40	instance option :: (finite) finite proof
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 30327 diff changeset	41	qed (simp add: UNIV_option_conv)
30246 8253519dfc90 Option.thy nipkow parents: diff changeset	42
8253519dfc90 Option.thy nipkow parents: diff changeset	43
8253519dfc90 Option.thy nipkow parents: diff changeset	44	subsubsection {* Operations *}
8253519dfc90 Option.thy nipkow parents: diff changeset	45
8253519dfc90 Option.thy nipkow parents: diff changeset	46	primrec the :: "'a option => 'a" where
8253519dfc90 Option.thy nipkow parents: diff changeset	47	"the (Some x) = x"
8253519dfc90 Option.thy nipkow parents: diff changeset	48
8253519dfc90 Option.thy nipkow parents: diff changeset	49	primrec set :: "'a option => 'a set" where
8253519dfc90 Option.thy nipkow parents: diff changeset	50	"set None = {}" \|
8253519dfc90 Option.thy nipkow parents: diff changeset	51	"set (Some x) = {x}"
8253519dfc90 Option.thy nipkow parents: diff changeset	52
8253519dfc90 Option.thy nipkow parents: diff changeset	53	lemma ospec [dest]: "(ALL x:set A. P x) ==> A = Some x ==> P x"
8253519dfc90 Option.thy nipkow parents: diff changeset	54	by simp
8253519dfc90 Option.thy nipkow parents: diff changeset	55
8253519dfc90 Option.thy nipkow parents: diff changeset	56	declaration {* fn _ =>
8253519dfc90 Option.thy nipkow parents: diff changeset	57	Classical.map_cs (fn cs => cs addSD2 ("ospec", thm "ospec"))
8253519dfc90 Option.thy nipkow parents: diff changeset	58	*}
8253519dfc90 Option.thy nipkow parents: diff changeset	59
8253519dfc90 Option.thy nipkow parents: diff changeset	60	lemma elem_set [iff]: "(x : set xo) = (xo = Some x)"
8253519dfc90 Option.thy nipkow parents: diff changeset	61	by (cases xo) auto
8253519dfc90 Option.thy nipkow parents: diff changeset	62
8253519dfc90 Option.thy nipkow parents: diff changeset	63	lemma set_empty_eq [simp]: "(set xo = {}) = (xo = None)"
8253519dfc90 Option.thy nipkow parents: diff changeset	64	by (cases xo) auto
8253519dfc90 Option.thy nipkow parents: diff changeset	65
31154 f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	66	definition map :: "('a \<Rightarrow> 'b) \<Rightarrow> 'a option \<Rightarrow> 'b option" where
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	67	"map = (%f y. case y of None => None \| Some x => Some (f x))"
30246 8253519dfc90 Option.thy nipkow parents: diff changeset	68
8253519dfc90 Option.thy nipkow parents: diff changeset	69	lemma option_map_None [simp, code]: "map f None = None"
8253519dfc90 Option.thy nipkow parents: diff changeset	70	by (simp add: map_def)
8253519dfc90 Option.thy nipkow parents: diff changeset	71
8253519dfc90 Option.thy nipkow parents: diff changeset	72	lemma option_map_Some [simp, code]: "map f (Some x) = Some (f x)"
8253519dfc90 Option.thy nipkow parents: diff changeset	73	by (simp add: map_def)
8253519dfc90 Option.thy nipkow parents: diff changeset	74
8253519dfc90 Option.thy nipkow parents: diff changeset	75	lemma option_map_is_None [iff]:
8253519dfc90 Option.thy nipkow parents: diff changeset	76	"(map f opt = None) = (opt = None)"
8253519dfc90 Option.thy nipkow parents: diff changeset	77	by (simp add: map_def split add: option.split)
8253519dfc90 Option.thy nipkow parents: diff changeset	78
8253519dfc90 Option.thy nipkow parents: diff changeset	79	lemma option_map_eq_Some [iff]:
8253519dfc90 Option.thy nipkow parents: diff changeset	80	"(map f xo = Some y) = (EX z. xo = Some z & f z = y)"
8253519dfc90 Option.thy nipkow parents: diff changeset	81	by (simp add: map_def split add: option.split)
8253519dfc90 Option.thy nipkow parents: diff changeset	82
8253519dfc90 Option.thy nipkow parents: diff changeset	83	lemma option_map_comp:
8253519dfc90 Option.thy nipkow parents: diff changeset	84	"map f (map g opt) = map (f o g) opt"
8253519dfc90 Option.thy nipkow parents: diff changeset	85	by (simp add: map_def split add: option.split)
8253519dfc90 Option.thy nipkow parents: diff changeset	86
8253519dfc90 Option.thy nipkow parents: diff changeset	87	lemma option_map_o_sum_case [simp]:
8253519dfc90 Option.thy nipkow parents: diff changeset	88	"map f o sum_case g h = sum_case (map f o g) (map f o h)"
8253519dfc90 Option.thy nipkow parents: diff changeset	89	by (rule ext) (simp split: sum.split)
8253519dfc90 Option.thy nipkow parents: diff changeset	90
8253519dfc90 Option.thy nipkow parents: diff changeset	91
8253519dfc90 Option.thy nipkow parents: diff changeset	92	hide (open) const set map
8253519dfc90 Option.thy nipkow parents: diff changeset	93
8253519dfc90 Option.thy nipkow parents: diff changeset	94	subsubsection {* Code generator setup *}
8253519dfc90 Option.thy nipkow parents: diff changeset	95
31154 f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	96	definition is_none :: "'a option \<Rightarrow> bool" where
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	97	[code post]: "is_none x \<longleftrightarrow> x = None"
30246 8253519dfc90 Option.thy nipkow parents: diff changeset	98
8253519dfc90 Option.thy nipkow parents: diff changeset	99	lemma is_none_code [code]:
8253519dfc90 Option.thy nipkow parents: diff changeset	100	shows "is_none None \<longleftrightarrow> True"
8253519dfc90 Option.thy nipkow parents: diff changeset	101	and "is_none (Some x) \<longleftrightarrow> False"
31154 f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	102	unfolding is_none_def by simp_all
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	103
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	104	lemma is_none_none:
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	105	"is_none x \<longleftrightarrow> x = None"
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	106	by (simp add: is_none_def)
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	107
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	108	lemma [code inline]:
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	109	"eq_class.eq x None \<longleftrightarrow> is_none x"
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	110	by (simp add: eq is_none_none)
30246 8253519dfc90 Option.thy nipkow parents: diff changeset	111
8253519dfc90 Option.thy nipkow parents: diff changeset	112	hide (open) const is_none
8253519dfc90 Option.thy nipkow parents: diff changeset	113
8253519dfc90 Option.thy nipkow parents: diff changeset	114	code_type option
8253519dfc90 Option.thy nipkow parents: diff changeset	115	(SML "_ option")
8253519dfc90 Option.thy nipkow parents: diff changeset	116	(OCaml "_ option")
8253519dfc90 Option.thy nipkow parents: diff changeset	117	(Haskell "Maybe _")
8253519dfc90 Option.thy nipkow parents: diff changeset	118
8253519dfc90 Option.thy nipkow parents: diff changeset	119	code_const None and Some
8253519dfc90 Option.thy nipkow parents: diff changeset	120	(SML "NONE" and "SOME")
8253519dfc90 Option.thy nipkow parents: diff changeset	121	(OCaml "None" and "Some _")
8253519dfc90 Option.thy nipkow parents: diff changeset	122	(Haskell "Nothing" and "Just")
8253519dfc90 Option.thy nipkow parents: diff changeset	123
8253519dfc90 Option.thy nipkow parents: diff changeset	124	code_instance option :: eq
8253519dfc90 Option.thy nipkow parents: diff changeset	125	(Haskell -)
8253519dfc90 Option.thy nipkow parents: diff changeset	126
8253519dfc90 Option.thy nipkow parents: diff changeset	127	code_const "eq_class.eq \<Colon> 'a\<Colon>eq option \<Rightarrow> 'a option \<Rightarrow> bool"
8253519dfc90 Option.thy nipkow parents: diff changeset	128	(Haskell infixl 4 "==")
8253519dfc90 Option.thy nipkow parents: diff changeset	129
8253519dfc90 Option.thy nipkow parents: diff changeset	130	code_reserved SML
8253519dfc90 Option.thy nipkow parents: diff changeset	131	option NONE SOME
8253519dfc90 Option.thy nipkow parents: diff changeset	132
8253519dfc90 Option.thy nipkow parents: diff changeset	133	code_reserved OCaml
8253519dfc90 Option.thy nipkow parents: diff changeset	134	option None Some
8253519dfc90 Option.thy nipkow parents: diff changeset	135
8253519dfc90 Option.thy nipkow parents: diff changeset	136	end

author	haftmann
	Tue, 19 May 2009 16:54:55 +0200
changeset 31205	98370b26c2ce
parent 31154	f919b8e67413
child 31998	2c7a24f74db9
permissions	-rw-r--r--