isabelle: src/HOL/List.thy@29f5b20e8ee8 (annotated)

13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	1	(* Title: HOL/List.thy
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	2	Author: Tobias Nipkow
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	3	*)
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	4
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	5	header {* The datatype of finite lists *}
13122 c63612ffb186 oops; wenzelm parents: 13114 diff changeset	6
15131 c69542757a4d New theory header syntax. nipkow parents: 15113 diff changeset	7	theory List
30952 7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 30949 diff changeset	8	imports Plain Presburger Recdef ATP_Linkup
31055 2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	9	uses ("Tools/list_code.ML")
15131 c69542757a4d New theory header syntax. nipkow parents: 15113 diff changeset	10	begin
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	11
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	12	datatype 'a list =
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	13	Nil ("[]")
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	14	\| Cons 'a "'a list" (infixr "#" 65)
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	15
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	16	subsection{Basic list processing functions}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	17
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	18	consts
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	19	filter:: "('a => bool) => 'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	20	concat:: "'a list list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	21	foldl :: "('b => 'a => 'b) => 'b => 'a list => 'b"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	22	foldr :: "('a => 'b => 'b) => 'a list => 'b => 'b"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	23	hd:: "'a list => 'a"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	24	tl:: "'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	25	last:: "'a list => 'a"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	26	butlast :: "'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	27	set :: "'a list => 'a set"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	28	map :: "('a=>'b) => ('a list => 'b list)"
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	29	listsum :: "'a list => 'a::monoid_add"
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	30	list_update :: "'a list => nat => 'a => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	31	take:: "nat => 'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	32	drop:: "nat => 'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	33	takeWhile :: "('a => bool) => 'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	34	dropWhile :: "('a => bool) => 'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	35	rev :: "'a list => 'a list"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	36	zip :: "'a list => 'b list => ('a * 'b) list"
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	37	upt :: "nat => nat => nat list" ("(1[_..</_'])")
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	38	remdups :: "'a list => 'a list"
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	39	remove1 :: "'a => 'a list => 'a list"
27693 73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	40	removeAll :: "'a => 'a list => 'a list"
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	41	"distinct":: "'a list => bool"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	42	replicate :: "nat => 'a => 'a list"
19390 6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	43	splice :: "'a list \<Rightarrow> 'a list \<Rightarrow> 'a list"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	44
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	45
13146 f43153b63361 * empty log message * nipkow parents: 13145 diff changeset	46	nonterminals lupdbinds lupdbind
5077 71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 4643 diff changeset	47
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	48	syntax
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	49	-- {* list Enumeration *}
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	50	"@list" :: "args => 'a list" ("[(_)]")
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	51
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	52	-- {* Special syntax for filter *}
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	53	"@filter" :: "[pttrn, 'a list, bool] => 'a list" ("(1[_<-_./ _])")
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	54
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	55	-- {* list update *}
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	56	"_lupdbind":: "['a, 'a] => lupdbind" ("(2_ :=/ _)")
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	57	"" :: "lupdbind => lupdbinds" ("_")
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	58	"_lupdbinds" :: "[lupdbind, lupdbinds] => lupdbinds" ("_,/ _")
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	59	"_LUpdate" :: "['a, lupdbinds] => 'a" ("_/[(_)]" [900,0] 900)
5077 71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 4643 diff changeset	60
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	61	translations
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	62	"[x, xs]" == "x#[xs]"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	63	"[x]" == "x#[]"
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	64	"[x<-xs . P]"== "filter (%x. P) xs"
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	65
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	66	"_LUpdate xs (_lupdbinds b bs)"== "_LUpdate (_LUpdate xs b) bs"
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	67	"xs[i:=x]" == "list_update xs i x"
5077 71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 4643 diff changeset	68
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	69
12114 a8e860c86252 eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 10832 diff changeset	70	syntax (xsymbols)
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	71	"@filter" :: "[pttrn, 'a list, bool] => 'a list"("(1[_\<leftarrow>_ ./ _])")
14565 c6dc17aab88a use more symbols in HTML output kleing parents: 14538 diff changeset	72	syntax (HTML output)
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	73	"@filter" :: "[pttrn, 'a list, bool] => 'a list"("(1[_\<leftarrow>_ ./ _])")
3342 ec3b55fcb165 New operator "lists" for formalizing sets of lists paulson parents: 3320 diff changeset	74
ec3b55fcb165 New operator "lists" for formalizing sets of lists paulson parents: 3320 diff changeset	75
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	76	text {*
14589 feae7b5fd425 tuned document; wenzelm parents: 14565 diff changeset	77	Function @{text size} is overloaded for all datatypes. Users may
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	78	refer to the list version as @{text length}. *}
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	79
19363 667b5ea637dd refined 'abbreviation'; wenzelm parents: 19302 diff changeset	80	abbreviation
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	81	length :: "'a list => nat" where
19363 667b5ea637dd refined 'abbreviation'; wenzelm parents: 19302 diff changeset	82	"length == size"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	83
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	84	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	85	"hd(x#xs) = x"
10dd989282fd indentation paulson parents: 15305 diff changeset	86
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	87	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	88	"tl([]) = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	89	"tl(x#xs) = xs"
10dd989282fd indentation paulson parents: 15305 diff changeset	90
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	91	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	92	"last(x#xs) = (if xs=[] then x else last xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	93
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	94	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	95	"butlast []= []"
10dd989282fd indentation paulson parents: 15305 diff changeset	96	"butlast(x#xs) = (if xs=[] then [] else x#butlast xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	97
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	98	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	99	"set [] = {}"
10dd989282fd indentation paulson parents: 15305 diff changeset	100	"set (x#xs) = insert x (set xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	101
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	102	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	103	"map f [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	104	"map f (x#xs) = f(x)#map f xs"
10dd989282fd indentation paulson parents: 15305 diff changeset	105
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	106	primrec
25559 f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	107	append :: "'a list \<Rightarrow> 'a list \<Rightarrow> 'a list" (infixr "@" 65)
f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	108	where
f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	109	append_Nil:"[] @ ys = ys"
f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	110	\| append_Cons: "(x#xs) @ ys = x # xs @ ys"
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	111
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	112	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	113	"rev([]) = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	114	"rev(x#xs) = rev(xs) @ [x]"
10dd989282fd indentation paulson parents: 15305 diff changeset	115
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	116	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	117	"filter P [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	118	"filter P (x#xs) = (if P x then x#filter P xs else filter P xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	119
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	120	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	121	foldl_Nil:"foldl f a [] = a"
10dd989282fd indentation paulson parents: 15305 diff changeset	122	foldl_Cons: "foldl f a (x#xs) = foldl f (f a x) xs"
10dd989282fd indentation paulson parents: 15305 diff changeset	123
8000 acafa0f15131 added foldr paulson parents: 7224 diff changeset	124	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	125	"foldr f [] a = a"
10dd989282fd indentation paulson parents: 15305 diff changeset	126	"foldr f (x#xs) a = f x (foldr f xs a)"
10dd989282fd indentation paulson parents: 15305 diff changeset	127
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	128	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	129	"concat([]) = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	130	"concat(x#xs) = x @ concat(xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	131
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	132	primrec
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	133	"listsum [] = 0"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	134	"listsum (x # xs) = x + listsum xs"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	135
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	136	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	137	drop_Nil:"drop n [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	138	drop_Cons: "drop n (x#xs) = (case n of 0 => x#xs \| Suc(m) => drop m xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	139	-- {*Warning: simpset does not contain this definition, but separate
10dd989282fd indentation paulson parents: 15305 diff changeset	140	theorems for @{text "n = 0"} and @{text "n = Suc k"} *}
10dd989282fd indentation paulson parents: 15305 diff changeset	141
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	142	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	143	take_Nil:"take n [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	144	take_Cons: "take n (x#xs) = (case n of 0 => [] \| Suc(m) => x # take m xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	145	-- {*Warning: simpset does not contain this definition, but separate
10dd989282fd indentation paulson parents: 15305 diff changeset	146	theorems for @{text "n = 0"} and @{text "n = Suc k"} *}
10dd989282fd indentation paulson parents: 15305 diff changeset	147
29822 c45845743f04 authentic syntax for List.nth haftmann parents: 29782 diff changeset	148	primrec nth :: "'a list => nat => 'a" (infixl "!" 100) where
c45845743f04 authentic syntax for List.nth haftmann parents: 29782 diff changeset	149	nth_Cons: "(x#xs)!n = (case n of 0 => x \| (Suc k) => xs!k)"
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	150	-- {*Warning: simpset does not contain this definition, but separate
10dd989282fd indentation paulson parents: 15305 diff changeset	151	theorems for @{text "n = 0"} and @{text "n = Suc k"} *}
10dd989282fd indentation paulson parents: 15305 diff changeset	152
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	153	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	154	"[][i:=v] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	155	"(x#xs)[i:=v] = (case i of 0 => v # xs \| Suc j => x # xs[j:=v])"
10dd989282fd indentation paulson parents: 15305 diff changeset	156
10dd989282fd indentation paulson parents: 15305 diff changeset	157	primrec
10dd989282fd indentation paulson parents: 15305 diff changeset	158	"takeWhile P [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	159	"takeWhile P (x#xs) = (if P x then x#takeWhile P xs else [])"
10dd989282fd indentation paulson parents: 15305 diff changeset	160
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	161	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	162	"dropWhile P [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	163	"dropWhile P (x#xs) = (if P x then dropWhile P xs else x#xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	164
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	165	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	166	"zip xs [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	167	zip_Cons: "zip xs (y#ys) = (case xs of [] => [] \| z#zs => (z,y)#zip zs ys)"
10dd989282fd indentation paulson parents: 15305 diff changeset	168	-- {*Warning: simpset does not contain this definition, but separate
10dd989282fd indentation paulson parents: 15305 diff changeset	169	theorems for @{text "xs = []"} and @{text "xs = z # zs"} *}
10dd989282fd indentation paulson parents: 15305 diff changeset	170
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	171	primrec
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	172	upt_0: "[i..<0] = []"
6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	173	upt_Suc: "[i..<(Suc j)] = (if i <= j then [i..<j] @ [j] else [])"
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	174
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	175	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	176	"distinct [] = True"
10dd989282fd indentation paulson parents: 15305 diff changeset	177	"distinct (x#xs) = (x ~: set xs \<and> distinct xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	178
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	179	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	180	"remdups [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	181	"remdups (x#xs) = (if x : set xs then remdups xs else x # remdups xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	182
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	183	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	184	"remove1 x [] = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	185	"remove1 x (y#xs) = (if x=y then xs else y # remove1 x xs)"
10dd989282fd indentation paulson parents: 15305 diff changeset	186
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	187	primrec
27693 73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	188	"removeAll x [] = []"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	189	"removeAll x (y#xs) = (if x=y then removeAll x xs else y # removeAll x xs)"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	190
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	191	primrec
15307 10dd989282fd indentation paulson parents: 15305 diff changeset	192	replicate_0: "replicate 0 x = []"
10dd989282fd indentation paulson parents: 15305 diff changeset	193	replicate_Suc: "replicate (Suc n) x = x # replicate n x"
10dd989282fd indentation paulson parents: 15305 diff changeset	194
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	195	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	196	rotate1 :: "'a list \<Rightarrow> 'a list" where
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	197	"rotate1 xs = (case xs of [] \<Rightarrow> [] \| x#xs \<Rightarrow> xs @ [x])"
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	198
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	199	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	200	rotate :: "nat \<Rightarrow> 'a list \<Rightarrow> 'a list" where
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30952 diff changeset	201	"rotate n = rotate1 ^^ n"
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	202
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	203	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	204	list_all2 :: "('a => 'b => bool) => 'a list => 'b list => bool" where
28562 4e74209f113e `code func` now just `code` haftmann parents: 28537 diff changeset	205	[code del]: "list_all2 P xs ys =
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	206	(length xs = length ys \<and> (\<forall>(x, y) \<in> set (zip xs ys). P x y))"
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	207
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	208	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	209	sublist :: "'a list => nat set => 'a list" where
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21211 diff changeset	210	"sublist xs A = map fst (filter (\<lambda>p. snd p \<in> A) (zip xs [0..<size xs]))"
17086 0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	211
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	212	primrec
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	213	"splice [] ys = ys"
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	214	"splice (x#xs) ys = (if ys=[] then x#xs else x # hd ys # splice xs (tl ys))"
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	215	-- {Warning: simpset does not contain the second eqn but a derived one. }
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	216
26771 1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	217	text{*
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	218	\begin{figure}[htbp]
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	219	\fbox{
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	220	\begin{tabular}{l}
27381 19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	221	@{lemma "[a,b]@[c,d] = [a,b,c,d]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	222	@{lemma "length [a,b,c] = 3" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	223	@{lemma "set [a,b,c] = {a,b,c}" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	224	@{lemma "map f [a,b,c] = [f a, f b, f c]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	225	@{lemma "rev [a,b,c] = [c,b,a]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	226	@{lemma "hd [a,b,c,d] = a" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	227	@{lemma "tl [a,b,c,d] = [b,c,d]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	228	@{lemma "last [a,b,c,d] = d" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	229	@{lemma "butlast [a,b,c,d] = [a,b,c]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	230	@{lemma[source] "filter (\<lambda>n::nat. n<2) [0,2,1] = [0,1]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	231	@{lemma "concat [[a,b],[c,d,e],[],[f]] = [a,b,c,d,e,f]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	232	@{lemma "foldl f x [a,b,c] = f (f (f x a) b) c" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	233	@{lemma "foldr f [a,b,c] x = f a (f b (f c x))" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	234	@{lemma "zip [a,b,c] [x,y,z] = [(a,x),(b,y),(c,z)]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	235	@{lemma "zip [a,b] [x,y,z] = [(a,x),(b,y)]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	236	@{lemma "splice [a,b,c] [x,y,z] = [a,x,b,y,c,z]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	237	@{lemma "splice [a,b,c,d] [x,y] = [a,x,b,y,c,d]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	238	@{lemma "take 2 [a,b,c,d] = [a,b]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	239	@{lemma "take 6 [a,b,c,d] = [a,b,c,d]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	240	@{lemma "drop 2 [a,b,c,d] = [c,d]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	241	@{lemma "drop 6 [a,b,c,d] = []" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	242	@{lemma "takeWhile (%n::nat. n<3) [1,2,3,0] = [1,2]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	243	@{lemma "dropWhile (%n::nat. n<3) [1,2,3,0] = [3,0]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	244	@{lemma "distinct [2,0,1::nat]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	245	@{lemma "remdups [2,0,2,1::nat,2] = [0,1,2]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	246	@{lemma "remove1 2 [2,0,2,1::nat,2] = [0,2,1,2]" by simp}\\
27693 73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	247	@{lemma "removeAll 2 [2,0,2,1::nat,2] = [0,1]" by simp}\\
27381 19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	248	@{lemma "nth [a,b,c,d] 2 = c" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	249	@{lemma "[a,b,c,d][2 := x] = [a,b,x,d]" by simp}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	250	@{lemma "sublist [a,b,c,d,e] {0,2,3} = [a,c,d]" by (simp add:sublist_def)}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	251	@{lemma "rotate1 [a,b,c,d] = [b,c,d,a]" by (simp add:rotate1_def)}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	252	@{lemma "rotate 3 [a,b,c,d] = [d,a,b,c]" by (simp add:rotate1_def rotate_def nat_number)}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	253	@{lemma "replicate 4 a = [a,a,a,a]" by (simp add:nat_number)}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	254	@{lemma "[2..<5] = [2,3,4]" by (simp add:nat_number)}\\
19ae7064f00f @{lemma}: 'by' keyword; wenzelm parents: 27368 diff changeset	255	@{lemma "listsum [1,2,3::nat] = 6" by simp}
26771 1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	256	\end{tabular}}
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	257	\caption{Characteristic examples}
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	258	\label{fig:Characteristic}
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	259	\end{figure}
29927 ae8f42c245b2 Added nitpick attribute, and fixed typo. blanchet parents: 29856 diff changeset	260	Figure~\ref{fig:Characteristic} shows characteristic examples
26771 1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	261	that should give an intuitive understanding of the above functions.
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	262	*}
1d67ab20f358 Added documentation nipkow parents: 26749 diff changeset	263
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	264	text{* The following simple sort functions are intended for proofs,
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	265	not for efficient implementations. *}
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	266
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	267	context linorder
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	268	begin
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	269
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	270	fun sorted :: "'a list \<Rightarrow> bool" where
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	271	"sorted [] \<longleftrightarrow> True" \|
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	272	"sorted [x] \<longleftrightarrow> True" \|
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	273	"sorted (x#y#zs) \<longleftrightarrow> x <= y \<and> sorted (y#zs)"
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	274
25559 f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	275	primrec insort :: "'a \<Rightarrow> 'a list \<Rightarrow> 'a list" where
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	276	"insort x [] = [x]" \|
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	277	"insort x (y#ys) = (if x <= y then (x#y#ys) else y#(insort x ys))"
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	278
25559 f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	279	primrec sort :: "'a list \<Rightarrow> 'a list" where
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	280	"sort [] = []" \|
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	281	"sort (x#xs) = insort x (sort xs)"
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	282
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	283	end
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	284
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	285
23388 77645da0db85 tuned proofs: avoid implicit prems; wenzelm parents: 23279 diff changeset	286	subsubsection {* List comprehension *}
23192 ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	287
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	288	text{* Input syntax for Haskell-like list comprehension notation.
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	289	Typical example: @{text"[(x,y). x \<leftarrow> xs, y \<leftarrow> ys, x \<noteq> y]"},
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	290	the list of all pairs of distinct elements from @{text xs} and @{text ys}.
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	291	The syntax is as in Haskell, except that @{text"\|"} becomes a dot
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	292	(like in Isabelle's set comprehension): @{text"[e. x \<leftarrow> xs, \<dots>]"} rather than
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	293	\verb![e\| x <- xs, ...]!.
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	294
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	295	The qualifiers after the dot are
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	296	\begin{description}
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	297	\item[generators] @{text"p \<leftarrow> xs"},
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	298	where @{text p} is a pattern and @{text xs} an expression of list type, or
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	299	\item[guards] @{text"b"}, where @{text b} is a boolean expression.
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	300	%\item[local bindings] @ {text"let x = e"}.
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	301	\end{description}
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	302
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	303	Just like in Haskell, list comprehension is just a shorthand. To avoid
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	304	misunderstandings, the translation into desugared form is not reversed
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	305	upon output. Note that the translation of @{text"[e. x \<leftarrow> xs]"} is
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	306	optmized to @{term"map (%x. e) xs"}.
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	307
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	308	It is easy to write short list comprehensions which stand for complex
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	309	expressions. During proofs, they may become unreadable (and
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	310	mangled). In such cases it can be advisable to introduce separate
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	311	definitions for the list comprehensions in question. *}
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	312
23209 098a23702aba * empty log message * nipkow parents: 23192 diff changeset	313	(*
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	314	Proper theorem proving support would be nice. For example, if
23192 ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	315	@{text"set[f x y. x \<leftarrow> xs, y \<leftarrow> ys, P x y]"}
ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	316	produced something like
23209 098a23702aba * empty log message * nipkow parents: 23192 diff changeset	317	@{term"{z. EX x: set xs. EX y:set ys. P x y \<and> z = f x y}"}.
098a23702aba * empty log message * nipkow parents: 23192 diff changeset	318	*)
098a23702aba * empty log message * nipkow parents: 23192 diff changeset	319
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	320	nonterminals lc_qual lc_quals
23192 ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	321
ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	322	syntax
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	323	"_listcompr" :: "'a \<Rightarrow> lc_qual \<Rightarrow> lc_quals \<Rightarrow> 'a list" ("[_ . __")
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	324	"_lc_gen" :: "'a \<Rightarrow> 'a list \<Rightarrow> lc_qual" ("_ <- _")
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	325	"_lc_test" :: "bool \<Rightarrow> lc_qual" ("_")
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	326	("_lc_let" :: "letbinds => lc_qual" ("let _"))
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	327	"_lc_end" :: "lc_quals" ("]")
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	328	"_lc_quals" :: "lc_qual \<Rightarrow> lc_quals \<Rightarrow> lc_quals" (", __")
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	329	"_lc_abs" :: "'a => 'b list => 'b list"
23192 ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	330
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	331	(* These are easier than ML code but cannot express the optimized
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	332	translation of [e. p<-xs]
23192 ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	333	translations
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	334	"[e. p<-xs]" => "concat(map (_lc_abs p [e]) xs)"
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	335	"_listcompr e (_lc_gen p xs) (_lc_quals Q Qs)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	336	=> "concat (map (_lc_abs p (_listcompr e Q Qs)) xs)"
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	337	"[e. P]" => "if P then [e] else []"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	338	"_listcompr e (_lc_test P) (_lc_quals Q Qs)"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	339	=> "if P then (_listcompr e Q Qs) else []"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	340	"_listcompr e (_lc_let b) (_lc_quals Q Qs)"
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	341	=> "_Let b (_listcompr e Q Qs)"
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	342	*)
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	343
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	344	syntax (xsymbols)
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	345	"_lc_gen" :: "'a \<Rightarrow> 'a list \<Rightarrow> lc_qual" ("_ \<leftarrow> _")
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	346	syntax (HTML output)
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	347	"_lc_gen" :: "'a \<Rightarrow> 'a list \<Rightarrow> lc_qual" ("_ \<leftarrow> _")
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	348
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	349	parse_translation (advanced) {*
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	350	let
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	351	val NilC = Syntax.const @{const_name Nil};
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	352	val ConsC = Syntax.const @{const_name Cons};
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	353	val mapC = Syntax.const @{const_name map};
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	354	val concatC = Syntax.const @{const_name concat};
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	355	val IfC = Syntax.const @{const_name If};
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	356	fun singl x = ConsC $ x $ NilC;
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	357
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	358	fun pat_tr ctxt p e opti = (* %x. case x of p => e \| _ => [] *)
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	359	let
29281 b22ccb3998db eliminated OldTerm.add_term_free_names; wenzelm parents: 29270 diff changeset	360	val x = Free (Name.variant (fold Term.add_free_names [p, e] []) "x", dummyT);
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	361	val e = if opti then singl e else e;
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	362	val case1 = Syntax.const "_case1" $ p $ e;
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	363	val case2 = Syntax.const "_case1" $ Syntax.const Term.dummy_patternN
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	364	$ NilC;
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	365	val cs = Syntax.const "_case2" $ case1 $ case2
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	366	val ft = DatatypeCase.case_tr false DatatypePackage.datatype_of_constr
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	367	ctxt [x, cs]
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	368	in lambda x ft end;
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	369
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	370	fun abs_tr ctxt (p as Free(s,T)) e opti =
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	371	let val thy = ProofContext.theory_of ctxt;
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	372	val s' = Sign.intern_const thy s
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	373	in if Sign.declared_const thy s'
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	374	then (pat_tr ctxt p e opti, false)
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	375	else (lambda p e, true)
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	376	end
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	377	\| abs_tr ctxt p e opti = (pat_tr ctxt p e opti, false);
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	378
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	379	fun lc_tr ctxt [e, Const("_lc_test",_)$b, qs] =
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	380	let val res = case qs of Const("_lc_end",_) => singl e
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	381	\| Const("_lc_quals",_)$q$qs => lc_tr ctxt [e,q,qs];
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	382	in IfC $ b $ res $ NilC end
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	383	\| lc_tr ctxt [e, Const("_lc_gen",_) $ p $ es, Const("_lc_end",_)] =
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	384	(case abs_tr ctxt p e true of
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	385	(f,true) => mapC $ f $ es
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	386	\| (f, false) => concatC $ (mapC $ f $ es))
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	387	\| lc_tr ctxt [e, Const("_lc_gen",_) $ p $ es, Const("_lc_quals",_)$q$qs] =
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	388	let val e' = lc_tr ctxt [e,q,qs];
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	389	in concatC $ (mapC $ (fst(abs_tr ctxt p e' false)) $ es) end
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	390
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	391	in [("_listcompr", lc_tr)] end
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	392	*}
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	393
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	394	(*
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	395	term "[(x,y,z). b]"
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	396	term "[(x,y,z). x\<leftarrow>xs]"
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	397	term "[e x y. x\<leftarrow>xs, y\<leftarrow>ys]"
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	398	term "[(x,y,z). x<a, x>b]"
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	399	term "[(x,y,z). x\<leftarrow>xs, x>b]"
f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	400	term "[(x,y,z). x<a, x\<leftarrow>xs]"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	401	term "[(x,y). Cons True x \<leftarrow> xs]"
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	402	term "[(x,y,z). Cons x [] \<leftarrow> xs]"
23240 7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	403	term "[(x,y,z). x<a, x>b, x=d]"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	404	term "[(x,y,z). x<a, x>b, y\<leftarrow>ys]"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	405	term "[(x,y,z). x<a, x\<leftarrow>xs,y>b]"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	406	term "[(x,y,z). x<a, x\<leftarrow>xs, y\<leftarrow>ys]"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	407	term "[(x,y,z). x\<leftarrow>xs, x>b, y<a]"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	408	term "[(x,y,z). x\<leftarrow>xs, x>b, y\<leftarrow>ys]"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	409	term "[(x,y,z). x\<leftarrow>xs, y\<leftarrow>ys,y>x]"
7077dc80a14b tuned list comprehension nipkow parents: 23235 diff changeset	410	term "[(x,y,z). x\<leftarrow>xs, y\<leftarrow>ys,z\<leftarrow>zs]"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	411	term "[(x,y). x\<leftarrow>xs, let xx = x+x, y\<leftarrow>ys, y \<noteq> xx]"
23192 ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	412	*)
ec73b9707d48 Moved list comprehension into List nipkow parents: 23096 diff changeset	413
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	414	subsubsection {* @{const Nil} and @{const Cons} *}
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	415
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	416	lemma not_Cons_self [simp]:
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	417	"xs \<noteq> x # xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	418	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	419
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	420	lemmas not_Cons_self2 [simp] = not_Cons_self [symmetric]
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	421
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	422	lemma neq_Nil_conv: "(xs \<noteq> []) = (\<exists>y ys. xs = y # ys)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	423	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	424
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	425	lemma length_induct:
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	426	"(\<And>xs. \<forall>ys. length ys < length xs \<longrightarrow> P ys \<Longrightarrow> P xs) \<Longrightarrow> P xs"
17589 58eeffd73be1 renamed rules to iprover nipkow parents: 17501 diff changeset	427	by (rule measure_induct [of length]) iprover
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	428
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	429
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	430	subsubsection {* @{const length} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	431
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	432	text {*
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	433	Needs to come before @{text "@"} because of theorem @{text
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	434	append_eq_append_conv}.
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	435	*}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	436
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	437	lemma length_append [simp]: "length (xs @ ys) = length xs + length ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	438	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	439
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	440	lemma length_map [simp]: "length (map f xs) = length xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	441	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	442
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	443	lemma length_rev [simp]: "length (rev xs) = length xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	444	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	445
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	446	lemma length_tl [simp]: "length (tl xs) = length xs - 1"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	447	by (cases xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	448
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	449	lemma length_0_conv [iff]: "(length xs = 0) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	450	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	451
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	452	lemma length_greater_0_conv [iff]: "(0 < length xs) = (xs \<noteq> [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	453	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	454
23479 10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	455	lemma length_pos_if_in_set: "x : set xs \<Longrightarrow> length xs > 0"
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	456	by auto
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	457
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	458	lemma length_Suc_conv:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	459	"(length xs = Suc n) = (\<exists>y ys. xs = y # ys \<and> length ys = n)"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	460	by (induct xs) auto
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	461
14025 d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	462	lemma Suc_length_conv:
d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	463	"(Suc n = length xs) = (\<exists>y ys. xs = y # ys \<and> length ys = n)"
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	464	apply (induct xs, simp, simp)
14025 d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	465	apply blast
d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	466	done
d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	467
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	468	lemma impossible_Cons: "length xs <= length ys ==> xs = x # ys = False"
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	469	by (induct xs) auto
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	470
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	471	lemma list_induct2 [consumes 1, case_names Nil Cons]:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	472	"length xs = length ys \<Longrightarrow> P [] [] \<Longrightarrow>
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	473	(\<And>x xs y ys. length xs = length ys \<Longrightarrow> P xs ys \<Longrightarrow> P (x#xs) (y#ys))
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	474	\<Longrightarrow> P xs ys"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	475	proof (induct xs arbitrary: ys)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	476	case Nil then show ?case by simp
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	477	next
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	478	case (Cons x xs ys) then show ?case by (cases ys) simp_all
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	479	qed
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	480
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	481	lemma list_induct3 [consumes 2, case_names Nil Cons]:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	482	"length xs = length ys \<Longrightarrow> length ys = length zs \<Longrightarrow> P [] [] [] \<Longrightarrow>
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	483	(\<And>x xs y ys z zs. length xs = length ys \<Longrightarrow> length ys = length zs \<Longrightarrow> P xs ys zs \<Longrightarrow> P (x#xs) (y#ys) (z#zs))
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	484	\<Longrightarrow> P xs ys zs"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	485	proof (induct xs arbitrary: ys zs)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	486	case Nil then show ?case by simp
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	487	next
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	488	case (Cons x xs ys zs) then show ?case by (cases ys, simp_all)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	489	(cases zs, simp_all)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	490	qed
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	491
22493 db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	492	lemma list_induct2':
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	493	"\<lbrakk> P [] [];
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	494	\<And>x xs. P (x#xs) [];
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	495	\<And>y ys. P [] (y#ys);
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	496	\<And>x xs y ys. P xs ys \<Longrightarrow> P (x#xs) (y#ys) \<rbrakk>
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	497	\<Longrightarrow> P xs ys"
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	498	by (induct xs arbitrary: ys) (case_tac x, auto)+
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	499
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	500	lemma neq_if_length_neq: "length xs \<noteq> length ys \<Longrightarrow> (xs = ys) == False"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	501	by (rule Eq_FalseI) auto
24037 0a41d2ebc0cd proper simproc_setup for "list_neq"; wenzelm parents: 23983 diff changeset	502
0a41d2ebc0cd proper simproc_setup for "list_neq"; wenzelm parents: 23983 diff changeset	503	simproc_setup list_neq ("(xs::'a list) = ys") = {*
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	504	(*
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	505	Reduces xs=ys to False if xs and ys cannot be of the same length.
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	506	This is the case if the atomic sublists of one are a submultiset
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	507	of those of the other list and there are fewer Cons's in one than the other.
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	508	*)
24037 0a41d2ebc0cd proper simproc_setup for "list_neq"; wenzelm parents: 23983 diff changeset	509
0a41d2ebc0cd proper simproc_setup for "list_neq"; wenzelm parents: 23983 diff changeset	510	let
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	511
29856 984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	512	fun len (Const(@{const_name Nil},_)) acc = acc
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	513	\| len (Const(@{const_name Cons},_) $ _ $ xs) (ts,n) = len xs (ts,n+1)
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	514	\| len (Const(@{const_name append},_) $ xs $ ys) acc = len xs (len ys acc)
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	515	\| len (Const(@{const_name rev},_) $ xs) acc = len xs acc
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	516	\| len (Const(@{const_name map},_) $ _ $ xs) acc = len xs acc
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	517	\| len t (ts,n) = (t::ts,n);
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	518
24037 0a41d2ebc0cd proper simproc_setup for "list_neq"; wenzelm parents: 23983 diff changeset	519	fun list_neq _ ss ct =
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	520	let
24037 0a41d2ebc0cd proper simproc_setup for "list_neq"; wenzelm parents: 23983 diff changeset	521	val (Const(_,eqT) $ lhs $ rhs) = Thm.term_of ct;
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	522	val (ls,m) = len lhs ([],0) and (rs,n) = len rhs ([],0);
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	523	fun prove_neq() =
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	524	let
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	525	val Type(_,listT::_) = eqT;
22994 02440636214f abstract size function in hologic.ML haftmann parents: 22940 diff changeset	526	val size = HOLogic.size_const listT;
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	527	val eq_len = HOLogic.mk_eq (size $ lhs, size $ rhs);
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	528	val neq_len = HOLogic.mk_Trueprop (HOLogic.Not $ eq_len);
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	529	val thm = Goal.prove (Simplifier.the_context ss) [] [] neq_len
22633 a47e4fd7ebc1 tuned haftmann parents: 22551 diff changeset	530	(K (simp_tac (Simplifier.inherit_context ss @{simpset}) 1));
a47e4fd7ebc1 tuned haftmann parents: 22551 diff changeset	531	in SOME (thm RS @{thm neq_if_length_neq}) end
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	532	in
23214 dc23c062b58c renamed gen_submultiset to submultiset; wenzelm parents: 23212 diff changeset	533	if m < n andalso submultiset (op aconv) (ls,rs) orelse
dc23c062b58c renamed gen_submultiset to submultiset; wenzelm parents: 23212 diff changeset	534	n < m andalso submultiset (op aconv) (rs,ls)
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	535	then prove_neq() else NONE
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	536	end;
24037 0a41d2ebc0cd proper simproc_setup for "list_neq"; wenzelm parents: 23983 diff changeset	537	in list_neq end;
22143 cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	538	*}
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	539
cf58486ca11b Added simproc list_neq (prompted by an application) nipkow parents: 21911 diff changeset	540
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	541	subsubsection {* @{text "@"} -- append *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	542
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	543	lemma append_assoc [simp]: "(xs @ ys) @ zs = xs @ (ys @ zs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	544	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	545
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	546	lemma append_Nil2 [simp]: "xs @ [] = xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	547	by (induct xs) auto
3507 157be29ad5ba Improved length = size translation. nipkow parents: 3465 diff changeset	548
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	549	lemma append_is_Nil_conv [iff]: "(xs @ ys = []) = (xs = [] \<and> ys = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	550	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	551
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	552	lemma Nil_is_append_conv [iff]: "([] = xs @ ys) = (xs = [] \<and> ys = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	553	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	554
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	555	lemma append_self_conv [iff]: "(xs @ ys = xs) = (ys = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	556	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	557
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	558	lemma self_append_conv [iff]: "(xs = xs @ ys) = (ys = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	559	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	560
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	561	lemma append_eq_append_conv [simp, noatp]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	562	"length xs = length ys \<or> length us = length vs
13883 0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	563	==> (xs@us = ys@vs) = (xs=ys \<and> us=vs)"
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	564	apply (induct xs arbitrary: ys)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	565	apply (case_tac ys, simp, force)
144f45277d5a misc tidying paulson parents: 14187 diff changeset	566	apply (case_tac ys, force, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	567	done
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	568
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	569	lemma append_eq_append_conv2: "(xs @ ys = zs @ ts) =
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	570	(EX us. xs = zs @ us & us @ ys = ts \| xs @ us = zs & ys = us@ ts)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	571	apply (induct xs arbitrary: ys zs ts)
14495 e2a1c31cf6d3 Added append_eq_append_conv2 nipkow parents: 14402 diff changeset	572	apply fastsimp
e2a1c31cf6d3 Added append_eq_append_conv2 nipkow parents: 14402 diff changeset	573	apply(case_tac zs)
e2a1c31cf6d3 Added append_eq_append_conv2 nipkow parents: 14402 diff changeset	574	apply simp
e2a1c31cf6d3 Added append_eq_append_conv2 nipkow parents: 14402 diff changeset	575	apply fastsimp
e2a1c31cf6d3 Added append_eq_append_conv2 nipkow parents: 14402 diff changeset	576	done
e2a1c31cf6d3 Added append_eq_append_conv2 nipkow parents: 14402 diff changeset	577
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	578	lemma same_append_eq [iff]: "(xs @ ys = xs @ zs) = (ys = zs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	579	by simp
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	580
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	581	lemma append1_eq_conv [iff]: "(xs @ [x] = ys @ [y]) = (xs = ys \<and> x = y)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	582	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	583
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	584	lemma append_same_eq [iff]: "(ys @ xs = zs @ xs) = (ys = zs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	585	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	586
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	587	lemma append_self_conv2 [iff]: "(xs @ ys = ys) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	588	using append_same_eq [of _ _ "[]"] by auto
3507 157be29ad5ba Improved length = size translation. nipkow parents: 3465 diff changeset	589
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	590	lemma self_append_conv2 [iff]: "(ys = xs @ ys) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	591	using append_same_eq [of "[]"] by auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	592
24286 7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	593	lemma hd_Cons_tl [simp,noatp]: "xs \<noteq> [] ==> hd xs # tl xs = xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	594	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	595
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	596	lemma hd_append: "hd (xs @ ys) = (if xs = [] then hd ys else hd xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	597	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	598
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	599	lemma hd_append2 [simp]: "xs \<noteq> [] ==> hd (xs @ ys) = hd xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	600	by (simp add: hd_append split: list.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	601
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	602	lemma tl_append: "tl (xs @ ys) = (case xs of [] => tl ys \| z#zs => zs @ ys)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	603	by (simp split: list.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	604
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	605	lemma tl_append2 [simp]: "xs \<noteq> [] ==> tl (xs @ ys) = tl xs @ ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	606	by (simp add: tl_append split: list.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	607
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	608
14300 bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	609	lemma Cons_eq_append_conv: "x#xs = ys@zs =
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	610	(ys = [] & x#xs = zs \| (EX ys'. x#ys' = ys & xs = ys'@zs))"
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	611	by(cases ys) auto
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	612
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	613	lemma append_eq_Cons_conv: "(ys@zs = x#xs) =
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	614	(ys = [] & zs = x#xs \| (EX ys'. ys = x#ys' & ys'@zs = xs))"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	615	by(cases ys) auto
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	616
14300 bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	617
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	618	text {* Trivial rules for solving @{text "@"}-equations automatically. *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	619
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	620	lemma eq_Nil_appendI: "xs = ys ==> xs = [] @ ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	621	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	622
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	623	lemma Cons_eq_appendI:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	624	"[\| x # xs1 = ys; xs = xs1 @ zs \|] ==> x # xs = ys @ zs"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	625	by (drule sym) simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	626
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	627	lemma append_eq_appendI:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	628	"[\| xs @ xs1 = zs; ys = xs1 @ us \|] ==> xs @ ys = zs @ us"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	629	by (drule sym) simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	630
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	631
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	632	text {*
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	633	Simplification procedure for all list equalities.
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	634	Currently only tries to rearrange @{text "@"} to see if
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	635	- both lists end in a singleton list,
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	636	- or both lists end in the same list.
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	637	*}
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	638
26480 544cef16045b replaced 'ML_setup' by 'ML'; wenzelm parents: 26442 diff changeset	639	ML {*
3507 157be29ad5ba Improved length = size translation. nipkow parents: 3465 diff changeset	640	local
157be29ad5ba Improved length = size translation. nipkow parents: 3465 diff changeset	641
29856 984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	642	fun last (cons as Const(@{const_name Cons},_) $ _ $ xs) =
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	643	(case xs of Const(@{const_name Nil},_) => cons \| _ => last xs)
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	644	\| last (Const(@{const_name append},_) $ _ $ ys) = last ys
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	645	\| last t = t;
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	646
29856 984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	647	fun list1 (Const(@{const_name Cons},_) $ _ $ Const(@{const_name Nil},_)) = true
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	648	\| list1 _ = false;
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	649
29856 984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	650	fun butlast ((cons as Const(@{const_name Cons},_) $ x) $ xs) =
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	651	(case xs of Const(@{const_name Nil},_) => xs \| _ => cons $ butlast xs)
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	652	\| butlast ((app as Const(@{const_name append},_) $ xs) $ ys) = app $ butlast ys
984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	653	\| butlast xs = Const(@{const_name Nil},fastype_of xs);
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	654
22633 a47e4fd7ebc1 tuned haftmann parents: 22551 diff changeset	655	val rearr_ss = HOL_basic_ss addsimps [@{thm append_assoc},
a47e4fd7ebc1 tuned haftmann parents: 22551 diff changeset	656	@{thm append_Nil}, @{thm append_Cons}];
16973 b2a894562b8f simprocs: Simplifier.inherit_bounds; wenzelm parents: 16965 diff changeset	657
20044 92cc2f4c7335 simprocs: no theory argument -- use simpset context instead; wenzelm parents: 19890 diff changeset	658	fun list_eq ss (F as (eq as Const(_,eqT)) $ lhs $ rhs) =
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	659	let
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	660	val lastl = last lhs and lastr = last rhs;
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	661	fun rearr conv =
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	662	let
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	663	val lhs1 = butlast lhs and rhs1 = butlast rhs;
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	664	val Type(_,listT::_) = eqT
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	665	val appT = [listT,listT] ---> listT
29856 984191be0357 const_name antiquotations huffman parents: 29829 diff changeset	666	val app = Const(@{const_name append},appT)
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	667	val F2 = eq $ (app$lhs1$lastl) $ (app$rhs1$lastr)
13480 bb72bd43c6c3 use Tactic.prove instead of prove_goalw_cterm in internal proofs! wenzelm parents: 13462 diff changeset	668	val eq = HOLogic.mk_Trueprop (HOLogic.mk_eq (F,F2));
20044 92cc2f4c7335 simprocs: no theory argument -- use simpset context instead; wenzelm parents: 19890 diff changeset	669	val thm = Goal.prove (Simplifier.the_context ss) [] [] eq
17877 67d5ab1cb0d8 Simplifier.inherit_context instead of Simplifier.inherit_bounds; wenzelm parents: 17830 diff changeset	670	(K (simp_tac (Simplifier.inherit_context ss rearr_ss) 1));
15531 08c8dad8e399 Deleted Library.option type. skalberg parents: 15489 diff changeset	671	in SOME ((conv RS (thm RS trans)) RS eq_reflection) end;
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	672
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	673	in
22633 a47e4fd7ebc1 tuned haftmann parents: 22551 diff changeset	674	if list1 lastl andalso list1 lastr then rearr @{thm append1_eq_conv}
a47e4fd7ebc1 tuned haftmann parents: 22551 diff changeset	675	else if lastl aconv lastr then rearr @{thm append_same_eq}
15531 08c8dad8e399 Deleted Library.option type. skalberg parents: 15489 diff changeset	676	else NONE
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	677	end;
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	678
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	679	in
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	680
56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	681	val list_eq_simproc =
28262 aa7ca36d67fd back to dynamic the_context(), because static @{theory} is invalidated if ML environment changes within the same code block; wenzelm parents: 28244 diff changeset	682	Simplifier.simproc (the_context ()) "list_eq" ["(xs::'a list) = ys"] (K list_eq);
13462 56610e2ba220 sane interface for simprocs; wenzelm parents: 13366 diff changeset	683
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	684	end;
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	685
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	686	Addsimprocs [list_eq_simproc];
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	687	*}
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	688
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	689
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	690	subsubsection {* @{text map} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	691
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	692	lemma map_ext: "(!!x. x : set xs --> f x = g x) ==> map f xs = map g xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	693	by (induct xs) simp_all
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	694
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	695	lemma map_ident [simp]: "map (\<lambda>x. x) = (\<lambda>xs. xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	696	by (rule ext, induct_tac xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	697
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	698	lemma map_append [simp]: "map f (xs @ ys) = map f xs @ map f ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	699	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	700
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	701	lemma map_compose: "map (f o g) xs = map f (map g xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	702	by (induct xs) (auto simp add: o_def)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	703
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	704	lemma rev_map: "rev (map f xs) = map f (rev xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	705	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	706
13737 e564c3d2d174 added a few lemmas nipkow parents: 13601 diff changeset	707	lemma map_eq_conv[simp]: "(map f xs = map g xs) = (!x : set xs. f x = g x)"
e564c3d2d174 added a few lemmas nipkow parents: 13601 diff changeset	708	by (induct xs) auto
e564c3d2d174 added a few lemmas nipkow parents: 13601 diff changeset	709
19770 be5c23ebe1eb HOL/Tools/function_package: Added support for mutual recursive definitions. krauss parents: 19623 diff changeset	710	lemma map_cong [fundef_cong, recdef_cong]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	711	"xs = ys ==> (!!x. x : set ys ==> f x = g x) ==> map f xs = map g ys"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	712	-- {* a congruence rule for @{text map} *}
13737 e564c3d2d174 added a few lemmas nipkow parents: 13601 diff changeset	713	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	714
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	715	lemma map_is_Nil_conv [iff]: "(map f xs = []) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	716	by (cases xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	717
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	718	lemma Nil_is_map_conv [iff]: "([] = map f xs) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	719	by (cases xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	720
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	721	lemma map_eq_Cons_conv:
14025 d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	722	"(map f xs = y#ys) = (\<exists>z zs. xs = z#zs \<and> f z = y \<and> map f zs = ys)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	723	by (cases xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	724
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	725	lemma Cons_eq_map_conv:
14025 d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	726	"(x#xs = map f ys) = (\<exists>z zs. ys = z#zs \<and> x = f z \<and> xs = map f zs)"
d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	727	by (cases ys) auto
d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	728
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	729	lemmas map_eq_Cons_D = map_eq_Cons_conv [THEN iffD1]
da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	730	lemmas Cons_eq_map_D = Cons_eq_map_conv [THEN iffD1]
da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	731	declare map_eq_Cons_D [dest!] Cons_eq_map_D [dest!]
da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	732
14111 993471c762b8 Some new thm (ex_map_conv?) nipkow parents: 14099 diff changeset	733	lemma ex_map_conv:
993471c762b8 Some new thm (ex_map_conv?) nipkow parents: 14099 diff changeset	734	"(EX xs. ys = map f xs) = (ALL y : set ys. EX x. y = f x)"
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	735	by(induct ys, auto simp add: Cons_eq_map_conv)
14111 993471c762b8 Some new thm (ex_map_conv?) nipkow parents: 14099 diff changeset	736
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	737	lemma map_eq_imp_length_eq:
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	738	assumes "map f xs = map f ys"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	739	shows "length xs = length ys"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	740	using assms proof (induct ys arbitrary: xs)
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	741	case Nil then show ?case by simp
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	742	next
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	743	case (Cons y ys) then obtain z zs where xs: "xs = z # zs" by auto
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	744	from Cons xs have "map f zs = map f ys" by simp
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	745	moreover with Cons have "length zs = length ys" by blast
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	746	with xs show ?case by simp
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	747	qed
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	748
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	749	lemma map_inj_on:
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	750	"[\| map f xs = map f ys; inj_on f (set xs Un set ys) \|]
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	751	==> xs = ys"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	752	apply(frule map_eq_imp_length_eq)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	753	apply(rotate_tac -1)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	754	apply(induct rule:list_induct2)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	755	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	756	apply(simp)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	757	apply (blast intro:sym)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	758	done
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	759
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	760	lemma inj_on_map_eq_map:
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	761	"inj_on f (set xs Un set ys) \<Longrightarrow> (map f xs = map f ys) = (xs = ys)"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	762	by(blast dest:map_inj_on)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	763
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	764	lemma map_injective:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	765	"map f xs = map f ys ==> inj f ==> xs = ys"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	766	by (induct ys arbitrary: xs) (auto dest!:injD)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	767
14339 ec575b7bde7a * empty log message * nipkow parents: 14338 diff changeset	768	lemma inj_map_eq_map[simp]: "inj f \<Longrightarrow> (map f xs = map f ys) = (xs = ys)"
ec575b7bde7a * empty log message * nipkow parents: 14338 diff changeset	769	by(blast dest:map_injective)
ec575b7bde7a * empty log message * nipkow parents: 14338 diff changeset	770
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	771	lemma inj_mapI: "inj f ==> inj (map f)"
17589 58eeffd73be1 renamed rules to iprover nipkow parents: 17501 diff changeset	772	by (iprover dest: map_injective injD intro: inj_onI)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	773
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	774	lemma inj_mapD: "inj (map f) ==> inj f"
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	775	apply (unfold inj_on_def, clarify)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	776	apply (erule_tac x = "[x]" in ballE)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	777	apply (erule_tac x = "[y]" in ballE, simp, blast)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	778	apply blast
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	779	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	780
14339 ec575b7bde7a * empty log message * nipkow parents: 14338 diff changeset	781	lemma inj_map[iff]: "inj (map f) = inj f"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	782	by (blast dest: inj_mapD intro: inj_mapI)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	783
15303 eedbb8d22ca2 added lemmas nipkow parents: 15302 diff changeset	784	lemma inj_on_mapI: "inj_on f (\<Union>(set ` A)) \<Longrightarrow> inj_on (map f) A"
eedbb8d22ca2 added lemmas nipkow parents: 15302 diff changeset	785	apply(rule inj_onI)
eedbb8d22ca2 added lemmas nipkow parents: 15302 diff changeset	786	apply(erule map_inj_on)
eedbb8d22ca2 added lemmas nipkow parents: 15302 diff changeset	787	apply(blast intro:inj_onI dest:inj_onD)
eedbb8d22ca2 added lemmas nipkow parents: 15302 diff changeset	788	done
eedbb8d22ca2 added lemmas nipkow parents: 15302 diff changeset	789
14343 6bc647f472b9 map_idI kleing parents: 14339 diff changeset	790	lemma map_idI: "(\<And>x. x \<in> set xs \<Longrightarrow> f x = x) \<Longrightarrow> map f xs = xs"
6bc647f472b9 map_idI kleing parents: 14339 diff changeset	791	by (induct xs, auto)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	792
14402 4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	793	lemma map_fun_upd [simp]: "y \<notin> set xs \<Longrightarrow> map (f(y:=v)) xs = map f xs"
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	794	by (induct xs) auto
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	795
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	796	lemma map_fst_zip[simp]:
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	797	"length xs = length ys \<Longrightarrow> map fst (zip xs ys) = xs"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	798	by (induct rule:list_induct2, simp_all)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	799
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	800	lemma map_snd_zip[simp]:
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	801	"length xs = length ys \<Longrightarrow> map snd (zip xs ys) = ys"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	802	by (induct rule:list_induct2, simp_all)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	803
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	804
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	805	subsubsection {* @{text rev} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	806
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	807	lemma rev_append [simp]: "rev (xs @ ys) = rev ys @ rev xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	808	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	809
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	810	lemma rev_rev_ident [simp]: "rev (rev xs) = xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	811	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	812
15870 4320bce5873f more on rev kleing parents: 15868 diff changeset	813	lemma rev_swap: "(rev xs = ys) = (xs = rev ys)"
4320bce5873f more on rev kleing parents: 15868 diff changeset	814	by auto
4320bce5873f more on rev kleing parents: 15868 diff changeset	815
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	816	lemma rev_is_Nil_conv [iff]: "(rev xs = []) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	817	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	818
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	819	lemma Nil_is_rev_conv [iff]: "([] = rev xs) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	820	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	821
15870 4320bce5873f more on rev kleing parents: 15868 diff changeset	822	lemma rev_singleton_conv [simp]: "(rev xs = [x]) = (xs = [x])"
4320bce5873f more on rev kleing parents: 15868 diff changeset	823	by (cases xs) auto
4320bce5873f more on rev kleing parents: 15868 diff changeset	824
4320bce5873f more on rev kleing parents: 15868 diff changeset	825	lemma singleton_rev_conv [simp]: "([x] = rev xs) = (xs = [x])"
4320bce5873f more on rev kleing parents: 15868 diff changeset	826	by (cases xs) auto
4320bce5873f more on rev kleing parents: 15868 diff changeset	827
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	828	lemma rev_is_rev_conv [iff]: "(rev xs = rev ys) = (xs = ys)"
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	829	apply (induct xs arbitrary: ys, force)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	830	apply (case_tac ys, simp, force)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	831	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	832
15439 71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	833	lemma inj_on_rev[iff]: "inj_on rev A"
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	834	by(simp add:inj_on_def)
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	835
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	836	lemma rev_induct [case_names Nil snoc]:
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	837	"[\| P []; !!x xs. P xs ==> P (xs @ [x]) \|] ==> P xs"
15489 d136af442665 Replaced application of subst by simplesubst in proof of rev_induct berghofe parents: 15439 diff changeset	838	apply(simplesubst rev_rev_ident[symmetric])
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	839	apply(rule_tac list = "rev xs" in list.induct, simp_all)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	840	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	841
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	842	lemma rev_exhaust [case_names Nil snoc]:
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	843	"(xs = [] ==> P) ==>(!!ys y. xs = ys @ [y] ==> P) ==> P"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	844	by (induct xs rule: rev_induct) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	845
13366 114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	846	lemmas rev_cases = rev_exhaust
114b7c14084a moved stuff from Main.thy; wenzelm parents: 13187 diff changeset	847
18423 d7859164447f new lemmas nipkow parents: 18336 diff changeset	848	lemma rev_eq_Cons_iff[iff]: "(rev xs = y#ys) = (xs = rev ys @ [y])"
d7859164447f new lemmas nipkow parents: 18336 diff changeset	849	by(rule rev_cases[of xs]) auto
d7859164447f new lemmas nipkow parents: 18336 diff changeset	850
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	851
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	852	subsubsection {* @{text set} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	853
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	854	lemma finite_set [iff]: "finite (set xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	855	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	856
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	857	lemma set_append [simp]: "set (xs @ ys) = (set xs \<union> set ys)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	858	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	859
17830 695a2365d32f added hd lemma nipkow parents: 17765 diff changeset	860	lemma hd_in_set[simp]: "xs \<noteq> [] \<Longrightarrow> hd xs : set xs"
695a2365d32f added hd lemma nipkow parents: 17765 diff changeset	861	by(cases xs) auto
14099 55d244f3c86d added fold_red, o2l, postfix, some thms oheimb parents: 14050 diff changeset	862
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	863	lemma set_subset_Cons: "set xs \<subseteq> set (x # xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	864	by auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	865
14099 55d244f3c86d added fold_red, o2l, postfix, some thms oheimb parents: 14050 diff changeset	866	lemma set_ConsD: "y \<in> set (x # xs) \<Longrightarrow> y=x \<or> y \<in> set xs"
55d244f3c86d added fold_red, o2l, postfix, some thms oheimb parents: 14050 diff changeset	867	by auto
55d244f3c86d added fold_red, o2l, postfix, some thms oheimb parents: 14050 diff changeset	868
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	869	lemma set_empty [iff]: "(set xs = {}) = (xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	870	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	871
15245 5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	872	lemma set_empty2[iff]: "({} = set xs) = (xs = [])"
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	873	by(induct xs) auto
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	874
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	875	lemma set_rev [simp]: "set (rev xs) = set xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	876	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	877
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	878	lemma set_map [simp]: "set (map f xs) = f`(set xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	879	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	880
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	881	lemma set_filter [simp]: "set (filter P xs) = {x. x : set xs \<and> P x}"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	882	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	883
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	884	lemma set_upt [simp]: "set[i..<j] = {k. i \<le> k \<and> k < j}"
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	885	apply (induct j, simp_all)
144f45277d5a misc tidying paulson parents: 14187 diff changeset	886	apply (erule ssubst, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	887	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	888
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	889
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	890	lemma split_list: "x : set xs \<Longrightarrow> \<exists>ys zs. xs = ys @ x # zs"
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	891	proof (induct xs)
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	892	case Nil thus ?case by simp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	893	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	894	case Cons thus ?case by (auto intro: Cons_eq_appendI)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	895	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	896
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	897	lemma in_set_conv_decomp: "x \<in> set xs \<longleftrightarrow> (\<exists>ys zs. xs = ys @ x # zs)"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	898	by (auto elim: split_list)
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	899
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	900	lemma split_list_first: "x : set xs \<Longrightarrow> \<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set ys"
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	901	proof (induct xs)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	902	case Nil thus ?case by simp
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	903	next
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	904	case (Cons a xs)
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	905	show ?case
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	906	proof cases
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	907	assume "x = a" thus ?case using Cons by fastsimp
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	908	next
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	909	assume "x \<noteq> a" thus ?case using Cons by(fastsimp intro!: Cons_eq_appendI)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	910	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	911	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	912
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	913	lemma in_set_conv_decomp_first:
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	914	"(x : set xs) = (\<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set ys)"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	915	by (auto dest!: split_list_first)
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	916
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	917	lemma split_list_last: "x : set xs \<Longrightarrow> \<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set zs"
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	918	proof (induct xs rule:rev_induct)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	919	case Nil thus ?case by simp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	920	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	921	case (snoc a xs)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	922	show ?case
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	923	proof cases
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	924	assume "x = a" thus ?case using snoc by simp (metis ex_in_conv set_empty2)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	925	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	926	assume "x \<noteq> a" thus ?case using snoc by fastsimp
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	927	qed
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	928	qed
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	929
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	930	lemma in_set_conv_decomp_last:
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	931	"(x : set xs) = (\<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set zs)"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	932	by (auto dest!: split_list_last)
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	933
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	934	lemma split_list_prop: "\<exists>x \<in> set xs. P x \<Longrightarrow> \<exists>ys x zs. xs = ys @ x # zs & P x"
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	935	proof (induct xs)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	936	case Nil thus ?case by simp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	937	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	938	case Cons thus ?case
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	939	by(simp add:Bex_def)(metis append_Cons append.simps(1))
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	940	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	941
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	942	lemma split_list_propE:
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	943	assumes "\<exists>x \<in> set xs. P x"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	944	obtains ys x zs where "xs = ys @ x # zs" and "P x"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	945	using split_list_prop [OF assms] by blast
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	946
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	947	lemma split_list_first_prop:
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	948	"\<exists>x \<in> set xs. P x \<Longrightarrow>
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	949	\<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>y \<in> set ys. \<not> P y)"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	950	proof (induct xs)
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	951	case Nil thus ?case by simp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	952	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	953	case (Cons x xs)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	954	show ?case
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	955	proof cases
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	956	assume "P x"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	957	thus ?thesis by simp
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	958	(metis Un_upper1 contra_subsetD in_set_conv_decomp_first self_append_conv2 set_append)
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	959	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	960	assume "\<not> P x"
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	961	hence "\<exists>x\<in>set xs. P x" using Cons(2) by simp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	962	thus ?thesis using `\<not> P x` Cons(1) by (metis append_Cons set_ConsD)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	963	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	964	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	965
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	966	lemma split_list_first_propE:
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	967	assumes "\<exists>x \<in> set xs. P x"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	968	obtains ys x zs where "xs = ys @ x # zs" and "P x" and "\<forall>y \<in> set ys. \<not> P y"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	969	using split_list_first_prop [OF assms] by blast
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	970
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	971	lemma split_list_first_prop_iff:
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	972	"(\<exists>x \<in> set xs. P x) \<longleftrightarrow>
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	973	(\<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>y \<in> set ys. \<not> P y))"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	974	by (rule, erule split_list_first_prop) auto
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	975
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	976	lemma split_list_last_prop:
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	977	"\<exists>x \<in> set xs. P x \<Longrightarrow>
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	978	\<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>z \<in> set zs. \<not> P z)"
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	979	proof(induct xs rule:rev_induct)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	980	case Nil thus ?case by simp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	981	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	982	case (snoc x xs)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	983	show ?case
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	984	proof cases
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	985	assume "P x" thus ?thesis by (metis emptyE set_empty)
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	986	next
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	987	assume "\<not> P x"
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	988	hence "\<exists>x\<in>set xs. P x" using snoc(2) by simp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	989	thus ?thesis using `\<not> P x` snoc(1) by fastsimp
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	990	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	991	qed
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	992
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	993	lemma split_list_last_propE:
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	994	assumes "\<exists>x \<in> set xs. P x"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	995	obtains ys x zs where "xs = ys @ x # zs" and "P x" and "\<forall>z \<in> set zs. \<not> P z"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	996	using split_list_last_prop [OF assms] by blast
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	997
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	998	lemma split_list_last_prop_iff:
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	999	"(\<exists>x \<in> set xs. P x) \<longleftrightarrow>
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	1000	(\<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>z \<in> set zs. \<not> P z))"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	1001	by (metis split_list_last_prop [where P=P] in_set_conv_decomp)
26073 0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	1002
0e70d3bd2eb4 more lemmas nipkow parents: 25966 diff changeset	1003	lemma finite_list: "finite A ==> EX xs. set xs = A"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	1004	by (erule finite_induct)
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	1005	(auto simp add: set.simps(2) [symmetric] simp del: set.simps(2))
13508 890d736b93a5 Frederic Blanqui's new "guard" examples paulson parents: 13480 diff changeset	1006
14388 04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	1007	lemma card_length: "card (set xs) \<le> length xs"
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	1008	by (induct xs) (auto simp add: card_insert_if)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1009
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1010	lemma set_minus_filter_out:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1011	"set xs - {y} = set (filter (\<lambda>x. \<not> (x = y)) xs)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1012	by (induct xs) auto
15168 33a08cfc3ae5 new functions for sets of lists paulson parents: 15140 diff changeset	1013
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1014	subsubsection {* @{text filter} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1015
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1016	lemma filter_append [simp]: "filter P (xs @ ys) = filter P xs @ filter P ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1017	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1018
15305 0bd9eedaa301 added lemmas nipkow parents: 15304 diff changeset	1019	lemma rev_filter: "rev (filter P xs) = filter P (rev xs)"
0bd9eedaa301 added lemmas nipkow parents: 15304 diff changeset	1020	by (induct xs) simp_all
0bd9eedaa301 added lemmas nipkow parents: 15304 diff changeset	1021
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1022	lemma filter_filter [simp]: "filter P (filter Q xs) = filter (\<lambda>x. Q x \<and> P x) xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1023	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1024
16998 e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1025	lemma length_filter_le [simp]: "length (filter P xs) \<le> length xs"
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1026	by (induct xs) (auto simp add: le_SucI)
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1027
18423 d7859164447f new lemmas nipkow parents: 18336 diff changeset	1028	lemma sum_length_filter_compl:
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1029	"length(filter P xs) + length(filter (%x. ~P x) xs) = length xs"
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1030	by(induct xs) simp_all
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1031
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1032	lemma filter_True [simp]: "\<forall>x \<in> set xs. P x ==> filter P xs = xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1033	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1034
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1035	lemma filter_False [simp]: "\<forall>x \<in> set xs. \<not> P x ==> filter P xs = []"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1036	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1037
16998 e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1038	lemma filter_empty_conv: "(filter P xs = []) = (\<forall>x\<in>set xs. \<not> P x)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1039	by (induct xs) simp_all
16998 e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1040
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1041	lemma filter_id_conv: "(filter P xs = xs) = (\<forall>x\<in>set xs. P x)"
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1042	apply (induct xs)
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1043	apply auto
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1044	apply(cut_tac P=P and xs=xs in length_filter_le)
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1045	apply simp
e0050191e2d1 Added filter lemma nipkow parents: 16973 diff changeset	1046	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1047
16965 46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1048	lemma filter_map:
46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1049	"filter P (map f xs) = map f (filter (P o f) xs)"
46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1050	by (induct xs) simp_all
46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1051
46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1052	lemma length_filter_map[simp]:
46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1053	"length (filter P (map f xs)) = length(filter (P o f) xs)"
46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1054	by (simp add:filter_map)
46697fa536ab added map_filter lemmas nipkow parents: 16770 diff changeset	1055
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1056	lemma filter_is_subset [simp]: "set (filter P xs) \<le> set xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1057	by auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1058
15246 0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1059	lemma length_filter_less:
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1060	"\<lbrakk> x : set xs; ~ P x \<rbrakk> \<Longrightarrow> length(filter P xs) < length xs"
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1061	proof (induct xs)
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1062	case Nil thus ?case by simp
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1063	next
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1064	case (Cons x xs) thus ?case
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1065	apply (auto split:split_if_asm)
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1066	using length_filter_le[of P xs] apply arith
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1067	done
0984a2c2868b added and renamed nipkow parents: 15245 diff changeset	1068	qed
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1069
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1070	lemma length_filter_conv_card:
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1071	"length(filter p xs) = card{i. i < length xs & p(xs!i)}"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1072	proof (induct xs)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1073	case Nil thus ?case by simp
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1074	next
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1075	case (Cons x xs)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1076	let ?S = "{i. i < length xs & p(xs!i)}"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1077	have fin: "finite ?S" by(fast intro: bounded_nat_set_is_finite)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1078	show ?case (is "?l = card ?S'")
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1079	proof (cases)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1080	assume "p x"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1081	hence eq: "?S' = insert 0 (Suc ` ?S)"
25162 ad4d5365d9d8 went back to >0 nipkow parents: 25157 diff changeset	1082	by(auto simp: image_def split:nat.split dest:gr0_implies_Suc)
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1083	have "length (filter p (x # xs)) = Suc(card ?S)"
23388 77645da0db85 tuned proofs: avoid implicit prems; wenzelm parents: 23279 diff changeset	1084	using Cons `p x` by simp
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1085	also have "\<dots> = Suc(card(Suc ` ?S))" using fin
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1086	by (simp add: card_image inj_Suc)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1087	also have "\<dots> = card ?S'" using eq fin
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1088	by (simp add:card_insert_if) (simp add:image_def)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1089	finally show ?thesis .
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1090	next
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1091	assume "\<not> p x"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1092	hence eq: "?S' = Suc ` ?S"
25162 ad4d5365d9d8 went back to >0 nipkow parents: 25157 diff changeset	1093	by(auto simp add: image_def split:nat.split elim:lessE)
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1094	have "length (filter p (x # xs)) = card ?S"
23388 77645da0db85 tuned proofs: avoid implicit prems; wenzelm parents: 23279 diff changeset	1095	using Cons `\<not> p x` by simp
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1096	also have "\<dots> = card(Suc ` ?S)" using fin
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1097	by (simp add: card_image inj_Suc)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1098	also have "\<dots> = card ?S'" using eq fin
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1099	by (simp add:card_insert_if)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1100	finally show ?thesis .
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1101	qed
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1102	qed
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1103
17629 f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1104	lemma Cons_eq_filterD:
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1105	"x#xs = filter P ys \<Longrightarrow>
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1106	\<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs"
19585 70a1ce3b23ae removed 'concl is' patterns; wenzelm parents: 19487 diff changeset	1107	(is "_ \<Longrightarrow> \<exists>us vs. ?P ys us vs")
17629 f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1108	proof(induct ys)
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1109	case Nil thus ?case by simp
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1110	next
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1111	case (Cons y ys)
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1112	show ?case (is "\<exists>x. ?Q x")
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1113	proof cases
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1114	assume Py: "P y"
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1115	show ?thesis
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1116	proof cases
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1117	assume "x = y"
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1118	with Py Cons.prems have "?Q []" by simp
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1119	then show ?thesis ..
17629 f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1120	next
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1121	assume "x \<noteq> y"
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1122	with Py Cons.prems show ?thesis by simp
17629 f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1123	qed
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1124	next
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1125	assume "\<not> P y"
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1126	with Cons obtain us vs where "?P (y#ys) (y#us) vs" by fastsimp
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1127	then have "?Q (y#us)" by simp
5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1128	then show ?thesis ..
17629 f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1129	qed
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1130	qed
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1131
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1132	lemma filter_eq_ConsD:
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1133	"filter P ys = x#xs \<Longrightarrow>
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1134	\<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs"
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1135	by(rule Cons_eq_filterD) simp
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1136
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1137	lemma filter_eq_Cons_iff:
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1138	"(filter P ys = x#xs) =
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1139	(\<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs)"
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1140	by(auto dest:filter_eq_ConsD)
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1141
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1142	lemma Cons_eq_filter_iff:
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1143	"(x#xs = filter P ys) =
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1144	(\<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs)"
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1145	by(auto dest:Cons_eq_filterD)
f8ea8068c6d9 a few new filter lemmas nipkow parents: 17589 diff changeset	1146
19770 be5c23ebe1eb HOL/Tools/function_package: Added support for mutual recursive definitions. krauss parents: 19623 diff changeset	1147	lemma filter_cong[fundef_cong, recdef_cong]:
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1148	"xs = ys \<Longrightarrow> (\<And>x. x \<in> set ys \<Longrightarrow> P x = Q x) \<Longrightarrow> filter P xs = filter Q ys"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1149	apply simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1150	apply(erule thin_rl)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1151	by (induct ys) simp_all
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1152
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1153
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1154	subsubsection {* List partitioning *}
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1155
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1156	primrec partition :: "('a \<Rightarrow> bool) \<Rightarrow>'a list \<Rightarrow> 'a list \<times> 'a list" where
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1157	"partition P [] = ([], [])"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1158	\| "partition P (x # xs) =
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1159	(let (yes, no) = partition P xs
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1160	in if P x then (x # yes, no) else (yes, x # no))"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1161
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1162	lemma partition_filter1:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1163	"fst (partition P xs) = filter P xs"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1164	by (induct xs) (auto simp add: Let_def split_def)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1165
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1166	lemma partition_filter2:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1167	"snd (partition P xs) = filter (Not o P) xs"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1168	by (induct xs) (auto simp add: Let_def split_def)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1169
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1170	lemma partition_P:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1171	assumes "partition P xs = (yes, no)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1172	shows "(\<forall>p \<in> set yes. P p) \<and> (\<forall>p \<in> set no. \<not> P p)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1173	proof -
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1174	from assms have "yes = fst (partition P xs)" and "no = snd (partition P xs)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1175	by simp_all
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1176	then show ?thesis by (simp_all add: partition_filter1 partition_filter2)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1177	qed
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1178
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1179	lemma partition_set:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1180	assumes "partition P xs = (yes, no)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1181	shows "set yes \<union> set no = set xs"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1182	proof -
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1183	from assms have "yes = fst (partition P xs)" and "no = snd (partition P xs)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1184	by simp_all
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1185	then show ?thesis by (auto simp add: partition_filter1 partition_filter2)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1186	qed
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1187
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	1188
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1189	subsubsection {* @{text concat} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1190
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1191	lemma concat_append [simp]: "concat (xs @ ys) = concat xs @ concat ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1192	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1193
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	1194	lemma concat_eq_Nil_conv [simp]: "(concat xss = []) = (\<forall>xs \<in> set xss. xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1195	by (induct xss) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1196
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	1197	lemma Nil_eq_concat_conv [simp]: "([] = concat xss) = (\<forall>xs \<in> set xss. xs = [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1198	by (induct xss) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1199
24308 700e745994c1 removed set_concat_map and improved set_concat nipkow parents: 24286 diff changeset	1200	lemma set_concat [simp]: "set (concat xs) = (UN x:set xs. set x)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1201	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1202
24476 f7ad9fbbeeaa turned list comprehension translations into ML to optimize base case nipkow parents: 24471 diff changeset	1203	lemma concat_map_singleton[simp]: "concat(map (%x. [f x]) xs) = map f xs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1204	by (induct xs) auto
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1205
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1206	lemma map_concat: "map f (concat xs) = concat (map (map f) xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1207	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1208
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1209	lemma filter_concat: "filter p (concat xs) = concat (map (filter p) xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1210	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1211
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1212	lemma rev_concat: "rev (concat xs) = concat (map rev (rev xs))"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1213	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1214
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1215
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1216	subsubsection {* @{text nth} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1217
29827 c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1218	lemma nth_Cons_0 [simp, code]: "(x # xs)!0 = x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1219	by auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1220
29827 c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1221	lemma nth_Cons_Suc [simp, code]: "(x # xs)!(Suc n) = xs!n"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1222	by auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1223
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1224	declare nth.simps [simp del]
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1225
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1226	lemma nth_append:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1227	"(xs @ ys)!n = (if n < length xs then xs!n else ys!(n - length xs))"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1228	apply (induct xs arbitrary: n, simp)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1229	apply (case_tac n, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1230	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1231
14402 4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1232	lemma nth_append_length [simp]: "(xs @ x # ys) ! length xs = x"
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1233	by (induct xs) auto
14402 4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1234
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1235	lemma nth_append_length_plus[simp]: "(xs @ ys) ! (length xs + n) = ys ! n"
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	1236	by (induct xs) auto
14402 4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1237
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1238	lemma nth_map [simp]: "n < length xs ==> (map f xs)!n = f(xs!n)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1239	apply (induct xs arbitrary: n, simp)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1240	apply (case_tac n, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1241	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1242
18423 d7859164447f new lemmas nipkow parents: 18336 diff changeset	1243	lemma hd_conv_nth: "xs \<noteq> [] \<Longrightarrow> hd xs = xs!0"
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1244	by(cases xs) simp_all
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1245
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	1246
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	1247	lemma list_eq_iff_nth_eq:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1248	"(xs = ys) = (length xs = length ys \<and> (ALL i<length xs. xs!i = ys!i))"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1249	apply(induct xs arbitrary: ys)
24632 779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	1250	apply force
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	1251	apply(case_tac ys)
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	1252	apply simp
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	1253	apply(simp add:nth_Cons split:nat.split)apply blast
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	1254	done
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	1255
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1256	lemma set_conv_nth: "set xs = {xs!i \| i. i < length xs}"
15251 bb6f072c8d10 converted some induct_tac to induct paulson parents: 15246 diff changeset	1257	apply (induct xs, simp, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1258	apply safe
24632 779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	1259	apply (metis nat_case_0 nth.simps zero_less_Suc)
779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	1260	apply (metis less_Suc_eq_0_disj nth_Cons_Suc)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1261	apply (case_tac i, simp)
24632 779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	1262	apply (metis diff_Suc_Suc nat_case_Suc nth.simps zero_less_diff)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1263	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1264
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1265	lemma in_set_conv_nth: "(x \<in> set xs) = (\<exists>i < length xs. xs!i = x)"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1266	by(auto simp:set_conv_nth)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1267
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1268	lemma list_ball_nth: "[\| n < length xs; !x : set xs. P x\|] ==> P(xs!n)"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1269	by (auto simp add: set_conv_nth)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1270
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1271	lemma nth_mem [simp]: "n < length xs ==> xs!n : set xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1272	by (auto simp add: set_conv_nth)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1273
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1274	lemma all_nth_imp_all_set:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1275	"[\| !i < length xs. P(xs!i); x : set xs\|] ==> P x"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1276	by (auto simp add: set_conv_nth)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1277
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1278	lemma all_set_conv_all_nth:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1279	"(\<forall>x \<in> set xs. P x) = (\<forall>i. i < length xs --> P (xs ! i))"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1280	by (auto simp add: set_conv_nth)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1281
25296 c187b7422156 rev_nth kleing parents: 25287 diff changeset	1282	lemma rev_nth:
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1283	"n < size xs \<Longrightarrow> rev xs ! n = xs ! (length xs - Suc n)"
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1284	proof (induct xs arbitrary: n)
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1285	case Nil thus ?case by simp
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1286	next
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1287	case (Cons x xs)
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1288	hence n: "n < Suc (length xs)" by simp
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1289	moreover
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1290	{ assume "n < length xs"
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1291	with n obtain n' where "length xs - n = Suc n'"
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1292	by (cases "length xs - n", auto)
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1293	moreover
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1294	then have "length xs - Suc n = n'" by simp
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1295	ultimately
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1296	have "xs ! (length xs - Suc n) = (x # xs) ! (length xs - n)" by simp
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1297	}
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1298	ultimately
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1299	show ?case by (clarsimp simp add: Cons nth_append)
c187b7422156 rev_nth kleing parents: 25287 diff changeset	1300	qed
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1301
31159 bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1302	lemma Skolem_list_nth:
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1303	"(ALL i<k. EX x. P i x) = (EX xs. size xs = k & (ALL i<k. P i (xs!i)))"
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1304	(is "_ = (EX xs. ?P k xs)")
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1305	proof(induct k)
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1306	case 0 show ?case by simp
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1307	next
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1308	case (Suc k)
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1309	show ?case (is "?L = ?R" is "_ = (EX xs. ?P' xs)")
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1310	proof
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1311	assume "?R" thus "?L" using Suc by auto
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1312	next
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1313	assume "?L"
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1314	with Suc obtain x xs where "?P k xs & P k x" by (metis less_Suc_eq)
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1315	hence "?P'(xs@[x])" by(simp add:nth_append less_Suc_eq)
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1316	thus "?R" ..
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1317	qed
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1318	qed
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1319
bac0d673b6d6 new lemma nipkow parents: 31154 diff changeset	1320
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1321	subsubsection {* @{text list_update} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1322
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1323	lemma length_list_update [simp]: "length(xs[i:=x]) = length xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1324	by (induct xs arbitrary: i) (auto split: nat.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1325
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1326	lemma nth_list_update:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1327	"i < length xs==> (xs[i:=x])!j = (if i = j then x else xs!j)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1328	by (induct xs arbitrary: i j) (auto simp add: nth_Cons split: nat.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1329
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1330	lemma nth_list_update_eq [simp]: "i < length xs ==> (xs[i:=x])!i = x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1331	by (simp add: nth_list_update)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1332
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1333	lemma nth_list_update_neq [simp]: "i \<noteq> j ==> xs[i:=x]!j = xs!j"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1334	by (induct xs arbitrary: i j) (auto simp add: nth_Cons split: nat.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1335
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1336	lemma list_update_id[simp]: "xs[i := xs!i] = xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1337	by (induct xs arbitrary: i) (simp_all split:nat.splits)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1338
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1339	lemma list_update_beyond[simp]: "length xs \<le> i \<Longrightarrow> xs[i:=x] = xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1340	apply (induct xs arbitrary: i)
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1341	apply simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1342	apply (case_tac i)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1343	apply simp_all
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1344	done
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1345
31077 28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1346	lemma list_update_nonempty[simp]: "xs[k:=x] = [] \<longleftrightarrow> xs=[]"
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1347	by(metis length_0_conv length_list_update)
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1348
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1349	lemma list_update_same_conv:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1350	"i < length xs ==> (xs[i := x] = xs) = (xs!i = x)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1351	by (induct xs arbitrary: i) (auto split: nat.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1352
14187 26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1353	lemma list_update_append1:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1354	"i < size xs \<Longrightarrow> (xs @ ys)[i:=x] = xs[i:=x] @ ys"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1355	apply (induct xs arbitrary: i, simp)
14187 26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1356	apply(simp split:nat.split)
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1357	done
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1358
15868 9634b3f9d910 more about list_update kleing parents: 15693 diff changeset	1359	lemma list_update_append:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1360	"(xs @ ys) [n:= x] =
15868 9634b3f9d910 more about list_update kleing parents: 15693 diff changeset	1361	(if n < length xs then xs[n:= x] @ ys else xs @ (ys [n-length xs:= x]))"
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1362	by (induct xs arbitrary: n) (auto split:nat.splits)
15868 9634b3f9d910 more about list_update kleing parents: 15693 diff changeset	1363
14402 4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1364	lemma list_update_length [simp]:
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1365	"(xs @ x # ys)[length xs := y] = (xs @ y # ys)"
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1366	by (induct xs, auto)
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	1367
31264 2662d1cdc51f more lemmas nipkow parents: 31258 diff changeset	1368	lemma map_update: "map f (xs[k:= y]) = (map f xs)[k := f y]"
2662d1cdc51f more lemmas nipkow parents: 31258 diff changeset	1369	by(induct xs arbitrary: k)(auto split:nat.splits)
2662d1cdc51f more lemmas nipkow parents: 31258 diff changeset	1370
2662d1cdc51f more lemmas nipkow parents: 31258 diff changeset	1371	lemma rev_update:
2662d1cdc51f more lemmas nipkow parents: 31258 diff changeset	1372	"k < length xs \<Longrightarrow> rev (xs[k:= y]) = (rev xs)[length xs - k - 1 := y]"
2662d1cdc51f more lemmas nipkow parents: 31258 diff changeset	1373	by (induct xs arbitrary: k) (auto simp: list_update_append split:nat.splits)
2662d1cdc51f more lemmas nipkow parents: 31258 diff changeset	1374
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1375	lemma update_zip:
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1376	"(zip xs ys)[i:=xy] = zip (xs[i:=fst xy]) (ys[i:=snd xy])"
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1377	by (induct ys arbitrary: i xy xs) (auto, case_tac xs, auto split: nat.split)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1378
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1379	lemma set_update_subset_insert: "set(xs[i:=x]) <= insert x (set xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1380	by (induct xs arbitrary: i) (auto split: nat.split)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1381
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1382	lemma set_update_subsetI: "[\| set xs <= A; x:A \|] ==> set(xs[i := x]) <= A"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1383	by (blast dest!: set_update_subset_insert [THEN subsetD])
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1384
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1385	lemma set_update_memI: "n < length xs \<Longrightarrow> x \<in> set (xs[n := x])"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1386	by (induct xs arbitrary: n) (auto split:nat.splits)
15868 9634b3f9d910 more about list_update kleing parents: 15693 diff changeset	1387
31077 28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1388	lemma list_update_overwrite[simp]:
24796 529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1389	"xs [i := x, i := y] = xs [i := y]"
31077 28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1390	apply (induct xs arbitrary: i) apply simp
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1391	apply (case_tac i, simp_all)
24796 529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1392	done
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1393
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1394	lemma list_update_swap:
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1395	"i \<noteq> i' \<Longrightarrow> xs [i := x, i' := x'] = xs [i' := x', i := x]"
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1396	apply (induct xs arbitrary: i i')
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1397	apply simp
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1398	apply (case_tac i, case_tac i')
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1399	apply auto
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1400	apply (case_tac i')
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1401	apply auto
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1402	done
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1403
29827 c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1404	lemma list_update_code [code]:
c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1405	"[][i := y] = []"
c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1406	"(x # xs)[0 := y] = y # xs"
c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1407	"(x # xs)[Suc i := y] = x # xs[i := y]"
c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1408	by simp_all
c82b3e8a4daf code theorems for nth, list_update haftmann parents: 29822 diff changeset	1409
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1410
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1411	subsubsection {* @{text last} and @{text butlast} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1412
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1413	lemma last_snoc [simp]: "last (xs @ [x]) = x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1414	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1415
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1416	lemma butlast_snoc [simp]: "butlast (xs @ [x]) = xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1417	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1418
14302 6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1419	lemma last_ConsL: "xs = [] \<Longrightarrow> last(x#xs) = x"
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1420	by(simp add:last.simps)
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1421
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1422	lemma last_ConsR: "xs \<noteq> [] \<Longrightarrow> last(x#xs) = last xs"
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1423	by(simp add:last.simps)
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1424
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1425	lemma last_append: "last(xs @ ys) = (if ys = [] then last xs else last ys)"
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1426	by (induct xs) (auto)
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1427
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1428	lemma last_appendL[simp]: "ys = [] \<Longrightarrow> last(xs @ ys) = last xs"
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1429	by(simp add:last_append)
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1430
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1431	lemma last_appendR[simp]: "ys \<noteq> [] \<Longrightarrow> last(xs @ ys) = last ys"
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1432	by(simp add:last_append)
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	1433
17762 478869f444ca new hd/rev/last lemmas nipkow parents: 17724 diff changeset	1434	lemma hd_rev: "xs \<noteq> [] \<Longrightarrow> hd(rev xs) = last xs"
478869f444ca new hd/rev/last lemmas nipkow parents: 17724 diff changeset	1435	by(rule rev_exhaust[of xs]) simp_all
478869f444ca new hd/rev/last lemmas nipkow parents: 17724 diff changeset	1436
478869f444ca new hd/rev/last lemmas nipkow parents: 17724 diff changeset	1437	lemma last_rev: "xs \<noteq> [] \<Longrightarrow> last(rev xs) = hd xs"
478869f444ca new hd/rev/last lemmas nipkow parents: 17724 diff changeset	1438	by(cases xs) simp_all
478869f444ca new hd/rev/last lemmas nipkow parents: 17724 diff changeset	1439
17765 e3cd31bc2e40 added last in set lemma nipkow parents: 17762 diff changeset	1440	lemma last_in_set[simp]: "as \<noteq> [] \<Longrightarrow> last as \<in> set as"
e3cd31bc2e40 added last in set lemma nipkow parents: 17762 diff changeset	1441	by (induct as) auto
17762 478869f444ca new hd/rev/last lemmas nipkow parents: 17724 diff changeset	1442
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1443	lemma length_butlast [simp]: "length (butlast xs) = length xs - 1"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1444	by (induct xs rule: rev_induct) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1445
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1446	lemma butlast_append:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1447	"butlast (xs @ ys) = (if ys = [] then butlast xs else xs @ butlast ys)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1448	by (induct xs arbitrary: ys) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1449
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1450	lemma append_butlast_last_id [simp]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1451	"xs \<noteq> [] ==> butlast xs @ [last xs] = xs"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1452	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1453
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1454	lemma in_set_butlastD: "x : set (butlast xs) ==> x : set xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1455	by (induct xs) (auto split: split_if_asm)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1456
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1457	lemma in_set_butlast_appendI:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1458	"x : set (butlast xs) \| x : set (butlast ys) ==> x : set (butlast (xs @ ys))"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1459	by (auto dest: in_set_butlastD simp add: butlast_append)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1460
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1461	lemma last_drop[simp]: "n < length xs \<Longrightarrow> last (drop n xs) = last xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1462	apply (induct xs arbitrary: n)
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1463	apply simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1464	apply (auto split:nat.split)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1465	done
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1466
30128 365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1467	lemma last_conv_nth: "xs\<noteq>[] \<Longrightarrow> last xs = xs!(length xs - 1)"
17589 58eeffd73be1 renamed rules to iprover nipkow parents: 17501 diff changeset	1468	by(induct xs)(auto simp:neq_Nil_conv)
58eeffd73be1 renamed rules to iprover nipkow parents: 17501 diff changeset	1469
30128 365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1470	lemma butlast_conv_take: "butlast xs = take (length xs - 1) xs"
26584 46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1471	by (induct xs, simp, case_tac xs, simp_all)
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1472
31077 28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1473	lemma last_list_update:
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1474	"xs \<noteq> [] \<Longrightarrow> last(xs[k:=x]) = (if k = size xs - 1 then x else last xs)"
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1475	by (auto simp: last_conv_nth)
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1476
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1477	lemma butlast_list_update:
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1478	"butlast(xs[k:=x]) =
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1479	(if k = size xs - 1 then butlast xs else (butlast xs)[k:=x])"
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1480	apply(cases xs rule:rev_cases)
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1481	apply simp
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1482	apply(simp add:list_update_append split:nat.splits)
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1483	done
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1484
24796 529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1485
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1486	subsubsection {* @{text take} and @{text drop} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1487
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1488	lemma take_0 [simp]: "take 0 xs = []"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1489	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1490
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1491	lemma drop_0 [simp]: "drop 0 xs = xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1492	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1493
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1494	lemma take_Suc_Cons [simp]: "take (Suc n) (x # xs) = x # take n xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1495	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1496
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1497	lemma drop_Suc_Cons [simp]: "drop (Suc n) (x # xs) = drop n xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1498	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1499
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1500	declare take_Cons [simp del] and drop_Cons [simp del]
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1501
30128 365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1502	lemma take_1_Cons [simp]: "take 1 (x # xs) = [x]"
365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1503	unfolding One_nat_def by simp
365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1504
365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1505	lemma drop_1_Cons [simp]: "drop 1 (x # xs) = xs"
365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1506	unfolding One_nat_def by simp
365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1507
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1508	lemma take_Suc: "xs ~= [] ==> take (Suc n) xs = hd xs # take n (tl xs)"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1509	by(clarsimp simp add:neq_Nil_conv)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1510
14187 26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1511	lemma drop_Suc: "drop (Suc n) xs = drop n (tl xs)"
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1512	by(cases xs, simp_all)
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1513
26584 46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1514	lemma take_tl: "take n (tl xs) = tl (take (Suc n) xs)"
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1515	by (induct xs arbitrary: n) simp_all
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1516
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1517	lemma drop_tl: "drop n (tl xs) = tl(drop n xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1518	by(induct xs arbitrary: n, simp_all add:drop_Cons drop_Suc split:nat.split)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1519
26584 46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1520	lemma tl_take: "tl (take n xs) = take (n - 1) (tl xs)"
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1521	by (cases n, simp, cases xs, auto)
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1522
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1523	lemma tl_drop: "tl (drop n xs) = drop n (tl xs)"
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1524	by (simp only: drop_tl)
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1525
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1526	lemma nth_via_drop: "drop n xs = y#ys \<Longrightarrow> xs!n = y"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1527	apply (induct xs arbitrary: n, simp)
14187 26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1528	apply(simp add:drop_Cons nth_Cons split:nat.splits)
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1529	done
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1530
13913 b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1531	lemma take_Suc_conv_app_nth:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1532	"i < length xs \<Longrightarrow> take (Suc i) xs = take i xs @ [xs!i]"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1533	apply (induct xs arbitrary: i, simp)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1534	apply (case_tac i, auto)
13913 b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1535	done
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1536
14591 7be4d5dadf15 lemma drop_Suc_conv_tl added. mehta parents: 14589 diff changeset	1537	lemma drop_Suc_conv_tl:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1538	"i < length xs \<Longrightarrow> (xs!i) # (drop (Suc i) xs) = drop i xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1539	apply (induct xs arbitrary: i, simp)
14591 7be4d5dadf15 lemma drop_Suc_conv_tl added. mehta parents: 14589 diff changeset	1540	apply (case_tac i, auto)
7be4d5dadf15 lemma drop_Suc_conv_tl added. mehta parents: 14589 diff changeset	1541	done
7be4d5dadf15 lemma drop_Suc_conv_tl added. mehta parents: 14589 diff changeset	1542
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1543	lemma length_take [simp]: "length (take n xs) = min (length xs) n"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1544	by (induct n arbitrary: xs) (auto, case_tac xs, auto)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1545
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1546	lemma length_drop [simp]: "length (drop n xs) = (length xs - n)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1547	by (induct n arbitrary: xs) (auto, case_tac xs, auto)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1548
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1549	lemma take_all [simp]: "length xs <= n ==> take n xs = xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1550	by (induct n arbitrary: xs) (auto, case_tac xs, auto)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1551
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1552	lemma drop_all [simp]: "length xs <= n ==> drop n xs = []"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1553	by (induct n arbitrary: xs) (auto, case_tac xs, auto)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1554
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1555	lemma take_append [simp]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1556	"take n (xs @ ys) = (take n xs @ take (n - length xs) ys)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1557	by (induct n arbitrary: xs) (auto, case_tac xs, auto)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1558
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1559	lemma drop_append [simp]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1560	"drop n (xs @ ys) = drop n xs @ drop (n - length xs) ys"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1561	by (induct n arbitrary: xs) (auto, case_tac xs, auto)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1562
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1563	lemma take_take [simp]: "take n (take m xs) = take (min n m) xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1564	apply (induct m arbitrary: xs n, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1565	apply (case_tac xs, auto)
15236 f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15176 diff changeset	1566	apply (case_tac n, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1567	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1568
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1569	lemma drop_drop [simp]: "drop n (drop m xs) = drop (n + m) xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1570	apply (induct m arbitrary: xs, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1571	apply (case_tac xs, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1572	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1573
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1574	lemma take_drop: "take n (drop m xs) = drop m (take (n + m) xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1575	apply (induct m arbitrary: xs n, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1576	apply (case_tac xs, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1577	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1578
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1579	lemma drop_take: "drop n (take m xs) = take (m-n) (drop n xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1580	apply(induct xs arbitrary: m n)
14802 e05116289ff9 added drop_take:thm nipkow parents: 14770 diff changeset	1581	apply simp
e05116289ff9 added drop_take:thm nipkow parents: 14770 diff changeset	1582	apply(simp add: take_Cons drop_Cons split:nat.split)
e05116289ff9 added drop_take:thm nipkow parents: 14770 diff changeset	1583	done
e05116289ff9 added drop_take:thm nipkow parents: 14770 diff changeset	1584
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1585	lemma append_take_drop_id [simp]: "take n xs @ drop n xs = xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1586	apply (induct n arbitrary: xs, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1587	apply (case_tac xs, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1588	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1589
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1590	lemma take_eq_Nil[simp]: "(take n xs = []) = (n = 0 \<or> xs = [])"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1591	apply(induct xs arbitrary: n)
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1592	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1593	apply(simp add:take_Cons split:nat.split)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1594	done
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1595
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1596	lemma drop_eq_Nil[simp]: "(drop n xs = []) = (length xs <= n)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1597	apply(induct xs arbitrary: n)
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1598	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1599	apply(simp add:drop_Cons split:nat.split)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1600	done
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1601
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1602	lemma take_map: "take n (map f xs) = map f (take n xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1603	apply (induct n arbitrary: xs, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1604	apply (case_tac xs, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1605	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1606
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1607	lemma drop_map: "drop n (map f xs) = map f (drop n xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1608	apply (induct n arbitrary: xs, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1609	apply (case_tac xs, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1610	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1611
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1612	lemma rev_take: "rev (take i xs) = drop (length xs - i) (rev xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1613	apply (induct xs arbitrary: i, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1614	apply (case_tac i, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1615	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1616
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1617	lemma rev_drop: "rev (drop i xs) = take (length xs - i) (rev xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1618	apply (induct xs arbitrary: i, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1619	apply (case_tac i, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1620	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1621
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1622	lemma nth_take [simp]: "i < n ==> (take n xs)!i = xs!i"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1623	apply (induct xs arbitrary: i n, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1624	apply (case_tac n, blast)
144f45277d5a misc tidying paulson parents: 14187 diff changeset	1625	apply (case_tac i, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1626	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1627
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1628	lemma nth_drop [simp]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1629	"n + i <= length xs ==> (drop n xs)!i = xs!(n + i)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1630	apply (induct n arbitrary: xs i, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1631	apply (case_tac xs, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1632	done
3507 157be29ad5ba Improved length = size translation. nipkow parents: 3465 diff changeset	1633
26584 46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1634	lemma butlast_take:
30128 365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1635	"n <= length xs ==> butlast (take n xs) = take (n - 1) xs"
26584 46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1636	by (simp add: butlast_conv_take min_max.inf_absorb1 min_max.inf_absorb2)
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1637
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1638	lemma butlast_drop: "butlast (drop n xs) = drop n (butlast xs)"
30128 365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1639	by (simp add: butlast_conv_take drop_take add_ac)
26584 46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1640
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1641	lemma take_butlast: "n < length xs ==> take n (butlast xs) = take n xs"
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1642	by (simp add: butlast_conv_take min_max.inf_absorb1)
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1643
46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1644	lemma drop_butlast: "drop n (butlast xs) = butlast (drop n xs)"
30128 365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	1645	by (simp add: butlast_conv_take drop_take add_ac)
26584 46f3b89b2445 move lemmas from Word/BinBoolList.thy to List.thy huffman parents: 26480 diff changeset	1646
18423 d7859164447f new lemmas nipkow parents: 18336 diff changeset	1647	lemma hd_drop_conv_nth: "\<lbrakk> xs \<noteq> []; n < length xs \<rbrakk> \<Longrightarrow> hd(drop n xs) = xs!n"
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1648	by(simp add: hd_conv_nth)
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1649
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1650	lemma set_take_subset: "set(take n xs) \<subseteq> set xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1651	by(induct xs arbitrary: n)(auto simp:take_Cons split:nat.split)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1652
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1653	lemma set_drop_subset: "set(drop n xs) \<subseteq> set xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1654	by(induct xs arbitrary: n)(auto simp:drop_Cons split:nat.split)
14025 d9b155757dc8 * empty log message * nipkow parents: 13913 diff changeset	1655
14187 26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1656	lemma in_set_takeD: "x : set(take n xs) \<Longrightarrow> x : set xs"
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1657	using set_take_subset by fast
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1658
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1659	lemma in_set_dropD: "x : set(drop n xs) \<Longrightarrow> x : set xs"
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1660	using set_drop_subset by fast
26dfcd0ac436 Added new theorems nipkow parents: 14111 diff changeset	1661
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1662	lemma append_eq_conv_conj:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1663	"(xs @ ys = zs) = (xs = take (length xs) zs \<and> ys = drop (length xs) zs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1664	apply (induct xs arbitrary: zs, simp, clarsimp)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1665	apply (case_tac zs, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1666	done
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1667
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1668	lemma take_add:
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1669	"i+j \<le> length(xs) \<Longrightarrow> take (i+j) xs = take i xs @ take j (drop i xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1670	apply (induct xs arbitrary: i, auto)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1671	apply (case_tac i, simp_all)
14050 826037db30cd new theorem paulson parents: 14025 diff changeset	1672	done
826037db30cd new theorem paulson parents: 14025 diff changeset	1673
14300 bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1674	lemma append_eq_append_conv_if:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1675	"(xs\<^isub>1 @ xs\<^isub>2 = ys\<^isub>1 @ ys\<^isub>2) =
14300 bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1676	(if size xs\<^isub>1 \<le> size ys\<^isub>1
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1677	then xs\<^isub>1 = take (size xs\<^isub>1) ys\<^isub>1 \<and> xs\<^isub>2 = drop (size xs\<^isub>1) ys\<^isub>1 @ ys\<^isub>2
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1678	else take (size ys\<^isub>1) xs\<^isub>1 = ys\<^isub>1 \<and> drop (size ys\<^isub>1) xs\<^isub>1 @ xs\<^isub>2 = ys\<^isub>2)"
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1679	apply(induct xs\<^isub>1 arbitrary: ys\<^isub>1)
14300 bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1680	apply simp
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1681	apply(case_tac ys\<^isub>1)
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1682	apply simp_all
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1683	done
bf8b8c9425c3 * empty log message * nipkow parents: 14247 diff changeset	1684
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1685	lemma take_hd_drop:
30079 293b896b9c25 make proofs work whether or not One_nat_def is a simp rule; replace 1 with Suc 0 in the rhs of some simp rules huffman parents: 30008 diff changeset	1686	"n < length xs \<Longrightarrow> take n xs @ [hd (drop n xs)] = take (Suc n) xs"
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1687	apply(induct xs arbitrary: n)
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1688	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1689	apply(simp add:drop_Cons split:nat.split)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1690	done
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	1691
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1692	lemma id_take_nth_drop:
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1693	"i < length xs \<Longrightarrow> xs = take i xs @ xs!i # drop (Suc i) xs"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1694	proof -
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1695	assume si: "i < length xs"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1696	hence "xs = take (Suc i) xs @ drop (Suc i) xs" by auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1697	moreover
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1698	from si have "take (Suc i) xs = take i xs @ [xs!i]"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1699	apply (rule_tac take_Suc_conv_app_nth) by arith
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1700	ultimately show ?thesis by auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1701	qed
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1702
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1703	lemma upd_conv_take_nth_drop:
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1704	"i < length xs \<Longrightarrow> xs[i:=a] = take i xs @ a # drop (Suc i) xs"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1705	proof -
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1706	assume i: "i < length xs"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1707	have "xs[i:=a] = (take i xs @ xs!i # drop (Suc i) xs)[i:=a]"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1708	by(rule arg_cong[OF id_take_nth_drop[OF i]])
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1709	also have "\<dots> = take i xs @ a # drop (Suc i) xs"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1710	using i by (simp add: list_update_append)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1711	finally show ?thesis .
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1712	qed
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1713
24796 529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1714	lemma nth_drop':
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1715	"i < length xs \<Longrightarrow> xs ! i # drop (Suc i) xs = drop i xs"
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1716	apply (induct i arbitrary: xs)
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1717	apply (simp add: neq_Nil_conv)
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1718	apply (erule exE)+
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1719	apply simp
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1720	apply (case_tac xs)
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1721	apply simp_all
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1722	done
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	1723
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1724
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1725	subsubsection {* @{text takeWhile} and @{text dropWhile} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1726
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1727	lemma takeWhile_dropWhile_id [simp]: "takeWhile P xs @ dropWhile P xs = xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1728	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1729
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1730	lemma takeWhile_append1 [simp]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1731	"[\| x:set xs; ~P(x)\|] ==> takeWhile P (xs @ ys) = takeWhile P xs"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1732	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1733
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1734	lemma takeWhile_append2 [simp]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1735	"(!!x. x : set xs ==> P x) ==> takeWhile P (xs @ ys) = xs @ takeWhile P ys"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1736	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1737
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1738	lemma takeWhile_tail: "\<not> P x ==> takeWhile P (xs @ (x#l)) = takeWhile P xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1739	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1740
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1741	lemma dropWhile_append1 [simp]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1742	"[\| x : set xs; ~P(x)\|] ==> dropWhile P (xs @ ys) = (dropWhile P xs)@ys"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1743	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1744
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1745	lemma dropWhile_append2 [simp]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1746	"(!!x. x:set xs ==> P(x)) ==> dropWhile P (xs @ ys) = dropWhile P ys"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1747	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1748
23971 e6d505d5b03d renamed lemma "set_take_whileD" to "set_takeWhileD" krauss parents: 23740 diff changeset	1749	lemma set_takeWhileD: "x : set (takeWhile P xs) ==> x : set xs \<and> P x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1750	by (induct xs) (auto split: split_if_asm)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1751
13913 b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1752	lemma takeWhile_eq_all_conv[simp]:
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1753	"(takeWhile P xs = xs) = (\<forall>x \<in> set xs. P x)"
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1754	by(induct xs, auto)
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1755
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1756	lemma dropWhile_eq_Nil_conv[simp]:
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1757	"(dropWhile P xs = []) = (\<forall>x \<in> set xs. P x)"
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1758	by(induct xs, auto)
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1759
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1760	lemma dropWhile_eq_Cons_conv:
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1761	"(dropWhile P xs = y#ys) = (xs = takeWhile P xs @ y # ys & \<not> P y)"
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1762	by(induct xs, auto)
b3ed67af04b8 Added take/dropWhile thms nipkow parents: 13883 diff changeset	1763
31077 28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1764	lemma distinct_takeWhile[simp]: "distinct xs ==> distinct (takeWhile P xs)"
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1765	by (induct xs) (auto dest: set_takeWhileD)
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1766
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1767	lemma distinct_dropWhile[simp]: "distinct xs ==> distinct (dropWhile P xs)"
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1768	by (induct xs) auto
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1769
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	1770
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1771	text{* The following two lemmmas could be generalized to an arbitrary
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1772	property. *}
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1773
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1774	lemma takeWhile_neq_rev: "\<lbrakk>distinct xs; x \<in> set xs\<rbrakk> \<Longrightarrow>
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1775	takeWhile (\<lambda>y. y \<noteq> x) (rev xs) = rev (tl (dropWhile (\<lambda>y. y \<noteq> x) xs))"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1776	by(induct xs) (auto simp: takeWhile_tail[where l="[]"])
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1777
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1778	lemma dropWhile_neq_rev: "\<lbrakk>distinct xs; x \<in> set xs\<rbrakk> \<Longrightarrow>
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1779	dropWhile (\<lambda>y. y \<noteq> x) (rev xs) = x # rev (takeWhile (\<lambda>y. y \<noteq> x) xs)"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1780	apply(induct xs)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1781	apply simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1782	apply auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1783	apply(subst dropWhile_append2)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1784	apply auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1785	done
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	1786
18423 d7859164447f new lemmas nipkow parents: 18336 diff changeset	1787	lemma takeWhile_not_last:
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1788	"\<lbrakk> xs \<noteq> []; distinct xs\<rbrakk> \<Longrightarrow> takeWhile (\<lambda>y. y \<noteq> last xs) xs = butlast xs"
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1789	apply(induct xs)
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1790	apply simp
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1791	apply(case_tac xs)
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1792	apply(auto)
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1793	done
d7859164447f new lemmas nipkow parents: 18336 diff changeset	1794
19770 be5c23ebe1eb HOL/Tools/function_package: Added support for mutual recursive definitions. krauss parents: 19623 diff changeset	1795	lemma takeWhile_cong [fundef_cong, recdef_cong]:
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	1796	"[\| l = k; !!x. x : set l ==> P x = Q x \|]
1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	1797	==> takeWhile P l = takeWhile Q k"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1798	by (induct k arbitrary: l) (simp_all)
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	1799
19770 be5c23ebe1eb HOL/Tools/function_package: Added support for mutual recursive definitions. krauss parents: 19623 diff changeset	1800	lemma dropWhile_cong [fundef_cong, recdef_cong]:
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	1801	"[\| l = k; !!x. x : set l ==> P x = Q x \|]
1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	1802	==> dropWhile P l = dropWhile Q k"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1803	by (induct k arbitrary: l, simp_all)
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	1804
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1805
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1806	subsubsection {* @{text zip} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1807
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1808	lemma zip_Nil [simp]: "zip [] ys = []"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1809	by (induct ys) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1810
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1811	lemma zip_Cons_Cons [simp]: "zip (x # xs) (y # ys) = (x, y) # zip xs ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1812	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1813
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1814	declare zip_Cons [simp del]
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1815
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1816	lemma zip_Cons1:
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1817	"zip (x#xs) ys = (case ys of [] \<Rightarrow> [] \| y#ys \<Rightarrow> (x,y)#zip xs ys)"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1818	by(auto split:list.split)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	1819
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1820	lemma length_zip [simp]:
22493 db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1821	"length (zip xs ys) = min (length xs) (length ys)"
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1822	by (induct xs ys rule:list_induct2') auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1823
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1824	lemma zip_append1:
22493 db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1825	"zip (xs @ ys) zs =
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1826	zip xs (take (length xs) zs) @ zip ys (drop (length xs) zs)"
22493 db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1827	by (induct xs zs rule:list_induct2') auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1828
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1829	lemma zip_append2:
22493 db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1830	"zip xs (ys @ zs) =
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1831	zip (take (length ys) xs) ys @ zip (drop (length ys) xs) zs"
22493 db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1832	by (induct xs ys rule:list_induct2') auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1833
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1834	lemma zip_append [simp]:
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1835	"[\| length xs = length us; length ys = length vs \|] ==>
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1836	zip (xs@ys) (us@vs) = zip xs us @ zip ys vs"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1837	by (simp add: zip_append1)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1838
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1839	lemma zip_rev:
14247 cb32eb89bddd * empty log message * nipkow parents: 14208 diff changeset	1840	"length xs = length ys ==> zip (rev xs) (rev ys) = rev (zip xs ys)"
cb32eb89bddd * empty log message * nipkow parents: 14208 diff changeset	1841	by (induct rule:list_induct2, simp_all)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1842
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1843	lemma map_zip_map:
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1844	"map f (zip (map g xs) ys) = map (%(x,y). f(g x, y)) (zip xs ys)"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1845	apply(induct xs arbitrary:ys) apply simp
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1846	apply(case_tac ys)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1847	apply simp_all
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1848	done
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1849
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1850	lemma map_zip_map2:
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1851	"map f (zip xs (map g ys)) = map (%(x,y). f(x, g y)) (zip xs ys)"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1852	apply(induct xs arbitrary:ys) apply simp
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1853	apply(case_tac ys)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1854	apply simp_all
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1855	done
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	1856
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1857	text{* Courtesy of Andreas Lochbihler: *}
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1858	lemma zip_same_conv_map: "zip xs xs = map (\<lambda>x. (x, x)) xs"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1859	by(induct xs) auto
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1860
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1861	lemma nth_zip [simp]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1862	"[\| i < length xs; i < length ys\|] ==> (zip xs ys)!i = (xs!i, ys!i)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1863	apply (induct ys arbitrary: i xs, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1864	apply (case_tac xs)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1865	apply (simp_all add: nth.simps split: nat.split)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1866	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1867
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1868	lemma set_zip:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1869	"set (zip xs ys) = {(xs!i, ys!i) \| i. i < min (length xs) (length ys)}"
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1870	by(simp add: set_conv_nth cong: rev_conj_cong)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1871
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1872	lemma zip_update:
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1873	"zip (xs[i:=x]) (ys[i:=y]) = (zip xs ys)[i:=(x,y)]"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	1874	by(rule sym, simp add: update_zip)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1875
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1876	lemma zip_replicate [simp]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1877	"zip (replicate i x) (replicate j y) = replicate (min i j) (x,y)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1878	apply (induct i arbitrary: j, auto)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1879	apply (case_tac j, auto)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1880	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1881
19487 d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1882	lemma take_zip:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1883	"take n (zip xs ys) = zip (take n xs) (take n ys)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1884	apply (induct n arbitrary: xs ys)
19487 d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1885	apply simp
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1886	apply (case_tac xs, simp)
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1887	apply (case_tac ys, simp_all)
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1888	done
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1889
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1890	lemma drop_zip:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1891	"drop n (zip xs ys) = zip (drop n xs) (drop n ys)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	1892	apply (induct n arbitrary: xs ys)
19487 d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1893	apply simp
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1894	apply (case_tac xs, simp)
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1895	apply (case_tac ys, simp_all)
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1896	done
d5e79a41bce0 added zip/take/drop lemmas nipkow parents: 19390 diff changeset	1897
22493 db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1898	lemma set_zip_leftD:
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1899	"(x,y)\<in> set (zip xs ys) \<Longrightarrow> x \<in> set xs"
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1900	by (induct xs ys rule:list_induct2') auto
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1901
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1902	lemma set_zip_rightD:
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1903	"(x,y)\<in> set (zip xs ys) \<Longrightarrow> y \<in> set ys"
db930e490fe5 added another rule for simultaneous induction, and lemmas for zip krauss parents: 22422 diff changeset	1904	by (induct xs ys rule:list_induct2') auto
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1905
23983 79dc793bec43 Added lemmas nipkow parents: 23971 diff changeset	1906	lemma in_set_zipE:
79dc793bec43 Added lemmas nipkow parents: 23971 diff changeset	1907	"(x,y) : set(zip xs ys) \<Longrightarrow> (\<lbrakk> x : set xs; y : set ys \<rbrakk> \<Longrightarrow> R) \<Longrightarrow> R"
79dc793bec43 Added lemmas nipkow parents: 23971 diff changeset	1908	by(blast dest: set_zip_leftD set_zip_rightD)
79dc793bec43 Added lemmas nipkow parents: 23971 diff changeset	1909
29829 9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1910	lemma zip_map_fst_snd:
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1911	"zip (map fst zs) (map snd zs) = zs"
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1912	by (induct zs) simp_all
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1913
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1914	lemma zip_eq_conv:
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1915	"length xs = length ys \<Longrightarrow> zip xs ys = zs \<longleftrightarrow> map fst zs = xs \<and> map snd zs = ys"
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1916	by (auto simp add: zip_map_fst_snd)
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1917
9acb915a62fa code theorems for nth, list_update haftmann parents: 29827 diff changeset	1918
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	1919	subsubsection {* @{text list_all2} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1920
14316 91b897b9a2dc added some [intro?] and [trans] for list_all2 lemmas kleing parents: 14302 diff changeset	1921	lemma list_all2_lengthD [intro?]:
91b897b9a2dc added some [intro?] and [trans] for list_all2 lemmas kleing parents: 14302 diff changeset	1922	"list_all2 P xs ys ==> length xs = length ys"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1923	by (simp add: list_all2_def)
19607 07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	1924
19787 b949911ecff5 improved code lemmas haftmann parents: 19770 diff changeset	1925	lemma list_all2_Nil [iff, code]: "list_all2 P [] ys = (ys = [])"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1926	by (simp add: list_all2_def)
19607 07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	1927
19787 b949911ecff5 improved code lemmas haftmann parents: 19770 diff changeset	1928	lemma list_all2_Nil2 [iff, code]: "list_all2 P xs [] = (xs = [])"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1929	by (simp add: list_all2_def)
19607 07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	1930
07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	1931	lemma list_all2_Cons [iff, code]:
07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	1932	"list_all2 P (x # xs) (y # ys) = (P x y \<and> list_all2 P xs ys)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1933	by (auto simp add: list_all2_def)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1934
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1935	lemma list_all2_Cons1:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1936	"list_all2 P (x # xs) ys = (\<exists>z zs. ys = z # zs \<and> P x z \<and> list_all2 P xs zs)"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1937	by (cases ys) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1938
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1939	lemma list_all2_Cons2:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1940	"list_all2 P xs (y # ys) = (\<exists>z zs. xs = z # zs \<and> P z y \<and> list_all2 P zs ys)"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1941	by (cases xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1942
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	1943	lemma list_all2_rev [iff]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1944	"list_all2 P (rev xs) (rev ys) = list_all2 P xs ys"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1945	by (simp add: list_all2_def zip_rev cong: conj_cong)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1946
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1947	lemma list_all2_rev1:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1948	"list_all2 P (rev xs) ys = list_all2 P xs (rev ys)"
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1949	by (subst list_all2_rev [symmetric]) simp
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1950
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1951	lemma list_all2_append1:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1952	"list_all2 P (xs @ ys) zs =
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1953	(EX us vs. zs = us @ vs \<and> length us = length xs \<and> length vs = length ys \<and>
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1954	list_all2 P xs us \<and> list_all2 P ys vs)"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1955	apply (simp add: list_all2_def zip_append1)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1956	apply (rule iffI)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1957	apply (rule_tac x = "take (length xs) zs" in exI)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1958	apply (rule_tac x = "drop (length xs) zs" in exI)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1959	apply (force split: nat_diff_split simp add: min_def, clarify)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1960	apply (simp add: ball_Un)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1961	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1962
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1963	lemma list_all2_append2:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1964	"list_all2 P xs (ys @ zs) =
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1965	(EX us vs. xs = us @ vs \<and> length us = length ys \<and> length vs = length zs \<and>
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1966	list_all2 P us ys \<and> list_all2 P vs zs)"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1967	apply (simp add: list_all2_def zip_append2)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1968	apply (rule iffI)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1969	apply (rule_tac x = "take (length ys) xs" in exI)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1970	apply (rule_tac x = "drop (length ys) xs" in exI)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	1971	apply (force split: nat_diff_split simp add: min_def, clarify)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1972	apply (simp add: ball_Un)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1973	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1974
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1975	lemma list_all2_append:
14247 cb32eb89bddd * empty log message * nipkow parents: 14208 diff changeset	1976	"length xs = length ys \<Longrightarrow>
cb32eb89bddd * empty log message * nipkow parents: 14208 diff changeset	1977	list_all2 P (xs@us) (ys@vs) = (list_all2 P xs ys \<and> list_all2 P us vs)"
cb32eb89bddd * empty log message * nipkow parents: 14208 diff changeset	1978	by (induct rule:list_induct2, simp_all)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1979
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1980	lemma list_all2_appendI [intro?, trans]:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1981	"\<lbrakk> list_all2 P a b; list_all2 P c d \<rbrakk> \<Longrightarrow> list_all2 P (a@c) (b@d)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	1982	by (simp add: list_all2_append list_all2_lengthD)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	1983
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1984	lemma list_all2_conv_all_nth:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1985	"list_all2 P xs ys =
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1986	(length xs = length ys \<and> (\<forall>i < length xs. P (xs!i) (ys!i)))"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	1987	by (force simp add: list_all2_def set_zip)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	1988
13883 0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1989	lemma list_all2_trans:
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1990	assumes tr: "!!a b c. P1 a b ==> P2 b c ==> P3 a c"
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1991	shows "!!bs cs. list_all2 P1 as bs ==> list_all2 P2 bs cs ==> list_all2 P3 as cs"
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1992	(is "!!bs cs. PROP ?Q as bs cs")
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1993	proof (induct as)
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1994	fix x xs bs assume I1: "!!bs cs. PROP ?Q xs bs cs"
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1995	show "!!cs. PROP ?Q (x # xs) bs cs"
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1996	proof (induct bs)
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1997	fix y ys cs assume I2: "!!cs. PROP ?Q (x # xs) ys cs"
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1998	show "PROP ?Q (x # xs) (y # ys) cs"
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	1999	by (induct cs) (auto intro: tr I1 I2)
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	2000	qed simp
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	2001	qed simp
0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	2002
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2003	lemma list_all2_all_nthI [intro?]:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2004	"length a = length b \<Longrightarrow> (\<And>n. n < length a \<Longrightarrow> P (a!n) (b!n)) \<Longrightarrow> list_all2 P a b"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2005	by (simp add: list_all2_conv_all_nth)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2006
14395 cc96cc06abf9 new theorem paulson parents: 14388 diff changeset	2007	lemma list_all2I:
cc96cc06abf9 new theorem paulson parents: 14388 diff changeset	2008	"\<forall>x \<in> set (zip a b). split P x \<Longrightarrow> length a = length b \<Longrightarrow> list_all2 P a b"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2009	by (simp add: list_all2_def)
14395 cc96cc06abf9 new theorem paulson parents: 14388 diff changeset	2010
14328 fd063037fdf5 list_all2_nthD no good as [intro?] kleing parents: 14327 diff changeset	2011	lemma list_all2_nthD:
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2012	"\<lbrakk> list_all2 P xs ys; p < size xs \<rbrakk> \<Longrightarrow> P (xs!p) (ys!p)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2013	by (simp add: list_all2_conv_all_nth)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2014
14302 6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	2015	lemma list_all2_nthD2:
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	2016	"\<lbrakk>list_all2 P xs ys; p < size ys\<rbrakk> \<Longrightarrow> P (xs!p) (ys!p)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2017	by (frule list_all2_lengthD) (auto intro: list_all2_nthD)
14302 6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	2018
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2019	lemma list_all2_map1:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2020	"list_all2 P (map f as) bs = list_all2 (\<lambda>x y. P (f x) y) as bs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2021	by (simp add: list_all2_conv_all_nth)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2022
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2023	lemma list_all2_map2:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2024	"list_all2 P as (map f bs) = list_all2 (\<lambda>x y. P x (f y)) as bs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2025	by (auto simp add: list_all2_conv_all_nth)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2026
14316 91b897b9a2dc added some [intro?] and [trans] for list_all2 lemmas kleing parents: 14302 diff changeset	2027	lemma list_all2_refl [intro?]:
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2028	"(\<And>x. P x x) \<Longrightarrow> list_all2 P xs xs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2029	by (simp add: list_all2_conv_all_nth)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2030
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2031	lemma list_all2_update_cong:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2032	"\<lbrakk> i<size xs; list_all2 P xs ys; P x y \<rbrakk> \<Longrightarrow> list_all2 P (xs[i:=x]) (ys[i:=y])"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2033	by (simp add: list_all2_conv_all_nth nth_list_update)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2034
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2035	lemma list_all2_update_cong2:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2036	"\<lbrakk>list_all2 P xs ys; P x y; i < length ys\<rbrakk> \<Longrightarrow> list_all2 P (xs[i:=x]) (ys[i:=y])"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2037	by (simp add: list_all2_lengthD list_all2_update_cong)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2038
14302 6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	2039	lemma list_all2_takeI [simp,intro?]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2040	"list_all2 P xs ys \<Longrightarrow> list_all2 P (take n xs) (take n ys)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2041	apply (induct xs arbitrary: n ys)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2042	apply simp
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2043	apply (clarsimp simp add: list_all2_Cons1)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2044	apply (case_tac n)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2045	apply auto
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2046	done
14302 6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	2047
6c24235e8d5d * empty log message * nipkow parents: 14300 diff changeset	2048	lemma list_all2_dropI [simp,intro?]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2049	"list_all2 P as bs \<Longrightarrow> list_all2 P (drop n as) (drop n bs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2050	apply (induct as arbitrary: n bs, simp)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2051	apply (clarsimp simp add: list_all2_Cons1)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2052	apply (case_tac n, simp, simp)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2053	done
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2054
14327 9cd4dea593e3 list_all2_mono should not be [trans] kleing parents: 14316 diff changeset	2055	lemma list_all2_mono [intro?]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2056	"list_all2 P xs ys \<Longrightarrow> (\<And>xs ys. P xs ys \<Longrightarrow> Q xs ys) \<Longrightarrow> list_all2 Q xs ys"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2057	apply (induct xs arbitrary: ys, simp)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2058	apply (case_tac ys, auto)
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2059	done
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2060
22551 e52f5400e331 paraphrasing equality haftmann parents: 22539 diff changeset	2061	lemma list_all2_eq:
e52f5400e331 paraphrasing equality haftmann parents: 22539 diff changeset	2062	"xs = ys \<longleftrightarrow> list_all2 (op =) xs ys"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2063	by (induct xs ys rule: list_induct2') auto
22551 e52f5400e331 paraphrasing equality haftmann parents: 22539 diff changeset	2064
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2065
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	2066	subsubsection {* @{text foldl} and @{text foldr} *}
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2067
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2068	lemma foldl_append [simp]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2069	"foldl f a (xs @ ys) = foldl f (foldl f a xs) ys"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2070	by (induct xs arbitrary: a) auto
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2071
14402 4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2072	lemma foldr_append[simp]: "foldr f (xs @ ys) a = foldr f xs (foldr f ys a)"
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2073	by (induct xs) auto
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2074
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2075	lemma foldr_map: "foldr g (map f xs) a = foldr (g o f) xs a"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2076	by(induct xs) simp_all
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2077
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2078	text{* For efficient code generation: avoid intermediate list. *}
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2079	lemma foldl_map[code unfold]:
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2080	"foldl g a (map f xs) = foldl (%a x. g a (f x)) a xs"
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2081	by(induct xs arbitrary:a) simp_all
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2082
19770 be5c23ebe1eb HOL/Tools/function_package: Added support for mutual recursive definitions. krauss parents: 19623 diff changeset	2083	lemma foldl_cong [fundef_cong, recdef_cong]:
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	2084	"[\| a = b; l = k; !!a x. x : set l ==> f a x = g a x \|]
1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	2085	==> foldl f a l = foldl g b k"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2086	by (induct k arbitrary: a b l) simp_all
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	2087
19770 be5c23ebe1eb HOL/Tools/function_package: Added support for mutual recursive definitions. krauss parents: 19623 diff changeset	2088	lemma foldr_cong [fundef_cong, recdef_cong]:
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	2089	"[\| a = b; l = k; !!a x. x : set l ==> f x a = g x a \|]
1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	2090	==> foldr f l a = foldr g k b"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2091	by (induct k arbitrary: a b l) simp_all
18336 1a2e30b37ed3 Added recdef congruence rules for bounded quantifiers and commonly used krauss parents: 18049 diff changeset	2092
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2093	lemma (in semigroup_add) foldl_assoc:
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	2094	shows "foldl op+ (x+y) zs = x + (foldl op+ y zs)"
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2095	by (induct zs arbitrary: y) (simp_all add:add_assoc)
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2096
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2097	lemma (in monoid_add) foldl_absorb0:
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	2098	shows "x + (foldl op+ 0 zs) = foldl op+ x zs"
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2099	by (induct zs) (simp_all add:foldl_assoc)
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2100
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2101
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2102	text{* The ``First Duality Theorem'' in Bird \& Wadler: *}
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2103
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2104	lemma foldl_foldr1_lemma:
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2105	"foldl op + a xs = a + foldr op + xs (0\<Colon>'a::monoid_add)"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2106	by (induct xs arbitrary: a) (auto simp:add_assoc)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2107
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2108	corollary foldl_foldr1:
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2109	"foldl op + 0 xs = foldr op + xs (0\<Colon>'a::monoid_add)"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2110	by (simp add:foldl_foldr1_lemma)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2111
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2112
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2113	text{* The ``Third Duality Theorem'' in Bird \& Wadler: *}
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2114
14402 4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2115	lemma foldr_foldl: "foldr f xs a = foldl (%x y. f y x) a (rev xs)"
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2116	by (induct xs) auto
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2117
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2118	lemma foldl_foldr: "foldl f a xs = foldr (%x y. f y x) (rev xs) a"
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2119	by (simp add: foldr_foldl [of "%x y. f y x" "rev xs"])
4201e1916482 moved lemmas from MicroJava/Comp/AuxLemmas.thy to List.thy nipkow parents: 14395 diff changeset	2120
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	2121	lemma (in ab_semigroup_add) foldr_conv_foldl: "foldr op + xs a = foldl op + a xs"
24471 d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2122	by (induct xs, auto simp add: foldl_assoc add_commute)
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2123
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2124	text {*
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2125	Note: @{text "n \<le> foldl (op +) n ns"} looks simpler, but is more
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2126	difficult to use because it requires an additional transitivity step.
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2127	*}
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2128
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2129	lemma start_le_sum: "(m::nat) <= n ==> m <= foldl (op +) n ns"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2130	by (induct ns arbitrary: n) auto
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2131
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2132	lemma elem_le_sum: "(n::nat) : set ns ==> n <= foldl (op +) 0 ns"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2133	by (force intro: start_le_sum simp add: in_set_conv_decomp)
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2134
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2135	lemma sum_eq_0_conv [iff]:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2136	"(foldl (op +) (m::nat) ns = 0) = (m = 0 \<and> (\<forall>n \<in> set ns. n = 0))"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2137	by (induct ns arbitrary: m) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2138
24471 d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2139	lemma foldr_invariant:
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2140	"\<lbrakk>Q x ; \<forall> x\<in> set xs. P x; \<forall> x y. P x \<and> Q y \<longrightarrow> Q (f x y) \<rbrakk> \<Longrightarrow> Q (foldr f xs x)"
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2141	by (induct xs, simp_all)
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2142
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2143	lemma foldl_invariant:
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2144	"\<lbrakk>Q x ; \<forall> x\<in> set xs. P x; \<forall> x y. P x \<and> Q y \<longrightarrow> Q (f y x) \<rbrakk> \<Longrightarrow> Q (foldl f x xs)"
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2145	by (induct xs arbitrary: x, simp_all)
d7cf53c1085f removed unused theorems ; added lifting properties for foldr and foldl chaieb parents: 24461 diff changeset	2146
31455 2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2147	text {* @{const foldl} and @{const concat} *}
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2148
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2149	lemma foldl_conv_concat:
29782 02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2150	"foldl (op @) xs xss = xs @ concat xss"
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2151	proof (induct xss arbitrary: xs)
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2152	case Nil show ?case by simp
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2153	next
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2154	interpret monoid_add "[]" "op @" proof qed simp_all
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2155	case Cons then show ?case by (simp add: foldl_absorb0)
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2156	qed
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2157
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2158	lemma concat_conv_foldl: "concat xss = foldl (op @) [] xss"
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2159	by (simp add: foldl_conv_concat)
02e76245e5af dropped global Nil/Append interpretation haftmann parents: 29626 diff changeset	2160
31455 2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2161	text {* @{const Finite_Set.fold} and @{const foldl} *}
2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2162
2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2163	lemma (in fun_left_comm_idem) fold_set:
2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2164	"fold f y (set xs) = foldl (\<lambda>y x. f x y) y xs"
2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2165	by (rule sym, induct xs arbitrary: y) (simp_all add: fold_fun_comm)
2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2166
2754a0dadccc lemma about List.foldl and Finite_Set.fold haftmann parents: 31363 diff changeset	2167
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2168
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2169	subsubsection {* List summation: @{const listsum} and @{text"\<Sum>"}*}
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2170
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2171	lemma listsum_append [simp]: "listsum (xs @ ys) = listsum xs + listsum ys"
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2172	by (induct xs) (simp_all add:add_assoc)
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2173
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2174	lemma listsum_rev [simp]:
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2175	fixes xs :: "'a\<Colon>comm_monoid_add list"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2176	shows "listsum (rev xs) = listsum xs"
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2177	by (induct xs) (simp_all add:add_ac)
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2178
31022 a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2179	lemma listsum_map_remove1:
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2180	fixes f :: "'a \<Rightarrow> ('b::comm_monoid_add)"
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2181	shows "x : set xs \<Longrightarrow> listsum(map f xs) = f x + listsum(map f (remove1 x xs))"
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2182	by (induct xs)(auto simp add:add_ac)
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2183
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2184	lemma list_size_conv_listsum:
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2185	"list_size f xs = listsum (map f xs) + size xs"
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2186	by(induct xs) auto
a438b4516dd3 added listsum lemmas nipkow parents: 30971 diff changeset	2187
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2188	lemma listsum_foldr: "listsum xs = foldr (op +) xs 0"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2189	by (induct xs) auto
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2190
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2191	lemma length_concat: "length (concat xss) = listsum (map length xss)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2192	by (induct xss) simp_all
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2193
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2194	text{* For efficient code generation ---
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2195	@{const listsum} is not tail recursive but @{const foldl} is. *}
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2196	lemma listsum[code unfold]: "listsum xs = foldl (op +) 0 xs"
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2197	by(simp add:listsum_foldr foldl_foldr1)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2198
31077 28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	2199	lemma distinct_listsum_conv_Setsum:
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	2200	"distinct xs \<Longrightarrow> listsum xs = Setsum(set xs)"
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	2201	by (induct xs) simp_all
28dd6fd3d184 more lemmas nipkow parents: 31055 diff changeset	2202
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	2203
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2204	text{* Some syntactic sugar for summing a function over a list: *}
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2205
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2206	syntax
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2207	"_listsum" :: "pttrn => 'a list => 'b => 'b" ("(3SUM _<-_. _)" [0, 51, 10] 10)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2208	syntax (xsymbols)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2209	"_listsum" :: "pttrn => 'a list => 'b => 'b" ("(3\<Sum>_\<leftarrow>_. _)" [0, 51, 10] 10)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2210	syntax (HTML output)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2211	"_listsum" :: "pttrn => 'a list => 'b => 'b" ("(3\<Sum>_\<leftarrow>_. _)" [0, 51, 10] 10)
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2212
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2213	translations -- {* Beware of argument permutation! *}
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2214	"SUM x<-xs. b" == "CONST listsum (map (%x. b) xs)"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2215	"\<Sum>x\<leftarrow>xs. b" == "CONST listsum (map (%x. b) xs)"
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2216
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2217	lemma listsum_triv: "(\<Sum>x\<leftarrow>xs. r) = of_nat (length xs) * r"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2218	by (induct xs) (simp_all add: left_distrib)
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2219
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2220	lemma listsum_0 [simp]: "(\<Sum>x\<leftarrow>xs. 0) = 0"
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2221	by (induct xs) (simp_all add: left_distrib)
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2222
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2223	text{* For non-Abelian groups @{text xs} needs to be reversed on one side: *}
423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2224	lemma uminus_listsum_map:
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2225	fixes f :: "'a \<Rightarrow> 'b\<Colon>ab_group_add"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2226	shows "- listsum (map f xs) = (listsum (map (uminus o f) xs))"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	2227	by (induct xs) simp_all
23096 423ad2fe9f76 * empty log message * nipkow parents: 23060 diff changeset	2228
31258 43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2229	lemma listsum_addf:
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2230	fixes f g :: "'a \<Rightarrow> 'b::comm_monoid_add"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2231	shows "(\<Sum>x\<leftarrow>xs. f x + g x) = listsum (map f xs) + listsum (map g xs)"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2232	by (induct xs) (simp_all add: algebra_simps)
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2233
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2234	lemma listsum_subtractf:
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2235	fixes f g :: "'a \<Rightarrow> 'b::ab_group_add"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2236	shows "(\<Sum>x\<leftarrow>xs. f x - g x) = listsum (map f xs) - listsum (map g xs)"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2237	by (induct xs) simp_all
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2238
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2239	lemma listsum_const_mult:
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2240	fixes f :: "'a \<Rightarrow> 'b::semiring_0"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2241	shows "(\<Sum>x\<leftarrow>xs. c * f x) = c * (\<Sum>x\<leftarrow>xs. f x)"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2242	by (induct xs, simp_all add: algebra_simps)
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2243
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2244	lemma listsum_mult_const:
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2245	fixes f :: "'a \<Rightarrow> 'b::semiring_0"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2246	shows "(\<Sum>x\<leftarrow>xs. f x * c) = (\<Sum>x\<leftarrow>xs. f x) * c"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2247	by (induct xs, simp_all add: algebra_simps)
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2248
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2249	lemma listsum_abs:
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2250	fixes xs :: "'a::pordered_ab_group_add_abs list"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2251	shows "\<bar>listsum xs\<bar> \<le> listsum (map abs xs)"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2252	by (induct xs, simp, simp add: order_trans [OF abs_triangle_ineq])
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2253
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2254	lemma listsum_mono:
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2255	fixes f g :: "'a \<Rightarrow> 'b::{comm_monoid_add, pordered_ab_semigroup_add}"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2256	shows "(\<And>x. x \<in> set xs \<Longrightarrow> f x \<le> g x) \<Longrightarrow> (\<Sum>x\<leftarrow>xs. f x) \<le> (\<Sum>x\<leftarrow>xs. g x)"
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2257	by (induct xs, simp, simp add: add_mono)
43a418a41317 listsum lemmas huffman parents: 31201 diff changeset	2258
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2259
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	2260	subsubsection {* @{text upt} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2261
17090 603f23d71ada small mods to code lemmas nipkow parents: 17086 diff changeset	2262	lemma upt_rec[code]: "[i..<j] = (if i<j then i#[Suc i..<j] else [])"
603f23d71ada small mods to code lemmas nipkow parents: 17086 diff changeset	2263	-- {* simp does not terminate! *}
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2264	by (induct j) auto
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2265
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	2266	lemma upt_conv_Nil [simp]: "j <= i ==> [i..<j] = []"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2267	by (subst upt_rec) simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2268
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	2269	lemma upt_eq_Nil_conv[simp]: "([i..<j] = []) = (j = 0 \<or> j <= i)"
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2270	by(induct j)simp_all
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2271
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2272	lemma upt_eq_Cons_conv:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2273	"([i..<j] = x#xs) = (i < j & i = x & [i+1..<j] = xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2274	apply(induct j arbitrary: x xs)
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2275	apply simp
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2276	apply(clarsimp simp add: append_eq_Cons_conv)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2277	apply arith
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2278	done
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2279
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	2280	lemma upt_Suc_append: "i <= j ==> [i..<(Suc j)] = [i..<j]@[j]"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2281	-- {* Only needed if @{text upt_Suc} is deleted from the simpset. *}
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2282	by simp
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2283
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	2284	lemma upt_conv_Cons: "i < j ==> [i..<j] = i # [Suc i..<j]"
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	2285	by (simp add: upt_rec)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2286
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	2287	lemma upt_add_eq_append: "i<=j ==> [i..<j+k] = [i..<j]@[j..<j+k]"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2288	-- {* LOOPS as a simprule, since @{text "j <= j"}. *}
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2289	by (induct k) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2290
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	2291	lemma length_upt [simp]: "length [i..<j] = j - i"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2292	by (induct j) (auto simp add: Suc_diff_le)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2293
15425 6356d2523f73 [ .. (] -> [ ..< ] nipkow parents: 15392 diff changeset	2294	lemma nth_upt [simp]: "i + k < j ==> [i..<j] ! k = i + k"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2295	apply (induct j)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2296	apply (auto simp add: less_Suc_eq nth_append split: nat_diff_split)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2297	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2298
17906 719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2299
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2300	lemma hd_upt[simp]: "i < j \<Longrightarrow> hd[i..<j] = i"
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2301	by(simp add:upt_conv_Cons)
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2302
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2303	lemma last_upt[simp]: "i < j \<Longrightarrow> last[i..<j] = j - 1"
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2304	apply(cases j)
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2305	apply simp
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2306	by(simp add:upt_Suc_append)
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2307
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2308	lemma take_upt [simp]: "i+m <= n ==> take m [i..<n] = [i..<i+m]"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2309	apply (induct m arbitrary: i, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2310	apply (subst upt_rec)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2311	apply (rule sym)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2312	apply (subst upt_rec)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2313	apply (simp del: upt.simps)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2314	done
3507 157be29ad5ba Improved length = size translation. nipkow parents: 3465 diff changeset	2315
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2316	lemma drop_upt[simp]: "drop m [i..<j] = [i+m..<j]"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2317	apply(induct j)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2318	apply auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2319	done
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2320
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	2321	lemma map_Suc_upt: "map Suc [m..<n] = [Suc m..<Suc n]"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2322	by (induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2323
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2324	lemma nth_map_upt: "i < n-m ==> (map f [m..<n]) ! i = f(m+i)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2325	apply (induct n m arbitrary: i rule: diff_induct)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2326	prefer 3 apply (subst map_Suc_upt[symmetric])
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2327	apply (auto simp add: less_diff_conv nth_upt)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2328	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2329
13883 0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	2330	lemma nth_take_lemma:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2331	"k <= length xs ==> k <= length ys ==>
13883 0451e0fb3f22 Re-structured some proofs in order to get rid of rule_format attribute. berghofe parents: 13863 diff changeset	2332	(!!i. i < k --> xs!i = ys!i) ==> take k xs = take k ys"
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2333	apply (atomize, induct k arbitrary: xs ys)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2334	apply (simp_all add: less_Suc_eq_0_disj all_conj_distrib, clarify)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2335	txt {* Both lists must be non-empty *}
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2336	apply (case_tac xs, simp)
144f45277d5a misc tidying paulson parents: 14187 diff changeset	2337	apply (case_tac ys, clarify)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2338	apply (simp (no_asm_use))
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2339	apply clarify
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2340	txt {* prenexing's needed, not miniscoping *}
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2341	apply (simp (no_asm_use) add: all_simps [symmetric] del: all_simps)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2342	apply blast
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2343	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2344
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2345	lemma nth_equalityI:
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2346	"[\| length xs = length ys; ALL i < length xs. xs!i = ys!i \|] ==> xs = ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2347	apply (frule nth_take_lemma [OF le_refl eq_imp_le])
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2348	apply (simp_all add: take_all)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2349	done
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2350
24796 529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2351	lemma map_nth:
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2352	"map (\<lambda>i. xs ! i) [0..<length xs] = xs"
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2353	by (rule nth_equalityI, auto)
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2354
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2355	(* needs nth_equalityI *)
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2356	lemma list_all2_antisym:
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2357	"\<lbrakk> (\<And>x y. \<lbrakk>P x y; Q y x\<rbrakk> \<Longrightarrow> x = y); list_all2 P xs ys; list_all2 Q ys xs \<rbrakk>
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2358	\<Longrightarrow> xs = ys"
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2359	apply (simp add: list_all2_conv_all_nth)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2360	apply (rule nth_equalityI, blast, simp)
13863 ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2361	done
ec901a432ea1 more about list_all2 kleing parents: 13737 diff changeset	2362
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2363	lemma take_equalityI: "(\<forall>i. take i xs = take i ys) ==> xs = ys"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2364	-- {* The famous take-lemma. *}
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2365	apply (drule_tac x = "max (length xs) (length ys)" in spec)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2366	apply (simp add: le_max_iff_disj take_all)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2367	done
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2368
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2369
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2370	lemma take_Cons':
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2371	"take n (x # xs) = (if n = 0 then [] else x # take (n - 1) xs)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2372	by (cases n) simp_all
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2373
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2374	lemma drop_Cons':
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2375	"drop n (x # xs) = (if n = 0 then x # xs else drop (n - 1) xs)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2376	by (cases n) simp_all
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2377
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2378	lemma nth_Cons': "(x # xs)!n = (if n = 0 then x else xs!(n - 1))"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2379	by (cases n) simp_all
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2380
18622 4524643feecc theorems need names paulson parents: 18490 diff changeset	2381	lemmas take_Cons_number_of = take_Cons'[of "number_of v",standard]
4524643feecc theorems need names paulson parents: 18490 diff changeset	2382	lemmas drop_Cons_number_of = drop_Cons'[of "number_of v",standard]
4524643feecc theorems need names paulson parents: 18490 diff changeset	2383	lemmas nth_Cons_number_of = nth_Cons'[of _ _ "number_of v",standard]
4524643feecc theorems need names paulson parents: 18490 diff changeset	2384
4524643feecc theorems need names paulson parents: 18490 diff changeset	2385	declare take_Cons_number_of [simp]
4524643feecc theorems need names paulson parents: 18490 diff changeset	2386	drop_Cons_number_of [simp]
4524643feecc theorems need names paulson parents: 18490 diff changeset	2387	nth_Cons_number_of [simp]
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2388
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2389
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	2390	subsubsection {* @{text "distinct"} and @{text remdups} *}
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2391
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2392	lemma distinct_append [simp]:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2393	"distinct (xs @ ys) = (distinct xs \<and> distinct ys \<and> set xs \<inter> set ys = {})"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2394	by (induct xs) auto
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2395
15305 0bd9eedaa301 added lemmas nipkow parents: 15304 diff changeset	2396	lemma distinct_rev[simp]: "distinct(rev xs) = distinct xs"
0bd9eedaa301 added lemmas nipkow parents: 15304 diff changeset	2397	by(induct xs) auto
0bd9eedaa301 added lemmas nipkow parents: 15304 diff changeset	2398
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2399	lemma set_remdups [simp]: "set (remdups xs) = set xs"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2400	by (induct xs) (auto simp add: insert_absorb)
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2401
1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2402	lemma distinct_remdups [iff]: "distinct (remdups xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2403	by (induct xs) auto
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2404
25287 094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2405	lemma distinct_remdups_id: "distinct xs ==> remdups xs = xs"
094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2406	by (induct xs, auto)
094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2407
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	2408	lemma remdups_id_iff_distinct [simp]: "remdups xs = xs \<longleftrightarrow> distinct xs"
a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	2409	by (metis distinct_remdups distinct_remdups_id)
25287 094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2410
24566 2bfa0215904c added lemma nipkow parents: 24526 diff changeset	2411	lemma finite_distinct_list: "finite A \<Longrightarrow> EX xs. set xs = A & distinct xs"
24632 779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	2412	by (metis distinct_remdups finite_list set_remdups)
24566 2bfa0215904c added lemma nipkow parents: 24526 diff changeset	2413
15072 4861bf6af0b4 new material courtesy of Norbert Voelker paulson parents: 15064 diff changeset	2414	lemma remdups_eq_nil_iff [simp]: "(remdups x = []) = (x = [])"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2415	by (induct x, auto)
15072 4861bf6af0b4 new material courtesy of Norbert Voelker paulson parents: 15064 diff changeset	2416
4861bf6af0b4 new material courtesy of Norbert Voelker paulson parents: 15064 diff changeset	2417	lemma remdups_eq_nil_right_iff [simp]: "([] = remdups x) = (x = [])"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2418	by (induct x, auto)
15072 4861bf6af0b4 new material courtesy of Norbert Voelker paulson parents: 15064 diff changeset	2419
15245 5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2420	lemma length_remdups_leq[iff]: "length(remdups xs) <= length xs"
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2421	by (induct xs) auto
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2422
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2423	lemma length_remdups_eq[iff]:
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2424	"(length (remdups xs) = length xs) = (remdups xs = xs)"
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2425	apply(induct xs)
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2426	apply auto
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2427	apply(subgoal_tac "length (remdups xs) <= length xs")
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2428	apply arith
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2429	apply(rule length_remdups_leq)
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2430	done
5a21d9a8f14b Added a few lemmas nipkow parents: 15236 diff changeset	2431
18490 434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2432
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2433	lemma distinct_map:
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2434	"distinct(map f xs) = (distinct xs & inj_on f (set xs))"
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2435	by (induct xs) auto
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2436
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2437
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2438	lemma distinct_filter [simp]: "distinct xs ==> distinct (filter P xs)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2439	by (induct xs) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2440
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2441	lemma distinct_upt[simp]: "distinct[i..<j]"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2442	by (induct j) auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2443
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2444	lemma distinct_take[simp]: "distinct xs \<Longrightarrow> distinct (take i xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2445	apply(induct xs arbitrary: i)
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2446	apply simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2447	apply (case_tac i)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2448	apply simp_all
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2449	apply(blast dest:in_set_takeD)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2450	done
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2451
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2452	lemma distinct_drop[simp]: "distinct xs \<Longrightarrow> distinct (drop i xs)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2453	apply(induct xs arbitrary: i)
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2454	apply simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2455	apply (case_tac i)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2456	apply simp_all
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2457	done
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2458
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2459	lemma distinct_list_update:
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2460	assumes d: "distinct xs" and a: "a \<notin> set xs - {xs!i}"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2461	shows "distinct (xs[i:=a])"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2462	proof (cases "i < length xs")
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2463	case True
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2464	with a have "a \<notin> set (take i xs @ xs ! i # drop (Suc i) xs) - {xs!i}"
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2465	apply (drule_tac id_take_nth_drop) by simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2466	with d True show ?thesis
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2467	apply (simp add: upd_conv_take_nth_drop)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2468	apply (drule subst [OF id_take_nth_drop]) apply assumption
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2469	apply simp apply (cases "a = xs!i") apply simp by blast
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2470	next
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2471	case False with d show ?thesis by auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2472	qed
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2473
31363 7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2474	lemma distinct_concat:
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2475	assumes "distinct xs"
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2476	and "\<And> ys. ys \<in> set xs \<Longrightarrow> distinct ys"
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2477	and "\<And> ys zs. \<lbrakk> ys \<in> set xs ; zs \<in> set xs ; ys \<noteq> zs \<rbrakk> \<Longrightarrow> set ys \<inter> set zs = {}"
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2478	shows "distinct (concat xs)"
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2479	using assms by (induct xs) auto
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2480
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2481	text {* It is best to avoid this indexed version of distinct, but
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2482	sometimes it is useful. *}
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2483
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2484	lemma distinct_conv_nth:
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2485	"distinct xs = (\<forall>i < size xs. \<forall>j < size xs. i \<noteq> j --> xs!i \<noteq> xs!j)"
15251 bb6f072c8d10 converted some induct_tac to induct paulson parents: 15246 diff changeset	2486	apply (induct xs, simp, simp)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2487	apply (rule iffI, clarsimp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2488	apply (case_tac i)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2489	apply (case_tac j, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2490	apply (simp add: set_conv_nth)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2491	apply (case_tac j)
24648 1e8053a6d725 metis too slow paulson parents: 24645 diff changeset	2492	apply (clarsimp simp add: set_conv_nth, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2493	apply (rule conjI)
24648 1e8053a6d725 metis too slow paulson parents: 24645 diff changeset	2494	(*TOO SLOW
24632 779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	2495	apply (metis Zero_neq_Suc gr0_conv_Suc in_set_conv_nth lessI less_trans_Suc nth_Cons' nth_Cons_Suc)
24648 1e8053a6d725 metis too slow paulson parents: 24645 diff changeset	2496	*)
1e8053a6d725 metis too slow paulson parents: 24645 diff changeset	2497	apply (clarsimp simp add: set_conv_nth)
1e8053a6d725 metis too slow paulson parents: 24645 diff changeset	2498	apply (erule_tac x = 0 in allE, simp)
1e8053a6d725 metis too slow paulson parents: 24645 diff changeset	2499	apply (erule_tac x = "Suc i" in allE, simp, clarsimp)
25130 d91391a8705b avoid very slow metis invocation; wenzelm parents: 25112 diff changeset	2500	(*TOO SLOW
24632 779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	2501	apply (metis Suc_Suc_eq lessI less_trans_Suc nth_Cons_Suc)
25130 d91391a8705b avoid very slow metis invocation; wenzelm parents: 25112 diff changeset	2502	*)
d91391a8705b avoid very slow metis invocation; wenzelm parents: 25112 diff changeset	2503	apply (erule_tac x = "Suc i" in allE, simp)
d91391a8705b avoid very slow metis invocation; wenzelm parents: 25112 diff changeset	2504	apply (erule_tac x = "Suc j" in allE, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2505	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2506
18490 434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2507	lemma nth_eq_iff_index_eq:
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2508	"\<lbrakk> distinct xs; i < length xs; j < length xs \<rbrakk> \<Longrightarrow> (xs!i = xs!j) = (i = j)"
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2509	by(auto simp: distinct_conv_nth)
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2510
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2511	lemma distinct_card: "distinct xs ==> card (set xs) = size xs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	2512	by (induct xs) auto
14388 04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2513
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2514	lemma card_distinct: "card (set xs) = size xs ==> distinct xs"
14388 04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2515	proof (induct xs)
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2516	case Nil thus ?case by simp
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2517	next
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2518	case (Cons x xs)
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2519	show ?case
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2520	proof (cases "x \<in> set xs")
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2521	case False with Cons show ?thesis by simp
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2522	next
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2523	case True with Cons.prems
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2524	have "card (set xs) = Suc (length xs)"
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2525	by (simp add: card_insert_if split: split_if_asm)
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2526	moreover have "card (set xs) \<le> length xs" by (rule card_length)
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2527	ultimately have False by simp
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2528	thus ?thesis ..
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2529	qed
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2530	qed
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	2531
25287 094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2532	lemma not_distinct_decomp: "~ distinct ws ==> EX xs ys zs y. ws = xs@[y]@ys@[y]@zs"
094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2533	apply (induct n == "length ws" arbitrary:ws) apply simp
094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2534	apply(case_tac ws) apply simp
094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2535	apply (simp split:split_if_asm)
094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2536	apply (metis Cons_eq_appendI eq_Nil_appendI split_list)
094dab519ff5 added lemmas nipkow parents: 25277 diff changeset	2537	done
18490 434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2538
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2539	lemma length_remdups_concat:
434e34392c40 new lemmas nipkow parents: 18451 diff changeset	2540	"length(remdups(concat xss)) = card(\<Union>xs \<in> set xss. set xs)"
24308 700e745994c1 removed set_concat_map and improved set_concat nipkow parents: 24286 diff changeset	2541	by(simp add: set_concat distinct_card[symmetric])
17906 719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2542
719364f5179b added 2 lemmas nipkow parents: 17877 diff changeset	2543
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	2544	subsubsection {* @{text remove1} *}
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2545
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2546	lemma remove1_append:
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2547	"remove1 x (xs @ ys) =
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2548	(if x \<in> set xs then remove1 x xs @ ys else xs @ remove1 x ys)"
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2549	by (induct xs) auto
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2550
23479 10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2551	lemma in_set_remove1[simp]:
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2552	"a \<noteq> b \<Longrightarrow> a : set(remove1 b xs) = (a : set xs)"
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2553	apply (induct xs)
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2554	apply auto
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2555	done
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2556
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2557	lemma set_remove1_subset: "set(remove1 x xs) <= set xs"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2558	apply(induct xs)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2559	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2560	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2561	apply blast
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2562	done
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2563
17724 e969fc0a4925 simprules need names paulson parents: 17629 diff changeset	2564	lemma set_remove1_eq [simp]: "distinct xs ==> set(remove1 x xs) = set xs - {x}"
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2565	apply(induct xs)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2566	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2567	apply simp
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2568	apply blast
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2569	done
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2570
23479 10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2571	lemma length_remove1:
30128 365ee7319b86 revert some Suc 0 lemmas back to their original forms; added some simp rules for (1::nat) huffman parents: 30079 diff changeset	2572	"length(remove1 x xs) = (if x : set xs then length xs - 1 else length xs)"
23479 10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2573	apply (induct xs)
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2574	apply (auto dest!:length_pos_if_in_set)
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2575	done
10adbdcdc65b new lemmas nipkow parents: 23388 diff changeset	2576
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2577	lemma remove1_filter_not[simp]:
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2578	"\<not> P x \<Longrightarrow> remove1 x (filter P xs) = filter P xs"
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2579	by(induct xs) auto
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2580
15110 78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2581	lemma notin_set_remove1[simp]: "x ~: set xs ==> x ~: set(remove1 y xs)"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2582	apply(insert set_remove1_subset)
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2583	apply fast
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2584	done
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2585
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2586	lemma distinct_remove1[simp]: "distinct xs ==> distinct(remove1 x xs)"
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2587	by (induct xs) simp_all
78b5636eabc7 Added a number of new thms and the new function remove1 nipkow parents: 15072 diff changeset	2588
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2589
27693 73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2590	subsubsection {* @{text removeAll} *}
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2591
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2592	lemma removeAll_append[simp]:
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2593	"removeAll x (xs @ ys) = removeAll x xs @ removeAll x ys"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2594	by (induct xs) auto
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2595
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2596	lemma set_removeAll[simp]: "set(removeAll x xs) = set xs - {x}"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2597	by (induct xs) auto
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2598
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2599	lemma removeAll_id[simp]: "x \<notin> set xs \<Longrightarrow> removeAll x xs = xs"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2600	by (induct xs) auto
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2601
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2602	(* Needs count:: 'a \<Rightarrow> a' list \<Rightarrow> nat
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2603	lemma length_removeAll:
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2604	"length(removeAll x xs) = length xs - count x xs"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2605	*)
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2606
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2607	lemma removeAll_filter_not[simp]:
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2608	"\<not> P x \<Longrightarrow> removeAll x (filter P xs) = filter P xs"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2609	by(induct xs) auto
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2610
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2611
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2612	lemma distinct_remove1_removeAll:
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2613	"distinct xs ==> remove1 x xs = removeAll x xs"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2614	by (induct xs) simp_all
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2615
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2616	lemma map_removeAll_inj_on: "inj_on f (insert x (set xs)) \<Longrightarrow>
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2617	map f (removeAll x xs) = removeAll (f x) (map f xs)"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2618	by (induct xs) (simp_all add:inj_on_def)
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2619
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2620	lemma map_removeAll_inj: "inj f \<Longrightarrow>
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2621	map f (removeAll x xs) = removeAll (f x) (map f xs)"
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2622	by(metis map_removeAll_inj_on subset_inj_on subset_UNIV)
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2623
73253a4e3ee2 added removeAll nipkow parents: 27381 diff changeset	2624
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	2625	subsubsection {* @{text replicate} *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2626
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2627	lemma length_replicate [simp]: "length (replicate n x) = n"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2628	by (induct n) auto
13124 6e1decd8a7a9 new thm distinct_conv_nth nipkow parents: 13122 diff changeset	2629
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2630	lemma map_replicate [simp]: "map f (replicate n x) = replicate n (f x)"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2631	by (induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2632
31363 7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2633	lemma map_replicate_const:
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2634	"map (\<lambda> x. k) lst = replicate (length lst) k"
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2635	by (induct lst) auto
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2636
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2637	lemma replicate_app_Cons_same:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2638	"(replicate n x) @ (x # xs) = x # replicate n x @ xs"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2639	by (induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2640
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2641	lemma rev_replicate [simp]: "rev (replicate n x) = replicate n x"
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2642	apply (induct n, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2643	apply (simp add: replicate_app_Cons_same)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2644	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2645
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2646	lemma replicate_add: "replicate (n + m) x = replicate n x @ replicate m x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2647	by (induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2648
16397 c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2649	text{* Courtesy of Matthias Daum: *}
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2650	lemma append_replicate_commute:
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2651	"replicate n x @ replicate k x = replicate k x @ replicate n x"
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2652	apply (simp add: replicate_add [THEN sym])
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2653	apply (simp add: add_commute)
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2654	done
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2655
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	2656	text{* Courtesy of Andreas Lochbihler: *}
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	2657	lemma filter_replicate:
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	2658	"filter P (replicate n x) = (if P x then replicate n x else [])"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	2659	by(induct n) auto
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31077 diff changeset	2660
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2661	lemma hd_replicate [simp]: "n \<noteq> 0 ==> hd (replicate n x) = x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2662	by (induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2663
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2664	lemma tl_replicate [simp]: "n \<noteq> 0 ==> tl (replicate n x) = replicate (n - 1) x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2665	by (induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2666
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2667	lemma last_replicate [simp]: "n \<noteq> 0 ==> last (replicate n x) = x"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2668	by (atomize (full), induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2669
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2670	lemma nth_replicate[simp]: "i < n ==> (replicate n x)!i = x"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2671	apply (induct n arbitrary: i, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2672	apply (simp add: nth_Cons split: nat.split)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2673	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2674
16397 c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2675	text{* Courtesy of Matthias Daum (2 lemmas): *}
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2676	lemma take_replicate[simp]: "take i (replicate k x) = replicate (min i k) x"
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2677	apply (case_tac "k \<le> i")
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2678	apply (simp add: min_def)
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2679	apply (drule not_leE)
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2680	apply (simp add: min_def)
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2681	apply (subgoal_tac "replicate k x = replicate i x @ replicate (k - i) x")
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2682	apply simp
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2683	apply (simp add: replicate_add [symmetric])
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2684	done
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2685
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2686	lemma drop_replicate[simp]: "drop i (replicate k x) = replicate (k-i) x"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2687	apply (induct k arbitrary: i)
16397 c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2688	apply simp
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2689	apply clarsimp
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2690	apply (case_tac i)
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2691	apply simp
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2692	apply clarsimp
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2693	done
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2694
c047008f88d4 added lemmas nipkow parents: 15870 diff changeset	2695
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2696	lemma set_replicate_Suc: "set (replicate (Suc n) x) = {x}"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2697	by (induct n) auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2698
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2699	lemma set_replicate [simp]: "n \<noteq> 0 ==> set (replicate n x) = {x}"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2700	by (fast dest!: not0_implies_Suc intro!: set_replicate_Suc)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2701
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2702	lemma set_replicate_conv_if: "set (replicate n x) = (if n = 0 then {} else {x})"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2703	by auto
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2704
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2705	lemma in_set_replicateD: "x : set (replicate n y) ==> x = y"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2706	by (simp add: set_replicate_conv_if split: split_if_asm)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2707
24796 529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2708	lemma replicate_append_same:
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2709	"replicate i x @ [x] = x # replicate i x"
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2710	by (induct i) simp_all
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2711
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2712	lemma map_replicate_trivial:
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2713	"map (\<lambda>i. x) [0..<i] = replicate i x"
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2714	by (induct i) (simp_all add: replicate_append_same)
529e458f84d2 added some lemmas haftmann parents: 24748 diff changeset	2715
31363 7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2716	lemma concat_replicate_trivial[simp]:
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2717	"concat (replicate i []) = []"
7493b571b37d Added theorems about distinct & concat, map & replicate and concat & replicate hoelzl parents: 31264 diff changeset	2718	by (induct i) (auto simp add: map_replicate_const)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2719
28642 658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2720	lemma replicate_empty[simp]: "(replicate n x = []) \<longleftrightarrow> n=0"
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2721	by (induct n) auto
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2722
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2723	lemma empty_replicate[simp]: "([] = replicate n x) \<longleftrightarrow> n=0"
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2724	by (induct n) auto
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2725
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2726	lemma replicate_eq_replicate[simp]:
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2727	"(replicate m x = replicate n y) \<longleftrightarrow> (m=n & (m\<noteq>0 \<longrightarrow> x=y))"
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2728	apply(induct m arbitrary: n)
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2729	apply simp
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2730	apply(induct_tac n)
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2731	apply auto
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2732	done
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2733
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2734
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	2735	subsubsection{@{text rotate1} and @{text rotate}}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2736
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2737	lemma rotate_simps[simp]: "rotate1 [] = [] \<and> rotate1 (x#xs) = xs @ [x]"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2738	by(simp add:rotate1_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2739
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2740	lemma rotate0[simp]: "rotate 0 = id"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2741	by(simp add:rotate_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2742
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2743	lemma rotate_Suc[simp]: "rotate (Suc n) xs = rotate1(rotate n xs)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2744	by(simp add:rotate_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2745
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2746	lemma rotate_add:
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2747	"rotate (m+n) = rotate m o rotate n"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2748	by(simp add:rotate_def funpow_add)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2749
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2750	lemma rotate_rotate: "rotate m (rotate n xs) = rotate (m+n) xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2751	by(simp add:rotate_add)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2752
18049 156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2753	lemma rotate1_rotate_swap: "rotate1 (rotate n xs) = rotate n (rotate1 xs)"
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2754	by(simp add:rotate_def funpow_swap1)
156bba334c12 A few new lemmas nipkow parents: 17956 diff changeset	2755
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2756	lemma rotate1_length01[simp]: "length xs <= 1 \<Longrightarrow> rotate1 xs = xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2757	by(cases xs) simp_all
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2758
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2759	lemma rotate_length01[simp]: "length xs <= 1 \<Longrightarrow> rotate n xs = xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2760	apply(induct n)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2761	apply simp
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2762	apply (simp add:rotate_def)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2763	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2764
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2765	lemma rotate1_hd_tl: "xs \<noteq> [] \<Longrightarrow> rotate1 xs = tl xs @ [hd xs]"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2766	by(simp add:rotate1_def split:list.split)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2767
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2768	lemma rotate_drop_take:
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2769	"rotate n xs = drop (n mod length xs) xs @ take (n mod length xs) xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2770	apply(induct n)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2771	apply simp
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2772	apply(simp add:rotate_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2773	apply(cases "xs = []")
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2774	apply (simp)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2775	apply(case_tac "n mod length xs = 0")
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2776	apply(simp add:mod_Suc)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2777	apply(simp add: rotate1_hd_tl drop_Suc take_Suc)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2778	apply(simp add:mod_Suc rotate1_hd_tl drop_Suc[symmetric] drop_tl[symmetric]
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2779	take_hd_drop linorder_not_le)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2780	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2781
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2782	lemma rotate_conv_mod: "rotate n xs = rotate (n mod length xs) xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2783	by(simp add:rotate_drop_take)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2784
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2785	lemma rotate_id[simp]: "n mod length xs = 0 \<Longrightarrow> rotate n xs = xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2786	by(simp add:rotate_drop_take)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2787
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2788	lemma length_rotate1[simp]: "length(rotate1 xs) = length xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2789	by(simp add:rotate1_def split:list.split)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2790
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2791	lemma length_rotate[simp]: "length(rotate n xs) = length xs"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2792	by (induct n arbitrary: xs) (simp_all add:rotate_def)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2793
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2794	lemma distinct1_rotate[simp]: "distinct(rotate1 xs) = distinct xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2795	by(simp add:rotate1_def split:list.split) blast
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2796
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2797	lemma distinct_rotate[simp]: "distinct(rotate n xs) = distinct xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2798	by (induct n) (simp_all add:rotate_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2799
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2800	lemma rotate_map: "rotate n (map f xs) = map f (rotate n xs)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2801	by(simp add:rotate_drop_take take_map drop_map)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2802
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2803	lemma set_rotate1[simp]: "set(rotate1 xs) = set xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2804	by(simp add:rotate1_def split:list.split)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2805
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2806	lemma set_rotate[simp]: "set(rotate n xs) = set xs"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2807	by (induct n) (simp_all add:rotate_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2808
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2809	lemma rotate1_is_Nil_conv[simp]: "(rotate1 xs = []) = (xs = [])"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2810	by(simp add:rotate1_def split:list.split)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2811
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2812	lemma rotate_is_Nil_conv[simp]: "(rotate n xs = []) = (xs = [])"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	2813	by (induct n) (simp_all add:rotate_def)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2814
15439 71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2815	lemma rotate_rev:
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2816	"rotate n (rev xs) = rev(rotate (length xs - (n mod length xs)) xs)"
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2817	apply(simp add:rotate_drop_take rev_drop rev_take)
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2818	apply(cases "length xs = 0")
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2819	apply simp
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2820	apply(cases "n mod length xs = 0")
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2821	apply simp
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2822	apply(simp add:rotate_drop_take rev_drop rev_take)
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2823	done
71c0f98e31f1 made diff_less a simp rule nipkow parents: 15426 diff changeset	2824
18423 d7859164447f new lemmas nipkow parents: 18336 diff changeset	2825	lemma hd_rotate_conv_nth: "xs \<noteq> [] \<Longrightarrow> hd(rotate n xs) = xs!(n mod length xs)"
d7859164447f new lemmas nipkow parents: 18336 diff changeset	2826	apply(simp add:rotate_drop_take hd_append hd_drop_conv_nth hd_conv_nth)
d7859164447f new lemmas nipkow parents: 18336 diff changeset	2827	apply(subgoal_tac "length xs \<noteq> 0")
d7859164447f new lemmas nipkow parents: 18336 diff changeset	2828	prefer 2 apply simp
d7859164447f new lemmas nipkow parents: 18336 diff changeset	2829	using mod_less_divisor[of "length xs" n] by arith
d7859164447f new lemmas nipkow parents: 18336 diff changeset	2830
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2831
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	2832	subsubsection {* @{text sublist} --- a generalization of @{text nth} to sets *}
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2833
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2834	lemma sublist_empty [simp]: "sublist xs {} = []"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2835	by (auto simp add: sublist_def)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2836
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2837	lemma sublist_nil [simp]: "sublist [] A = []"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2838	by (auto simp add: sublist_def)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2839
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2840	lemma length_sublist:
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2841	"length(sublist xs I) = card{i. i < length xs \<and> i : I}"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2842	by(simp add: sublist_def length_filter_conv_card cong:conj_cong)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2843
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2844	lemma sublist_shift_lemma_Suc:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2845	"map fst (filter (%p. P(Suc(snd p))) (zip xs is)) =
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2846	map fst (filter (%p. P(snd p)) (zip xs (map Suc is)))"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2847	apply(induct xs arbitrary: "is")
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2848	apply simp
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2849	apply (case_tac "is")
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2850	apply simp
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2851	apply simp
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2852	done
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2853
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2854	lemma sublist_shift_lemma:
23279 e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	2855	"map fst [p<-zip xs [i..<i + length xs] . snd p : A] =
e39dd93161d9 tuned list comprehension, changed filter syntax from : to <- nipkow parents: 23246 diff changeset	2856	map fst [p<-zip xs [0..<length xs] . snd p + i : A]"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2857	by (induct xs rule: rev_induct) (simp_all add: add_commute)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2858
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2859	lemma sublist_append:
15168 33a08cfc3ae5 new functions for sets of lists paulson parents: 15140 diff changeset	2860	"sublist (l @ l') A = sublist l A @ sublist l' {j. j + length l : A}"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2861	apply (unfold sublist_def)
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2862	apply (induct l' rule: rev_induct, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2863	apply (simp add: upt_add_eq_append[of 0] zip_append sublist_shift_lemma)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2864	apply (simp add: add_commute)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2865	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2866
f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2867	lemma sublist_Cons:
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2868	"sublist (x # l) A = (if 0:A then [x] else []) @ sublist l {j. Suc j : A}"
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2869	apply (induct l rule: rev_induct)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2870	apply (simp add: sublist_def)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2871	apply (simp del: append_Cons add: append_Cons[symmetric] sublist_append)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2872	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2873
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2874	lemma set_sublist: "set(sublist xs I) = {xs!i\|i. i<size xs \<and> i \<in> I}"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2875	apply(induct xs arbitrary: I)
25162 ad4d5365d9d8 went back to >0 nipkow parents: 25157 diff changeset	2876	apply(auto simp: sublist_Cons nth_Cons split:nat.split dest!: gr0_implies_Suc)
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2877	done
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2878
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2879	lemma set_sublist_subset: "set(sublist xs I) \<subseteq> set xs"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2880	by(auto simp add:set_sublist)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2881
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2882	lemma notin_set_sublistI[simp]: "x \<notin> set xs \<Longrightarrow> x \<notin> set(sublist xs I)"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2883	by(auto simp add:set_sublist)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2884
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2885	lemma in_set_sublistD: "x \<in> set(sublist xs I) \<Longrightarrow> x \<in> set xs"
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2886	by(auto simp add:set_sublist)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2887
13142 1ebd8ed5a1a0 tuned document; wenzelm parents: 13124 diff changeset	2888	lemma sublist_singleton [simp]: "sublist [x] A = (if 0 : A then [x] else [])"
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2889	by (simp add: sublist_Cons)
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2890
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2891
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2892	lemma distinct_sublistI[simp]: "distinct xs \<Longrightarrow> distinct(sublist xs I)"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2893	apply(induct xs arbitrary: I)
15281 bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2894	apply simp
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2895	apply(auto simp add:sublist_Cons)
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2896	done
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2897
bd4611956c7b More lemmas nipkow parents: 15251 diff changeset	2898
15045 d59f7e2e18d3 Moved to new m<..<n syntax for set intervals. nipkow parents: 14981 diff changeset	2899	lemma sublist_upt_eq_take [simp]: "sublist l {..<n} = take n l"
14208 144f45277d5a misc tidying paulson parents: 14187 diff changeset	2900	apply (induct l rule: rev_induct, simp)
13145 59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2901	apply (simp split: nat_diff_split add: sublist_append)
59bc43b51aa2 * empty log message * nipkow parents: 13142 diff changeset	2902	done
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2903
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2904	lemma filter_in_sublist:
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2905	"distinct xs \<Longrightarrow> filter (%x. x \<in> set(sublist xs s)) xs = sublist xs s"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2906	proof (induct xs arbitrary: s)
17501 acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2907	case Nil thus ?case by simp
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2908	next
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2909	case (Cons a xs)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2910	moreover hence "!x. x: set xs \<longrightarrow> x \<noteq> a" by auto
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2911	ultimately show ?case by(simp add: sublist_Cons cong:filter_cong)
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2912	qed
acbebb72e85a added a number of lemmas nipkow parents: 17090 diff changeset	2913
13114 f2b00262bdfc converted; wenzelm parents: 12887 diff changeset	2914
19390 6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2915	subsubsection {* @{const splice} *}
6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2916
19607 07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	2917	lemma splice_Nil2 [simp, code]:
19390 6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2918	"splice xs [] = xs"
6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2919	by (cases xs) simp_all
6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2920
19607 07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	2921	lemma splice_Cons_Cons [simp, code]:
19390 6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2922	"splice (x#xs) (y#ys) = x # y # splice xs ys"
6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2923	by simp
6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2924
19607 07eeb832f28d introduced characters for code generator; some improved code lemmas for some list functions haftmann parents: 19585 diff changeset	2925	declare splice.simps(2) [simp del, code del]
19390 6c7383f80ad1 Added function "splice" nipkow parents: 19363 diff changeset	2926
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2927	lemma length_splice[simp]: "length(splice xs ys) = length xs + length ys"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	2928	apply(induct xs arbitrary: ys) apply simp
22793 dc13dfd588b2 new lemma splice_length nipkow parents: 22633 diff changeset	2929	apply(case_tac ys)
dc13dfd588b2 new lemma splice_length nipkow parents: 22633 diff changeset	2930	apply auto
dc13dfd588b2 new lemma splice_length nipkow parents: 22633 diff changeset	2931	done
dc13dfd588b2 new lemma splice_length nipkow parents: 22633 diff changeset	2932
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2933
31557 4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2934	subsubsection {* (In)finiteness *}
28642 658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2935
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2936	lemma finite_maxlen:
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2937	"finite (M::'a list set) ==> EX n. ALL s:M. size s < n"
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2938	proof (induct rule: finite.induct)
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2939	case emptyI show ?case by simp
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2940	next
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2941	case (insertI M xs)
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2942	then obtain n where "\<forall>s\<in>M. length s < n" by blast
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2943	hence "ALL s:insert xs M. size s < max n (size xs) + 1" by auto
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2944	thus ?case ..
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2945	qed
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2946
31557 4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2947	lemma finite_lists_length_eq:
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2948	assumes "finite A"
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2949	shows "finite {xs. set xs \<subseteq> A \<and> length xs = n}" (is "finite (?S n)")
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2950	proof(induct n)
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2951	case 0 show ?case by simp
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2952	next
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2953	case (Suc n)
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2954	have "?S (Suc n) = (\<Union>x\<in>A. (\<lambda>xs. x#xs) ` ?S n)"
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2955	by (auto simp:length_Suc_conv)
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2956	then show ?case using `finite A`
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2957	by (auto intro: finite_imageI Suc) (* FIXME metis? *)
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2958	qed
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2959
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2960	lemma finite_lists_length_le:
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2961	assumes "finite A" shows "finite {xs. set xs \<subseteq> A \<and> length xs \<le> n}"
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2962	(is "finite ?S")
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2963	proof-
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2964	have "?S = (\<Union>n\<in>{0..n}. {xs. set xs \<subseteq> A \<and> length xs = n})" by auto
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2965	thus ?thesis by (auto intro: finite_lists_length_eq[OF `finite A`])
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2966	qed
4e36f2f17c63 two finiteness lemmas by Robert Himmelmann nipkow parents: 31455 diff changeset	2967
28642 658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2968	lemma infinite_UNIV_listI: "~ finite(UNIV::'a list set)"
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2969	apply(rule notI)
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2970	apply(drule finite_maxlen)
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2971	apply (metis UNIV_I length_replicate less_not_refl)
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2972	done
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2973
658b598d8af4 added lemmas nipkow parents: 28562 diff changeset	2974
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2975	subsection {Sorting}
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2976
24617 bc484b2671fd sorting nipkow parents: 24616 diff changeset	2977	text{* Currently it is not shown that @{const sort} returns a
bc484b2671fd sorting nipkow parents: 24616 diff changeset	2978	permutation of its input because the nicest proof is via multisets,
bc484b2671fd sorting nipkow parents: 24616 diff changeset	2979	which are not yet available. Alternatively one could define a function
bc484b2671fd sorting nipkow parents: 24616 diff changeset	2980	that counts the number of occurrences of an element in a list and use
bc484b2671fd sorting nipkow parents: 24616 diff changeset	2981	that instead of multisets to state the correctness property. *}
bc484b2671fd sorting nipkow parents: 24616 diff changeset	2982
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2983	context linorder
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2984	begin
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2985
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	2986	lemma sorted_Cons: "sorted (x#xs) = (sorted xs & (ALL y:set xs. x <= y))"
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2987	apply(induct xs arbitrary: x) apply simp
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2988	by simp (blast intro: order_trans)
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2989
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2990	lemma sorted_append:
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	2991	"sorted (xs@ys) = (sorted xs & sorted ys & (\<forall>x \<in> set xs. \<forall>y \<in> set ys. x\<le>y))"
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2992	by (induct xs) (auto simp add:sorted_Cons)
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2993
31201 3dde56615750 new lemma nipkow parents: 31159 diff changeset	2994	lemma sorted_nth_mono:
3dde56615750 new lemma nipkow parents: 31159 diff changeset	2995	"sorted xs \<Longrightarrow> i <= j \<Longrightarrow> j < length xs \<Longrightarrow> xs!i <= xs!j"
3dde56615750 new lemma nipkow parents: 31159 diff changeset	2996	by (induct xs arbitrary: i j) (auto simp:nth_Cons' sorted_Cons)
3dde56615750 new lemma nipkow parents: 31159 diff changeset	2997
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2998	lemma set_insort: "set(insort x xs) = insert x (set xs)"
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	2999	by (induct xs) auto
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3000
24617 bc484b2671fd sorting nipkow parents: 24616 diff changeset	3001	lemma set_sort[simp]: "set(sort xs) = set xs"
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3002	by (induct xs) (simp_all add:set_insort)
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3003
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3004	lemma distinct_insort: "distinct (insort x xs) = (x \<notin> set xs \<and> distinct xs)"
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3005	by(induct xs)(auto simp:set_insort)
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3006
24617 bc484b2671fd sorting nipkow parents: 24616 diff changeset	3007	lemma distinct_sort[simp]: "distinct (sort xs) = distinct xs"
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3008	by(induct xs)(simp_all add:distinct_insort set_sort)
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3009
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3010	lemma sorted_insort: "sorted (insort x xs) = sorted xs"
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3011	apply (induct xs)
24650 e2930fa53538 tuned nipkow parents: 24648 diff changeset	3012	apply(auto simp:sorted_Cons set_insort)
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3013	done
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3014
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3015	theorem sorted_sort[simp]: "sorted (sort xs)"
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3016	by (induct xs) (auto simp:sorted_insort)
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3017
26143 314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3018	lemma insort_is_Cons: "\<forall>x\<in>set xs. a \<le> x \<Longrightarrow> insort a xs = a # xs"
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3019	by (cases xs) auto
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3020
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3021	lemma sorted_remove1: "sorted xs \<Longrightarrow> sorted (remove1 a xs)"
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3022	by (induct xs, auto simp add: sorted_Cons)
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3023
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3024	lemma insort_remove1: "\<lbrakk> a \<in> set xs; sorted xs \<rbrakk> \<Longrightarrow> insort a (remove1 a xs) = xs"
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3025	by (induct xs, auto simp add: sorted_Cons insort_is_Cons)
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3026
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3027	lemma sorted_remdups[simp]:
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3028	"sorted l \<Longrightarrow> sorted (remdups l)"
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3029	by (induct l) (auto simp: sorted_Cons)
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26073 diff changeset	3030
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3031	lemma sorted_distinct_set_unique:
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3032	assumes "sorted xs" "distinct xs" "sorted ys" "distinct ys" "set xs = set ys"
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3033	shows "xs = ys"
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3034	proof -
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	3035	from assms have 1: "length xs = length ys" by (auto dest!: distinct_card)
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3036	from assms show ?thesis
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3037	proof(induct rule:list_induct2[OF 1])
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3038	case 1 show ?case by simp
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3039	next
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3040	case 2 thus ?case by (simp add:sorted_Cons)
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3041	(metis Diff_insert_absorb antisym insertE insert_iff)
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3042	qed
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3043	qed
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3044
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3045	lemma finite_sorted_distinct_unique:
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3046	shows "finite A \<Longrightarrow> EX! xs. set xs = A & sorted xs & distinct xs"
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3047	apply(drule finite_distinct_list)
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3048	apply clarify
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3049	apply(rule_tac a="sort xs" in ex1I)
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3050	apply (auto simp: sorted_distinct_set_unique)
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3051	done
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3052
29626 6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3053	lemma sorted_take:
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3054	"sorted xs \<Longrightarrow> sorted (take n xs)"
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3055	proof (induct xs arbitrary: n rule: sorted.induct)
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3056	case 1 show ?case by simp
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3057	next
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3058	case 2 show ?case by (cases n) simp_all
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3059	next
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3060	case (3 x y xs)
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3061	then have "x \<le> y" by simp
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3062	show ?case proof (cases n)
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3063	case 0 then show ?thesis by simp
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3064	next
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3065	case (Suc m)
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3066	with 3 have "sorted (take m (y # xs))" by simp
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3067	with Suc `x \<le> y` show ?thesis by (cases m) simp_all
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3068	qed
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3069	qed
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3070
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3071	lemma sorted_drop:
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3072	"sorted xs \<Longrightarrow> sorted (drop n xs)"
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3073	proof (induct xs arbitrary: n rule: sorted.induct)
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3074	case 1 show ?case by simp
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3075	next
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3076	case 2 show ?case by (cases n) simp_all
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3077	next
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3078	case 3 then show ?case by (cases n) simp_all
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3079	qed
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3080
6f8aada233c1 sorted_take, sorted_drop haftmann parents: 29509 diff changeset	3081
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3082	end
fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3083
25277 95128fcdd7e8 added lemmas nipkow parents: 25221 diff changeset	3084	lemma sorted_upt[simp]: "sorted[i..<j]"
95128fcdd7e8 added lemmas nipkow parents: 25221 diff changeset	3085	by (induct j) (simp_all add:sorted_append)
95128fcdd7e8 added lemmas nipkow parents: 25221 diff changeset	3086
24616 fac3dd4ade83 sorting nipkow parents: 24566 diff changeset	3087
25069 081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3088	subsubsection {* @{text sorted_list_of_set} *}
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3089
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3090	text{* This function maps (finite) linearly ordered sets to sorted
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3091	lists. Warning: in most cases it is not a good idea to convert from
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3092	sets to lists but one should convert in the other direction (via
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3093	@{const set}). *}
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3094
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3095
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3096	context linorder
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3097	begin
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3098
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3099	definition
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3100	sorted_list_of_set :: "'a set \<Rightarrow> 'a list" where
28562 4e74209f113e `code func` now just `code` haftmann parents: 28537 diff changeset	3101	[code del]: "sorted_list_of_set A == THE xs. set xs = A & sorted xs & distinct xs"
25069 081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3102
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3103	lemma sorted_list_of_set[simp]: "finite A \<Longrightarrow>
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3104	set(sorted_list_of_set A) = A &
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3105	sorted(sorted_list_of_set A) & distinct(sorted_list_of_set A)"
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3106	apply(simp add:sorted_list_of_set_def)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3107	apply(rule the1I2)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3108	apply(simp_all add: finite_sorted_distinct_unique)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3109	done
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3110
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3111	lemma sorted_list_of_empty[simp]: "sorted_list_of_set {} = []"
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3112	unfolding sorted_list_of_set_def
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3113	apply(subst the_equality[of _ "[]"])
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3114	apply simp_all
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3115	done
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3116
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3117	end
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3118
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3119
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3120	subsubsection {* @{text upto}: the generic interval-list *}
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3121
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3122	class finite_intvl_succ = linorder +
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3123	fixes successor :: "'a \<Rightarrow> 'a"
25069 081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3124	assumes finite_intvl: "finite{a..b}"
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	3125	and successor_incr: "a < successor a"
af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	3126	and ord_discrete: "\<not>(\<exists>x. a < x & x < successor a)"
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3127
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3128	context finite_intvl_succ
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3129	begin
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3130
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3131	definition
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	3132	upto :: "'a \<Rightarrow> 'a \<Rightarrow> 'a list" ("(1[_../_])") where
25069 081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3133	"upto i j == sorted_list_of_set {i..j}"
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3134
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3135	lemma upto[simp]: "set[a..b] = {a..b} & sorted[a..b] & distinct[a..b]"
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3136	by(simp add:upto_def finite_intvl)
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3137
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	3138	lemma insert_intvl: "i \<le> j \<Longrightarrow> insert i {successor i..j} = {i..j}"
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3139	apply(insert successor_incr[of i])
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3140	apply(auto simp: atLeastAtMost_def atLeast_def atMost_def)
26734 a92057c1ee21 dropped some metis calls haftmann parents: 26584 diff changeset	3141	apply(metis ord_discrete less_le not_le)
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3142	done
1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3143
25069 081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3144	lemma sorted_list_of_set_rec: "i \<le> j \<Longrightarrow>
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3145	sorted_list_of_set {i..j} = i # sorted_list_of_set {successor i..j}"
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3146	apply(simp add:sorted_list_of_set_def upto_def)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3147	apply (rule the1_equality[OF finite_sorted_distinct_unique])
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3148	apply (simp add:finite_intvl)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3149	apply(rule the1I2[OF finite_sorted_distinct_unique])
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3150	apply (simp add:finite_intvl)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3151	apply (simp add: sorted_Cons insert_intvl Ball_def)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3152	apply (metis successor_incr leD less_imp_le order_trans)
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3153	done
081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3154
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3155	lemma sorted_list_of_set_rec2: "i \<le> j \<Longrightarrow>
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3156	sorted_list_of_set {i..successor j} =
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3157	sorted_list_of_set {i..j} @ [successor j]"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3158	apply(simp add:sorted_list_of_set_def upto_def)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3159	apply (rule the1_equality[OF finite_sorted_distinct_unique])
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3160	apply (simp add:finite_intvl)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3161	apply(rule the1I2[OF finite_sorted_distinct_unique])
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3162	apply (simp add:finite_intvl)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3163	apply (simp add: sorted_append Ball_def expand_set_eq)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3164	apply(rule conjI)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3165	apply (metis eq_iff leD linear not_leE ord_discrete order_trans successor_incr)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3166	apply (metis leD linear order_trans successor_incr)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3167	done
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3168
25062 af5ef0d4d655 global class syntax haftmann parents: 24902 diff changeset	3169	lemma upto_rec[code]: "[i..j] = (if i \<le> j then i # [successor i..j] else [])"
25069 081189141a6e added sorted_list_of_set nipkow parents: 25062 diff changeset	3170	by(simp add: upto_def sorted_list_of_set_rec)
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3171
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3172	lemma upto_empty[simp]: "j < i \<Longrightarrow> [i..j] = []"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3173	by(simp add: upto_rec)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3174
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3175	lemma upto_rec2: "i \<le> j \<Longrightarrow> [i..successor j] = [i..j] @ [successor j]"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3176	by(simp add: upto_def sorted_list_of_set_rec2)
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3177
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3178	end
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3179
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3180	text{* The integers are an instance of the above class: *}
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3181
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3182	instantiation int:: finite_intvl_succ
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3183	begin
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3184
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3185	definition
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3186	successor_int_def: "successor = (%i\<Colon>int. i+1)"
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3187
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3188	instance
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3189	by intro_classes (simp_all add: successor_int_def)
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3190
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	3191	end
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3192
24697 b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3193	text{* Now @{term"[i..j::int]"} is defined for integers. *}
b37d3980da3c fixed haftmann bug nipkow parents: 24657 diff changeset	3194
24698 9800a7602629 hide successor nipkow parents: 24697 diff changeset	3195	hide (open) const successor
9800a7602629 hide successor nipkow parents: 24697 diff changeset	3196
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3197	lemma upto_rec2_int: "(i::int) \<le> j \<Longrightarrow> [i..j+1] = [i..j] @ [j+1]"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3198	by(rule upto_rec2[where 'a = int, simplified successor_int_def])
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3199
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3200
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	3201	subsubsection {* @{text lists}: the list-forming operator over sets *}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3202
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3203	inductive_set
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3204	lists :: "'a set => 'a list set"
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3205	for A :: "'a set"
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3206	where
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3207	Nil [intro!]: "[]: lists A"
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3208	\| Cons [intro!,noatp]: "[\| a: A; l: lists A\|] ==> a#l : lists A"
24286 7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3209
7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3210	inductive_cases listsE [elim!,noatp]: "x#l : lists A"
7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3211	inductive_cases listspE [elim!,noatp]: "listsp A (x # l)"
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3212
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3213	lemma listsp_mono [mono]: "A \<le> B ==> listsp A \<le> listsp B"
26795 a27607030a1c - Explicitely applied predicate1I in a few proofs, because it is no longer berghofe parents: 26771 diff changeset	3214	by (rule predicate1I, erule listsp.induct, blast+)
a27607030a1c - Explicitely applied predicate1I in a few proofs, because it is no longer berghofe parents: 26771 diff changeset	3215
a27607030a1c - Explicitely applied predicate1I in a few proofs, because it is no longer berghofe parents: 26771 diff changeset	3216	lemmas lists_mono = listsp_mono [to_set pred_subset_eq]
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3217
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3218	lemma listsp_infI:
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3219	assumes l: "listsp A l" shows "listsp B l ==> listsp (inf A B) l" using l
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3220	by induct blast+
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3221
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3222	lemmas lists_IntI = listsp_infI [to_set]
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3223
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3224	lemma listsp_inf_eq [simp]: "listsp (inf A B) = inf (listsp A) (listsp B)"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3225	proof (rule mono_inf [where f=listsp, THEN order_antisym])
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3226	show "mono listsp" by (simp add: mono_def listsp_mono)
26795 a27607030a1c - Explicitely applied predicate1I in a few proofs, because it is no longer berghofe parents: 26771 diff changeset	3227	show "inf (listsp A) (listsp B) \<le> listsp (inf A B)" by (blast intro!: listsp_infI predicate1I)
14388 04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	3228	qed
04f04408b99b lemmas about card (set xs) kleing parents: 14343 diff changeset	3229
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3230	lemmas listsp_conj_eq [simp] = listsp_inf_eq [simplified inf_fun_eq inf_bool_eq]
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3231
26795 a27607030a1c - Explicitely applied predicate1I in a few proofs, because it is no longer berghofe parents: 26771 diff changeset	3232	lemmas lists_Int_eq [simp] = listsp_inf_eq [to_set pred_equals_eq]
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3233
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3234	lemma append_in_listsp_conv [iff]:
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3235	"(listsp A (xs @ ys)) = (listsp A xs \<and> listsp A ys)"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3236	by (induct xs) auto
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3237
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3238	lemmas append_in_lists_conv [iff] = append_in_listsp_conv [to_set]
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3239
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3240	lemma in_listsp_conv_set: "(listsp A xs) = (\<forall>x \<in> set xs. A x)"
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3241	-- {* eliminate @{text listsp} in favour of @{text set} *}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3242	by (induct xs) auto
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3243
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3244	lemmas in_lists_conv_set = in_listsp_conv_set [to_set]
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3245
24286 7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3246	lemma in_listspD [dest!,noatp]: "listsp A xs ==> \<forall>x\<in>set xs. A x"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3247	by (rule in_listsp_conv_set [THEN iffD1])
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3248
24286 7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3249	lemmas in_listsD [dest!,noatp] = in_listspD [to_set]
7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3250
7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3251	lemma in_listspI [intro!,noatp]: "\<forall>x\<in>set xs. A x ==> listsp A xs"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3252	by (rule in_listsp_conv_set [THEN iffD2])
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3253
24286 7619080e49f0 ATP blacklisting is now in theory data, attribute noatp paulson parents: 24219 diff changeset	3254	lemmas in_listsI [intro!,noatp] = in_listspI [to_set]
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3255
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3256	lemma lists_UNIV [simp]: "lists UNIV = UNIV"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3257	by auto
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3258
17086 0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3259
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3260
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3261	subsubsection{* Inductive definition for membership *}
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3262
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3263	inductive ListMem :: "'a \<Rightarrow> 'a list \<Rightarrow> bool"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3264	where
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3265	elem: "ListMem x (x # xs)"
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3266	\| insert: "ListMem x xs \<Longrightarrow> ListMem x (y # xs)"
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3267
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3268	lemma ListMem_iff: "(ListMem x xs) = (x \<in> set xs)"
17086 0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3269	apply (rule iffI)
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3270	apply (induct set: ListMem)
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3271	apply auto
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3272	apply (induct xs)
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3273	apply (auto intro: ListMem.intros)
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3274	done
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3275
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3276
0eb0c9259dd7 added quite a few functions for code generation nipkow parents: 16998 diff changeset	3277
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	3278	subsubsection{Lists as Cartesian products}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3279
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3280	text{*@{text"set_Cons A Xs"}: the set of lists with head drawn from
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3281	@{term A} and tail drawn from @{term Xs}.*}
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3282
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3283	constdefs
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3284	set_Cons :: "'a set \<Rightarrow> 'a list set \<Rightarrow> 'a list set"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3285	"set_Cons A XS == {z. \<exists>x xs. z = x#xs & x \<in> A & xs \<in> XS}"
28562 4e74209f113e `code func` now just `code` haftmann parents: 28537 diff changeset	3286	declare set_Cons_def [code del]
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3287
17724 e969fc0a4925 simprules need names paulson parents: 17629 diff changeset	3288	lemma set_Cons_sing_Nil [simp]: "set_Cons A {[]} = (%x. [x])`A"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3289	by (auto simp add: set_Cons_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3290
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3291	text{*Yields the set of lists, all of the same length as the argument and
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3292	with elements drawn from the corresponding element of the argument.*}
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3293
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3294	consts listset :: "'a set list \<Rightarrow> 'a list set"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3295	primrec
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3296	"listset [] = {[]}"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3297	"listset(A#As) = set_Cons A (listset As)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3298
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3299
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3300	subsection{Relations on Lists}
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3301
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3302	subsubsection {* Length Lexicographic Ordering *}
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3303
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3304	text{*These orderings preserve well-foundedness: shorter lists
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3305	precede longer lists. These ordering are not used in dictionaries.*}
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3306
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3307	consts lexn :: "('a * 'a)set => nat => ('a list * 'a list)set"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3308	--{The lexicographic ordering for lists of the specified length}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3309	primrec
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3310	"lexn r 0 = {}"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3311	"lexn r (Suc n) =
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3312	(prod_fun (%(x,xs). x#xs) (%(x,xs). x#xs) ` (r <lex> lexn r n)) Int
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3313	{(xs,ys). length xs = Suc n \<and> length ys = Suc n}"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3314
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3315	constdefs
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3316	lex :: "('a \<times> 'a) set => ('a list \<times> 'a list) set"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3317	"lex r == \<Union>n. lexn r n"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3318	--{Holds only between lists of the same length}
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3319
15693 3a67e61c6e96 tuned Map, renamed lex stuff in List. nipkow parents: 15656 diff changeset	3320	lenlex :: "('a \<times> 'a) set => ('a list \<times> 'a list) set"
3a67e61c6e96 tuned Map, renamed lex stuff in List. nipkow parents: 15656 diff changeset	3321	"lenlex r == inv_image (less_than <lex> lex r) (%xs. (length xs, xs))"
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3322	--{Compares lists by their length and then lexicographically}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3323
28562 4e74209f113e `code func` now just `code` haftmann parents: 28537 diff changeset	3324	declare lex_def [code del]
27106 ff27dc6e7d05 removed some dubious code lemmas haftmann parents: 26975 diff changeset	3325
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3326
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3327	lemma wf_lexn: "wf r ==> wf (lexn r n)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3328	apply (induct n, simp, simp)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3329	apply(rule wf_subset)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3330	prefer 2 apply (rule Int_lower1)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3331	apply(rule wf_prod_fun_image)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3332	prefer 2 apply (rule inj_onI, auto)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3333	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3334
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3335	lemma lexn_length:
24526 7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	3336	"(xs, ys) : lexn r n ==> length xs = n \<and> length ys = n"
7fa202789bf6 tuned lemma; replaced !! by arbitrary nipkow parents: 24476 diff changeset	3337	by (induct n arbitrary: xs ys) auto
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3338
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3339	lemma wf_lex [intro!]: "wf r ==> wf (lex r)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3340	apply (unfold lex_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3341	apply (rule wf_UN)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3342	apply (blast intro: wf_lexn, clarify)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3343	apply (rename_tac m n)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3344	apply (subgoal_tac "m \<noteq> n")
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3345	prefer 2 apply blast
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3346	apply (blast dest: lexn_length not_sym)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3347	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3348
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3349	lemma lexn_conv:
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3350	"lexn r n =
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3351	{(xs,ys). length xs = n \<and> length ys = n \<and>
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3352	(\<exists>xys x y xs' ys'. xs= xys @ x#xs' \<and> ys= xys @ y # ys' \<and> (x, y):r)}"
18423 d7859164447f new lemmas nipkow parents: 18336 diff changeset	3353	apply (induct n, simp)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3354	apply (simp add: image_Collect lex_prod_def, safe, blast)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3355	apply (rule_tac x = "ab # xys" in exI, simp)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3356	apply (case_tac xys, simp_all, blast)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3357	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3358
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3359	lemma lex_conv:
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3360	"lex r =
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3361	{(xs,ys). length xs = length ys \<and>
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3362	(\<exists>xys x y xs' ys'. xs = xys @ x # xs' \<and> ys = xys @ y # ys' \<and> (x, y):r)}"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3363	by (force simp add: lex_def lexn_conv)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3364
15693 3a67e61c6e96 tuned Map, renamed lex stuff in List. nipkow parents: 15656 diff changeset	3365	lemma wf_lenlex [intro!]: "wf r ==> wf (lenlex r)"
3a67e61c6e96 tuned Map, renamed lex stuff in List. nipkow parents: 15656 diff changeset	3366	by (unfold lenlex_def) blast
3a67e61c6e96 tuned Map, renamed lex stuff in List. nipkow parents: 15656 diff changeset	3367
3a67e61c6e96 tuned Map, renamed lex stuff in List. nipkow parents: 15656 diff changeset	3368	lemma lenlex_conv:
3a67e61c6e96 tuned Map, renamed lex stuff in List. nipkow parents: 15656 diff changeset	3369	"lenlex r = {(xs,ys). length xs < length ys \|
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3370	length xs = length ys \<and> (xs, ys) : lex r}"
30198 922f944f03b2 name changes nipkow parents: 30128 diff changeset	3371	by (simp add: lenlex_def Id_on_def lex_prod_def inv_image_def)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3372
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3373	lemma Nil_notin_lex [iff]: "([], ys) \<notin> lex r"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3374	by (simp add: lex_conv)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3375
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3376	lemma Nil2_notin_lex [iff]: "(xs, []) \<notin> lex r"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3377	by (simp add:lex_conv)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3378
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18423 diff changeset	3379	lemma Cons_in_lex [simp]:
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3380	"((x # xs, y # ys) : lex r) =
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3381	((x, y) : r \<and> length xs = length ys \| x = y \<and> (xs, ys) : lex r)"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3382	apply (simp add: lex_conv)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3383	apply (rule iffI)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3384	prefer 2 apply (blast intro: Cons_eq_appendI, clarify)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3385	apply (case_tac xys, simp, simp)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3386	apply blast
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3387	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3388
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3389
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3390	subsubsection {* Lexicographic Ordering *}
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3391
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3392	text {* Classical lexicographic ordering on lists, ie. "a" < "ab" < "b".
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3393	This ordering does \emph{not} preserve well-foundedness.
17090 603f23d71ada small mods to code lemmas nipkow parents: 17086 diff changeset	3394	Author: N. Voelker, March 2005. *}
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3395
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3396	constdefs
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3397	lexord :: "('a * 'a)set \<Rightarrow> ('a list * 'a list) set"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3398	"lexord r == {(x,y). \<exists> a v. y = x @ a # v \<or>
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3399	(\<exists> u a b v w. (a,b) \<in> r \<and> x = u @ (a # v) \<and> y = u @ (b # w))}"
28562 4e74209f113e `code func` now just `code` haftmann parents: 28537 diff changeset	3400	declare lexord_def [code del]
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3401
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3402	lemma lexord_Nil_left[simp]: "([],y) \<in> lexord r = (\<exists> a x. y = a # x)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3403	by (unfold lexord_def, induct_tac y, auto)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3404
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3405	lemma lexord_Nil_right[simp]: "(x,[]) \<notin> lexord r"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3406	by (unfold lexord_def, induct_tac x, auto)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3407
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3408	lemma lexord_cons_cons[simp]:
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3409	"((a # x, b # y) \<in> lexord r) = ((a,b)\<in> r \| (a = b & (x,y)\<in> lexord r))"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3410	apply (unfold lexord_def, safe, simp_all)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3411	apply (case_tac u, simp, simp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3412	apply (case_tac u, simp, clarsimp, blast, blast, clarsimp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3413	apply (erule_tac x="b # u" in allE)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3414	by force
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3415
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3416	lemmas lexord_simps = lexord_Nil_left lexord_Nil_right lexord_cons_cons
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3417
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3418	lemma lexord_append_rightI: "\<exists> b z. y = b # z \<Longrightarrow> (x, x @ y) \<in> lexord r"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3419	by (induct_tac x, auto)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3420
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3421	lemma lexord_append_left_rightI:
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3422	"(a,b) \<in> r \<Longrightarrow> (u @ a # x, u @ b # y) \<in> lexord r"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3423	by (induct_tac u, auto)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3424
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3425	lemma lexord_append_leftI: " (u,v) \<in> lexord r \<Longrightarrow> (x @ u, x @ v) \<in> lexord r"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3426	by (induct x, auto)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3427
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3428	lemma lexord_append_leftD:
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3429	"\<lbrakk> (x @ u, x @ v) \<in> lexord r; (! a. (a,a) \<notin> r) \<rbrakk> \<Longrightarrow> (u,v) \<in> lexord r"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3430	by (erule rev_mp, induct_tac x, auto)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3431
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3432	lemma lexord_take_index_conv:
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3433	"((x,y) : lexord r) =
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3434	((length x < length y \<and> take (length x) y = x) \<or>
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3435	(\<exists>i. i < min(length x)(length y) & take i x = take i y & (x!i,y!i) \<in> r))"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3436	apply (unfold lexord_def Let_def, clarsimp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3437	apply (rule_tac f = "(% a b. a \<or> b)" in arg_cong2)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3438	apply auto
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3439	apply (rule_tac x="hd (drop (length x) y)" in exI)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3440	apply (rule_tac x="tl (drop (length x) y)" in exI)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3441	apply (erule subst, simp add: min_def)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3442	apply (rule_tac x ="length u" in exI, simp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3443	apply (rule_tac x ="take i x" in exI)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3444	apply (rule_tac x ="x ! i" in exI)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3445	apply (rule_tac x ="y ! i" in exI, safe)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3446	apply (rule_tac x="drop (Suc i) x" in exI)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3447	apply (drule sym, simp add: drop_Suc_conv_tl)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3448	apply (rule_tac x="drop (Suc i) y" in exI)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3449	by (simp add: drop_Suc_conv_tl)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3450
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3451	-- {* lexord is extension of partial ordering List.lex *}
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3452	lemma lexord_lex: " (x,y) \<in> lex r = ((x,y) \<in> lexord r \<and> length x = length y)"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3453	apply (rule_tac x = y in spec)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3454	apply (induct_tac x, clarsimp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3455	by (clarify, case_tac x, simp, force)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3456
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3457	lemma lexord_irreflexive: "(! x. (x,x) \<notin> r) \<Longrightarrow> (y,y) \<notin> lexord r"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3458	by (induct y, auto)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3459
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3460	lemma lexord_trans:
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3461	"\<lbrakk> (x, y) \<in> lexord r; (y, z) \<in> lexord r; trans r \<rbrakk> \<Longrightarrow> (x, z) \<in> lexord r"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3462	apply (erule rev_mp)+
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3463	apply (rule_tac x = x in spec)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3464	apply (rule_tac x = z in spec)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3465	apply ( induct_tac y, simp, clarify)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3466	apply (case_tac xa, erule ssubst)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3467	apply (erule allE, erule allE) -- {* avoid simp recursion *}
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3468	apply (case_tac x, simp, simp)
24632 779fc4fcbf8b metis now available in PreList paulson parents: 24617 diff changeset	3469	apply (case_tac x, erule allE, erule allE, simp)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3470	apply (erule_tac x = listb in allE)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3471	apply (erule_tac x = lista in allE, simp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3472	apply (unfold trans_def)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3473	by blast
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3474
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3475	lemma lexord_transI: "trans r \<Longrightarrow> trans (lexord r)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3476	by (rule transI, drule lexord_trans, blast)
15656 988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3477
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3478	lemma lexord_linear: "(! a b. (a,b)\<in> r \| a = b \| (b,a) \<in> r) \<Longrightarrow> (x,y) : lexord r \| x = y \| (y,x) : lexord r"
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3479	apply (rule_tac x = y in spec)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3480	apply (induct_tac x, rule allI)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3481	apply (case_tac x, simp, simp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3482	apply (rule allI, case_tac x, simp, simp)
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3483	by blast
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3484
988f91b9c4ef lexicographic order by Norbert Voelker paulson parents: 15570 diff changeset	3485
21103 367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3486	subsection {* Lexicographic combination of measure functions *}
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3487
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3488	text {* These are useful for termination proofs *}
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3489
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3490	definition
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3491	"measures fs = inv_image (lex less_than) (%a. map (%f. f a) fs)"
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3492
21106 51599a81b308 Added "recdef_wf" and "simp" attribute to "wf_measures" krauss parents: 21103 diff changeset	3493	lemma wf_measures[recdef_wf, simp]: "wf (measures fs)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3494	unfolding measures_def
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3495	by blast
21103 367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3496
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3497	lemma in_measures[simp]:
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3498	"(x, y) \<in> measures [] = False"
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3499	"(x, y) \<in> measures (f # fs)
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3500	= (f x < f y \<or> (f x = f y \<and> (x, y) \<in> measures fs))"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3501	unfolding measures_def
0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3502	by auto
21103 367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3503
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3504	lemma measures_less: "f x < f y ==> (x, y) \<in> measures (f#fs)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3505	by simp
21103 367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3506
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3507	lemma measures_lesseq: "f x <= f y ==> (x, y) \<in> measures fs ==> (x, y) \<in> measures (f#fs)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3508	by auto
21103 367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3509
367b4ad7c7cc Added "measures" combinator for lexicographic combinations of multiple measures. krauss parents: 21079 diff changeset	3510
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15307 diff changeset	3511	subsubsection{Lifting a Relation on List Elements to the Lists}
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3512
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3513	inductive_set
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3514	listrel :: "('a * 'a)set => ('a list * 'a list)set"
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3515	for r :: "('a * 'a)set"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 22143 diff changeset	3516	where
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3517	Nil: "([],[]) \<in> listrel r"
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3518	\| Cons: "[\| (x,y) \<in> r; (xs,ys) \<in> listrel r \|] ==> (x#xs, y#ys) \<in> listrel r"
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3519
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3520	inductive_cases listrel_Nil1 [elim!]: "([],xs) \<in> listrel r"
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3521	inductive_cases listrel_Nil2 [elim!]: "(xs,[]) \<in> listrel r"
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3522	inductive_cases listrel_Cons1 [elim!]: "(y#ys,xs) \<in> listrel r"
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3523	inductive_cases listrel_Cons2 [elim!]: "(xs,y#ys) \<in> listrel r"
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3524
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3525
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3526	lemma listrel_mono: "r \<subseteq> s \<Longrightarrow> listrel r \<subseteq> listrel s"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3527	apply clarify
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3528	apply (erule listrel.induct)
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3529	apply (blast intro: listrel.intros)+
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3530	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3531
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3532	lemma listrel_subset: "r \<subseteq> A \<times> A \<Longrightarrow> listrel r \<subseteq> lists A \<times> lists A"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3533	apply clarify
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3534	apply (erule listrel.induct, auto)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3535	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3536
30198 922f944f03b2 name changes nipkow parents: 30128 diff changeset	3537	lemma listrel_refl_on: "refl_on A r \<Longrightarrow> refl_on (lists A) (listrel r)"
922f944f03b2 name changes nipkow parents: 30128 diff changeset	3538	apply (simp add: refl_on_def listrel_subset Ball_def)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3539	apply (rule allI)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3540	apply (induct_tac x)
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3541	apply (auto intro: listrel.intros)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3542	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3543
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3544	lemma listrel_sym: "sym r \<Longrightarrow> sym (listrel r)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3545	apply (auto simp add: sym_def)
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3546	apply (erule listrel.induct)
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3547	apply (blast intro: listrel.intros)+
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3548	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3549
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3550	lemma listrel_trans: "trans r \<Longrightarrow> trans (listrel r)"
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3551	apply (simp add: trans_def)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3552	apply (intro allI)
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3553	apply (rule impI)
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3554	apply (erule listrel.induct)
d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3555	apply (blast intro: listrel.intros)+
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3556	done
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3557
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3558	theorem equiv_listrel: "equiv A r \<Longrightarrow> equiv (lists A) (listrel r)"
30198 922f944f03b2 name changes nipkow parents: 30128 diff changeset	3559	by (simp add: equiv_def listrel_refl_on listrel_sym listrel_trans)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3560
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3561	lemma listrel_Nil [simp]: "listrel r `` {[]} = {[]}"
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3562	by (blast intro: listrel.intros)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3563
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3564	lemma listrel_Cons:
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3565	"listrel r `` {x#xs} = set_Cons (r``{x}) (listrel r `` {xs})";
23740 d7f18c837ce7 Adapted to new package for inductive sets. berghofe parents: 23554 diff changeset	3566	by (auto simp add: set_Cons_def intro: listrel.intros)
15302 a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3567
a643fcbc3468 Restructured List and added "rotate" nipkow parents: 15281 diff changeset	3568
26749 397a1aeede7d * New attribute "termination_simp": Simp rules for termination proofs krauss parents: 26734 diff changeset	3569	subsection {* Size function *}
397a1aeede7d * New attribute "termination_simp": Simp rules for termination proofs krauss parents: 26734 diff changeset	3570
26875 e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3571	lemma [measure_function]: "is_measure f \<Longrightarrow> is_measure (list_size f)"
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3572	by (rule is_measure_trivial)
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3573
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3574	lemma [measure_function]: "is_measure f \<Longrightarrow> is_measure (option_size f)"
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3575	by (rule is_measure_trivial)
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3576
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3577	lemma list_size_estimation[termination_simp]:
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3578	"x \<in> set xs \<Longrightarrow> y < f x \<Longrightarrow> y < list_size f xs"
26749 397a1aeede7d * New attribute "termination_simp": Simp rules for termination proofs krauss parents: 26734 diff changeset	3579	by (induct xs) auto
397a1aeede7d * New attribute "termination_simp": Simp rules for termination proofs krauss parents: 26734 diff changeset	3580
26875 e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3581	lemma list_size_estimation'[termination_simp]:
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3582	"x \<in> set xs \<Longrightarrow> y \<le> f x \<Longrightarrow> y \<le> list_size f xs"
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3583	by (induct xs) auto
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3584
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3585	lemma list_size_map[simp]: "list_size f (map g xs) = list_size (f o g) xs"
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3586	by (induct xs) auto
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3587
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3588	lemma list_size_pointwise[termination_simp]:
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3589	"(\<And>x. x \<in> set xs \<Longrightarrow> f x < g x) \<Longrightarrow> list_size f xs \<le> list_size g xs"
e18574413bc4 Measure functions can now be declared via special rules, allowing for a krauss parents: 26795 diff changeset	3590	by (induct xs) force+
26749 397a1aeede7d * New attribute "termination_simp": Simp rules for termination proofs krauss parents: 26734 diff changeset	3591
31048 ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3592
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3593	subsection {* Code generator *}
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3594
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3595	subsubsection {* Setup *}
15064 4f3102b50197 - Moved code generator setup for lists from Main.thy to List.thy berghofe parents: 15045 diff changeset	3596
31055 2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3597	use "Tools/list_code.ML"
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3598
31048 ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3599	code_type list
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3600	(SML "_ list")
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3601	(OCaml "_ list")
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3602	(Haskell "![_]")
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3603
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3604	code_const Nil
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3605	(SML "[]")
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3606	(OCaml "[]")
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3607	(Haskell "[]")
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3608
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3609	code_instance list :: eq
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3610	(Haskell -)
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3611
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3612	code_const "eq_class.eq \<Colon> 'a\<Colon>eq list \<Rightarrow> 'a list \<Rightarrow> bool"
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3613	(Haskell infixl 4 "==")
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3614
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3615	code_reserved SML
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3616	list
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3617
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3618	code_reserved OCaml
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3619	list
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3620
16770 1f1b1fae30e4 Auxiliary functions to be used in generated code are now defined using "attach". berghofe parents: 16634 diff changeset	3621	types_code
1f1b1fae30e4 Auxiliary functions to be used in generated code are now defined using "attach". berghofe parents: 16634 diff changeset	3622	"list" ("_ list")
1f1b1fae30e4 Auxiliary functions to be used in generated code are now defined using "attach". berghofe parents: 16634 diff changeset	3623	attach (term_of) {*
21760 78248dda3a90 fixed term_of_list; wenzelm parents: 21754 diff changeset	3624	fun term_of_list f T = HOLogic.mk_list T o map f;
16770 1f1b1fae30e4 Auxiliary functions to be used in generated code are now defined using "attach". berghofe parents: 16634 diff changeset	3625	*}
1f1b1fae30e4 Auxiliary functions to be used in generated code are now defined using "attach". berghofe parents: 16634 diff changeset	3626	attach (test) {*
25885 6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3627	fun gen_list' aG aT i j = frequency
6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3628	[(i, fn () =>
6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3629	let
6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3630	val (x, t) = aG j;
6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3631	val (xs, ts) = gen_list' aG aT (i-1) j
6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3632	in (x :: xs, fn () => HOLogic.cons_const aT $ t () $ ts ()) end),
6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3633	(1, fn () => ([], fn () => HOLogic.nil_const aT))] ()
6fbc3f54f819 New interface for test data generators. berghofe parents: 25591 diff changeset	3634	and gen_list aG aT i = gen_list' aG aT i i;
16770 1f1b1fae30e4 Auxiliary functions to be used in generated code are now defined using "attach". berghofe parents: 16634 diff changeset	3635	*}
31048 ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3636
ac146fc38b51 refined HOL string theories and corresponding ML fragments haftmann parents: 31022 diff changeset	3637	consts_code Cons ("(_ ::/ _)")
20588 c847c56edf0c added operational equality haftmann parents: 20503 diff changeset	3638
20453 855f07fabd76 final syntax for some Isar code generator keywords haftmann parents: 20439 diff changeset	3639	setup {*
855f07fabd76 final syntax for some Isar code generator keywords haftmann parents: 20439 diff changeset	3640	let
31055 2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3641	fun list_codegen thy defs dep thyname b t gr =
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3642	let
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3643	val ts = HOLogic.dest_list t;
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3644	val (_, gr') = Codegen.invoke_tycodegen thy defs dep thyname false
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3645	(fastype_of t) gr;
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3646	val (ps, gr'') = fold_map
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3647	(Codegen.invoke_codegen thy defs dep thyname false) ts gr'
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3648	in SOME (Pretty.list "[" "]" ps, gr'') end handle TERM _ => NONE;
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3649	in
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3650	fold (List_Code.add_literal_list) ["SML", "OCaml", "Haskell"]
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3651	#> Codegen.add_codegen "list_codegen" list_codegen
2cf6efca6c71 proper structures for list and string code generation stuff haftmann parents: 31048 diff changeset	3652	end
20453 855f07fabd76 final syntax for some Isar code generator keywords haftmann parents: 20439 diff changeset	3653	*}
15064 4f3102b50197 - Moved code generator setup for lists from Main.thy to List.thy berghofe parents: 15045 diff changeset	3654
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3655
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3656	subsubsection {* Generation of efficient code *}
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3657
25221 5ded95dda5df append/member: more light-weight way to declare authentic syntax; wenzelm parents: 25215 diff changeset	3658	primrec
25559 f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	3659	member :: "'a \<Rightarrow> 'a list \<Rightarrow> bool" (infixl "mem" 55)
f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	3660	where
f14305fb698c authentic primrec haftmann parents: 25502 diff changeset	3661	"x mem [] \<longleftrightarrow> False"
28515 b26ba1b1dbda dropped superfluous if haftmann parents: 28370 diff changeset	3662	\| "x mem (y#ys) \<longleftrightarrow> x = y \<or> x mem ys"
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3663
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3664	primrec
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3665	null:: "'a list \<Rightarrow> bool"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3666	where
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3667	"null [] = True"
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3668	\| "null (x#xs) = False"
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3669
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3670	primrec
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3671	list_inter :: "'a list \<Rightarrow> 'a list \<Rightarrow> 'a list"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3672	where
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3673	"list_inter [] bs = []"
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3674	\| "list_inter (a#as) bs =
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3675	(if a \<in> set bs then a # list_inter as bs else list_inter as bs)"
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3676
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3677	primrec
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3678	list_all :: "('a \<Rightarrow> bool) \<Rightarrow> ('a list \<Rightarrow> bool)"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3679	where
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3680	"list_all P [] = True"
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3681	\| "list_all P (x#xs) = (P x \<and> list_all P xs)"
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3682
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3683	primrec
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3684	list_ex :: "('a \<Rightarrow> bool) \<Rightarrow> 'a list \<Rightarrow> bool"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3685	where
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3686	"list_ex P [] = False"
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3687	\| "list_ex P (x#xs) = (P x \<or> list_ex P xs)"
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3688
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3689	primrec
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3690	filtermap :: "('a \<Rightarrow> 'b option) \<Rightarrow> 'a list \<Rightarrow> 'b list"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3691	where
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3692	"filtermap f [] = []"
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3693	\| "filtermap f (x#xs) =
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3694	(case f x of None \<Rightarrow> filtermap f xs
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3695	\| Some y \<Rightarrow> y # filtermap f xs)"
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3696
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3697	primrec
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3698	map_filter :: "('a \<Rightarrow> 'b) \<Rightarrow> ('a \<Rightarrow> bool) \<Rightarrow> 'a list \<Rightarrow> 'b list"
57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3699	where
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3700	"map_filter f P [] = []"
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3701	\| "map_filter f P (x#xs) =
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3702	(if P x then f x # map_filter f P xs else map_filter f P xs)"
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3703
28789 5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3704	primrec
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3705	length_unique :: "'a list \<Rightarrow> nat"
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3706	where
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3707	"length_unique [] = 0"
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3708	\| "length_unique (x#xs) =
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3709	(if x \<in> set xs then length_unique xs else Suc (length_unique xs))"
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3710
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3711	text {*
21754 6316163ae934 moved char/string syntax to Tools/string_syntax.ML; wenzelm parents: 21548 diff changeset	3712	Only use @{text mem} for generating executable code. Otherwise use
6316163ae934 moved char/string syntax to Tools/string_syntax.ML; wenzelm parents: 21548 diff changeset	3713	@{prop "x : set xs"} instead --- it is much easier to reason about.
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3714	The same is true for @{const list_all} and @{const list_ex}: write
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3715	@{text "\<forall>x\<in>set xs"} and @{text "\<exists>x\<in>set xs"} instead because the HOL
21754 6316163ae934 moved char/string syntax to Tools/string_syntax.ML; wenzelm parents: 21548 diff changeset	3716	quantifiers are aleady known to the automatic provers. In fact, the
6316163ae934 moved char/string syntax to Tools/string_syntax.ML; wenzelm parents: 21548 diff changeset	3717	declarations in the code subsection make sure that @{text "\<in>"},
6316163ae934 moved char/string syntax to Tools/string_syntax.ML; wenzelm parents: 21548 diff changeset	3718	@{text "\<forall>x\<in>set xs"} and @{text "\<exists>x\<in>set xs"} are implemented
6316163ae934 moved char/string syntax to Tools/string_syntax.ML; wenzelm parents: 21548 diff changeset	3719	efficiently.
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3720
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3721	Efficient emptyness check is implemented by @{const null}.
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3722
23060 0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3723	The functions @{const filtermap} and @{const map_filter} are just
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3724	there to generate efficient code. Do not use
21754 6316163ae934 moved char/string syntax to Tools/string_syntax.ML; wenzelm parents: 21548 diff changeset	3725	them for modelling and proving.
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3726	*}
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3727
23060 0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3728	lemma rev_foldl_cons [code]:
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3729	"rev xs = foldl (\<lambda>xs x. x # xs) [] xs"
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3730	proof (induct xs)
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3731	case Nil then show ?case by simp
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3732	next
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3733	case Cons
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3734	{
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3735	fix x xs ys
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3736	have "foldl (\<lambda>xs x. x # xs) ys xs @ [x]
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3737	= foldl (\<lambda>xs x. x # xs) (ys @ [x]) xs"
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3738	by (induct xs arbitrary: ys) auto
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3739	}
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3740	note aux = this
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3741	show ?case by (induct xs) (auto simp add: Cons aux)
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3742	qed
0c0b03d0ec7e improved code for rev haftmann parents: 23029 diff changeset	3743
24166 7b28dc69bdbb new nbe implementation haftmann parents: 24130 diff changeset	3744	lemma mem_iff [code post]:
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3745	"x mem xs \<longleftrightarrow> x \<in> set xs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3746	by (induct xs) auto
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3747
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3748	lemmas in_set_code [code unfold] = mem_iff [symmetric]
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3749
31154 f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	3750	lemma empty_null:
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3751	"xs = [] \<longleftrightarrow> null xs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3752	by (cases xs) simp_all
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3753
31154 f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	3754	lemma [code inline]:
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	3755	"eq_class.eq xs [] \<longleftrightarrow> null xs"
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	3756	by (simp add: eq empty_null)
f919b8e67413 preprocessing must consider eq haftmann parents: 31080 diff changeset	3757
24166 7b28dc69bdbb new nbe implementation haftmann parents: 24130 diff changeset	3758	lemmas null_empty [code post] =
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3759	empty_null [symmetric]
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3760
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3761	lemma list_inter_conv:
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3762	"set (list_inter xs ys) = set xs \<inter> set ys"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3763	by (induct xs) auto
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3764
24166 7b28dc69bdbb new nbe implementation haftmann parents: 24130 diff changeset	3765	lemma list_all_iff [code post]:
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3766	"list_all P xs \<longleftrightarrow> (\<forall>x \<in> set xs. P x)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3767	by (induct xs) auto
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3768
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3769	lemmas list_ball_code [code unfold] = list_all_iff [symmetric]
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3770
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3771	lemma list_all_append [simp]:
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3772	"list_all P (xs @ ys) \<longleftrightarrow> (list_all P xs \<and> list_all P ys)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3773	by (induct xs) auto
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3774
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3775	lemma list_all_rev [simp]:
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3776	"list_all P (rev xs) \<longleftrightarrow> list_all P xs"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3777	by (simp add: list_all_iff)
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3778
22506 c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3779	lemma list_all_length:
c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3780	"list_all P xs \<longleftrightarrow> (\<forall>n < length xs. P (xs ! n))"
c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3781	unfolding list_all_iff by (auto intro: all_nth_imp_all_set)
c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3782
24166 7b28dc69bdbb new nbe implementation haftmann parents: 24130 diff changeset	3783	lemma list_ex_iff [code post]:
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22262 diff changeset	3784	"list_ex P xs \<longleftrightarrow> (\<exists>x \<in> set xs. P x)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3785	by (induct xs) simp_all
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3786
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3787	lemmas list_bex_code [code unfold] =
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3788	list_ex_iff [symmetric]
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3789
22506 c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3790	lemma list_ex_length:
c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3791	"list_ex P xs \<longleftrightarrow> (\<exists>n < length xs. P (xs ! n))"
c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3792	unfolding list_ex_iff set_conv_nth by auto
c78f1d924bfe two further properties about lists haftmann parents: 22493 diff changeset	3793
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3794	lemma filtermap_conv:
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3795	"filtermap f xs = map (\<lambda>x. the (f x)) (filter (\<lambda>x. f x \<noteq> None) xs)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3796	by (induct xs) (simp_all split: option.split)
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3797
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3798	lemma map_filter_conv [simp]:
580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3799	"map_filter f P xs = map f (filter P xs)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3800	by (induct xs) auto
21061 580dfc999ef6 added normal post setup; cleaned up "execution" constants haftmann parents: 21046 diff changeset	3801
28823 dcbef866c9e2 tuned unfold_locales invocation haftmann parents: 28789 diff changeset	3802	lemma length_remdups_length_unique [code inline]:
28789 5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3803	"length (remdups xs) = length_unique xs"
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3804	by (induct xs) simp_all
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3805
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3806	hide (open) const length_unique
5a404273ea8f added length_unique operation for code generation haftmann parents: 28708 diff changeset	3807
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	3808
2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	3809	text {* Code for bounded quantification and summation over nats. *}
21891 b4e4ea3db161 added code lemmas for quantification over bounded nats haftmann parents: 21871 diff changeset	3810
28072 a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3811	lemma atMost_upto [code unfold]:
a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3812	"{..n} = set [0..<Suc n]"
a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3813	by auto
a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3814
a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3815	lemma atLeast_upt [code unfold]:
a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3816	"{..<n} = set [0..<n]"
a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3817	by auto
a45e8c872dc1 It appears that the code generator (Stefan's) needs some laws that appear superfluous: {..n} = set ... nipkow parents: 28068 diff changeset	3818
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	3819	lemma greaterThanLessThan_upt [code unfold]:
21891 b4e4ea3db161 added code lemmas for quantification over bounded nats haftmann parents: 21871 diff changeset	3820	"{n<..<m} = set [Suc n..<m]"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3821	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3822
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	3823	lemma atLeastLessThan_upt [code unfold]:
21891 b4e4ea3db161 added code lemmas for quantification over bounded nats haftmann parents: 21871 diff changeset	3824	"{n..<m} = set [n..<m]"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3825	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3826
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3827	lemma greaterThanAtMost_upt [code unfold]:
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3828	"{n<..m} = set [Suc n..<Suc m]"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3829	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3830
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3831	lemma atLeastAtMost_upt [code unfold]:
24645 1af302128da2 Generalized [_.._] from nat to linear orders nipkow parents: 24640 diff changeset	3832	"{n..m} = set [n..<Suc m]"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3833	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3834
ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3835	lemma all_nat_less_eq [code unfold]:
21891 b4e4ea3db161 added code lemmas for quantification over bounded nats haftmann parents: 21871 diff changeset	3836	"(\<forall>m<n\<Colon>nat. P m) \<longleftrightarrow> (\<forall>m \<in> {0..<n}. P m)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3837	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3838
ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3839	lemma ex_nat_less_eq [code unfold]:
21891 b4e4ea3db161 added code lemmas for quantification over bounded nats haftmann parents: 21871 diff changeset	3840	"(\<exists>m<n\<Colon>nat. P m) \<longleftrightarrow> (\<exists>m \<in> {0..<n}. P m)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3841	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3842
ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3843	lemma all_nat_less [code unfold]:
21891 b4e4ea3db161 added code lemmas for quantification over bounded nats haftmann parents: 21871 diff changeset	3844	"(\<forall>m\<le>n\<Colon>nat. P m) \<longleftrightarrow> (\<forall>m \<in> {0..n}. P m)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3845	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3846
ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3847	lemma ex_nat_less [code unfold]:
21891 b4e4ea3db161 added code lemmas for quantification over bounded nats haftmann parents: 21871 diff changeset	3848	"(\<exists>m\<le>n\<Colon>nat. P m) \<longleftrightarrow> (\<exists>m \<in> {0..n}. P m)"
24349 0dd8782fb02d Final mods for list comprehension nipkow parents: 24335 diff changeset	3849	by auto
22799 ed7d53db2170 moved code generation pretty integers and characters to separate theories haftmann parents: 22793 diff changeset	3850
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3851	lemma setsum_set_distinct_conv_listsum:
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3852	"distinct xs \<Longrightarrow> setsum f (set xs) = listsum (map f xs)"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3853	by (induct xs) simp_all
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3854
26442 57fb6a8b099e restructuring; explicit case names for rule list_induct2 haftmann parents: 26300 diff changeset	3855	lemma setsum_set_upt_conv_listsum [code unfold]:
27715 087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3856	"setsum f (set [m..<n]) = listsum (map f [m..<n])"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3857	by (rule setsum_set_distinct_conv_listsum) simp
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3858
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3859
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3860	text {* Code for summation over ints. *}
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3861
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3862	lemma greaterThanLessThan_upto [code unfold]:
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3863	"{i<..<j::int} = set [i+1..j - 1]"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3864	by auto
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3865
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3866	lemma atLeastLessThan_upto [code unfold]:
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3867	"{i..<j::int} = set [i..j - 1]"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3868	by auto
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3869
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3870	lemma greaterThanAtMost_upto [code unfold]:
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3871	"{i<..j::int} = set [i+1..j]"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3872	by auto
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3873
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3874	lemma atLeastAtMost_upto [code unfold]:
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3875	"{i..j::int} = set [i..j]"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3876	by auto
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3877
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3878	lemma setsum_set_upto_conv_listsum [code unfold]:
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3879	"setsum f (set [i..j::int]) = listsum (map f [i..j])"
087db5aacac3 made setsum executable on int. nipkow parents: 27693 diff changeset	3880	by (rule setsum_set_distinct_conv_listsum) simp
24449 2f05cb7fed85 added (code) lemmas for setsum and foldl nipkow parents: 24349 diff changeset	3881
23388 77645da0db85 tuned proofs: avoid implicit prems; wenzelm parents: 23279 diff changeset	3882	end

author	nipkow
	Fri, 19 Jun 2009 18:33:10 +0200
changeset 31719	29f5b20e8ee8
parent 31557	4e36f2f17c63
child 31723	f5cafe803b55
permissions	-rw-r--r--