src/HOL/List.thy
author wenzelm
Sat Apr 16 15:25:25 2011 +0200 (2011-04-16)
changeset 42359 6ca5407863ed
parent 42264 b6c1b0c4c511
child 42361 23f352990944
permissions -rw-r--r--
prefer local name spaces;
tuned signatures;
tuned;
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(*  Title:      HOL/List.thy
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    Author:     Tobias Nipkow
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*)
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header {* The datatype of finite lists *}
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theory List
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imports Plain Presburger Recdef Code_Numeral Quotient ATP
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uses
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  ("Tools/list_code.ML")
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  ("Tools/list_to_set_comprehension.ML")
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begin
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datatype 'a list =
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    Nil    ("[]")
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  | Cons 'a  "'a list"    (infixr "#" 65)
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syntax
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  -- {* list Enumeration *}
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  "_list" :: "args => 'a list"    ("[(_)]")
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translations
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  "[x, xs]" == "x#[xs]"
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  "[x]" == "x#[]"
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subsection {* Basic list processing functions *}
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primrec
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  hd :: "'a list \<Rightarrow> 'a" where
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  "hd (x # xs) = x"
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primrec
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  tl :: "'a list \<Rightarrow> 'a list" where
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    "tl [] = []"
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  | "tl (x # xs) = xs"
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primrec
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  last :: "'a list \<Rightarrow> 'a" where
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  "last (x # xs) = (if xs = [] then x else last xs)"
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primrec
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  butlast :: "'a list \<Rightarrow> 'a list" where
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    "butlast []= []"
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  | "butlast (x # xs) = (if xs = [] then [] else x # butlast xs)"
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primrec
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  set :: "'a list \<Rightarrow> 'a set" where
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    "set [] = {}"
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  | "set (x # xs) = insert x (set xs)"
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primrec
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  map :: "('a \<Rightarrow> 'b) \<Rightarrow> 'a list \<Rightarrow> 'b list" where
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    "map f [] = []"
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  | "map f (x # xs) = f x # map f xs"
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primrec
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  append :: "'a list \<Rightarrow> 'a list \<Rightarrow> 'a list" (infixr "@" 65) where
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    append_Nil:"[] @ ys = ys"
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  | append_Cons: "(x#xs) @ ys = x # xs @ ys"
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primrec
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  rev :: "'a list \<Rightarrow> 'a list" where
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    "rev [] = []"
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  | "rev (x # xs) = rev xs @ [x]"
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primrec
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  filter:: "('a \<Rightarrow> bool) \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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    "filter P [] = []"
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  | "filter P (x # xs) = (if P x then x # filter P xs else filter P xs)"
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syntax
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  -- {* Special syntax for filter *}
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  "_filter" :: "[pttrn, 'a list, bool] => 'a list"    ("(1[_<-_./ _])")
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translations
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  "[x<-xs . P]"== "CONST filter (%x. P) xs"
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syntax (xsymbols)
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  "_filter" :: "[pttrn, 'a list, bool] => 'a list"("(1[_\<leftarrow>_ ./ _])")
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syntax (HTML output)
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  "_filter" :: "[pttrn, 'a list, bool] => 'a list"("(1[_\<leftarrow>_ ./ _])")
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primrec
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  foldl :: "('b \<Rightarrow> 'a \<Rightarrow> 'b) \<Rightarrow> 'b \<Rightarrow> 'a list \<Rightarrow> 'b" where
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    foldl_Nil: "foldl f a [] = a"
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  | foldl_Cons: "foldl f a (x # xs) = foldl f (f a x) xs"
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primrec
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  foldr :: "('a \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'a list \<Rightarrow> 'b \<Rightarrow> 'b" where
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    "foldr f [] a = a"
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  | "foldr f (x # xs) a = f x (foldr f xs a)"
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primrec
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  concat:: "'a list list \<Rightarrow> 'a list" where
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    "concat [] = []"
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  | "concat (x # xs) = x @ concat xs"
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definition (in monoid_add)
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  listsum :: "'a list \<Rightarrow> 'a" where
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  "listsum xs = foldr plus xs 0"
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primrec
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  drop:: "nat \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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    drop_Nil: "drop n [] = []"
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  | drop_Cons: "drop n (x # xs) = (case n of 0 \<Rightarrow> x # xs | Suc m \<Rightarrow> drop m xs)"
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  -- {*Warning: simpset does not contain this definition, but separate
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       theorems for @{text "n = 0"} and @{text "n = Suc k"} *}
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primrec
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  take:: "nat \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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    take_Nil:"take n [] = []"
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  | take_Cons: "take n (x # xs) = (case n of 0 \<Rightarrow> [] | Suc m \<Rightarrow> x # take m xs)"
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  -- {*Warning: simpset does not contain this definition, but separate
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       theorems for @{text "n = 0"} and @{text "n = Suc k"} *}
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primrec
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  nth :: "'a list => nat => 'a" (infixl "!" 100) where
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  nth_Cons: "(x # xs) ! n = (case n of 0 \<Rightarrow> x | Suc k \<Rightarrow> xs ! k)"
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  -- {*Warning: simpset does not contain this definition, but separate
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       theorems for @{text "n = 0"} and @{text "n = Suc k"} *}
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primrec
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  list_update :: "'a list \<Rightarrow> nat \<Rightarrow> 'a \<Rightarrow> 'a list" where
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    "list_update [] i v = []"
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  | "list_update (x # xs) i v = (case i of 0 \<Rightarrow> v # xs | Suc j \<Rightarrow> x # list_update xs j v)"
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nonterminal lupdbinds and lupdbind
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syntax
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  "_lupdbind":: "['a, 'a] => lupdbind"    ("(2_ :=/ _)")
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  "" :: "lupdbind => lupdbinds"    ("_")
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  "_lupdbinds" :: "[lupdbind, lupdbinds] => lupdbinds"    ("_,/ _")
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  "_LUpdate" :: "['a, lupdbinds] => 'a"    ("_/[(_)]" [900,0] 900)
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translations
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  "_LUpdate xs (_lupdbinds b bs)" == "_LUpdate (_LUpdate xs b) bs"
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  "xs[i:=x]" == "CONST list_update xs i x"
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primrec
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  takeWhile :: "('a \<Rightarrow> bool) \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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    "takeWhile P [] = []"
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  | "takeWhile P (x # xs) = (if P x then x # takeWhile P xs else [])"
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primrec
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  dropWhile :: "('a \<Rightarrow> bool) \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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    "dropWhile P [] = []"
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  | "dropWhile P (x # xs) = (if P x then dropWhile P xs else x # xs)"
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primrec
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  zip :: "'a list \<Rightarrow> 'b list \<Rightarrow> ('a \<times> 'b) list" where
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    "zip xs [] = []"
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  | zip_Cons: "zip xs (y # ys) = (case xs of [] => [] | z # zs => (z, y) # zip zs ys)"
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  -- {*Warning: simpset does not contain this definition, but separate
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       theorems for @{text "xs = []"} and @{text "xs = z # zs"} *}
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primrec 
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  upt :: "nat \<Rightarrow> nat \<Rightarrow> nat list" ("(1[_..</_'])") where
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    upt_0: "[i..<0] = []"
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  | upt_Suc: "[i..<(Suc j)] = (if i <= j then [i..<j] @ [j] else [])"
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definition
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  insert :: "'a \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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  "insert x xs = (if x \<in> set xs then xs else x # xs)"
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hide_const (open) insert
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hide_fact (open) insert_def
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primrec
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  remove1 :: "'a \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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    "remove1 x [] = []"
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  | "remove1 x (y # xs) = (if x = y then xs else y # remove1 x xs)"
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primrec
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  removeAll :: "'a \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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    "removeAll x [] = []"
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  | "removeAll x (y # xs) = (if x = y then removeAll x xs else y # removeAll x xs)"
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primrec
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  distinct :: "'a list \<Rightarrow> bool" where
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    "distinct [] \<longleftrightarrow> True"
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  | "distinct (x # xs) \<longleftrightarrow> x \<notin> set xs \<and> distinct xs"
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primrec
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  remdups :: "'a list \<Rightarrow> 'a list" where
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    "remdups [] = []"
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  | "remdups (x # xs) = (if x \<in> set xs then remdups xs else x # remdups xs)"
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primrec
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  replicate :: "nat \<Rightarrow> 'a \<Rightarrow> 'a list" where
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    replicate_0: "replicate 0 x = []"
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  | replicate_Suc: "replicate (Suc n) x = x # replicate n x"
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text {*
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  Function @{text size} is overloaded for all datatypes. Users may
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  refer to the list version as @{text length}. *}
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abbreviation
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  length :: "'a list \<Rightarrow> nat" where
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  "length \<equiv> size"
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definition
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  rotate1 :: "'a list \<Rightarrow> 'a list" where
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  "rotate1 xs = (case xs of [] \<Rightarrow> [] | x#xs \<Rightarrow> xs @ [x])"
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definition
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  rotate :: "nat \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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  "rotate n = rotate1 ^^ n"
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definition
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  list_all2 :: "('a => 'b => bool) => 'a list => 'b list => bool" where
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  "list_all2 P xs ys =
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    (length xs = length ys \<and> (\<forall>(x, y) \<in> set (zip xs ys). P x y))"
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definition
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  sublist :: "'a list => nat set => 'a list" where
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  "sublist xs A = map fst (filter (\<lambda>p. snd p \<in> A) (zip xs [0..<size xs]))"
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fun splice :: "'a list \<Rightarrow> 'a list \<Rightarrow> 'a list" where
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"splice [] ys = ys" |
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"splice xs [] = xs" |
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"splice (x#xs) (y#ys) = x # y # splice xs ys"
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text{*
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\begin{figure}[htbp]
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\fbox{
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\begin{tabular}{l}
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@{lemma "[a,b]@[c,d] = [a,b,c,d]" by simp}\\
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@{lemma "length [a,b,c] = 3" by simp}\\
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@{lemma "set [a,b,c] = {a,b,c}" by simp}\\
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@{lemma "map f [a,b,c] = [f a, f b, f c]" by simp}\\
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@{lemma "rev [a,b,c] = [c,b,a]" by simp}\\
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@{lemma "hd [a,b,c,d] = a" by simp}\\
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@{lemma "tl [a,b,c,d] = [b,c,d]" by simp}\\
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@{lemma "last [a,b,c,d] = d" by simp}\\
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@{lemma "butlast [a,b,c,d] = [a,b,c]" by simp}\\
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@{lemma[source] "filter (\<lambda>n::nat. n<2) [0,2,1] = [0,1]" by simp}\\
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@{lemma "concat [[a,b],[c,d,e],[],[f]] = [a,b,c,d,e,f]" by simp}\\
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@{lemma "foldl f x [a,b,c] = f (f (f x a) b) c" by simp}\\
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@{lemma "foldr f [a,b,c] x = f a (f b (f c x))" by simp}\\
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@{lemma "zip [a,b,c] [x,y,z] = [(a,x),(b,y),(c,z)]" by simp}\\
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@{lemma "zip [a,b] [x,y,z] = [(a,x),(b,y)]" by simp}\\
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@{lemma "splice [a,b,c] [x,y,z] = [a,x,b,y,c,z]" by simp}\\
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@{lemma "splice [a,b,c,d] [x,y] = [a,x,b,y,c,d]" by simp}\\
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@{lemma "take 2 [a,b,c,d] = [a,b]" by simp}\\
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@{lemma "take 6 [a,b,c,d] = [a,b,c,d]" by simp}\\
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@{lemma "drop 2 [a,b,c,d] = [c,d]" by simp}\\
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@{lemma "drop 6 [a,b,c,d] = []" by simp}\\
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@{lemma "takeWhile (%n::nat. n<3) [1,2,3,0] = [1,2]" by simp}\\
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@{lemma "dropWhile (%n::nat. n<3) [1,2,3,0] = [3,0]" by simp}\\
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@{lemma "distinct [2,0,1::nat]" by simp}\\
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@{lemma "remdups [2,0,2,1::nat,2] = [0,1,2]" by simp}\\
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@{lemma "List.insert 2 [0::nat,1,2] = [0,1,2]" by (simp add: List.insert_def)}\\
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@{lemma "List.insert 3 [0::nat,1,2] = [3,0,1,2]" by (simp add: List.insert_def)}\\
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@{lemma "remove1 2 [2,0,2,1::nat,2] = [0,2,1,2]" by simp}\\
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@{lemma "removeAll 2 [2,0,2,1::nat,2] = [0,1]" by simp}\\
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@{lemma "nth [a,b,c,d] 2 = c" by simp}\\
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@{lemma "[a,b,c,d][2 := x] = [a,b,x,d]" by simp}\\
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@{lemma "sublist [a,b,c,d,e] {0,2,3} = [a,c,d]" by (simp add:sublist_def)}\\
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@{lemma "rotate1 [a,b,c,d] = [b,c,d,a]" by (simp add:rotate1_def)}\\
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@{lemma "rotate 3 [a,b,c,d] = [d,a,b,c]" by (simp add:rotate1_def rotate_def eval_nat_numeral)}\\
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@{lemma "replicate 4 a = [a,a,a,a]" by (simp add:eval_nat_numeral)}\\
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@{lemma "[2..<5] = [2,3,4]" by (simp add:eval_nat_numeral)}\\
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@{lemma "listsum [1,2,3::nat] = 6" by (simp add: listsum_def)}
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\end{tabular}}
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\caption{Characteristic examples}
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\label{fig:Characteristic}
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\end{figure}
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Figure~\ref{fig:Characteristic} shows characteristic examples
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that should give an intuitive understanding of the above functions.
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*}
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text{* The following simple sort functions are intended for proofs,
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not for efficient implementations. *}
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context linorder
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begin
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inductive sorted :: "'a list \<Rightarrow> bool" where
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  Nil [iff]: "sorted []"
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| Cons: "\<forall>y\<in>set xs. x \<le> y \<Longrightarrow> sorted xs \<Longrightarrow> sorted (x # xs)"
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lemma sorted_single [iff]:
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  "sorted [x]"
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  by (rule sorted.Cons) auto
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lemma sorted_many:
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  "x \<le> y \<Longrightarrow> sorted (y # zs) \<Longrightarrow> sorted (x # y # zs)"
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  by (rule sorted.Cons) (cases "y # zs" rule: sorted.cases, auto)
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lemma sorted_many_eq [simp, code]:
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  "sorted (x # y # zs) \<longleftrightarrow> x \<le> y \<and> sorted (y # zs)"
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  by (auto intro: sorted_many elim: sorted.cases)
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lemma [code]:
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  "sorted [] \<longleftrightarrow> True"
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  "sorted [x] \<longleftrightarrow> True"
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  by simp_all
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primrec insort_key :: "('b \<Rightarrow> 'a) \<Rightarrow> 'b \<Rightarrow> 'b list \<Rightarrow> 'b list" where
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"insort_key f x [] = [x]" |
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"insort_key f x (y#ys) = (if f x \<le> f y then (x#y#ys) else y#(insort_key f x ys))"
hoelzl@33639
   303
haftmann@35195
   304
definition sort_key :: "('b \<Rightarrow> 'a) \<Rightarrow> 'b list \<Rightarrow> 'b list" where
haftmann@35195
   305
"sort_key f xs = foldr (insort_key f) xs []"
hoelzl@33639
   306
haftmann@40210
   307
definition insort_insert_key :: "('b \<Rightarrow> 'a) \<Rightarrow> 'b \<Rightarrow> 'b list \<Rightarrow> 'b list" where
haftmann@40210
   308
  "insort_insert_key f x xs = (if f x \<in> f ` set xs then xs else insort_key f x xs)"
haftmann@40210
   309
hoelzl@33639
   310
abbreviation "sort \<equiv> sort_key (\<lambda>x. x)"
hoelzl@33639
   311
abbreviation "insort \<equiv> insort_key (\<lambda>x. x)"
haftmann@40210
   312
abbreviation "insort_insert \<equiv> insort_insert_key (\<lambda>x. x)"
haftmann@35608
   313
wenzelm@25221
   314
end
wenzelm@25221
   315
nipkow@24616
   316
wenzelm@23388
   317
subsubsection {* List comprehension *}
nipkow@23192
   318
nipkow@24349
   319
text{* Input syntax for Haskell-like list comprehension notation.
nipkow@24349
   320
Typical example: @{text"[(x,y). x \<leftarrow> xs, y \<leftarrow> ys, x \<noteq> y]"},
nipkow@24349
   321
the list of all pairs of distinct elements from @{text xs} and @{text ys}.
nipkow@24349
   322
The syntax is as in Haskell, except that @{text"|"} becomes a dot
nipkow@24349
   323
(like in Isabelle's set comprehension): @{text"[e. x \<leftarrow> xs, \<dots>]"} rather than
nipkow@24349
   324
\verb![e| x <- xs, ...]!.
nipkow@24349
   325
nipkow@24349
   326
The qualifiers after the dot are
nipkow@24349
   327
\begin{description}
nipkow@24349
   328
\item[generators] @{text"p \<leftarrow> xs"},
nipkow@24476
   329
 where @{text p} is a pattern and @{text xs} an expression of list type, or
nipkow@24476
   330
\item[guards] @{text"b"}, where @{text b} is a boolean expression.
nipkow@24476
   331
%\item[local bindings] @ {text"let x = e"}.
nipkow@24349
   332
\end{description}
nipkow@23240
   333
nipkow@24476
   334
Just like in Haskell, list comprehension is just a shorthand. To avoid
nipkow@24476
   335
misunderstandings, the translation into desugared form is not reversed
nipkow@24476
   336
upon output. Note that the translation of @{text"[e. x \<leftarrow> xs]"} is
nipkow@24476
   337
optmized to @{term"map (%x. e) xs"}.
nipkow@23240
   338
nipkow@24349
   339
It is easy to write short list comprehensions which stand for complex
nipkow@24349
   340
expressions. During proofs, they may become unreadable (and
nipkow@24349
   341
mangled). In such cases it can be advisable to introduce separate
nipkow@24349
   342
definitions for the list comprehensions in question.  *}
nipkow@24349
   343
wenzelm@42144
   344
nonterminal lc_gen and lc_qual and lc_quals
nipkow@23192
   345
nipkow@23192
   346
syntax
nipkow@23240
   347
"_listcompr" :: "'a \<Rightarrow> lc_qual \<Rightarrow> lc_quals \<Rightarrow> 'a list"  ("[_ . __")
wenzelm@42144
   348
"_lc_gen" :: "lc_gen \<Rightarrow> 'a list \<Rightarrow> lc_qual" ("_ <- _")
nipkow@23240
   349
"_lc_test" :: "bool \<Rightarrow> lc_qual" ("_")
nipkow@24476
   350
(*"_lc_let" :: "letbinds => lc_qual"  ("let _")*)
nipkow@23240
   351
"_lc_end" :: "lc_quals" ("]")
nipkow@23240
   352
"_lc_quals" :: "lc_qual \<Rightarrow> lc_quals \<Rightarrow> lc_quals" (", __")
nipkow@24349
   353
"_lc_abs" :: "'a => 'b list => 'b list"
wenzelm@42144
   354
"_strip_positions" :: "'a \<Rightarrow> lc_gen"  ("_")
nipkow@23192
   355
nipkow@24476
   356
(* These are easier than ML code but cannot express the optimized
nipkow@24476
   357
   translation of [e. p<-xs]
nipkow@23192
   358
translations
nipkow@24349
   359
"[e. p<-xs]" => "concat(map (_lc_abs p [e]) xs)"
nipkow@23240
   360
"_listcompr e (_lc_gen p xs) (_lc_quals Q Qs)"
nipkow@24349
   361
 => "concat (map (_lc_abs p (_listcompr e Q Qs)) xs)"
nipkow@23240
   362
"[e. P]" => "if P then [e] else []"
nipkow@23240
   363
"_listcompr e (_lc_test P) (_lc_quals Q Qs)"
nipkow@23240
   364
 => "if P then (_listcompr e Q Qs) else []"
nipkow@24349
   365
"_listcompr e (_lc_let b) (_lc_quals Q Qs)"
nipkow@24349
   366
 => "_Let b (_listcompr e Q Qs)"
nipkow@24476
   367
*)
nipkow@23240
   368
nipkow@23279
   369
syntax (xsymbols)
wenzelm@42144
   370
"_lc_gen" :: "lc_gen \<Rightarrow> 'a list \<Rightarrow> lc_qual" ("_ \<leftarrow> _")
nipkow@23279
   371
syntax (HTML output)
wenzelm@42144
   372
"_lc_gen" :: "lc_gen \<Rightarrow> 'a list \<Rightarrow> lc_qual" ("_ \<leftarrow> _")
nipkow@24349
   373
nipkow@24349
   374
parse_translation (advanced) {*
nipkow@24349
   375
let
wenzelm@35256
   376
  val NilC = Syntax.const @{const_syntax Nil};
wenzelm@35256
   377
  val ConsC = Syntax.const @{const_syntax Cons};
wenzelm@35256
   378
  val mapC = Syntax.const @{const_syntax map};
wenzelm@35256
   379
  val concatC = Syntax.const @{const_syntax concat};
wenzelm@35256
   380
  val IfC = Syntax.const @{const_syntax If};
wenzelm@35115
   381
nipkow@24476
   382
  fun singl x = ConsC $ x $ NilC;
nipkow@24476
   383
wenzelm@35115
   384
  fun pat_tr ctxt p e opti = (* %x. case x of p => e | _ => [] *)
nipkow@24349
   385
    let
wenzelm@29281
   386
      val x = Free (Name.variant (fold Term.add_free_names [p, e] []) "x", dummyT);
nipkow@24476
   387
      val e = if opti then singl e else e;
wenzelm@42264
   388
      val case1 = Syntax.const @{syntax_const "_case1"} $ Term_Position.strip_positions p $ e;
wenzelm@35256
   389
      val case2 =
wenzelm@35256
   390
        Syntax.const @{syntax_const "_case1"} $
wenzelm@35256
   391
          Syntax.const @{const_syntax dummy_pattern} $ NilC;
wenzelm@35115
   392
      val cs = Syntax.const @{syntax_const "_case2"} $ case1 $ case2;
wenzelm@35115
   393
      val ft = Datatype_Case.case_tr false Datatype.info_of_constr ctxt [x, cs];
nipkow@24349
   394
    in lambda x ft end;
nipkow@24349
   395
wenzelm@35256
   396
  fun abs_tr ctxt (p as Free (s, T)) e opti =
wenzelm@35115
   397
        let
wenzelm@35115
   398
          val thy = ProofContext.theory_of ctxt;
wenzelm@42359
   399
          val s' = ProofContext.intern_const ctxt s;
wenzelm@35115
   400
        in
wenzelm@35115
   401
          if Sign.declared_const thy s'
wenzelm@35115
   402
          then (pat_tr ctxt p e opti, false)
wenzelm@35115
   403
          else (lambda p e, true)
nipkow@24349
   404
        end
nipkow@24476
   405
    | abs_tr ctxt p e opti = (pat_tr ctxt p e opti, false);
nipkow@24476
   406
wenzelm@35115
   407
  fun lc_tr ctxt [e, Const (@{syntax_const "_lc_test"}, _) $ b, qs] =
wenzelm@35115
   408
        let
wenzelm@35115
   409
          val res =
wenzelm@35115
   410
            (case qs of
wenzelm@35115
   411
              Const (@{syntax_const "_lc_end"}, _) => singl e
wenzelm@35115
   412
            | Const (@{syntax_const "_lc_quals"}, _) $ q $ qs => lc_tr ctxt [e, q, qs]);
nipkow@24476
   413
        in IfC $ b $ res $ NilC end
wenzelm@35115
   414
    | lc_tr ctxt
wenzelm@35115
   415
          [e, Const (@{syntax_const "_lc_gen"}, _) $ p $ es,
wenzelm@35115
   416
            Const(@{syntax_const "_lc_end"}, _)] =
nipkow@24476
   417
        (case abs_tr ctxt p e true of
wenzelm@35115
   418
          (f, true) => mapC $ f $ es
wenzelm@35115
   419
        | (f, false) => concatC $ (mapC $ f $ es))
wenzelm@35115
   420
    | lc_tr ctxt
wenzelm@35115
   421
          [e, Const (@{syntax_const "_lc_gen"}, _) $ p $ es,
wenzelm@35115
   422
            Const (@{syntax_const "_lc_quals"}, _) $ q $ qs] =
wenzelm@35115
   423
        let val e' = lc_tr ctxt [e, q, qs];
wenzelm@35115
   424
        in concatC $ (mapC $ (fst (abs_tr ctxt p e' false)) $ es) end;
wenzelm@35115
   425
wenzelm@35115
   426
in [(@{syntax_const "_listcompr"}, lc_tr)] end
nipkow@24349
   427
*}
nipkow@23279
   428
wenzelm@42167
   429
ML {*
wenzelm@42167
   430
  let
wenzelm@42167
   431
    val read = Syntax.read_term @{context};
wenzelm@42167
   432
    fun check s1 s2 = read s1 aconv read s2 orelse error ("Check failed: " ^ quote s1);
wenzelm@42167
   433
  in
wenzelm@42167
   434
    check "[(x,y,z). b]" "if b then [(x, y, z)] else []";
wenzelm@42167
   435
    check "[(x,y,z). x\<leftarrow>xs]" "map (\<lambda>x. (x, y, z)) xs";
wenzelm@42167
   436
    check "[e x y. x\<leftarrow>xs, y\<leftarrow>ys]" "concat (map (\<lambda>x. map (\<lambda>y. e x y) ys) xs)";
wenzelm@42167
   437
    check "[(x,y,z). x<a, x>b]" "if x < a then if b < x then [(x, y, z)] else [] else []";
wenzelm@42167
   438
    check "[(x,y,z). x\<leftarrow>xs, x>b]" "concat (map (\<lambda>x. if b < x then [(x, y, z)] else []) xs)";
wenzelm@42167
   439
    check "[(x,y,z). x<a, x\<leftarrow>xs]" "if x < a then map (\<lambda>x. (x, y, z)) xs else []";
wenzelm@42167
   440
    check "[(x,y). Cons True x \<leftarrow> xs]"
wenzelm@42167
   441
      "concat (map (\<lambda>xa. case xa of [] \<Rightarrow> [] | True # x \<Rightarrow> [(x, y)] | False # x \<Rightarrow> []) xs)";
wenzelm@42167
   442
    check "[(x,y,z). Cons x [] \<leftarrow> xs]"
wenzelm@42167
   443
      "concat (map (\<lambda>xa. case xa of [] \<Rightarrow> [] | [x] \<Rightarrow> [(x, y, z)] | x # aa # lista \<Rightarrow> []) xs)";
wenzelm@42167
   444
    check "[(x,y,z). x<a, x>b, x=d]"
wenzelm@42167
   445
      "if x < a then if b < x then if x = d then [(x, y, z)] else [] else [] else []";
wenzelm@42167
   446
    check "[(x,y,z). x<a, x>b, y\<leftarrow>ys]"
wenzelm@42167
   447
      "if x < a then if b < x then map (\<lambda>y. (x, y, z)) ys else [] else []";
wenzelm@42167
   448
    check "[(x,y,z). x<a, x\<leftarrow>xs,y>b]"
wenzelm@42167
   449
      "if x < a then concat (map (\<lambda>x. if b < y then [(x, y, z)] else []) xs) else []";
wenzelm@42167
   450
    check "[(x,y,z). x<a, x\<leftarrow>xs, y\<leftarrow>ys]"
wenzelm@42167
   451
      "if x < a then concat (map (\<lambda>x. map (\<lambda>y. (x, y, z)) ys) xs) else []";
wenzelm@42167
   452
    check "[(x,y,z). x\<leftarrow>xs, x>b, y<a]"
wenzelm@42167
   453
      "concat (map (\<lambda>x. if b < x then if y < a then [(x, y, z)] else [] else []) xs)";
wenzelm@42167
   454
    check "[(x,y,z). x\<leftarrow>xs, x>b, y\<leftarrow>ys]"
wenzelm@42167
   455
      "concat (map (\<lambda>x. if b < x then map (\<lambda>y. (x, y, z)) ys else []) xs)";
wenzelm@42167
   456
    check "[(x,y,z). x\<leftarrow>xs, y\<leftarrow>ys,y>x]"
wenzelm@42167
   457
      "concat (map (\<lambda>x. concat (map (\<lambda>y. if x < y then [(x, y, z)] else []) ys)) xs)";
wenzelm@42167
   458
    check "[(x,y,z). x\<leftarrow>xs, y\<leftarrow>ys,z\<leftarrow>zs]"
wenzelm@42167
   459
      "concat (map (\<lambda>x. concat (map (\<lambda>y. map (\<lambda>z. (x, y, z)) zs) ys)) xs)"
wenzelm@42167
   460
  end;
wenzelm@42167
   461
*}
wenzelm@42167
   462
wenzelm@35115
   463
(*
nipkow@24349
   464
term "[(x,y). x\<leftarrow>xs, let xx = x+x, y\<leftarrow>ys, y \<noteq> xx]"
nipkow@23192
   465
*)
nipkow@23192
   466
wenzelm@42167
   467
bulwahn@41463
   468
use "Tools/list_to_set_comprehension.ML"
bulwahn@41463
   469
bulwahn@41463
   470
simproc_setup list_to_set_comprehension ("set xs") = {* K List_to_Set_Comprehension.simproc *}
bulwahn@41463
   471
wenzelm@35115
   472
haftmann@21061
   473
subsubsection {* @{const Nil} and @{const Cons} *}
haftmann@21061
   474
haftmann@21061
   475
lemma not_Cons_self [simp]:
haftmann@21061
   476
  "xs \<noteq> x # xs"
nipkow@13145
   477
by (induct xs) auto
wenzelm@13114
   478
wenzelm@41697
   479
lemma not_Cons_self2 [simp]:
wenzelm@41697
   480
  "x # xs \<noteq> xs"
wenzelm@41697
   481
by (rule not_Cons_self [symmetric])
wenzelm@13114
   482
wenzelm@13142
   483
lemma neq_Nil_conv: "(xs \<noteq> []) = (\<exists>y ys. xs = y # ys)"
nipkow@13145
   484
by (induct xs) auto
wenzelm@13114
   485
wenzelm@13142
   486
lemma length_induct:
haftmann@21061
   487
  "(\<And>xs. \<forall>ys. length ys < length xs \<longrightarrow> P ys \<Longrightarrow> P xs) \<Longrightarrow> P xs"
nipkow@17589
   488
by (rule measure_induct [of length]) iprover
wenzelm@13114
   489
haftmann@37289
   490
lemma list_nonempty_induct [consumes 1, case_names single cons]:
haftmann@37289
   491
  assumes "xs \<noteq> []"
haftmann@37289
   492
  assumes single: "\<And>x. P [x]"
haftmann@37289
   493
  assumes cons: "\<And>x xs. xs \<noteq> [] \<Longrightarrow> P xs \<Longrightarrow> P (x # xs)"
haftmann@37289
   494
  shows "P xs"
haftmann@37289
   495
using `xs \<noteq> []` proof (induct xs)
haftmann@37289
   496
  case Nil then show ?case by simp
haftmann@37289
   497
next
haftmann@37289
   498
  case (Cons x xs) show ?case proof (cases xs)
haftmann@37289
   499
    case Nil with single show ?thesis by simp
haftmann@37289
   500
  next
haftmann@37289
   501
    case Cons then have "xs \<noteq> []" by simp
haftmann@37289
   502
    moreover with Cons.hyps have "P xs" .
haftmann@37289
   503
    ultimately show ?thesis by (rule cons)
haftmann@37289
   504
  qed
haftmann@37289
   505
qed
haftmann@37289
   506
wenzelm@13114
   507
haftmann@21061
   508
subsubsection {* @{const length} *}
wenzelm@13114
   509
wenzelm@13142
   510
text {*
haftmann@21061
   511
  Needs to come before @{text "@"} because of theorem @{text
haftmann@21061
   512
  append_eq_append_conv}.
wenzelm@13142
   513
*}
wenzelm@13114
   514
wenzelm@13142
   515
lemma length_append [simp]: "length (xs @ ys) = length xs + length ys"
nipkow@13145
   516
by (induct xs) auto
wenzelm@13114
   517
wenzelm@13142
   518
lemma length_map [simp]: "length (map f xs) = length xs"
nipkow@13145
   519
by (induct xs) auto
wenzelm@13114
   520
wenzelm@13142
   521
lemma length_rev [simp]: "length (rev xs) = length xs"
nipkow@13145
   522
by (induct xs) auto
wenzelm@13114
   523
wenzelm@13142
   524
lemma length_tl [simp]: "length (tl xs) = length xs - 1"
nipkow@13145
   525
by (cases xs) auto
wenzelm@13114
   526
wenzelm@13142
   527
lemma length_0_conv [iff]: "(length xs = 0) = (xs = [])"
nipkow@13145
   528
by (induct xs) auto
wenzelm@13114
   529
wenzelm@13142
   530
lemma length_greater_0_conv [iff]: "(0 < length xs) = (xs \<noteq> [])"
nipkow@13145
   531
by (induct xs) auto
wenzelm@13114
   532
nipkow@23479
   533
lemma length_pos_if_in_set: "x : set xs \<Longrightarrow> length xs > 0"
nipkow@23479
   534
by auto
nipkow@23479
   535
wenzelm@13114
   536
lemma length_Suc_conv:
nipkow@13145
   537
"(length xs = Suc n) = (\<exists>y ys. xs = y # ys \<and> length ys = n)"
nipkow@13145
   538
by (induct xs) auto
wenzelm@13142
   539
nipkow@14025
   540
lemma Suc_length_conv:
nipkow@14025
   541
"(Suc n = length xs) = (\<exists>y ys. xs = y # ys \<and> length ys = n)"
paulson@14208
   542
apply (induct xs, simp, simp)
nipkow@14025
   543
apply blast
nipkow@14025
   544
done
nipkow@14025
   545
wenzelm@25221
   546
lemma impossible_Cons: "length xs <= length ys ==> xs = x # ys = False"
wenzelm@25221
   547
  by (induct xs) auto
wenzelm@25221
   548
haftmann@26442
   549
lemma list_induct2 [consumes 1, case_names Nil Cons]:
haftmann@26442
   550
  "length xs = length ys \<Longrightarrow> P [] [] \<Longrightarrow>
haftmann@26442
   551
   (\<And>x xs y ys. length xs = length ys \<Longrightarrow> P xs ys \<Longrightarrow> P (x#xs) (y#ys))
haftmann@26442
   552
   \<Longrightarrow> P xs ys"
haftmann@26442
   553
proof (induct xs arbitrary: ys)
haftmann@26442
   554
  case Nil then show ?case by simp
haftmann@26442
   555
next
haftmann@26442
   556
  case (Cons x xs ys) then show ?case by (cases ys) simp_all
haftmann@26442
   557
qed
haftmann@26442
   558
haftmann@26442
   559
lemma list_induct3 [consumes 2, case_names Nil Cons]:
haftmann@26442
   560
  "length xs = length ys \<Longrightarrow> length ys = length zs \<Longrightarrow> P [] [] [] \<Longrightarrow>
haftmann@26442
   561
   (\<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))
haftmann@26442
   562
   \<Longrightarrow> P xs ys zs"
haftmann@26442
   563
proof (induct xs arbitrary: ys zs)
haftmann@26442
   564
  case Nil then show ?case by simp
haftmann@26442
   565
next
haftmann@26442
   566
  case (Cons x xs ys zs) then show ?case by (cases ys, simp_all)
haftmann@26442
   567
    (cases zs, simp_all)
haftmann@26442
   568
qed
wenzelm@13114
   569
kaliszyk@36154
   570
lemma list_induct4 [consumes 3, case_names Nil Cons]:
kaliszyk@36154
   571
  "length xs = length ys \<Longrightarrow> length ys = length zs \<Longrightarrow> length zs = length ws \<Longrightarrow>
kaliszyk@36154
   572
   P [] [] [] [] \<Longrightarrow> (\<And>x xs y ys z zs w ws. length xs = length ys \<Longrightarrow>
kaliszyk@36154
   573
   length ys = length zs \<Longrightarrow> length zs = length ws \<Longrightarrow> P xs ys zs ws \<Longrightarrow>
kaliszyk@36154
   574
   P (x#xs) (y#ys) (z#zs) (w#ws)) \<Longrightarrow> P xs ys zs ws"
kaliszyk@36154
   575
proof (induct xs arbitrary: ys zs ws)
kaliszyk@36154
   576
  case Nil then show ?case by simp
kaliszyk@36154
   577
next
kaliszyk@36154
   578
  case (Cons x xs ys zs ws) then show ?case by ((cases ys, simp_all), (cases zs,simp_all)) (cases ws, simp_all)
kaliszyk@36154
   579
qed
kaliszyk@36154
   580
krauss@22493
   581
lemma list_induct2': 
krauss@22493
   582
  "\<lbrakk> P [] [];
krauss@22493
   583
  \<And>x xs. P (x#xs) [];
krauss@22493
   584
  \<And>y ys. P [] (y#ys);
krauss@22493
   585
   \<And>x xs y ys. P xs ys  \<Longrightarrow> P (x#xs) (y#ys) \<rbrakk>
krauss@22493
   586
 \<Longrightarrow> P xs ys"
krauss@22493
   587
by (induct xs arbitrary: ys) (case_tac x, auto)+
krauss@22493
   588
nipkow@22143
   589
lemma neq_if_length_neq: "length xs \<noteq> length ys \<Longrightarrow> (xs = ys) == False"
nipkow@24349
   590
by (rule Eq_FalseI) auto
wenzelm@24037
   591
wenzelm@24037
   592
simproc_setup list_neq ("(xs::'a list) = ys") = {*
nipkow@22143
   593
(*
nipkow@22143
   594
Reduces xs=ys to False if xs and ys cannot be of the same length.
nipkow@22143
   595
This is the case if the atomic sublists of one are a submultiset
nipkow@22143
   596
of those of the other list and there are fewer Cons's in one than the other.
nipkow@22143
   597
*)
wenzelm@24037
   598
wenzelm@24037
   599
let
nipkow@22143
   600
huffman@29856
   601
fun len (Const(@{const_name Nil},_)) acc = acc
huffman@29856
   602
  | len (Const(@{const_name Cons},_) $ _ $ xs) (ts,n) = len xs (ts,n+1)
huffman@29856
   603
  | len (Const(@{const_name append},_) $ xs $ ys) acc = len xs (len ys acc)
huffman@29856
   604
  | len (Const(@{const_name rev},_) $ xs) acc = len xs acc
huffman@29856
   605
  | len (Const(@{const_name map},_) $ _ $ xs) acc = len xs acc
nipkow@22143
   606
  | len t (ts,n) = (t::ts,n);
nipkow@22143
   607
wenzelm@24037
   608
fun list_neq _ ss ct =
nipkow@22143
   609
  let
wenzelm@24037
   610
    val (Const(_,eqT) $ lhs $ rhs) = Thm.term_of ct;
nipkow@22143
   611
    val (ls,m) = len lhs ([],0) and (rs,n) = len rhs ([],0);
nipkow@22143
   612
    fun prove_neq() =
nipkow@22143
   613
      let
nipkow@22143
   614
        val Type(_,listT::_) = eqT;
haftmann@22994
   615
        val size = HOLogic.size_const listT;
nipkow@22143
   616
        val eq_len = HOLogic.mk_eq (size $ lhs, size $ rhs);
nipkow@22143
   617
        val neq_len = HOLogic.mk_Trueprop (HOLogic.Not $ eq_len);
nipkow@22143
   618
        val thm = Goal.prove (Simplifier.the_context ss) [] [] neq_len
haftmann@22633
   619
          (K (simp_tac (Simplifier.inherit_context ss @{simpset}) 1));
haftmann@22633
   620
      in SOME (thm RS @{thm neq_if_length_neq}) end
nipkow@22143
   621
  in
wenzelm@23214
   622
    if m < n andalso submultiset (op aconv) (ls,rs) orelse
wenzelm@23214
   623
       n < m andalso submultiset (op aconv) (rs,ls)
nipkow@22143
   624
    then prove_neq() else NONE
nipkow@22143
   625
  end;
wenzelm@24037
   626
in list_neq end;
nipkow@22143
   627
*}
nipkow@22143
   628
nipkow@22143
   629
nipkow@15392
   630
subsubsection {* @{text "@"} -- append *}
wenzelm@13114
   631
wenzelm@13142
   632
lemma append_assoc [simp]: "(xs @ ys) @ zs = xs @ (ys @ zs)"
nipkow@13145
   633
by (induct xs) auto
wenzelm@13114
   634
wenzelm@13142
   635
lemma append_Nil2 [simp]: "xs @ [] = xs"
nipkow@13145
   636
by (induct xs) auto
nipkow@3507
   637
wenzelm@13142
   638
lemma append_is_Nil_conv [iff]: "(xs @ ys = []) = (xs = [] \<and> ys = [])"
nipkow@13145
   639
by (induct xs) auto
wenzelm@13114
   640
wenzelm@13142
   641
lemma Nil_is_append_conv [iff]: "([] = xs @ ys) = (xs = [] \<and> ys = [])"
nipkow@13145
   642
by (induct xs) auto
wenzelm@13114
   643
wenzelm@13142
   644
lemma append_self_conv [iff]: "(xs @ ys = xs) = (ys = [])"
nipkow@13145
   645
by (induct xs) auto
wenzelm@13114
   646
wenzelm@13142
   647
lemma self_append_conv [iff]: "(xs = xs @ ys) = (ys = [])"
nipkow@13145
   648
by (induct xs) auto
wenzelm@13114
   649
blanchet@35828
   650
lemma append_eq_append_conv [simp, no_atp]:
nipkow@24526
   651
 "length xs = length ys \<or> length us = length vs
berghofe@13883
   652
 ==> (xs@us = ys@vs) = (xs=ys \<and> us=vs)"
nipkow@24526
   653
apply (induct xs arbitrary: ys)
paulson@14208
   654
 apply (case_tac ys, simp, force)
paulson@14208
   655
apply (case_tac ys, force, simp)
nipkow@13145
   656
done
wenzelm@13142
   657
nipkow@24526
   658
lemma append_eq_append_conv2: "(xs @ ys = zs @ ts) =
nipkow@24526
   659
  (EX us. xs = zs @ us & us @ ys = ts | xs @ us = zs & ys = us@ ts)"
nipkow@24526
   660
apply (induct xs arbitrary: ys zs ts)
nipkow@14495
   661
 apply fastsimp
nipkow@14495
   662
apply(case_tac zs)
nipkow@14495
   663
 apply simp
nipkow@14495
   664
apply fastsimp
nipkow@14495
   665
done
nipkow@14495
   666
berghofe@34910
   667
lemma same_append_eq [iff, induct_simp]: "(xs @ ys = xs @ zs) = (ys = zs)"
nipkow@13145
   668
by simp
wenzelm@13142
   669
wenzelm@13142
   670
lemma append1_eq_conv [iff]: "(xs @ [x] = ys @ [y]) = (xs = ys \<and> x = y)"
nipkow@13145
   671
by simp
wenzelm@13114
   672
berghofe@34910
   673
lemma append_same_eq [iff, induct_simp]: "(ys @ xs = zs @ xs) = (ys = zs)"
nipkow@13145
   674
by simp
wenzelm@13114
   675
wenzelm@13142
   676
lemma append_self_conv2 [iff]: "(xs @ ys = ys) = (xs = [])"
nipkow@13145
   677
using append_same_eq [of _ _ "[]"] by auto
nipkow@3507
   678
wenzelm@13142
   679
lemma self_append_conv2 [iff]: "(ys = xs @ ys) = (xs = [])"
nipkow@13145
   680
using append_same_eq [of "[]"] by auto
wenzelm@13114
   681
blanchet@35828
   682
lemma hd_Cons_tl [simp,no_atp]: "xs \<noteq> [] ==> hd xs # tl xs = xs"
nipkow@13145
   683
by (induct xs) auto
wenzelm@13114
   684
wenzelm@13142
   685
lemma hd_append: "hd (xs @ ys) = (if xs = [] then hd ys else hd xs)"
nipkow@13145
   686
by (induct xs) auto
wenzelm@13114
   687
wenzelm@13142
   688
lemma hd_append2 [simp]: "xs \<noteq> [] ==> hd (xs @ ys) = hd xs"
nipkow@13145
   689
by (simp add: hd_append split: list.split)
wenzelm@13114
   690
wenzelm@13142
   691
lemma tl_append: "tl (xs @ ys) = (case xs of [] => tl ys | z#zs => zs @ ys)"
nipkow@13145
   692
by (simp split: list.split)
wenzelm@13114
   693
wenzelm@13142
   694
lemma tl_append2 [simp]: "xs \<noteq> [] ==> tl (xs @ ys) = tl xs @ ys"
nipkow@13145
   695
by (simp add: tl_append split: list.split)
wenzelm@13114
   696
wenzelm@13114
   697
nipkow@14300
   698
lemma Cons_eq_append_conv: "x#xs = ys@zs =
nipkow@14300
   699
 (ys = [] & x#xs = zs | (EX ys'. x#ys' = ys & xs = ys'@zs))"
nipkow@14300
   700
by(cases ys) auto
nipkow@14300
   701
nipkow@15281
   702
lemma append_eq_Cons_conv: "(ys@zs = x#xs) =
nipkow@15281
   703
 (ys = [] & zs = x#xs | (EX ys'. ys = x#ys' & ys'@zs = xs))"
nipkow@15281
   704
by(cases ys) auto
nipkow@15281
   705
nipkow@14300
   706
wenzelm@13142
   707
text {* Trivial rules for solving @{text "@"}-equations automatically. *}
wenzelm@13114
   708
wenzelm@13114
   709
lemma eq_Nil_appendI: "xs = ys ==> xs = [] @ ys"
nipkow@13145
   710
by simp
wenzelm@13114
   711
wenzelm@13142
   712
lemma Cons_eq_appendI:
nipkow@13145
   713
"[| x # xs1 = ys; xs = xs1 @ zs |] ==> x # xs = ys @ zs"
nipkow@13145
   714
by (drule sym) simp
wenzelm@13114
   715
wenzelm@13142
   716
lemma append_eq_appendI:
nipkow@13145
   717
"[| xs @ xs1 = zs; ys = xs1 @ us |] ==> xs @ ys = zs @ us"
nipkow@13145
   718
by (drule sym) simp
wenzelm@13114
   719
wenzelm@13114
   720
wenzelm@13142
   721
text {*
nipkow@13145
   722
Simplification procedure for all list equalities.
nipkow@13145
   723
Currently only tries to rearrange @{text "@"} to see if
nipkow@13145
   724
- both lists end in a singleton list,
nipkow@13145
   725
- or both lists end in the same list.
wenzelm@13142
   726
*}
wenzelm@13142
   727
wenzelm@26480
   728
ML {*
nipkow@3507
   729
local
nipkow@3507
   730
huffman@29856
   731
fun last (cons as Const(@{const_name Cons},_) $ _ $ xs) =
huffman@29856
   732
  (case xs of Const(@{const_name Nil},_) => cons | _ => last xs)
huffman@29856
   733
  | last (Const(@{const_name append},_) $ _ $ ys) = last ys
wenzelm@13462
   734
  | last t = t;
wenzelm@13114
   735
huffman@29856
   736
fun list1 (Const(@{const_name Cons},_) $ _ $ Const(@{const_name Nil},_)) = true
wenzelm@13462
   737
  | list1 _ = false;
wenzelm@13114
   738
huffman@29856
   739
fun butlast ((cons as Const(@{const_name Cons},_) $ x) $ xs) =
huffman@29856
   740
  (case xs of Const(@{const_name Nil},_) => xs | _ => cons $ butlast xs)
huffman@29856
   741
  | butlast ((app as Const(@{const_name append},_) $ xs) $ ys) = app $ butlast ys
huffman@29856
   742
  | butlast xs = Const(@{const_name Nil},fastype_of xs);
wenzelm@13114
   743
haftmann@22633
   744
val rearr_ss = HOL_basic_ss addsimps [@{thm append_assoc},
haftmann@22633
   745
  @{thm append_Nil}, @{thm append_Cons}];
wenzelm@16973
   746
wenzelm@20044
   747
fun list_eq ss (F as (eq as Const(_,eqT)) $ lhs $ rhs) =
wenzelm@13462
   748
  let
wenzelm@13462
   749
    val lastl = last lhs and lastr = last rhs;
wenzelm@13462
   750
    fun rearr conv =
wenzelm@13462
   751
      let
wenzelm@13462
   752
        val lhs1 = butlast lhs and rhs1 = butlast rhs;
wenzelm@13462
   753
        val Type(_,listT::_) = eqT
wenzelm@13462
   754
        val appT = [listT,listT] ---> listT
huffman@29856
   755
        val app = Const(@{const_name append},appT)
wenzelm@13462
   756
        val F2 = eq $ (app$lhs1$lastl) $ (app$rhs1$lastr)
wenzelm@13480
   757
        val eq = HOLogic.mk_Trueprop (HOLogic.mk_eq (F,F2));
wenzelm@20044
   758
        val thm = Goal.prove (Simplifier.the_context ss) [] [] eq
wenzelm@17877
   759
          (K (simp_tac (Simplifier.inherit_context ss rearr_ss) 1));
skalberg@15531
   760
      in SOME ((conv RS (thm RS trans)) RS eq_reflection) end;
wenzelm@13114
   761
wenzelm@13462
   762
  in
haftmann@22633
   763
    if list1 lastl andalso list1 lastr then rearr @{thm append1_eq_conv}
haftmann@22633
   764
    else if lastl aconv lastr then rearr @{thm append_same_eq}
skalberg@15531
   765
    else NONE
wenzelm@13462
   766
  end;
wenzelm@13462
   767
wenzelm@13114
   768
in
wenzelm@13462
   769
wenzelm@13462
   770
val list_eq_simproc =
wenzelm@38715
   771
  Simplifier.simproc_global @{theory} "list_eq" ["(xs::'a list) = ys"] (K list_eq);
wenzelm@13462
   772
wenzelm@13114
   773
end;
wenzelm@13114
   774
wenzelm@13114
   775
Addsimprocs [list_eq_simproc];
wenzelm@13114
   776
*}
wenzelm@13114
   777
wenzelm@13114
   778
nipkow@15392
   779
subsubsection {* @{text map} *}
wenzelm@13114
   780
haftmann@40210
   781
lemma hd_map:
haftmann@40210
   782
  "xs \<noteq> [] \<Longrightarrow> hd (map f xs) = f (hd xs)"
haftmann@40210
   783
  by (cases xs) simp_all
haftmann@40210
   784
haftmann@40210
   785
lemma map_tl:
haftmann@40210
   786
  "map f (tl xs) = tl (map f xs)"
haftmann@40210
   787
  by (cases xs) simp_all
haftmann@40210
   788
wenzelm@13142
   789
lemma map_ext: "(!!x. x : set xs --> f x = g x) ==> map f xs = map g xs"
nipkow@13145
   790
by (induct xs) simp_all
wenzelm@13114
   791
wenzelm@13142
   792
lemma map_ident [simp]: "map (\<lambda>x. x) = (\<lambda>xs. xs)"
nipkow@13145
   793
by (rule ext, induct_tac xs) auto
wenzelm@13114
   794
wenzelm@13142
   795
lemma map_append [simp]: "map f (xs @ ys) = map f xs @ map f ys"
nipkow@13145
   796
by (induct xs) auto
wenzelm@13114
   797
hoelzl@33639
   798
lemma map_map [simp]: "map f (map g xs) = map (f \<circ> g) xs"
hoelzl@33639
   799
by (induct xs) auto
hoelzl@33639
   800
nipkow@35208
   801
lemma map_comp_map[simp]: "((map f) o (map g)) = map(f o g)"
nipkow@35208
   802
apply(rule ext)
nipkow@35208
   803
apply(simp)
nipkow@35208
   804
done
nipkow@35208
   805
wenzelm@13142
   806
lemma rev_map: "rev (map f xs) = map f (rev xs)"
nipkow@13145
   807
by (induct xs) auto
wenzelm@13114
   808
nipkow@13737
   809
lemma map_eq_conv[simp]: "(map f xs = map g xs) = (!x : set xs. f x = g x)"
nipkow@13737
   810
by (induct xs) auto
nipkow@13737
   811
krauss@19770
   812
lemma map_cong [fundef_cong, recdef_cong]:
haftmann@40122
   813
  "xs = ys \<Longrightarrow> (\<And>x. x \<in> set ys \<Longrightarrow> f x = g x) \<Longrightarrow> map f xs = map g ys"
haftmann@40122
   814
  by simp
wenzelm@13114
   815
wenzelm@13142
   816
lemma map_is_Nil_conv [iff]: "(map f xs = []) = (xs = [])"
nipkow@13145
   817
by (cases xs) auto
wenzelm@13114
   818
wenzelm@13142
   819
lemma Nil_is_map_conv [iff]: "([] = map f xs) = (xs = [])"
nipkow@13145
   820
by (cases xs) auto
wenzelm@13114
   821
paulson@18447
   822
lemma map_eq_Cons_conv:
nipkow@14025
   823
 "(map f xs = y#ys) = (\<exists>z zs. xs = z#zs \<and> f z = y \<and> map f zs = ys)"
nipkow@13145
   824
by (cases xs) auto
wenzelm@13114
   825
paulson@18447
   826
lemma Cons_eq_map_conv:
nipkow@14025
   827
 "(x#xs = map f ys) = (\<exists>z zs. ys = z#zs \<and> x = f z \<and> xs = map f zs)"
nipkow@14025
   828
by (cases ys) auto
nipkow@14025
   829
paulson@18447
   830
lemmas map_eq_Cons_D = map_eq_Cons_conv [THEN iffD1]
paulson@18447
   831
lemmas Cons_eq_map_D = Cons_eq_map_conv [THEN iffD1]
paulson@18447
   832
declare map_eq_Cons_D [dest!]  Cons_eq_map_D [dest!]
paulson@18447
   833
nipkow@14111
   834
lemma ex_map_conv:
nipkow@14111
   835
  "(EX xs. ys = map f xs) = (ALL y : set ys. EX x. y = f x)"
paulson@18447
   836
by(induct ys, auto simp add: Cons_eq_map_conv)
nipkow@14111
   837
nipkow@15110
   838
lemma map_eq_imp_length_eq:
paulson@35510
   839
  assumes "map f xs = map g ys"
haftmann@26734
   840
  shows "length xs = length ys"
haftmann@26734
   841
using assms proof (induct ys arbitrary: xs)
haftmann@26734
   842
  case Nil then show ?case by simp
haftmann@26734
   843
next
haftmann@26734
   844
  case (Cons y ys) then obtain z zs where xs: "xs = z # zs" by auto
paulson@35510
   845
  from Cons xs have "map f zs = map g ys" by simp
haftmann@26734
   846
  moreover with Cons have "length zs = length ys" by blast
haftmann@26734
   847
  with xs show ?case by simp
haftmann@26734
   848
qed
haftmann@26734
   849
  
nipkow@15110
   850
lemma map_inj_on:
nipkow@15110
   851
 "[| map f xs = map f ys; inj_on f (set xs Un set ys) |]
nipkow@15110
   852
  ==> xs = ys"
nipkow@15110
   853
apply(frule map_eq_imp_length_eq)
nipkow@15110
   854
apply(rotate_tac -1)
nipkow@15110
   855
apply(induct rule:list_induct2)
nipkow@15110
   856
 apply simp
nipkow@15110
   857
apply(simp)
nipkow@15110
   858
apply (blast intro:sym)
nipkow@15110
   859
done
nipkow@15110
   860
nipkow@15110
   861
lemma inj_on_map_eq_map:
nipkow@15110
   862
 "inj_on f (set xs Un set ys) \<Longrightarrow> (map f xs = map f ys) = (xs = ys)"
nipkow@15110
   863
by(blast dest:map_inj_on)
nipkow@15110
   864
wenzelm@13114
   865
lemma map_injective:
nipkow@24526
   866
 "map f xs = map f ys ==> inj f ==> xs = ys"
nipkow@24526
   867
by (induct ys arbitrary: xs) (auto dest!:injD)
wenzelm@13114
   868
nipkow@14339
   869
lemma inj_map_eq_map[simp]: "inj f \<Longrightarrow> (map f xs = map f ys) = (xs = ys)"
nipkow@14339
   870
by(blast dest:map_injective)
nipkow@14339
   871
wenzelm@13114
   872
lemma inj_mapI: "inj f ==> inj (map f)"
nipkow@17589
   873
by (iprover dest: map_injective injD intro: inj_onI)
wenzelm@13114
   874
wenzelm@13114
   875
lemma inj_mapD: "inj (map f) ==> inj f"
paulson@14208
   876
apply (unfold inj_on_def, clarify)
nipkow@13145
   877
apply (erule_tac x = "[x]" in ballE)
paulson@14208
   878
 apply (erule_tac x = "[y]" in ballE, simp, blast)
nipkow@13145
   879
apply blast
nipkow@13145
   880
done
wenzelm@13114
   881
nipkow@14339
   882
lemma inj_map[iff]: "inj (map f) = inj f"
nipkow@13145
   883
by (blast dest: inj_mapD intro: inj_mapI)
wenzelm@13114
   884
nipkow@15303
   885
lemma inj_on_mapI: "inj_on f (\<Union>(set ` A)) \<Longrightarrow> inj_on (map f) A"
nipkow@15303
   886
apply(rule inj_onI)
nipkow@15303
   887
apply(erule map_inj_on)
nipkow@15303
   888
apply(blast intro:inj_onI dest:inj_onD)
nipkow@15303
   889
done
nipkow@15303
   890
kleing@14343
   891
lemma map_idI: "(\<And>x. x \<in> set xs \<Longrightarrow> f x = x) \<Longrightarrow> map f xs = xs"
kleing@14343
   892
by (induct xs, auto)
wenzelm@13114
   893
nipkow@14402
   894
lemma map_fun_upd [simp]: "y \<notin> set xs \<Longrightarrow> map (f(y:=v)) xs = map f xs"
nipkow@14402
   895
by (induct xs) auto
nipkow@14402
   896
nipkow@15110
   897
lemma map_fst_zip[simp]:
nipkow@15110
   898
  "length xs = length ys \<Longrightarrow> map fst (zip xs ys) = xs"
nipkow@15110
   899
by (induct rule:list_induct2, simp_all)
nipkow@15110
   900
nipkow@15110
   901
lemma map_snd_zip[simp]:
nipkow@15110
   902
  "length xs = length ys \<Longrightarrow> map snd (zip xs ys) = ys"
nipkow@15110
   903
by (induct rule:list_induct2, simp_all)
nipkow@15110
   904
haftmann@41505
   905
enriched_type map: map
haftmann@41372
   906
  by (simp_all add: fun_eq_iff id_def)
haftmann@40608
   907
nipkow@15110
   908
nipkow@15392
   909
subsubsection {* @{text rev} *}
wenzelm@13114
   910
wenzelm@13142
   911
lemma rev_append [simp]: "rev (xs @ ys) = rev ys @ rev xs"
nipkow@13145
   912
by (induct xs) auto
wenzelm@13114
   913
wenzelm@13142
   914
lemma rev_rev_ident [simp]: "rev (rev xs) = xs"
nipkow@13145
   915
by (induct xs) auto
wenzelm@13114
   916
kleing@15870
   917
lemma rev_swap: "(rev xs = ys) = (xs = rev ys)"
kleing@15870
   918
by auto
kleing@15870
   919
wenzelm@13142
   920
lemma rev_is_Nil_conv [iff]: "(rev xs = []) = (xs = [])"
nipkow@13145
   921
by (induct xs) auto
wenzelm@13114
   922
wenzelm@13142
   923
lemma Nil_is_rev_conv [iff]: "([] = rev xs) = (xs = [])"
nipkow@13145
   924
by (induct xs) auto
wenzelm@13114
   925
kleing@15870
   926
lemma rev_singleton_conv [simp]: "(rev xs = [x]) = (xs = [x])"
kleing@15870
   927
by (cases xs) auto
kleing@15870
   928
kleing@15870
   929
lemma singleton_rev_conv [simp]: "([x] = rev xs) = (xs = [x])"
kleing@15870
   930
by (cases xs) auto
kleing@15870
   931
haftmann@21061
   932
lemma rev_is_rev_conv [iff]: "(rev xs = rev ys) = (xs = ys)"
haftmann@21061
   933
apply (induct xs arbitrary: ys, force)
paulson@14208
   934
apply (case_tac ys, simp, force)
nipkow@13145
   935
done
wenzelm@13114
   936
nipkow@15439
   937
lemma inj_on_rev[iff]: "inj_on rev A"
nipkow@15439
   938
by(simp add:inj_on_def)
nipkow@15439
   939
wenzelm@13366
   940
lemma rev_induct [case_names Nil snoc]:
wenzelm@13366
   941
  "[| P []; !!x xs. P xs ==> P (xs @ [x]) |] ==> P xs"
berghofe@15489
   942
apply(simplesubst rev_rev_ident[symmetric])
nipkow@13145
   943
apply(rule_tac list = "rev xs" in list.induct, simp_all)
nipkow@13145
   944
done
wenzelm@13114
   945
wenzelm@13366
   946
lemma rev_exhaust [case_names Nil snoc]:
wenzelm@13366
   947
  "(xs = [] ==> P) ==>(!!ys y. xs = ys @ [y] ==> P) ==> P"
nipkow@13145
   948
by (induct xs rule: rev_induct) auto
wenzelm@13114
   949
wenzelm@13366
   950
lemmas rev_cases = rev_exhaust
wenzelm@13366
   951
nipkow@18423
   952
lemma rev_eq_Cons_iff[iff]: "(rev xs = y#ys) = (xs = rev ys @ [y])"
nipkow@18423
   953
by(rule rev_cases[of xs]) auto
nipkow@18423
   954
wenzelm@13114
   955
nipkow@15392
   956
subsubsection {* @{text set} *}
wenzelm@13114
   957
wenzelm@13142
   958
lemma finite_set [iff]: "finite (set xs)"
nipkow@13145
   959
by (induct xs) auto
wenzelm@13114
   960
wenzelm@13142
   961
lemma set_append [simp]: "set (xs @ ys) = (set xs \<union> set ys)"
nipkow@13145
   962
by (induct xs) auto
wenzelm@13114
   963
nipkow@17830
   964
lemma hd_in_set[simp]: "xs \<noteq> [] \<Longrightarrow> hd xs : set xs"
nipkow@17830
   965
by(cases xs) auto
oheimb@14099
   966
wenzelm@13142
   967
lemma set_subset_Cons: "set xs \<subseteq> set (x # xs)"
nipkow@13145
   968
by auto
wenzelm@13114
   969
oheimb@14099
   970
lemma set_ConsD: "y \<in> set (x # xs) \<Longrightarrow> y=x \<or> y \<in> set xs" 
oheimb@14099
   971
by auto
oheimb@14099
   972
wenzelm@13142
   973
lemma set_empty [iff]: "(set xs = {}) = (xs = [])"
nipkow@13145
   974
by (induct xs) auto
wenzelm@13114
   975
nipkow@15245
   976
lemma set_empty2[iff]: "({} = set xs) = (xs = [])"
nipkow@15245
   977
by(induct xs) auto
nipkow@15245
   978
wenzelm@13142
   979
lemma set_rev [simp]: "set (rev xs) = set xs"
nipkow@13145
   980
by (induct xs) auto
wenzelm@13114
   981
wenzelm@13142
   982
lemma set_map [simp]: "set (map f xs) = f`(set xs)"
nipkow@13145
   983
by (induct xs) auto
wenzelm@13114
   984
wenzelm@13142
   985
lemma set_filter [simp]: "set (filter P xs) = {x. x : set xs \<and> P x}"
nipkow@13145
   986
by (induct xs) auto
wenzelm@13114
   987
nipkow@32417
   988
lemma set_upt [simp]: "set[i..<j] = {i..<j}"
bulwahn@41463
   989
by (induct j) auto
wenzelm@13114
   990
wenzelm@13142
   991
wenzelm@25221
   992
lemma split_list: "x : set xs \<Longrightarrow> \<exists>ys zs. xs = ys @ x # zs"
nipkow@18049
   993
proof (induct xs)
nipkow@26073
   994
  case Nil thus ?case by simp
nipkow@26073
   995
next
nipkow@26073
   996
  case Cons thus ?case by (auto intro: Cons_eq_appendI)
nipkow@26073
   997
qed
nipkow@26073
   998
haftmann@26734
   999
lemma in_set_conv_decomp: "x \<in> set xs \<longleftrightarrow> (\<exists>ys zs. xs = ys @ x # zs)"
haftmann@26734
  1000
  by (auto elim: split_list)
nipkow@26073
  1001
nipkow@26073
  1002
lemma split_list_first: "x : set xs \<Longrightarrow> \<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set ys"
nipkow@26073
  1003
proof (induct xs)
nipkow@26073
  1004
  case Nil thus ?case by simp
nipkow@18049
  1005
next
nipkow@18049
  1006
  case (Cons a xs)
nipkow@18049
  1007
  show ?case
nipkow@18049
  1008
  proof cases
wenzelm@25221
  1009
    assume "x = a" thus ?case using Cons by fastsimp
nipkow@18049
  1010
  next
nipkow@26073
  1011
    assume "x \<noteq> a" thus ?case using Cons by(fastsimp intro!: Cons_eq_appendI)
nipkow@26073
  1012
  qed
nipkow@26073
  1013
qed
nipkow@26073
  1014
nipkow@26073
  1015
lemma in_set_conv_decomp_first:
nipkow@26073
  1016
  "(x : set xs) = (\<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set ys)"
haftmann@26734
  1017
  by (auto dest!: split_list_first)
nipkow@26073
  1018
haftmann@40122
  1019
lemma split_list_last: "x \<in> set xs \<Longrightarrow> \<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set zs"
haftmann@40122
  1020
proof (induct xs rule: rev_induct)
nipkow@26073
  1021
  case Nil thus ?case by simp
nipkow@26073
  1022
next
nipkow@26073
  1023
  case (snoc a xs)
nipkow@26073
  1024
  show ?case
nipkow@26073
  1025
  proof cases
haftmann@40122
  1026
    assume "x = a" thus ?case using snoc by (metis List.set.simps(1) emptyE)
nipkow@26073
  1027
  next
nipkow@26073
  1028
    assume "x \<noteq> a" thus ?case using snoc by fastsimp
nipkow@18049
  1029
  qed
nipkow@18049
  1030
qed
nipkow@18049
  1031
nipkow@26073
  1032
lemma in_set_conv_decomp_last:
nipkow@26073
  1033
  "(x : set xs) = (\<exists>ys zs. xs = ys @ x # zs \<and> x \<notin> set zs)"
haftmann@26734
  1034
  by (auto dest!: split_list_last)
nipkow@26073
  1035
nipkow@26073
  1036
lemma split_list_prop: "\<exists>x \<in> set xs. P x \<Longrightarrow> \<exists>ys x zs. xs = ys @ x # zs & P x"
nipkow@26073
  1037
proof (induct xs)
nipkow@26073
  1038
  case Nil thus ?case by simp
nipkow@26073
  1039
next
nipkow@26073
  1040
  case Cons thus ?case
nipkow@26073
  1041
    by(simp add:Bex_def)(metis append_Cons append.simps(1))
nipkow@26073
  1042
qed
nipkow@26073
  1043
nipkow@26073
  1044
lemma split_list_propE:
haftmann@26734
  1045
  assumes "\<exists>x \<in> set xs. P x"
haftmann@26734
  1046
  obtains ys x zs where "xs = ys @ x # zs" and "P x"
haftmann@26734
  1047
using split_list_prop [OF assms] by blast
nipkow@26073
  1048
nipkow@26073
  1049
lemma split_list_first_prop:
nipkow@26073
  1050
  "\<exists>x \<in> set xs. P x \<Longrightarrow>
nipkow@26073
  1051
   \<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>y \<in> set ys. \<not> P y)"
haftmann@26734
  1052
proof (induct xs)
nipkow@26073
  1053
  case Nil thus ?case by simp
nipkow@26073
  1054
next
nipkow@26073
  1055
  case (Cons x xs)
nipkow@26073
  1056
  show ?case
nipkow@26073
  1057
  proof cases
nipkow@26073
  1058
    assume "P x"
haftmann@40122
  1059
    thus ?thesis by simp (metis Un_upper1 contra_subsetD in_set_conv_decomp_first self_append_conv2 set_append)
nipkow@26073
  1060
  next
nipkow@26073
  1061
    assume "\<not> P x"
nipkow@26073
  1062
    hence "\<exists>x\<in>set xs. P x" using Cons(2) by simp
nipkow@26073
  1063
    thus ?thesis using `\<not> P x` Cons(1) by (metis append_Cons set_ConsD)
nipkow@26073
  1064
  qed
nipkow@26073
  1065
qed
nipkow@26073
  1066
nipkow@26073
  1067
lemma split_list_first_propE:
haftmann@26734
  1068
  assumes "\<exists>x \<in> set xs. P x"
haftmann@26734
  1069
  obtains ys x zs where "xs = ys @ x # zs" and "P x" and "\<forall>y \<in> set ys. \<not> P y"
haftmann@26734
  1070
using split_list_first_prop [OF assms] by blast
nipkow@26073
  1071
nipkow@26073
  1072
lemma split_list_first_prop_iff:
nipkow@26073
  1073
  "(\<exists>x \<in> set xs. P x) \<longleftrightarrow>
nipkow@26073
  1074
   (\<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>y \<in> set ys. \<not> P y))"
haftmann@26734
  1075
by (rule, erule split_list_first_prop) auto
nipkow@26073
  1076
nipkow@26073
  1077
lemma split_list_last_prop:
nipkow@26073
  1078
  "\<exists>x \<in> set xs. P x \<Longrightarrow>
nipkow@26073
  1079
   \<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>z \<in> set zs. \<not> P z)"
nipkow@26073
  1080
proof(induct xs rule:rev_induct)
nipkow@26073
  1081
  case Nil thus ?case by simp
nipkow@26073
  1082
next
nipkow@26073
  1083
  case (snoc x xs)
nipkow@26073
  1084
  show ?case
nipkow@26073
  1085
  proof cases
nipkow@26073
  1086
    assume "P x" thus ?thesis by (metis emptyE set_empty)
nipkow@26073
  1087
  next
nipkow@26073
  1088
    assume "\<not> P x"
nipkow@26073
  1089
    hence "\<exists>x\<in>set xs. P x" using snoc(2) by simp
nipkow@26073
  1090
    thus ?thesis using `\<not> P x` snoc(1) by fastsimp
nipkow@26073
  1091
  qed
nipkow@26073
  1092
qed
nipkow@26073
  1093
nipkow@26073
  1094
lemma split_list_last_propE:
haftmann@26734
  1095
  assumes "\<exists>x \<in> set xs. P x"
haftmann@26734
  1096
  obtains ys x zs where "xs = ys @ x # zs" and "P x" and "\<forall>z \<in> set zs. \<not> P z"
haftmann@26734
  1097
using split_list_last_prop [OF assms] by blast
nipkow@26073
  1098
nipkow@26073
  1099
lemma split_list_last_prop_iff:
nipkow@26073
  1100
  "(\<exists>x \<in> set xs. P x) \<longleftrightarrow>
nipkow@26073
  1101
   (\<exists>ys x zs. xs = ys@x#zs \<and> P x \<and> (\<forall>z \<in> set zs. \<not> P z))"
haftmann@26734
  1102
by (metis split_list_last_prop [where P=P] in_set_conv_decomp)
nipkow@26073
  1103
nipkow@26073
  1104
lemma finite_list: "finite A ==> EX xs. set xs = A"
haftmann@26734
  1105
  by (erule finite_induct)
haftmann@26734
  1106
    (auto simp add: set.simps(2) [symmetric] simp del: set.simps(2))
paulson@13508
  1107
kleing@14388
  1108
lemma card_length: "card (set xs) \<le> length xs"
kleing@14388
  1109
by (induct xs) (auto simp add: card_insert_if)
wenzelm@13114
  1110
haftmann@26442
  1111
lemma set_minus_filter_out:
haftmann@26442
  1112
  "set xs - {y} = set (filter (\<lambda>x. \<not> (x = y)) xs)"
haftmann@26442
  1113
  by (induct xs) auto
paulson@15168
  1114
wenzelm@35115
  1115
nipkow@15392
  1116
subsubsection {* @{text filter} *}
wenzelm@13114
  1117
wenzelm@13142
  1118
lemma filter_append [simp]: "filter P (xs @ ys) = filter P xs @ filter P ys"
nipkow@13145
  1119
by (induct xs) auto
wenzelm@13114
  1120
nipkow@15305
  1121
lemma rev_filter: "rev (filter P xs) = filter P (rev xs)"
nipkow@15305
  1122
by (induct xs) simp_all
nipkow@15305
  1123
wenzelm@13142
  1124
lemma filter_filter [simp]: "filter P (filter Q xs) = filter (\<lambda>x. Q x \<and> P x) xs"
nipkow@13145
  1125
by (induct xs) auto
wenzelm@13114
  1126
nipkow@16998
  1127
lemma length_filter_le [simp]: "length (filter P xs) \<le> length xs"
nipkow@16998
  1128
by (induct xs) (auto simp add: le_SucI)
nipkow@16998
  1129
nipkow@18423
  1130
lemma sum_length_filter_compl:
nipkow@18423
  1131
  "length(filter P xs) + length(filter (%x. ~P x) xs) = length xs"
nipkow@18423
  1132
by(induct xs) simp_all
nipkow@18423
  1133
wenzelm@13142
  1134
lemma filter_True [simp]: "\<forall>x \<in> set xs. P x ==> filter P xs = xs"
nipkow@13145
  1135
by (induct xs) auto
wenzelm@13114
  1136
wenzelm@13142
  1137
lemma filter_False [simp]: "\<forall>x \<in> set xs. \<not> P x ==> filter P xs = []"
nipkow@13145
  1138
by (induct xs) auto
wenzelm@13114
  1139
nipkow@16998
  1140
lemma filter_empty_conv: "(filter P xs = []) = (\<forall>x\<in>set xs. \<not> P x)" 
nipkow@24349
  1141
by (induct xs) simp_all
nipkow@16998
  1142
nipkow@16998
  1143
lemma filter_id_conv: "(filter P xs = xs) = (\<forall>x\<in>set xs. P x)"
nipkow@16998
  1144
apply (induct xs)
nipkow@16998
  1145
 apply auto
nipkow@16998
  1146
apply(cut_tac P=P and xs=xs in length_filter_le)
nipkow@16998
  1147
apply simp
nipkow@16998
  1148
done
wenzelm@13114
  1149
nipkow@16965
  1150
lemma filter_map:
nipkow@16965
  1151
  "filter P (map f xs) = map f (filter (P o f) xs)"
nipkow@16965
  1152
by (induct xs) simp_all
nipkow@16965
  1153
nipkow@16965
  1154
lemma length_filter_map[simp]:
nipkow@16965
  1155
  "length (filter P (map f xs)) = length(filter (P o f) xs)"
nipkow@16965
  1156
by (simp add:filter_map)
nipkow@16965
  1157
wenzelm@13142
  1158
lemma filter_is_subset [simp]: "set (filter P xs) \<le> set xs"
nipkow@13145
  1159
by auto
wenzelm@13114
  1160
nipkow@15246
  1161
lemma length_filter_less:
nipkow@15246
  1162
  "\<lbrakk> x : set xs; ~ P x \<rbrakk> \<Longrightarrow> length(filter P xs) < length xs"
nipkow@15246
  1163
proof (induct xs)
nipkow@15246
  1164
  case Nil thus ?case by simp
nipkow@15246
  1165
next
nipkow@15246
  1166
  case (Cons x xs) thus ?case
nipkow@15246
  1167
    apply (auto split:split_if_asm)
nipkow@15246
  1168
    using length_filter_le[of P xs] apply arith
nipkow@15246
  1169
  done
nipkow@15246
  1170
qed
wenzelm@13114
  1171
nipkow@15281
  1172
lemma length_filter_conv_card:
nipkow@15281
  1173
 "length(filter p xs) = card{i. i < length xs & p(xs!i)}"
nipkow@15281
  1174
proof (induct xs)
nipkow@15281
  1175
  case Nil thus ?case by simp
nipkow@15281
  1176
next
nipkow@15281
  1177
  case (Cons x xs)
nipkow@15281
  1178
  let ?S = "{i. i < length xs & p(xs!i)}"
nipkow@15281
  1179
  have fin: "finite ?S" by(fast intro: bounded_nat_set_is_finite)
nipkow@15281
  1180
  show ?case (is "?l = card ?S'")
nipkow@15281
  1181
  proof (cases)
nipkow@15281
  1182
    assume "p x"
nipkow@15281
  1183
    hence eq: "?S' = insert 0 (Suc ` ?S)"
nipkow@25162
  1184
      by(auto simp: image_def split:nat.split dest:gr0_implies_Suc)
nipkow@15281
  1185
    have "length (filter p (x # xs)) = Suc(card ?S)"
wenzelm@23388
  1186
      using Cons `p x` by simp
nipkow@15281
  1187
    also have "\<dots> = Suc(card(Suc ` ?S))" using fin
nipkow@15281
  1188
      by (simp add: card_image inj_Suc)
nipkow@15281
  1189
    also have "\<dots> = card ?S'" using eq fin
nipkow@15281
  1190
      by (simp add:card_insert_if) (simp add:image_def)
nipkow@15281
  1191
    finally show ?thesis .
nipkow@15281
  1192
  next
nipkow@15281
  1193
    assume "\<not> p x"
nipkow@15281
  1194
    hence eq: "?S' = Suc ` ?S"
nipkow@25162
  1195
      by(auto simp add: image_def split:nat.split elim:lessE)
nipkow@15281
  1196
    have "length (filter p (x # xs)) = card ?S"
wenzelm@23388
  1197
      using Cons `\<not> p x` by simp
nipkow@15281
  1198
    also have "\<dots> = card(Suc ` ?S)" using fin
nipkow@15281
  1199
      by (simp add: card_image inj_Suc)
nipkow@15281
  1200
    also have "\<dots> = card ?S'" using eq fin
nipkow@15281
  1201
      by (simp add:card_insert_if)
nipkow@15281
  1202
    finally show ?thesis .
nipkow@15281
  1203
  qed
nipkow@15281
  1204
qed
nipkow@15281
  1205
nipkow@17629
  1206
lemma Cons_eq_filterD:
nipkow@17629
  1207
 "x#xs = filter P ys \<Longrightarrow>
nipkow@17629
  1208
  \<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs"
wenzelm@19585
  1209
  (is "_ \<Longrightarrow> \<exists>us vs. ?P ys us vs")
nipkow@17629
  1210
proof(induct ys)
nipkow@17629
  1211
  case Nil thus ?case by simp
nipkow@17629
  1212
next
nipkow@17629
  1213
  case (Cons y ys)
nipkow@17629
  1214
  show ?case (is "\<exists>x. ?Q x")
nipkow@17629
  1215
  proof cases
nipkow@17629
  1216
    assume Py: "P y"
nipkow@17629
  1217
    show ?thesis
nipkow@17629
  1218
    proof cases
wenzelm@25221
  1219
      assume "x = y"
wenzelm@25221
  1220
      with Py Cons.prems have "?Q []" by simp
wenzelm@25221
  1221
      then show ?thesis ..
nipkow@17629
  1222
    next
wenzelm@25221
  1223
      assume "x \<noteq> y"
wenzelm@25221
  1224
      with Py Cons.prems show ?thesis by simp
nipkow@17629
  1225
    qed
nipkow@17629
  1226
  next
wenzelm@25221
  1227
    assume "\<not> P y"
wenzelm@25221
  1228
    with Cons obtain us vs where "?P (y#ys) (y#us) vs" by fastsimp
wenzelm@25221
  1229
    then have "?Q (y#us)" by simp
wenzelm@25221
  1230
    then show ?thesis ..
nipkow@17629
  1231
  qed
nipkow@17629
  1232
qed
nipkow@17629
  1233
nipkow@17629
  1234
lemma filter_eq_ConsD:
nipkow@17629
  1235
 "filter P ys = x#xs \<Longrightarrow>
nipkow@17629
  1236
  \<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs"
nipkow@17629
  1237
by(rule Cons_eq_filterD) simp
nipkow@17629
  1238
nipkow@17629
  1239
lemma filter_eq_Cons_iff:
nipkow@17629
  1240
 "(filter P ys = x#xs) =
nipkow@17629
  1241
  (\<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs)"
nipkow@17629
  1242
by(auto dest:filter_eq_ConsD)
nipkow@17629
  1243
nipkow@17629
  1244
lemma Cons_eq_filter_iff:
nipkow@17629
  1245
 "(x#xs = filter P ys) =
nipkow@17629
  1246
  (\<exists>us vs. ys = us @ x # vs \<and> (\<forall>u\<in>set us. \<not> P u) \<and> P x \<and> xs = filter P vs)"
nipkow@17629
  1247
by(auto dest:Cons_eq_filterD)
nipkow@17629
  1248
krauss@19770
  1249
lemma filter_cong[fundef_cong, recdef_cong]:
nipkow@17501
  1250
 "xs = ys \<Longrightarrow> (\<And>x. x \<in> set ys \<Longrightarrow> P x = Q x) \<Longrightarrow> filter P xs = filter Q ys"
nipkow@17501
  1251
apply simp
nipkow@17501
  1252
apply(erule thin_rl)
nipkow@17501
  1253
by (induct ys) simp_all
nipkow@17501
  1254
nipkow@15281
  1255
haftmann@26442
  1256
subsubsection {* List partitioning *}
haftmann@26442
  1257
haftmann@26442
  1258
primrec partition :: "('a \<Rightarrow> bool) \<Rightarrow>'a list \<Rightarrow> 'a list \<times> 'a list" where
haftmann@26442
  1259
  "partition P [] = ([], [])"
haftmann@26442
  1260
  | "partition P (x # xs) = 
haftmann@26442
  1261
      (let (yes, no) = partition P xs
haftmann@26442
  1262
      in if P x then (x # yes, no) else (yes, x # no))"
haftmann@26442
  1263
haftmann@26442
  1264
lemma partition_filter1:
haftmann@26442
  1265
    "fst (partition P xs) = filter P xs"
haftmann@26442
  1266
by (induct xs) (auto simp add: Let_def split_def)
haftmann@26442
  1267
haftmann@26442
  1268
lemma partition_filter2:
haftmann@26442
  1269
    "snd (partition P xs) = filter (Not o P) xs"
haftmann@26442
  1270
by (induct xs) (auto simp add: Let_def split_def)
haftmann@26442
  1271
haftmann@26442
  1272
lemma partition_P:
haftmann@26442
  1273
  assumes "partition P xs = (yes, no)"
haftmann@26442
  1274
  shows "(\<forall>p \<in> set yes.  P p) \<and> (\<forall>p  \<in> set no. \<not> P p)"
haftmann@26442
  1275
proof -
haftmann@26442
  1276
  from assms have "yes = fst (partition P xs)" and "no = snd (partition P xs)"
haftmann@26442
  1277
    by simp_all
haftmann@26442
  1278
  then show ?thesis by (simp_all add: partition_filter1 partition_filter2)
haftmann@26442
  1279
qed
haftmann@26442
  1280
haftmann@26442
  1281
lemma partition_set:
haftmann@26442
  1282
  assumes "partition P xs = (yes, no)"
haftmann@26442
  1283
  shows "set yes \<union> set no = set xs"
haftmann@26442
  1284
proof -
haftmann@26442
  1285
  from assms have "yes = fst (partition P xs)" and "no = snd (partition P xs)"
haftmann@26442
  1286
    by simp_all
haftmann@26442
  1287
  then show ?thesis by (auto simp add: partition_filter1 partition_filter2) 
haftmann@26442
  1288
qed
haftmann@26442
  1289
hoelzl@33639
  1290
lemma partition_filter_conv[simp]:
hoelzl@33639
  1291
  "partition f xs = (filter f xs,filter (Not o f) xs)"
hoelzl@33639
  1292
unfolding partition_filter2[symmetric]
hoelzl@33639
  1293
unfolding partition_filter1[symmetric] by simp
hoelzl@33639
  1294
hoelzl@33639
  1295
declare partition.simps[simp del]
haftmann@26442
  1296
wenzelm@35115
  1297
nipkow@15392
  1298
subsubsection {* @{text concat} *}
wenzelm@13114
  1299
wenzelm@13142
  1300
lemma concat_append [simp]: "concat (xs @ ys) = concat xs @ concat ys"
nipkow@13145
  1301
by (induct xs) auto
wenzelm@13114
  1302
paulson@18447
  1303
lemma concat_eq_Nil_conv [simp]: "(concat xss = []) = (\<forall>xs \<in> set xss. xs = [])"
nipkow@13145
  1304
by (induct xss) auto
wenzelm@13114
  1305
paulson@18447
  1306
lemma Nil_eq_concat_conv [simp]: "([] = concat xss) = (\<forall>xs \<in> set xss. xs = [])"
nipkow@13145
  1307
by (induct xss) auto
wenzelm@13114
  1308
nipkow@24308
  1309
lemma set_concat [simp]: "set (concat xs) = (UN x:set xs. set x)"
nipkow@13145
  1310
by (induct xs) auto
wenzelm@13114
  1311
nipkow@24476
  1312
lemma concat_map_singleton[simp]: "concat(map (%x. [f x]) xs) = map f xs"
nipkow@24349
  1313
by (induct xs) auto
nipkow@24349
  1314
wenzelm@13142
  1315
lemma map_concat: "map f (concat xs) = concat (map (map f) xs)"
nipkow@13145
  1316
by (induct xs) auto
wenzelm@13114
  1317
wenzelm@13142
  1318
lemma filter_concat: "filter p (concat xs) = concat (map (filter p) xs)"
nipkow@13145
  1319
by (induct xs) auto
wenzelm@13114
  1320
wenzelm@13142
  1321
lemma rev_concat: "rev (concat xs) = concat (map rev (rev xs))"
nipkow@13145
  1322
by (induct xs) auto
wenzelm@13114
  1323
bulwahn@40365
  1324
lemma concat_eq_concat_iff: "\<forall>(x, y) \<in> set (zip xs ys). length x = length y ==> length xs = length ys ==> (concat xs = concat ys) = (xs = ys)"
bulwahn@40365
  1325
proof (induct xs arbitrary: ys)
bulwahn@40365
  1326
  case (Cons x xs ys)
bulwahn@40365
  1327
  thus ?case by (cases ys) auto
bulwahn@40365
  1328
qed (auto)
bulwahn@40365
  1329
bulwahn@40365
  1330
lemma concat_injective: "concat xs = concat ys ==> length xs = length ys ==> \<forall>(x, y) \<in> set (zip xs ys). length x = length y ==> xs = ys"
bulwahn@40365
  1331
by (simp add: concat_eq_concat_iff)
bulwahn@40365
  1332
wenzelm@13114
  1333
nipkow@15392
  1334
subsubsection {* @{text nth} *}
wenzelm@13114
  1335
haftmann@29827
  1336
lemma nth_Cons_0 [simp, code]: "(x # xs)!0 = x"
nipkow@13145
  1337
by auto
wenzelm@13114
  1338
haftmann@29827
  1339
lemma nth_Cons_Suc [simp, code]: "(x # xs)!(Suc n) = xs!n"
nipkow@13145
  1340
by auto
wenzelm@13114
  1341
wenzelm@13142
  1342
declare nth.simps [simp del]
wenzelm@13114
  1343
nipkow@41842
  1344
lemma nth_Cons_pos[simp]: "0 < n \<Longrightarrow> (x#xs) ! n = xs ! (n - 1)"
nipkow@41842
  1345
by(auto simp: Nat.gr0_conv_Suc)
nipkow@41842
  1346
wenzelm@13114
  1347
lemma nth_append:
nipkow@24526
  1348
  "(xs @ ys)!n = (if n < length xs then xs!n else ys!(n - length xs))"
nipkow@24526
  1349
apply (induct xs arbitrary: n, simp)
paulson@14208
  1350
apply (case_tac n, auto)
nipkow@13145
  1351
done
wenzelm@13114
  1352
nipkow@14402
  1353
lemma nth_append_length [simp]: "(xs @ x # ys) ! length xs = x"
wenzelm@25221
  1354
by (induct xs) auto
nipkow@14402
  1355
nipkow@14402
  1356
lemma nth_append_length_plus[simp]: "(xs @ ys) ! (length xs + n) = ys ! n"
wenzelm@25221
  1357
by (induct xs) auto
nipkow@14402
  1358
nipkow@24526
  1359
lemma nth_map [simp]: "n < length xs ==> (map f xs)!n = f(xs!n)"
nipkow@24526
  1360
apply (induct xs arbitrary: n, simp)
paulson@14208
  1361
apply (case_tac n, auto)
nipkow@13145
  1362
done
wenzelm@13114
  1363
nipkow@18423
  1364
lemma hd_conv_nth: "xs \<noteq> [] \<Longrightarrow> hd xs = xs!0"
nipkow@18423
  1365
by(cases xs) simp_all
nipkow@18423
  1366
nipkow@18049
  1367
nipkow@18049
  1368
lemma list_eq_iff_nth_eq:
nipkow@24526
  1369
 "(xs = ys) = (length xs = length ys \<and> (ALL i<length xs. xs!i = ys!i))"
nipkow@24526
  1370
apply(induct xs arbitrary: ys)
paulson@24632
  1371
 apply force
nipkow@18049
  1372
apply(case_tac ys)
nipkow@18049
  1373
 apply simp
nipkow@18049
  1374
apply(simp add:nth_Cons split:nat.split)apply blast
nipkow@18049
  1375
done
nipkow@18049
  1376
wenzelm@13142
  1377
lemma set_conv_nth: "set xs = {xs!i | i. i < length xs}"
paulson@15251
  1378
apply (induct xs, simp, simp)
nipkow@13145
  1379
apply safe
paulson@24632
  1380
apply (metis nat_case_0 nth.simps zero_less_Suc)
paulson@24632
  1381
apply (metis less_Suc_eq_0_disj nth_Cons_Suc)
paulson@14208
  1382
apply (case_tac i, simp)
paulson@24632
  1383
apply (metis diff_Suc_Suc nat_case_Suc nth.simps zero_less_diff)
nipkow@13145
  1384
done
wenzelm@13114
  1385
nipkow@17501
  1386
lemma in_set_conv_nth: "(x \<in> set xs) = (\<exists>i < length xs. xs!i = x)"
nipkow@17501
  1387
by(auto simp:set_conv_nth)
nipkow@17501
  1388
nipkow@13145
  1389
lemma list_ball_nth: "[| n < length xs; !x : set xs. P x|] ==> P(xs!n)"
nipkow@13145
  1390
by (auto simp add: set_conv_nth)
wenzelm@13114
  1391
wenzelm@13142
  1392
lemma nth_mem [simp]: "n < length xs ==> xs!n : set xs"
nipkow@13145
  1393
by (auto simp add: set_conv_nth)
wenzelm@13114
  1394
wenzelm@13114
  1395
lemma all_nth_imp_all_set:
nipkow@13145
  1396
"[| !i < length xs. P(xs!i); x : set xs|] ==> P x"
nipkow@13145
  1397
by (auto simp add: set_conv_nth)
wenzelm@13114
  1398
wenzelm@13114
  1399
lemma all_set_conv_all_nth:
nipkow@13145
  1400
"(\<forall>x \<in> set xs. P x) = (\<forall>i. i < length xs --> P (xs ! i))"
nipkow@13145
  1401
by (auto simp add: set_conv_nth)
wenzelm@13114
  1402
kleing@25296
  1403
lemma rev_nth:
kleing@25296
  1404
  "n < size xs \<Longrightarrow> rev xs ! n = xs ! (length xs - Suc n)"
kleing@25296
  1405
proof (induct xs arbitrary: n)
kleing@25296
  1406
  case Nil thus ?case by simp
kleing@25296
  1407
next
kleing@25296
  1408
  case (Cons x xs)
kleing@25296
  1409
  hence n: "n < Suc (length xs)" by simp
kleing@25296
  1410
  moreover
kleing@25296
  1411
  { assume "n < length xs"
kleing@25296
  1412
    with n obtain n' where "length xs - n = Suc n'"
kleing@25296
  1413
      by (cases "length xs - n", auto)
kleing@25296
  1414
    moreover
kleing@25296
  1415
    then have "length xs - Suc n = n'" by simp
kleing@25296
  1416
    ultimately
kleing@25296
  1417
    have "xs ! (length xs - Suc n) = (x # xs) ! (length xs - n)" by simp
kleing@25296
  1418
  }
kleing@25296
  1419
  ultimately
kleing@25296
  1420
  show ?case by (clarsimp simp add: Cons nth_append)
kleing@25296
  1421
qed
wenzelm@13114
  1422
nipkow@31159
  1423
lemma Skolem_list_nth:
nipkow@31159
  1424
  "(ALL i<k. EX x. P i x) = (EX xs. size xs = k & (ALL i<k. P i (xs!i)))"
nipkow@31159
  1425
  (is "_ = (EX xs. ?P k xs)")
nipkow@31159
  1426
proof(induct k)
nipkow@31159
  1427
  case 0 show ?case by simp
nipkow@31159
  1428
next
nipkow@31159
  1429
  case (Suc k)
nipkow@31159
  1430
  show ?case (is "?L = ?R" is "_ = (EX xs. ?P' xs)")
nipkow@31159
  1431
  proof
nipkow@31159
  1432
    assume "?R" thus "?L" using Suc by auto
nipkow@31159
  1433
  next
nipkow@31159
  1434
    assume "?L"
nipkow@31159
  1435
    with Suc obtain x xs where "?P k xs & P k x" by (metis less_Suc_eq)
nipkow@31159
  1436
    hence "?P'(xs@[x])" by(simp add:nth_append less_Suc_eq)
nipkow@31159
  1437
    thus "?R" ..
nipkow@31159
  1438
  qed
nipkow@31159
  1439
qed
nipkow@31159
  1440
nipkow@31159
  1441
nipkow@15392
  1442
subsubsection {* @{text list_update} *}
wenzelm@13114
  1443
nipkow@24526
  1444
lemma length_list_update [simp]: "length(xs[i:=x]) = length xs"
nipkow@24526
  1445
by (induct xs arbitrary: i) (auto split: nat.split)
wenzelm@13114
  1446
wenzelm@13114
  1447
lemma nth_list_update:
nipkow@24526
  1448
"i < length xs==> (xs[i:=x])!j = (if i = j then x else xs!j)"
nipkow@24526
  1449
by (induct xs arbitrary: i j) (auto simp add: nth_Cons split: nat.split)
wenzelm@13114
  1450
wenzelm@13142
  1451
lemma nth_list_update_eq [simp]: "i < length xs ==> (xs[i:=x])!i = x"
nipkow@13145
  1452
by (simp add: nth_list_update)
wenzelm@13114
  1453
nipkow@24526
  1454
lemma nth_list_update_neq [simp]: "i \<noteq> j ==> xs[i:=x]!j = xs!j"
nipkow@24526
  1455
by (induct xs arbitrary: i j) (auto simp add: nth_Cons split: nat.split)
wenzelm@13114
  1456
nipkow@24526
  1457
lemma list_update_id[simp]: "xs[i := xs!i] = xs"
nipkow@24526
  1458
by (induct xs arbitrary: i) (simp_all split:nat.splits)
nipkow@24526
  1459
nipkow@24526
  1460
lemma list_update_beyond[simp]: "length xs \<le> i \<Longrightarrow> xs[i:=x] = xs"
nipkow@24526
  1461
apply (induct xs arbitrary: i)
nipkow@17501
  1462
 apply simp
nipkow@17501
  1463
apply (case_tac i)
nipkow@17501
  1464
apply simp_all
nipkow@17501
  1465
done
nipkow@17501
  1466
nipkow@31077
  1467
lemma list_update_nonempty[simp]: "xs[k:=x] = [] \<longleftrightarrow> xs=[]"
nipkow@31077
  1468
by(metis length_0_conv length_list_update)
nipkow@31077
  1469
wenzelm@13114
  1470
lemma list_update_same_conv:
nipkow@24526
  1471
"i < length xs ==> (xs[i := x] = xs) = (xs!i = x)"
nipkow@24526
  1472
by (induct xs arbitrary: i) (auto split: nat.split)
wenzelm@13114
  1473
nipkow@14187
  1474
lemma list_update_append1:
nipkow@24526
  1475
 "i < size xs \<Longrightarrow> (xs @ ys)[i:=x] = xs[i:=x] @ ys"
nipkow@24526
  1476
apply (induct xs arbitrary: i, simp)
nipkow@14187
  1477
apply(simp split:nat.split)
nipkow@14187
  1478
done
nipkow@14187
  1479
kleing@15868
  1480
lemma list_update_append:
nipkow@24526
  1481
  "(xs @ ys) [n:= x] = 
kleing@15868
  1482
  (if n < length xs then xs[n:= x] @ ys else xs @ (ys [n-length xs:= x]))"
nipkow@24526
  1483
by (induct xs arbitrary: n) (auto split:nat.splits)
kleing@15868
  1484
nipkow@14402
  1485
lemma list_update_length [simp]:
nipkow@14402
  1486
 "(xs @ x # ys)[length xs := y] = (xs @ y # ys)"
nipkow@14402
  1487
by (induct xs, auto)
nipkow@14402
  1488
nipkow@31264
  1489
lemma map_update: "map f (xs[k:= y]) = (map f xs)[k := f y]"
nipkow@31264
  1490
by(induct xs arbitrary: k)(auto split:nat.splits)
nipkow@31264
  1491
nipkow@31264
  1492
lemma rev_update:
nipkow@31264
  1493
  "k < length xs \<Longrightarrow> rev (xs[k:= y]) = (rev xs)[length xs - k - 1 := y]"
nipkow@31264
  1494
by (induct xs arbitrary: k) (auto simp: list_update_append split:nat.splits)
nipkow@31264
  1495
wenzelm@13114
  1496
lemma update_zip:
nipkow@31080
  1497
  "(zip xs ys)[i:=xy] = zip (xs[i:=fst xy]) (ys[i:=snd xy])"
nipkow@24526
  1498
by (induct ys arbitrary: i xy xs) (auto, case_tac xs, auto split: nat.split)
nipkow@24526
  1499
nipkow@24526
  1500
lemma set_update_subset_insert: "set(xs[i:=x]) <= insert x (set xs)"
nipkow@24526
  1501
by (induct xs arbitrary: i) (auto split: nat.split)
wenzelm@13114
  1502
wenzelm@13114
  1503
lemma set_update_subsetI: "[| set xs <= A; x:A |] ==> set(xs[i := x]) <= A"
nipkow@13145
  1504
by (blast dest!: set_update_subset_insert [THEN subsetD])
wenzelm@13114
  1505
nipkow@24526
  1506
lemma set_update_memI: "n < length xs \<Longrightarrow> x \<in> set (xs[n := x])"
nipkow@24526
  1507
by (induct xs arbitrary: n) (auto split:nat.splits)
kleing@15868
  1508
nipkow@31077
  1509
lemma list_update_overwrite[simp]:
haftmann@24796
  1510
  "xs [i := x, i := y] = xs [i := y]"
nipkow@31077
  1511
apply (induct xs arbitrary: i) apply simp
nipkow@31077
  1512
apply (case_tac i, simp_all)
haftmann@24796
  1513
done
haftmann@24796
  1514
haftmann@24796
  1515
lemma list_update_swap:
haftmann@24796
  1516
  "i \<noteq> i' \<Longrightarrow> xs [i := x, i' := x'] = xs [i' := x', i := x]"
haftmann@24796
  1517
apply (induct xs arbitrary: i i')
haftmann@24796
  1518
apply simp
haftmann@24796
  1519
apply (case_tac i, case_tac i')
haftmann@24796
  1520
apply auto
haftmann@24796
  1521
apply (case_tac i')
haftmann@24796
  1522
apply auto
haftmann@24796
  1523
done
haftmann@24796
  1524
haftmann@29827
  1525
lemma list_update_code [code]:
haftmann@29827
  1526
  "[][i := y] = []"
haftmann@29827
  1527
  "(x # xs)[0 := y] = y # xs"
haftmann@29827
  1528
  "(x # xs)[Suc i := y] = x # xs[i := y]"
haftmann@29827
  1529
  by simp_all
haftmann@29827
  1530
wenzelm@13114
  1531
nipkow@15392
  1532
subsubsection {* @{text last} and @{text butlast} *}
wenzelm@13114
  1533
wenzelm@13142
  1534
lemma last_snoc [simp]: "last (xs @ [x]) = x"
nipkow@13145
  1535
by (induct xs) auto
wenzelm@13114
  1536
wenzelm@13142
  1537
lemma butlast_snoc [simp]: "butlast (xs @ [x]) = xs"
nipkow@13145
  1538
by (induct xs) auto
wenzelm@13114
  1539
nipkow@14302
  1540
lemma last_ConsL: "xs = [] \<Longrightarrow> last(x#xs) = x"
nipkow@14302
  1541
by(simp add:last.simps)
nipkow@14302
  1542
nipkow@14302
  1543
lemma last_ConsR: "xs \<noteq> [] \<Longrightarrow> last(x#xs) = last xs"
nipkow@14302
  1544
by(simp add:last.simps)
nipkow@14302
  1545
nipkow@14302
  1546
lemma last_append: "last(xs @ ys) = (if ys = [] then last xs else last ys)"
nipkow@14302
  1547
by (induct xs) (auto)
nipkow@14302
  1548
nipkow@14302
  1549
lemma last_appendL[simp]: "ys = [] \<Longrightarrow> last(xs @ ys) = last xs"
nipkow@14302
  1550
by(simp add:last_append)
nipkow@14302
  1551
nipkow@14302
  1552
lemma last_appendR[simp]: "ys \<noteq> [] \<Longrightarrow> last(xs @ ys) = last ys"
nipkow@14302
  1553
by(simp add:last_append)
nipkow@14302
  1554
nipkow@17762
  1555
lemma hd_rev: "xs \<noteq> [] \<Longrightarrow> hd(rev xs) = last xs"
nipkow@17762
  1556
by(rule rev_exhaust[of xs]) simp_all
nipkow@17762
  1557
nipkow@17762
  1558
lemma last_rev: "xs \<noteq> [] \<Longrightarrow> last(rev xs) = hd xs"
nipkow@17762
  1559
by(cases xs) simp_all
nipkow@17762
  1560
nipkow@17765
  1561
lemma last_in_set[simp]: "as \<noteq> [] \<Longrightarrow> last as \<in> set as"
nipkow@17765
  1562
by (induct as) auto
nipkow@17762
  1563
wenzelm@13142
  1564
lemma length_butlast [simp]: "length (butlast xs) = length xs - 1"
nipkow@13145
  1565
by (induct xs rule: rev_induct) auto
wenzelm@13114
  1566
wenzelm@13114
  1567
lemma butlast_append:
nipkow@24526
  1568
  "butlast (xs @ ys) = (if ys = [] then butlast xs else xs @ butlast ys)"
nipkow@24526
  1569
by (induct xs arbitrary: ys) auto
wenzelm@13114
  1570
wenzelm@13142
  1571
lemma append_butlast_last_id [simp]:
nipkow@13145
  1572
"xs \<noteq> [] ==> butlast xs @ [last xs] = xs"
nipkow@13145
  1573
by (induct xs) auto
wenzelm@13114
  1574
wenzelm@13142
  1575
lemma in_set_butlastD: "x : set (butlast xs) ==> x : set xs"
nipkow@13145
  1576
by (induct xs) (auto split: split_if_asm)
wenzelm@13114
  1577
wenzelm@13114
  1578
lemma in_set_butlast_appendI:
nipkow@13145
  1579
"x : set (butlast xs) | x : set (butlast ys) ==> x : set (butlast (xs @ ys))"
nipkow@13145
  1580
by (auto dest: in_set_butlastD simp add: butlast_append)
wenzelm@13114
  1581
nipkow@24526
  1582
lemma last_drop[simp]: "n < length xs \<Longrightarrow> last (drop n xs) = last xs"
nipkow@24526
  1583
apply (induct xs arbitrary: n)
nipkow@17501
  1584
 apply simp
nipkow@17501
  1585
apply (auto split:nat.split)
nipkow@17501
  1586
done
nipkow@17501
  1587
huffman@30128
  1588
lemma last_conv_nth: "xs\<noteq>[] \<Longrightarrow> last xs = xs!(length xs - 1)"
nipkow@17589
  1589
by(induct xs)(auto simp:neq_Nil_conv)
nipkow@17589
  1590
huffman@30128
  1591
lemma butlast_conv_take: "butlast xs = take (length xs - 1) xs"
huffman@26584
  1592
by (induct xs, simp, case_tac xs, simp_all)
huffman@26584
  1593
nipkow@31077
  1594
lemma last_list_update:
nipkow@31077
  1595
  "xs \<noteq> [] \<Longrightarrow> last(xs[k:=x]) = (if k = size xs - 1 then x else last xs)"
nipkow@31077
  1596
by (auto simp: last_conv_nth)
nipkow@31077
  1597
nipkow@31077
  1598
lemma butlast_list_update:
nipkow@31077
  1599
  "butlast(xs[k:=x]) =
nipkow@31077
  1600
 (if k = size xs - 1 then butlast xs else (butlast xs)[k:=x])"
nipkow@31077
  1601
apply(cases xs rule:rev_cases)
nipkow@31077
  1602
apply simp
nipkow@31077
  1603
apply(simp add:list_update_append split:nat.splits)
nipkow@31077
  1604
done
nipkow@31077
  1605
haftmann@36851
  1606
lemma last_map:
haftmann@36851
  1607
  "xs \<noteq> [] \<Longrightarrow> last (map f xs) = f (last xs)"
haftmann@36851
  1608
  by (cases xs rule: rev_cases) simp_all
haftmann@36851
  1609
haftmann@36851
  1610
lemma map_butlast:
haftmann@36851
  1611
  "map f (butlast xs) = butlast (map f xs)"
haftmann@36851
  1612
  by (induct xs) simp_all
haftmann@36851
  1613
nipkow@40230
  1614
lemma snoc_eq_iff_butlast:
nipkow@40230
  1615
  "xs @ [x] = ys \<longleftrightarrow> (ys \<noteq> [] & butlast ys = xs & last ys = x)"
nipkow@40230
  1616
by (metis append_butlast_last_id append_is_Nil_conv butlast_snoc last_snoc not_Cons_self)
nipkow@40230
  1617
haftmann@24796
  1618
nipkow@15392
  1619
subsubsection {* @{text take} and @{text drop} *}
wenzelm@13114
  1620
wenzelm@13142
  1621
lemma take_0 [simp]: "take 0 xs = []"
nipkow@13145
  1622
by (induct xs) auto
wenzelm@13114
  1623
wenzelm@13142
  1624
lemma drop_0 [simp]: "drop 0 xs = xs"
nipkow@13145
  1625
by (induct xs) auto
wenzelm@13114
  1626
wenzelm@13142
  1627
lemma take_Suc_Cons [simp]: "take (Suc n) (x # xs) = x # take n xs"
nipkow@13145
  1628
by simp
wenzelm@13114
  1629
wenzelm@13142
  1630
lemma drop_Suc_Cons [simp]: "drop (Suc n) (x # xs) = drop n xs"
nipkow@13145
  1631
by simp
wenzelm@13114
  1632
wenzelm@13142
  1633
declare take_Cons [simp del] and drop_Cons [simp del]
wenzelm@13114
  1634
huffman@30128
  1635
lemma take_1_Cons [simp]: "take 1 (x # xs) = [x]"
huffman@30128
  1636
  unfolding One_nat_def by simp
huffman@30128
  1637
huffman@30128
  1638
lemma drop_1_Cons [simp]: "drop 1 (x # xs) = xs"
huffman@30128
  1639
  unfolding One_nat_def by simp
huffman@30128
  1640
nipkow@15110
  1641
lemma take_Suc: "xs ~= [] ==> take (Suc n) xs = hd xs # take n (tl xs)"
nipkow@15110
  1642
by(clarsimp simp add:neq_Nil_conv)
nipkow@15110
  1643
nipkow@14187
  1644
lemma drop_Suc: "drop (Suc n) xs = drop n (tl xs)"
nipkow@14187
  1645
by(cases xs, simp_all)
nipkow@14187
  1646
huffman@26584
  1647
lemma take_tl: "take n (tl xs) = tl (take (Suc n) xs)"
huffman@26584
  1648
by (induct xs arbitrary: n) simp_all
huffman@26584
  1649
nipkow@24526
  1650
lemma drop_tl: "drop n (tl xs) = tl(drop n xs)"
nipkow@24526
  1651
by(induct xs arbitrary: n, simp_all add:drop_Cons drop_Suc split:nat.split)
nipkow@24526
  1652
huffman@26584
  1653
lemma tl_take: "tl (take n xs) = take (n - 1) (tl xs)"
huffman@26584
  1654
by (cases n, simp, cases xs, auto)
huffman@26584
  1655
huffman@26584
  1656
lemma tl_drop: "tl (drop n xs) = drop n (tl xs)"
huffman@26584
  1657
by (simp only: drop_tl)
huffman@26584
  1658
nipkow@24526
  1659
lemma nth_via_drop: "drop n xs = y#ys \<Longrightarrow> xs!n = y"
nipkow@24526
  1660
apply (induct xs arbitrary: n, simp)
nipkow@14187
  1661
apply(simp add:drop_Cons nth_Cons split:nat.splits)
nipkow@14187
  1662
done
nipkow@14187
  1663
nipkow@13913
  1664
lemma take_Suc_conv_app_nth:
nipkow@24526
  1665
  "i < length xs \<Longrightarrow> take (Suc i) xs = take i xs @ [xs!i]"
nipkow@24526
  1666
apply (induct xs arbitrary: i, simp)
paulson@14208
  1667
apply (case_tac i, auto)
nipkow@13913
  1668
done
nipkow@13913
  1669
mehta@14591
  1670
lemma drop_Suc_conv_tl:
nipkow@24526
  1671
  "i < length xs \<Longrightarrow> (xs!i) # (drop (Suc i) xs) = drop i xs"
nipkow@24526
  1672
apply (induct xs arbitrary: i, simp)
mehta@14591
  1673
apply (case_tac i, auto)
mehta@14591
  1674
done
mehta@14591
  1675
nipkow@24526
  1676
lemma length_take [simp]: "length (take n xs) = min (length xs) n"
nipkow@24526
  1677
by (induct n arbitrary: xs) (auto, case_tac xs, auto)
nipkow@24526
  1678
nipkow@24526
  1679
lemma length_drop [simp]: "length (drop n xs) = (length xs - n)"
nipkow@24526
  1680
by (induct n arbitrary: xs) (auto, case_tac xs, auto)
nipkow@24526
  1681
nipkow@24526
  1682
lemma take_all [simp]: "length xs <= n ==> take n xs = xs"
nipkow@24526
  1683
by (induct n arbitrary: xs) (auto, case_tac xs, auto)
nipkow@24526
  1684
nipkow@24526
  1685
lemma drop_all [simp]: "length xs <= n ==> drop n xs = []"
nipkow@24526
  1686
by (induct n arbitrary: xs) (auto, case_tac xs, auto)
wenzelm@13114
  1687
wenzelm@13142
  1688
lemma take_append [simp]:
nipkow@24526
  1689
  "take n (xs @ ys) = (take n xs @ take (n - length xs) ys)"
nipkow@24526
  1690
by (induct n arbitrary: xs) (auto, case_tac xs, auto)
wenzelm@13114
  1691
wenzelm@13142
  1692
lemma drop_append [simp]:
nipkow@24526
  1693
  "drop n (xs @ ys) = drop n xs @ drop (n - length xs) ys"
nipkow@24526
  1694
by (induct n arbitrary: xs) (auto, case_tac xs, auto)
nipkow@24526
  1695
nipkow@24526
  1696
lemma take_take [simp]: "take n (take m xs) = take (min n m) xs"
nipkow@24526
  1697
apply (induct m arbitrary: xs n, auto)
paulson@14208
  1698
apply (case_tac xs, auto)
nipkow@15236
  1699
apply (case_tac n, auto)
nipkow@13145
  1700
done
wenzelm@13114
  1701
nipkow@24526
  1702
lemma drop_drop [simp]: "drop n (drop m xs) = drop (n + m) xs"
nipkow@24526
  1703
apply (induct m arbitrary: xs, auto)
paulson@14208
  1704
apply (case_tac xs, auto)
nipkow@13145
  1705
done
wenzelm@13114
  1706
nipkow@24526
  1707
lemma take_drop: "take n (drop m xs) = drop m (take (n + m) xs)"
nipkow@24526
  1708
apply (induct m arbitrary: xs n, auto)
paulson@14208
  1709
apply (case_tac xs, auto)
nipkow@13145
  1710
done
wenzelm@13114
  1711
nipkow@24526
  1712
lemma drop_take: "drop n (take m xs) = take (m-n) (drop n xs)"
nipkow@24526
  1713
apply(induct xs arbitrary: m n)
nipkow@14802
  1714
 apply simp
nipkow@14802
  1715
apply(simp add: take_Cons drop_Cons split:nat.split)
nipkow@14802
  1716
done
nipkow@14802
  1717
nipkow@24526
  1718
lemma append_take_drop_id [simp]: "take n xs @ drop n xs = xs"
nipkow@24526
  1719
apply (induct n arbitrary: xs, auto)
paulson@14208
  1720
apply (case_tac xs, auto)
nipkow@13145
  1721
done
wenzelm@13114
  1722
nipkow@24526
  1723
lemma take_eq_Nil[simp]: "(take n xs = []) = (n = 0 \<or> xs = [])"
nipkow@24526
  1724
apply(induct xs arbitrary: n)
nipkow@15110
  1725
 apply simp
nipkow@15110
  1726
apply(simp add:take_Cons split:nat.split)
nipkow@15110
  1727
done
nipkow@15110
  1728
nipkow@24526
  1729
lemma drop_eq_Nil[simp]: "(drop n xs = []) = (length xs <= n)"
nipkow@24526
  1730
apply(induct xs arbitrary: n)
nipkow@15110
  1731
apply simp
nipkow@15110
  1732
apply(simp add:drop_Cons split:nat.split)
nipkow@15110
  1733
done
nipkow@15110
  1734
nipkow@24526
  1735
lemma take_map: "take n (map f xs) = map f (take n xs)"
nipkow@24526
  1736
apply (induct n arbitrary: xs, auto)
paulson@14208
  1737
apply (case_tac xs, auto)
nipkow@13145
  1738
done
wenzelm@13114
  1739
nipkow@24526
  1740
lemma drop_map: "drop n (map f xs) = map f (drop n xs)"
nipkow@24526
  1741
apply (induct n arbitrary: xs, auto)
paulson@14208
  1742
apply (case_tac xs, auto)
nipkow@13145
  1743
done
wenzelm@13114
  1744
nipkow@24526
  1745
lemma rev_take: "rev (take i xs) = drop (length xs - i) (rev xs)"
nipkow@24526
  1746
apply (induct xs arbitrary: i, auto)
paulson@14208
  1747
apply (case_tac i, auto)
nipkow@13145
  1748
done
wenzelm@13114
  1749
nipkow@24526
  1750
lemma rev_drop: "rev (drop i xs) = take (length xs - i) (rev xs)"
nipkow@24526
  1751
apply (induct xs arbitrary: i, auto)
paulson@14208
  1752
apply (case_tac i, auto)
nipkow@13145
  1753
done
wenzelm@13114
  1754
nipkow@24526
  1755
lemma nth_take [simp]: "i < n ==> (take n xs)!i = xs!i"
nipkow@24526
  1756
apply (induct xs arbitrary: i n, auto)
paulson@14208
  1757
apply (case_tac n, blast)
paulson@14208
  1758
apply (case_tac i, auto)
nipkow@13145
  1759
done
wenzelm@13114
  1760
wenzelm@13142
  1761
lemma nth_drop [simp]:
nipkow@24526
  1762
  "n + i <= length xs ==> (drop n xs)!i = xs!(n + i)"
nipkow@24526
  1763
apply (induct n arbitrary: xs i, auto)
paulson@14208
  1764
apply (case_tac xs, auto)
nipkow@13145
  1765
done
nipkow@3507
  1766
huffman@26584
  1767
lemma butlast_take:
huffman@30128
  1768
  "n <= length xs ==> butlast (take n xs) = take (n - 1) xs"
huffman@26584
  1769
by (simp add: butlast_conv_take min_max.inf_absorb1 min_max.inf_absorb2)
huffman@26584
  1770
huffman@26584
  1771
lemma butlast_drop: "butlast (drop n xs) = drop n (butlast xs)"
huffman@30128
  1772
by (simp add: butlast_conv_take drop_take add_ac)
huffman@26584
  1773
huffman@26584
  1774
lemma take_butlast: "n < length xs ==> take n (butlast xs) = take n xs"
huffman@26584
  1775
by (simp add: butlast_conv_take min_max.inf_absorb1)
huffman@26584
  1776
huffman@26584
  1777
lemma drop_butlast: "drop n (butlast xs) = butlast (drop n xs)"
huffman@30128
  1778
by (simp add: butlast_conv_take drop_take add_ac)
huffman@26584
  1779
nipkow@18423
  1780
lemma hd_drop_conv_nth: "\<lbrakk> xs \<noteq> []; n < length xs \<rbrakk> \<Longrightarrow> hd(drop n xs) = xs!n"
nipkow@18423
  1781
by(simp add: hd_conv_nth)
nipkow@18423
  1782
nipkow@35248
  1783
lemma set_take_subset_set_take:
nipkow@35248
  1784
  "m <= n \<Longrightarrow> set(take m xs) <= set(take n xs)"
bulwahn@41463
  1785
apply (induct xs arbitrary: m n)
bulwahn@41463
  1786
apply simp
bulwahn@41463
  1787
apply (case_tac n)
bulwahn@41463
  1788
apply (auto simp: take_Cons)
bulwahn@41463
  1789
done
nipkow@35248
  1790
nipkow@24526
  1791
lemma set_take_subset: "set(take n xs) \<subseteq> set xs"
nipkow@24526
  1792
by(induct xs arbitrary: n)(auto simp:take_Cons split:nat.split)
nipkow@24526
  1793
nipkow@24526
  1794
lemma set_drop_subset: "set(drop n xs) \<subseteq> set xs"
nipkow@24526
  1795
by(induct xs arbitrary: n)(auto simp:drop_Cons split:nat.split)
nipkow@14025
  1796
nipkow@35248
  1797
lemma set_drop_subset_set_drop:
nipkow@35248
  1798
  "m >= n \<Longrightarrow> set(drop m xs) <= set(drop n xs)"
nipkow@35248
  1799
apply(induct xs arbitrary: m n)
nipkow@35248
  1800
apply(auto simp:drop_Cons split:nat.split)
nipkow@35248
  1801
apply (metis set_drop_subset subset_iff)
nipkow@35248
  1802
done
nipkow@35248
  1803
nipkow@14187
  1804
lemma in_set_takeD: "x : set(take n xs) \<Longrightarrow> x : set xs"
nipkow@14187
  1805
using set_take_subset by fast
nipkow@14187
  1806
nipkow@14187
  1807
lemma in_set_dropD: "x : set(drop n xs) \<Longrightarrow> x : set xs"
nipkow@14187
  1808
using set_drop_subset by fast
nipkow@14187
  1809
wenzelm@13114
  1810
lemma append_eq_conv_conj:
nipkow@24526
  1811
  "(xs @ ys = zs) = (xs = take (length xs) zs \<and> ys = drop (length xs) zs)"
nipkow@24526
  1812
apply (induct xs arbitrary: zs, simp, clarsimp)
paulson@14208
  1813
apply (case_tac zs, auto)
nipkow@13145
  1814
done
wenzelm@13142
  1815
nipkow@24526
  1816
lemma take_add: 
nipkow@24526
  1817
  "i+j \<le> length(xs) \<Longrightarrow> take (i+j) xs = take i xs @ take j (drop i xs)"
nipkow@24526
  1818
apply (induct xs arbitrary: i, auto) 
nipkow@24526
  1819
apply (case_tac i, simp_all)
paulson@14050
  1820
done
paulson@14050
  1821
nipkow@14300
  1822
lemma append_eq_append_conv_if:
nipkow@24526
  1823
 "(xs\<^isub>1 @ xs\<^isub>2 = ys\<^isub>1 @ ys\<^isub>2) =
nipkow@14300
  1824
  (if size xs\<^isub>1 \<le> size ys\<^isub>1
nipkow@14300
  1825
   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
nipkow@14300
  1826
   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)"
nipkow@24526
  1827
apply(induct xs\<^isub>1 arbitrary: ys\<^isub>1)
nipkow@14300
  1828
 apply simp
nipkow@14300
  1829
apply(case_tac ys\<^isub>1)
nipkow@14300
  1830
apply simp_all
nipkow@14300
  1831
done
nipkow@14300
  1832
nipkow@15110
  1833
lemma take_hd_drop:
huffman@30079
  1834
  "n < length xs \<Longrightarrow> take n xs @ [hd (drop n xs)] = take (Suc n) xs"
nipkow@24526
  1835
apply(induct xs arbitrary: n)
nipkow@15110
  1836
apply simp
nipkow@15110
  1837
apply(simp add:drop_Cons split:nat.split)
nipkow@15110
  1838
done
nipkow@15110
  1839
nipkow@17501
  1840
lemma id_take_nth_drop:
nipkow@17501
  1841
 "i < length xs \<Longrightarrow> xs = take i xs @ xs!i # drop (Suc i) xs" 
nipkow@17501
  1842
proof -
nipkow@17501
  1843
  assume si: "i < length xs"
nipkow@17501
  1844
  hence "xs = take (Suc i) xs @ drop (Suc i) xs" by auto
nipkow@17501
  1845
  moreover
nipkow@17501
  1846
  from si have "take (Suc i) xs = take i xs @ [xs!i]"
nipkow@17501
  1847
    apply (rule_tac take_Suc_conv_app_nth) by arith
nipkow@17501
  1848
  ultimately show ?thesis by auto
nipkow@17501
  1849
qed
nipkow@17501
  1850
  
nipkow@17501
  1851
lemma upd_conv_take_nth_drop:
nipkow@17501
  1852
 "i < length xs \<Longrightarrow> xs[i:=a] = take i xs @ a # drop (Suc i) xs"
nipkow@17501
  1853
proof -
nipkow@17501
  1854
  assume i: "i < length xs"
nipkow@17501
  1855
  have "xs[i:=a] = (take i xs @ xs!i # drop (Suc i) xs)[i:=a]"
nipkow@17501
  1856
    by(rule arg_cong[OF id_take_nth_drop[OF i]])
nipkow@17501
  1857
  also have "\<dots> = take i xs @ a # drop (Suc i) xs"
nipkow@17501
  1858
    using i by (simp add: list_update_append)
nipkow@17501
  1859
  finally show ?thesis .
nipkow@17501
  1860
qed
nipkow@17501
  1861
haftmann@24796
  1862
lemma nth_drop':
haftmann@24796
  1863
  "i < length xs \<Longrightarrow> xs ! i # drop (Suc i) xs = drop i xs"
haftmann@24796
  1864
apply (induct i arbitrary: xs)
haftmann@24796
  1865
apply (simp add: neq_Nil_conv)
haftmann@24796
  1866
apply (erule exE)+
haftmann@24796
  1867
apply simp
haftmann@24796
  1868
apply (case_tac xs)
haftmann@24796
  1869
apply simp_all
haftmann@24796
  1870
done
haftmann@24796
  1871
wenzelm@13114
  1872
nipkow@15392
  1873
subsubsection {* @{text takeWhile} and @{text dropWhile} *}
wenzelm@13114
  1874
hoelzl@33639
  1875
lemma length_takeWhile_le: "length (takeWhile P xs) \<le> length xs"
hoelzl@33639
  1876
  by (induct xs) auto
hoelzl@33639
  1877
wenzelm@13142
  1878
lemma takeWhile_dropWhile_id [simp]: "takeWhile P xs @ dropWhile P xs = xs"
nipkow@13145
  1879
by (induct xs) auto
wenzelm@13114
  1880
wenzelm@13142
  1881
lemma takeWhile_append1 [simp]:
nipkow@13145
  1882
"[| x:set xs; ~P(x)|] ==> takeWhile P (xs @ ys) = takeWhile P xs"
nipkow@13145
  1883
by (induct xs) auto
wenzelm@13114
  1884
wenzelm@13142
  1885
lemma takeWhile_append2 [simp]:
nipkow@13145
  1886
"(!!x. x : set xs ==> P x) ==> takeWhile P (xs @ ys) = xs @ takeWhile P ys"
nipkow@13145
  1887
by (induct xs) auto
wenzelm@13114
  1888
wenzelm@13142
  1889
lemma takeWhile_tail: "\<not> P x ==> takeWhile P (xs @ (x#l)) = takeWhile P xs"
nipkow@13145
  1890
by (induct xs) auto
wenzelm@13114
  1891
hoelzl@33639
  1892
lemma takeWhile_nth: "j < length (takeWhile P xs) \<Longrightarrow> takeWhile P xs ! j = xs ! j"
hoelzl@33639
  1893
apply (subst (3) takeWhile_dropWhile_id[symmetric]) unfolding nth_append by auto
hoelzl@33639
  1894
hoelzl@33639
  1895
lemma dropWhile_nth: "j < length (dropWhile P xs) \<Longrightarrow> dropWhile P xs ! j = xs ! (j + length (takeWhile P xs))"
hoelzl@33639
  1896
apply (subst (3) takeWhile_dropWhile_id[symmetric]) unfolding nth_append by auto
hoelzl@33639
  1897
hoelzl@33639
  1898
lemma length_dropWhile_le: "length (dropWhile P xs) \<le> length xs"
hoelzl@33639
  1899
by (induct xs) auto
hoelzl@33639
  1900
wenzelm@13142
  1901
lemma dropWhile_append1 [simp]:
nipkow@13145
  1902
"[| x : set xs; ~P(x)|] ==> dropWhile P (xs @ ys) = (dropWhile P xs)@ys"
nipkow@13145
  1903
by (induct xs) auto
wenzelm@13114
  1904
wenzelm@13142
  1905
lemma dropWhile_append2 [simp]:
nipkow@13145
  1906
"(!!x. x:set xs ==> P(x)) ==> dropWhile P (xs @ ys) = dropWhile P ys"
nipkow@13145
  1907
by (induct xs) auto
wenzelm@13114
  1908
krauss@23971
  1909
lemma set_takeWhileD: "x : set (takeWhile P xs) ==> x : set xs \<and> P x"
nipkow@13145
  1910
by (induct xs) (auto split: split_if_asm)
wenzelm@13114
  1911
nipkow@13913
  1912
lemma takeWhile_eq_all_conv[simp]:
nipkow@13913
  1913
 "(takeWhile P xs = xs) = (\<forall>x \<in> set xs. P x)"
nipkow@13913
  1914
by(induct xs, auto)
nipkow@13913
  1915
nipkow@13913
  1916
lemma dropWhile_eq_Nil_conv[simp]:
nipkow@13913
  1917
 "(dropWhile P xs = []) = (\<forall>x \<in> set xs. P x)"
nipkow@13913
  1918
by(induct xs, auto)
nipkow@13913
  1919
nipkow@13913
  1920
lemma dropWhile_eq_Cons_conv:
nipkow@13913
  1921
 "(dropWhile P xs = y#ys) = (xs = takeWhile P xs @ y # ys & \<not> P y)"
nipkow@13913
  1922
by(induct xs, auto)
nipkow@13913
  1923
nipkow@31077
  1924
lemma distinct_takeWhile[simp]: "distinct xs ==> distinct (takeWhile P xs)"
nipkow@31077
  1925
by (induct xs) (auto dest: set_takeWhileD)
nipkow@31077
  1926
nipkow@31077
  1927
lemma distinct_dropWhile[simp]: "distinct xs ==> distinct (dropWhile P xs)"
nipkow@31077
  1928
by (induct xs) auto
nipkow@31077
  1929
hoelzl@33639
  1930
lemma takeWhile_map: "takeWhile P (map f xs) = map f (takeWhile (P \<circ> f) xs)"
hoelzl@33639
  1931
by (induct xs) auto
hoelzl@33639
  1932
hoelzl@33639
  1933
lemma dropWhile_map: "dropWhile P (map f xs) = map f (dropWhile (P \<circ> f) xs)"
hoelzl@33639
  1934
by (induct xs) auto
hoelzl@33639
  1935
hoelzl@33639
  1936
lemma takeWhile_eq_take: "takeWhile P xs = take (length (takeWhile P xs)) xs"
hoelzl@33639
  1937
by (induct xs) auto
hoelzl@33639
  1938
hoelzl@33639
  1939
lemma dropWhile_eq_drop: "dropWhile P xs = drop (length (takeWhile P xs)) xs"
hoelzl@33639
  1940
by (induct xs) auto
hoelzl@33639
  1941
hoelzl@33639
  1942
lemma hd_dropWhile:
hoelzl@33639
  1943
  "dropWhile P xs \<noteq> [] \<Longrightarrow> \<not> P (hd (dropWhile P xs))"
hoelzl@33639
  1944
using assms by (induct xs) auto
hoelzl@33639
  1945
hoelzl@33639
  1946
lemma takeWhile_eq_filter:
hoelzl@33639
  1947
  assumes "\<And> x. x \<in> set (dropWhile P xs) \<Longrightarrow> \<not> P x"
hoelzl@33639
  1948
  shows "takeWhile P xs = filter P xs"
hoelzl@33639
  1949
proof -
hoelzl@33639
  1950
  have A: "filter P xs = filter P (takeWhile P xs @ dropWhile P xs)"
hoelzl@33639
  1951
    by simp
hoelzl@33639
  1952
  have B: "filter P (dropWhile P xs) = []"
hoelzl@33639
  1953
    unfolding filter_empty_conv using assms by blast
hoelzl@33639
  1954
  have "filter P xs = takeWhile P xs"
hoelzl@33639
  1955
    unfolding A filter_append B
hoelzl@33639
  1956
    by (auto simp add: filter_id_conv dest: set_takeWhileD)
hoelzl@33639
  1957
  thus ?thesis ..
hoelzl@33639
  1958
qed
hoelzl@33639
  1959
hoelzl@33639
  1960
lemma takeWhile_eq_take_P_nth:
hoelzl@33639
  1961
  "\<lbrakk> \<And> i. \<lbrakk> i < n ; i < length xs \<rbrakk> \<Longrightarrow> P (xs ! i) ; n < length xs \<Longrightarrow> \<not> P (xs ! n) \<rbrakk> \<Longrightarrow>
hoelzl@33639
  1962
  takeWhile P xs = take n xs"
hoelzl@33639
  1963
proof (induct xs arbitrary: n)
hoelzl@33639
  1964
  case (Cons x xs)
hoelzl@33639
  1965
  thus ?case
hoelzl@33639
  1966
  proof (cases n)
hoelzl@33639
  1967
    case (Suc n') note this[simp]
hoelzl@33639
  1968
    have "P x" using Cons.prems(1)[of 0] by simp
hoelzl@33639
  1969
    moreover have "takeWhile P xs = take n' xs"
hoelzl@33639
  1970
    proof (rule Cons.hyps)
hoelzl@33639
  1971
      case goal1 thus "P (xs ! i)" using Cons.prems(1)[of "Suc i"] by simp
hoelzl@33639
  1972
    next case goal2 thus ?case using Cons by auto
hoelzl@33639
  1973
    qed
hoelzl@33639
  1974
    ultimately show ?thesis by simp
hoelzl@33639
  1975
   qed simp
hoelzl@33639
  1976
qed simp
hoelzl@33639
  1977
hoelzl@33639
  1978
lemma nth_length_takeWhile:
hoelzl@33639
  1979
  "length (takeWhile P xs) < length xs \<Longrightarrow> \<not> P (xs ! length (takeWhile P xs))"
hoelzl@33639
  1980
by (induct xs) auto
hoelzl@33639
  1981
hoelzl@33639
  1982
lemma length_takeWhile_less_P_nth:
hoelzl@33639
  1983
  assumes all: "\<And> i. i < j \<Longrightarrow> P (xs ! i)" and "j \<le> length xs"
hoelzl@33639
  1984
  shows "j \<le> length (takeWhile P xs)"
hoelzl@33639
  1985
proof (rule classical)
hoelzl@33639
  1986
  assume "\<not> ?thesis"
hoelzl@33639
  1987
  hence "length (takeWhile P xs) < length xs" using assms by simp
hoelzl@33639
  1988
  thus ?thesis using all `\<not> ?thesis` nth_length_takeWhile[of P xs] by auto
hoelzl@33639
  1989
qed
nipkow@31077
  1990
nipkow@17501
  1991
text{* The following two lemmmas could be generalized to an arbitrary
nipkow@17501
  1992
property. *}
nipkow@17501
  1993
nipkow@17501
  1994
lemma takeWhile_neq_rev: "\<lbrakk>distinct xs; x \<in> set xs\<rbrakk> \<Longrightarrow>
nipkow@17501
  1995
 takeWhile (\<lambda>y. y \<noteq> x) (rev xs) = rev (tl (dropWhile (\<lambda>y. y \<noteq> x) xs))"
nipkow@17501
  1996
by(induct xs) (auto simp: takeWhile_tail[where l="[]"])
nipkow@17501
  1997
nipkow@17501
  1998
lemma dropWhile_neq_rev: "\<lbrakk>distinct xs; x \<in> set xs\<rbrakk> \<Longrightarrow>
nipkow@17501
  1999
  dropWhile (\<lambda>y. y \<noteq> x) (rev xs) = x # rev (takeWhile (\<lambda>y. y \<noteq> x) xs)"
nipkow@17501
  2000
apply(induct xs)
nipkow@17501
  2001
 apply simp
nipkow@17501
  2002
apply auto
nipkow@17501
  2003
apply(subst dropWhile_append2)
nipkow@17501
  2004
apply auto
nipkow@17501
  2005
done
nipkow@17501
  2006
nipkow@18423
  2007
lemma takeWhile_not_last:
nipkow@18423
  2008
 "\<lbrakk> xs \<noteq> []; distinct xs\<rbrakk> \<Longrightarrow> takeWhile (\<lambda>y. y \<noteq> last xs) xs = butlast xs"
nipkow@18423
  2009
apply(induct xs)
nipkow@18423
  2010
 apply simp
nipkow@18423
  2011
apply(case_tac xs)
nipkow@18423
  2012
apply(auto)
nipkow@18423
  2013
done
nipkow@18423
  2014
krauss@19770
  2015
lemma takeWhile_cong [fundef_cong, recdef_cong]:
krauss@18336
  2016
  "[| l = k; !!x. x : set l ==> P x = Q x |] 
krauss@18336
  2017
  ==> takeWhile P l = takeWhile Q k"
nipkow@24349
  2018
by (induct k arbitrary: l) (simp_all)
krauss@18336
  2019
krauss@19770
  2020
lemma dropWhile_cong [fundef_cong, recdef_cong]:
krauss@18336
  2021
  "[| l = k; !!x. x : set l ==> P x = Q x |] 
krauss@18336
  2022
  ==> dropWhile P l = dropWhile Q k"
nipkow@24349
  2023
by (induct k arbitrary: l, simp_all)
krauss@18336
  2024
wenzelm@13114
  2025
nipkow@15392
  2026
subsubsection {* @{text zip} *}
wenzelm@13114
  2027
wenzelm@13142
  2028
lemma zip_Nil [simp]: "zip [] ys = []"
nipkow@13145
  2029
by (induct ys) auto
wenzelm@13114
  2030
wenzelm@13142
  2031
lemma zip_Cons_Cons [simp]: "zip (x # xs) (y # ys) = (x, y) # zip xs ys"
nipkow@13145
  2032
by simp
wenzelm@13114
  2033
wenzelm@13142
  2034
declare zip_Cons [simp del]
wenzelm@13114
  2035
haftmann@36198
  2036
lemma [code]:
haftmann@36198
  2037
  "zip [] ys = []"
haftmann@36198
  2038
  "zip xs [] = []"
haftmann@36198
  2039
  "zip (x # xs) (y # ys) = (x, y) # zip xs ys"
haftmann@36198
  2040
  by (fact zip_Nil zip.simps(1) zip_Cons_Cons)+
haftmann@36198
  2041
nipkow@15281
  2042
lemma zip_Cons1:
nipkow@15281
  2043
 "zip (x#xs) ys = (case ys of [] \<Rightarrow> [] | y#ys \<Rightarrow> (x,y)#zip xs ys)"
nipkow@15281
  2044
by(auto split:list.split)
nipkow@15281
  2045
wenzelm@13142
  2046
lemma length_zip [simp]:
krauss@22493
  2047
"length (zip xs ys) = min (length xs) (length ys)"
krauss@22493
  2048
by (induct xs ys rule:list_induct2') auto
wenzelm@13114
  2049
haftmann@34978
  2050
lemma zip_obtain_same_length:
haftmann@34978
  2051
  assumes "\<And>zs ws n. length zs = length ws \<Longrightarrow> n = min (length xs) (length ys)
haftmann@34978
  2052
    \<Longrightarrow> zs = take n xs \<Longrightarrow> ws = take n ys \<Longrightarrow> P (zip zs ws)"
haftmann@34978
  2053
  shows "P (zip xs ys)"
haftmann@34978
  2054
proof -
haftmann@34978
  2055
  let ?n = "min (length xs) (length ys)"
haftmann@34978
  2056
  have "P (zip (take ?n xs) (take ?n ys))"
haftmann@34978
  2057
    by (rule assms) simp_all
haftmann@34978
  2058
  moreover have "zip xs ys = zip (take ?n xs) (take ?n ys)"
haftmann@34978
  2059
  proof (induct xs arbitrary: ys)
haftmann@34978
  2060
    case Nil then show ?case by simp
haftmann@34978
  2061
  next
haftmann@34978
  2062
    case (Cons x xs) then show ?case by (cases ys) simp_all
haftmann@34978
  2063
  qed
haftmann@34978
  2064
  ultimately show ?thesis by simp
haftmann@34978
  2065
qed
haftmann@34978
  2066
wenzelm@13114
  2067
lemma zip_append1:
krauss@22493
  2068
"zip (xs @ ys) zs =
nipkow@13145
  2069
zip xs (take (length xs) zs) @ zip ys (drop (length xs) zs)"
krauss@22493
  2070
by (induct xs zs rule:list_induct2') auto
wenzelm@13114
  2071
wenzelm@13114
  2072
lemma zip_append2:
krauss@22493
  2073
"zip xs (ys @ zs) =
nipkow@13145
  2074
zip (take (length ys) xs) ys @ zip (drop (length ys) xs) zs"
krauss@22493
  2075
by (induct xs ys rule:list_induct2') auto
wenzelm@13114
  2076
wenzelm@13142
  2077
lemma zip_append [simp]:
wenzelm@13142
  2078
 "[| length xs = length us; length ys = length vs |] ==>
nipkow@13145
  2079
zip (xs@ys) (us@vs) = zip xs us @ zip ys vs"
nipkow@13145
  2080
by (simp add: zip_append1)
wenzelm@13114
  2081
wenzelm@13114
  2082
lemma zip_rev:
nipkow@14247
  2083
"length xs = length ys ==> zip (rev xs) (rev ys) = rev (zip xs ys)"
nipkow@14247
  2084
by (induct rule:list_induct2, simp_all)
wenzelm@13114
  2085
hoelzl@33639
  2086
lemma zip_map_map:
hoelzl@33639
  2087
  "zip (map f xs) (map g ys) = map (\<lambda> (x, y). (f x, g y)) (zip xs ys)"
hoelzl@33639
  2088
proof (induct xs arbitrary: ys)
hoelzl@33639
  2089
  case (Cons x xs) note Cons_x_xs = Cons.hyps
hoelzl@33639
  2090
  show ?case
hoelzl@33639
  2091
  proof (cases ys)
hoelzl@33639
  2092
    case (Cons y ys')
hoelzl@33639
  2093
    show ?thesis unfolding Cons using Cons_x_xs by simp
hoelzl@33639
  2094
  qed simp
hoelzl@33639
  2095
qed simp
hoelzl@33639
  2096
hoelzl@33639
  2097
lemma zip_map1:
hoelzl@33639
  2098
  "zip (map f xs) ys = map (\<lambda>(x, y). (f x, y)) (zip xs ys)"
hoelzl@33639
  2099
using zip_map_map[of f xs "\<lambda>x. x" ys] by simp
hoelzl@33639
  2100
hoelzl@33639
  2101
lemma zip_map2:
hoelzl@33639
  2102
  "zip xs (map f ys) = map (\<lambda>(x, y). (x, f y)) (zip xs ys)"
hoelzl@33639
  2103
using zip_map_map[of "\<lambda>x. x" xs f ys] by simp
hoelzl@33639
  2104
nipkow@23096
  2105
lemma map_zip_map:
hoelzl@33639
  2106
  "map f (zip (map g xs) ys) = map (%(x,y). f(g x, y)) (zip xs ys)"
hoelzl@33639
  2107
unfolding zip_map1 by auto
nipkow@23096
  2108
nipkow@23096
  2109
lemma map_zip_map2:
hoelzl@33639
  2110
  "map f (zip xs (map g ys)) = map (%(x,y). f(x, g y)) (zip xs ys)"
hoelzl@33639
  2111
unfolding zip_map2 by auto
nipkow@23096
  2112
nipkow@31080
  2113
text{* Courtesy of Andreas Lochbihler: *}
nipkow@31080
  2114
lemma zip_same_conv_map: "zip xs xs = map (\<lambda>x. (x, x)) xs"
nipkow@31080
  2115
by(induct xs) auto
nipkow@31080
  2116
wenzelm@13142
  2117
lemma nth_zip [simp]:
nipkow@24526
  2118
"[| i < length xs; i < length ys|] ==> (zip xs ys)!i = (xs!i, ys!i)"
nipkow@24526
  2119
apply (induct ys arbitrary: i xs, simp)
nipkow@13145
  2120
apply (case_tac xs)
nipkow@13145
  2121
 apply (simp_all add: nth.simps split: nat.split)
nipkow@13145
  2122
done
wenzelm@13114
  2123
wenzelm@13114
  2124
lemma set_zip:
nipkow@13145
  2125
"set (zip xs ys) = {(xs!i, ys!i) | i. i < min (length xs) (length ys)}"
nipkow@31080
  2126
by(simp add: set_conv_nth cong: rev_conj_cong)
wenzelm@13114
  2127
hoelzl@33639
  2128
lemma zip_same: "((a,b) \<in> set (zip xs xs)) = (a \<in> set xs \<and> a = b)"
hoelzl@33639
  2129
by(induct xs) auto
hoelzl@33639
  2130
wenzelm@13114
  2131
lemma zip_update:
nipkow@31080
  2132
  "zip (xs[i:=x]) (ys[i:=y]) = (zip xs ys)[i:=(x,y)]"
nipkow@31080
  2133
by(rule sym, simp add: update_zip)
wenzelm@13114
  2134
wenzelm@13142
  2135
lemma zip_replicate [simp]:
nipkow@24526
  2136
  "zip (replicate i x) (replicate j y) = replicate (min i j) (x,y)"
nipkow@24526
  2137
apply (induct i arbitrary: j, auto)
paulson@14208
  2138
apply (case_tac j, auto)
nipkow@13145
  2139
done
wenzelm@13114
  2140
nipkow@19487
  2141
lemma take_zip:
nipkow@24526
  2142
  "take n (zip xs ys) = zip (take n xs) (take n ys)"
nipkow@24526
  2143
apply (induct n arbitrary: xs ys)
nipkow@19487
  2144
 apply simp
nipkow@19487
  2145
apply (case_tac xs, simp)
nipkow@19487
  2146
apply (case_tac ys, simp_all)
nipkow@19487
  2147
done
nipkow@19487
  2148
nipkow@19487
  2149
lemma drop_zip:
nipkow@24526
  2150
  "drop n (zip xs ys) = zip (drop n xs) (drop n ys)"
nipkow@24526
  2151
apply (induct n arbitrary: xs ys)
nipkow@19487
  2152
 apply simp
nipkow@19487
  2153
apply (case_tac xs, simp)
nipkow@19487
  2154
apply (case_tac ys, simp_all)
nipkow@19487
  2155
done
nipkow@19487
  2156
hoelzl@33639
  2157
lemma zip_takeWhile_fst: "zip (takeWhile P xs) ys = takeWhile (P \<circ> fst) (zip xs ys)"
hoelzl@33639
  2158
proof (induct xs arbitrary: ys)
hoelzl@33639
  2159
  case (Cons x xs) thus ?case by (cases ys) auto
hoelzl@33639
  2160
qed simp
hoelzl@33639
  2161
hoelzl@33639
  2162
lemma zip_takeWhile_snd: "zip xs (takeWhile P ys) = takeWhile (P \<circ> snd) (zip xs ys)"
hoelzl@33639
  2163
proof (induct xs arbitrary: ys)
hoelzl@33639
  2164
  case (Cons x xs) thus ?case by (cases ys) auto
hoelzl@33639
  2165
qed simp
hoelzl@33639
  2166
krauss@22493
  2167
lemma set_zip_leftD:
krauss@22493
  2168
  "(x,y)\<in> set (zip xs ys) \<Longrightarrow> x \<in> set xs"
krauss@22493
  2169
by (induct xs ys rule:list_induct2') auto
krauss@22493
  2170
krauss@22493
  2171
lemma set_zip_rightD:
krauss@22493
  2172
  "(x,y)\<in> set (zip xs ys) \<Longrightarrow> y \<in> set ys"
krauss@22493
  2173
by (induct xs ys rule:list_induct2') auto
wenzelm@13142
  2174
nipkow@23983
  2175
lemma in_set_zipE:
nipkow@23983
  2176
  "(x,y) : set(zip xs ys) \<Longrightarrow> (\<lbrakk> x : set xs; y : set ys \<rbrakk> \<Longrightarrow> R) \<Longrightarrow> R"
nipkow@23983
  2177
by(blast dest: set_zip_leftD set_zip_rightD)
nipkow@23983
  2178
haftmann@29829
  2179
lemma zip_map_fst_snd:
haftmann@29829
  2180
  "zip (map fst zs) (map snd zs) = zs"
haftmann@29829
  2181
  by (induct zs) simp_all
haftmann@29829
  2182
haftmann@29829
  2183
lemma zip_eq_conv:
haftmann@29829
  2184
  "length xs = length ys \<Longrightarrow> zip xs ys = zs \<longleftrightarrow> map fst zs = xs \<and> map snd zs = ys"
haftmann@29829
  2185
  by (auto simp add: zip_map_fst_snd)
haftmann@29829
  2186
wenzelm@35115
  2187
nipkow@15392
  2188
subsubsection {* @{text list_all2} *}
wenzelm@13114
  2189
kleing@14316
  2190
lemma list_all2_lengthD [intro?]: 
kleing@14316
  2191
  "list_all2 P xs ys ==> length xs = length ys"
nipkow@24349
  2192
by (simp add: list_all2_def)
haftmann@19607
  2193
haftmann@19787
  2194
lemma list_all2_Nil [iff, code]: "list_all2 P [] ys = (ys = [])"
nipkow@24349
  2195
by (simp add: list_all2_def)
haftmann@19607
  2196
haftmann@19787
  2197
lemma list_all2_Nil2 [iff, code]: "list_all2 P xs [] = (xs = [])"
nipkow@24349
  2198
by (simp add: list_all2_def)
haftmann@19607
  2199
haftmann@19607
  2200
lemma list_all2_Cons [iff, code]:
haftmann@19607
  2201
  "list_all2 P (x # xs) (y # ys) = (P x y \<and> list_all2 P xs ys)"
nipkow@24349
  2202
by (auto simp add: list_all2_def)
wenzelm@13114
  2203
wenzelm@13114
  2204
lemma list_all2_Cons1:
nipkow@13145
  2205
"list_all2 P (x # xs) ys = (\<exists>z zs. ys = z # zs \<and> P x z \<and> list_all2 P xs zs)"
nipkow@13145
  2206
by (cases ys) auto
wenzelm@13114
  2207
wenzelm@13114
  2208
lemma list_all2_Cons2:
nipkow@13145
  2209
"list_all2 P xs (y # ys) = (\<exists>z zs. xs = z # zs \<and> P z y \<and> list_all2 P zs ys)"
nipkow@13145
  2210
by (cases xs) auto
wenzelm@13114
  2211
wenzelm@13142
  2212
lemma list_all2_rev [iff]:
nipkow@13145
  2213
"list_all2 P (rev xs) (rev ys) = list_all2 P xs ys"
nipkow@13145
  2214
by (simp add: list_all2_def zip_rev cong: conj_cong)
wenzelm@13114
  2215
kleing@13863
  2216
lemma list_all2_rev1:
kleing@13863
  2217
"list_all2 P (rev xs) ys = list_all2 P xs (rev ys)"
kleing@13863
  2218
by (subst list_all2_rev [symmetric]) simp
kleing@13863
  2219
wenzelm@13114
  2220
lemma list_all2_append1:
nipkow@13145
  2221
"list_all2 P (xs @ ys) zs =
nipkow@13145
  2222
(EX us vs. zs = us @ vs \<and> length us = length xs \<and> length vs = length ys \<and>
nipkow@13145
  2223
list_all2 P xs us \<and> list_all2 P ys vs)"
nipkow@13145
  2224
apply (simp add: list_all2_def zip_append1)
nipkow@13145
  2225
apply (rule iffI)
nipkow@13145
  2226
 apply (rule_tac x = "take (length xs) zs" in exI)
nipkow@13145
  2227
 apply (rule_tac x = "drop (length xs) zs" in exI)
paulson@14208
  2228
 apply (force split: nat_diff_split simp add: min_def, clarify)
nipkow@13145
  2229
apply (simp add: ball_Un)
nipkow@13145
  2230
done
wenzelm@13114
  2231
wenzelm@13114
  2232
lemma list_all2_append2:
nipkow@13145
  2233
"list_all2 P xs (ys @ zs) =
nipkow@13145
  2234
(EX us vs. xs = us @ vs \<and> length us = length ys \<and> length vs = length zs \<and>
nipkow@13145
  2235
list_all2 P us ys \<and> list_all2 P vs zs)"
nipkow@13145
  2236
apply (simp add: list_all2_def zip_append2)
nipkow@13145
  2237
apply (rule iffI)
nipkow@13145
  2238
 apply (rule_tac x = "take (length ys) xs" in exI)
nipkow@13145
  2239
 apply (rule_tac x = "drop (length ys) xs" in exI)
paulson@14208
  2240
 apply (force split: nat_diff_split simp add: min_def, clarify)
nipkow@13145
  2241
apply (simp add: ball_Un)
nipkow@13145
  2242
done
wenzelm@13114
  2243
kleing@13863
  2244
lemma list_all2_append:
nipkow@14247
  2245
  "length xs = length ys \<Longrightarrow>
nipkow@14247
  2246
  list_all2 P (xs@us) (ys@vs) = (list_all2 P xs ys \<and> list_all2 P us vs)"
nipkow@14247
  2247
by (induct rule:list_induct2, simp_all)
kleing@13863
  2248
kleing@13863
  2249
lemma list_all2_appendI [intro?, trans]:
kleing@13863
  2250
  "\<lbrakk> list_all2 P a b; list_all2 P c d \<rbrakk> \<Longrightarrow> list_all2 P (a@c) (b@d)"
nipkow@24349
  2251
by (simp add: list_all2_append list_all2_lengthD)
kleing@13863
  2252
wenzelm@13114
  2253
lemma list_all2_conv_all_nth:
nipkow@13145
  2254
"list_all2 P xs ys =
nipkow@13145
  2255
(length xs = length ys \<and> (\<forall>i < length xs. P (xs!i) (ys!i)))"
nipkow@13145
  2256
by (force simp add: list_all2_def set_zip)
wenzelm@13114
  2257
berghofe@13883
  2258
lemma list_all2_trans:
berghofe@13883
  2259
  assumes tr: "!!a b c. P1 a b ==> P2 b c ==> P3 a c"
berghofe@13883
  2260
  shows "!!bs cs. list_all2 P1 as bs ==> list_all2 P2 bs cs ==> list_all2 P3 as cs"
berghofe@13883
  2261
        (is "!!bs cs. PROP ?Q as bs cs")
berghofe@13883
  2262
proof (induct as)
berghofe@13883
  2263
  fix x xs bs assume I1: "!!bs cs. PROP ?Q xs bs cs"
berghofe@13883
  2264
  show "!!cs. PROP ?Q (x # xs) bs cs"
berghofe@13883
  2265
  proof (induct bs)
berghofe@13883
  2266
    fix y ys cs assume I2: "!!cs. PROP ?Q (x # xs) ys cs"
berghofe@13883
  2267
    show "PROP ?Q (x # xs) (y # ys) cs"
berghofe@13883
  2268
      by (induct cs) (auto intro: tr I1 I2)
berghofe@13883
  2269
  qed simp
berghofe@13883
  2270
qed simp
berghofe@13883
  2271
kleing@13863
  2272
lemma list_all2_all_nthI [intro?]:
kleing@13863
  2273
  "length a = length b \<Longrightarrow> (\<And>n. n < length a \<Longrightarrow> P (a!n) (b!n)) \<Longrightarrow> list_all2 P a b"
nipkow@24349
  2274
by (simp add: list_all2_conv_all_nth)
kleing@13863
  2275
paulson@14395
  2276
lemma list_all2I:
paulson@14395
  2277
  "\<forall>x \<in> set (zip a b). split P x \<Longrightarrow> length a = length b \<Longrightarrow> list_all2 P a b"
nipkow@24349
  2278
by (simp add: list_all2_def)
paulson@14395
  2279
kleing@14328
  2280
lemma list_all2_nthD:
kleing@13863
  2281
  "\<lbrakk> list_all2 P xs ys; p < size xs \<rbrakk> \<Longrightarrow> P (xs!p) (ys!p)"
nipkow@24349
  2282
by (simp add: list_all2_conv_all_nth)
kleing@13863
  2283
nipkow@14302
  2284
lemma list_all2_nthD2:
nipkow@14302
  2285
  "\<lbrakk>list_all2 P xs ys; p < size ys\<rbrakk> \<Longrightarrow> P (xs!p) (ys!p)"
nipkow@24349
  2286
by (frule list_all2_lengthD) (auto intro: list_all2_nthD)
nipkow@14302
  2287
kleing@13863
  2288
lemma list_all2_map1: 
kleing@13863
  2289
  "list_all2 P (map f as) bs = list_all2 (\<lambda>x y. P (f x) y) as bs"
nipkow@24349
  2290
by (simp add: list_all2_conv_all_nth)
kleing@13863
  2291
kleing@13863
  2292
lemma list_all2_map2: 
kleing@13863
  2293
  "list_all2 P as (map f bs) = list_all2 (\<lambda>x y. P x (f y)) as bs"
nipkow@24349
  2294
by (auto simp add: list_all2_conv_all_nth)
kleing@13863
  2295
kleing@14316
  2296
lemma list_all2_refl [intro?]:
kleing@13863
  2297
  "(\<And>x. P x x) \<Longrightarrow> list_all2 P xs xs"
nipkow@24349
  2298
by (simp add: list_all2_conv_all_nth)
kleing@13863
  2299
kleing@13863
  2300
lemma list_all2_update_cong:
kleing@13863
  2301
  "\<lbrakk> i<size xs; list_all2 P xs ys; P x y \<rbrakk> \<Longrightarrow> list_all2 P (xs[i:=x]) (ys[i:=y])"
nipkow@24349
  2302
by (simp add: list_all2_conv_all_nth nth_list_update)
kleing@13863
  2303
kleing@13863
  2304
lemma list_all2_update_cong2:
kleing@13863
  2305
  "\<lbrakk>list_all2 P xs ys; P x y; i < length ys\<rbrakk> \<Longrightarrow> list_all2 P (xs[i:=x]) (ys[i:=y])"
nipkow@24349
  2306
by (simp add: list_all2_lengthD list_all2_update_cong)
kleing@13863
  2307
nipkow@14302
  2308
lemma list_all2_takeI [simp,intro?]:
nipkow@24526
  2309
  "list_all2 P xs ys \<Longrightarrow> list_all2 P (take n xs) (take n ys)"
nipkow@24526
  2310
apply (induct xs arbitrary: n ys)
nipkow@24526
  2311
 apply simp
nipkow@24526
  2312
apply (clarsimp simp add: list_all2_Cons1)
nipkow@24526
  2313
apply (case_tac n)
nipkow@24526
  2314
apply auto
nipkow@24526
  2315
done
nipkow@14302
  2316
nipkow@14302
  2317
lemma list_all2_dropI [simp,intro?]:
nipkow@24526
  2318
  "list_all2 P as bs \<Longrightarrow> list_all2 P (drop n as) (drop n bs)"
nipkow@24526
  2319
apply (induct as arbitrary: n bs, simp)
nipkow@24526
  2320
apply (clarsimp simp add: list_all2_Cons1)
nipkow@24526
  2321
apply (case_tac n, simp, simp)
nipkow@24526
  2322
done
kleing@13863
  2323
kleing@14327
  2324
lemma list_all2_mono [intro?]:
nipkow@24526
  2325
  "list_all2 P xs ys \<Longrightarrow> (\<And>xs ys. P xs ys \<Longrightarrow> Q xs ys) \<Longrightarrow> list_all2 Q xs ys"
nipkow@24526
  2326
apply (induct xs arbitrary: ys, simp)
nipkow@24526
  2327
apply (case_tac ys, auto)
nipkow@24526
  2328
done
kleing@13863
  2329
haftmann@22551
  2330
lemma list_all2_eq:
haftmann@22551
  2331
  "xs = ys \<longleftrightarrow> list_all2 (op =) xs ys"
nipkow@24349
  2332
by (induct xs ys rule: list_induct2') auto
haftmann@22551
  2333
nipkow@40230
  2334
lemma list_eq_iff_zip_eq:
nipkow@40230
  2335
  "xs = ys \<longleftrightarrow> length xs = length ys \<and> (\<forall>(x,y) \<in> set (zip xs ys). x = y)"
nipkow@40230
  2336
by(auto simp add: set_zip list_all2_eq list_all2_conv_all_nth cong: conj_cong)
nipkow@40230
  2337
wenzelm@13142
  2338
nipkow@15392
  2339
subsubsection {* @{text foldl} and @{text foldr} *}
wenzelm@13142
  2340
wenzelm@13142
  2341
lemma foldl_append [simp]:
nipkow@24526
  2342
  "foldl f a (xs @ ys) = foldl f (foldl f a xs) ys"
nipkow@24526
  2343
by (induct xs arbitrary: a) auto
wenzelm@13142
  2344
nipkow@14402
  2345
lemma foldr_append[simp]: "foldr f (xs @ ys) a = foldr f xs (foldr f ys a)"
nipkow@14402
  2346
by (induct xs) auto
nipkow@14402
  2347
nipkow@23096
  2348
lemma foldr_map: "foldr g (map f xs) a = foldr (g o f) xs a"
nipkow@23096
  2349
by(induct xs) simp_all
nipkow@23096
  2350
nipkow@24449
  2351
text{* For efficient code generation: avoid intermediate list. *}
haftmann@31998
  2352
lemma foldl_map[code_unfold]:
nipkow@24449
  2353
  "foldl g a (map f xs) = foldl (%a x. g a (f x)) a xs"
nipkow@23096
  2354
by(induct xs arbitrary:a) simp_all
nipkow@23096
  2355
haftmann@34978
  2356
lemma foldl_apply:
haftmann@34978
  2357
  assumes "\<And>x. x \<in> set xs \<Longrightarrow> f x \<circ> h = h \<circ> g x"
haftmann@34978
  2358
  shows "foldl (\<lambda>s x. f x s) (h s) xs = h (foldl (\<lambda>s x. g x s) s xs)"
nipkow@39302
  2359
  by (rule sym, insert assms, induct xs arbitrary: s) (simp_all add: fun_eq_iff)
haftmann@31930
  2360
krauss@19770
  2361
lemma foldl_cong [fundef_cong, recdef_cong]:
krauss@18336
  2362
  "[| a = b; l = k; !!a x. x : set l ==> f a x = g a x |] 
krauss@18336
  2363
  ==> foldl f a l = foldl g b k"
nipkow@24349
  2364
by (induct k arbitrary: a b l) simp_all
krauss@18336
  2365
krauss@19770
  2366
lemma foldr_cong [fundef_cong, recdef_cong]:
krauss@18336
  2367
  "[| a = b; l = k; !!a x. x : set l ==> f x a = g x a |] 
krauss@18336
  2368
  ==> foldr f l a = foldr g k b"
nipkow@24349
  2369
by (induct k arbitrary: a b l) simp_all
krauss@18336
  2370
haftmann@35195
  2371
lemma foldl_fun_comm:
haftmann@35195
  2372
  assumes "\<And>x y s. f (f s x) y = f (f s y) x"
haftmann@35195
  2373
  shows "f (foldl f s xs) x = foldl f (f s x) xs"
haftmann@35195
  2374
  by (induct xs arbitrary: s)
haftmann@35195
  2375
    (simp_all add: assms)
haftmann@35195
  2376
nipkow@24449
  2377
lemma (in semigroup_add) foldl_assoc:
haftmann@25062
  2378
shows "foldl op+ (x+y) zs = x + (foldl op+ y zs)"
nipkow@24449
  2379
by (induct zs arbitrary: y) (simp_all add:add_assoc)
nipkow@24449
  2380
nipkow@24449
  2381
lemma (in monoid_add) foldl_absorb0:
haftmann@25062
  2382
shows "x + (foldl op+ 0 zs) = foldl op+ x zs"
nipkow@24449
  2383
by (induct zs) (simp_all add:foldl_assoc)
nipkow@24449
  2384
haftmann@35195
  2385
lemma foldl_rev:
haftmann@35195
  2386
  assumes "\<And>x y s. f (f s x) y = f (f s y) x"
haftmann@35195
  2387
  shows "foldl f s (rev xs) = foldl f s xs"
haftmann@35195
  2388
proof (induct xs arbitrary: s)
haftmann@35195
  2389
  case Nil then show ?case by simp
haftmann@35195
  2390
next
haftmann@35195
  2391
  case (Cons x xs) with assms show ?case by (simp add: foldl_fun_comm)
haftmann@35195
  2392
qed
haftmann@35195
  2393
haftmann@37605
  2394
lemma rev_foldl_cons [code]:
haftmann@37605
  2395
  "rev xs = foldl (\<lambda>xs x. x # xs) [] xs"
haftmann@37605
  2396
proof (induct xs)
haftmann@37605
  2397
  case Nil then show ?case by simp
haftmann@37605
  2398
next
haftmann@37605
  2399
  case Cons
haftmann@37605
  2400
  {
haftmann@37605
  2401
    fix x xs ys
haftmann@37605
  2402
    have "foldl (\<lambda>xs x. x # xs) ys xs @ [x]
haftmann@37605
  2403
      = foldl (\<lambda>xs x. x # xs) (ys @ [x]) xs"
haftmann@37605
  2404
    by (induct xs arbitrary: ys) auto
haftmann@37605
  2405
  }
haftmann@37605
  2406
  note aux = this
haftmann@37605
  2407
  show ?case by (induct xs) (auto simp add: Cons aux)
haftmann@37605
  2408
qed
haftmann@37605
  2409
nipkow@24449
  2410
haftmann@39774
  2411
text{* The ``Third Duality Theorem'' in Bird \& Wadler: *}
haftmann@39774
  2412
haftmann@39774
  2413
lemma foldr_foldl:
haftmann@39774
  2414
  "foldr f xs a = foldl (%x y. f y x) a (rev xs)"
haftmann@39774
  2415
  by (induct xs) auto
haftmann@39774
  2416
haftmann@39774
  2417
lemma foldl_foldr:
haftmann@39774
  2418
  "foldl f a xs = foldr (%x y. f y x) (rev xs) a"
haftmann@39774
  2419
  by (simp add: foldr_foldl [of "%x y. f y x" "rev xs"])
haftmann@39774
  2420
haftmann@39774
  2421
nipkow@23096
  2422
text{* The ``First Duality Theorem'' in Bird \& Wadler: *}
nipkow@23096
  2423
haftmann@39774
  2424
lemma (in monoid_add) foldl_foldr1_lemma:
haftmann@39774
  2425
  "foldl op + a xs = a + foldr op + xs 0"
haftmann@39774
  2426
  by (induct xs arbitrary: a) (auto simp: add_assoc)
haftmann@39774
  2427
haftmann@39774
  2428
corollary (in monoid_add) foldl_foldr1:
haftmann@39774
  2429
  "foldl op + 0 xs = foldr op + xs 0"
haftmann@39774
  2430
  by (simp add: foldl_foldr1_lemma)
haftmann@39774
  2431
haftmann@39774
  2432
lemma (in ab_semigroup_add) foldr_conv_foldl:
haftmann@39774
  2433
  "foldr op + xs a = foldl op + a xs"
haftmann@39774
  2434
  by (induct xs) (simp_all add: foldl_assoc add.commute)
chaieb@24471
  2435
wenzelm@13142
  2436
text {*
nipkow@13145
  2437
Note: @{text "n \<le> foldl (op +) n ns"} looks simpler, but is more
nipkow@13145
  2438
difficult to use because it requires an additional transitivity step.
wenzelm@13142
  2439
*}
wenzelm@13142
  2440
nipkow@24526
  2441
lemma start_le_sum: "(m::nat) <= n ==> m <= foldl (op +) n ns"
nipkow@24526
  2442
by (induct ns arbitrary: n) auto
nipkow@24526
  2443
nipkow@24526
  2444
lemma elem_le_sum: "(n::nat) : set ns ==> n <= foldl (op +) 0 ns"
nipkow@13145
  2445
by (force intro: start_le_sum simp add: in_set_conv_decomp)
wenzelm@13142
  2446
wenzelm@13142
  2447
lemma sum_eq_0_conv [iff]:
nipkow@24526
  2448
  "(foldl (op +) (m::nat) ns = 0) = (m = 0 \<and> (\<forall>n \<in> set ns. n = 0))"
nipkow@24526
  2449
by (induct ns arbitrary: m) auto
wenzelm@13114
  2450
chaieb@24471
  2451
lemma foldr_invariant: 
chaieb@24471
  2452
  "\<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)"
chaieb@24471
  2453
  by (induct xs, simp_all)
chaieb@24471
  2454
chaieb@24471
  2455
lemma foldl_invariant: 
chaieb@24471
  2456
  "\<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)"
chaieb@24471
  2457
  by (induct xs arbitrary: x, simp_all)
chaieb@24471
  2458
haftmann@34978
  2459
lemma foldl_weak_invariant:
haftmann@34978
  2460
  assumes "P s"
haftmann@34978
  2461
    and "\<And>s x. x \<in> set xs \<Longrightarrow> P s \<Longrightarrow> P (f s x)"
haftmann@34978
  2462
  shows "P (foldl f s xs)"
haftmann@34978
  2463
  using assms by (induct xs arbitrary: s) simp_all
haftmann@34978
  2464
haftmann@31455
  2465
text {* @{const foldl} and @{const concat} *}
nipkow@24449
  2466
nipkow@24449
  2467
lemma foldl_conv_concat:
haftmann@29782
  2468
  "foldl (op @) xs xss = xs @ concat xss"
haftmann@29782
  2469
proof (induct xss arbitrary: xs)
haftmann@29782
  2470
  case Nil show ?case by simp
haftmann@29782
  2471
next
haftmann@35267
  2472
  interpret monoid_add "op @" "[]" proof qed simp_all
haftmann@29782
  2473
  case Cons then show ?case by (simp add: foldl_absorb0)
haftmann@29782
  2474
qed
haftmann@29782
  2475
haftmann@29782
  2476
lemma concat_conv_foldl: "concat xss = foldl (op @) [] xss"
haftmann@29782
  2477
  by (simp add: foldl_conv_concat)
haftmann@29782
  2478
haftmann@31455
  2479
text {* @{const Finite_Set.fold} and @{const foldl} *}
haftmann@31455
  2480
haftmann@35195
  2481
lemma (in fun_left_comm) fold_set_remdups:
haftmann@35195
  2482
  "fold f y (set xs) = foldl (\<lambda>y x. f x y) y (remdups xs)"
haftmann@35195
  2483
  by (rule sym, induct xs arbitrary: y) (simp_all add: fold_fun_comm insert_absorb)
haftmann@35195
  2484
haftmann@31455
  2485
lemma (in fun_left_comm_idem) fold_set:
haftmann@31455
  2486
  "fold f y (set xs) = foldl (\<lambda>y x. f x y) y xs"
haftmann@31455
  2487
  by (rule sym, induct xs arbitrary: y) (simp_all add: fold_fun_comm)
haftmann@31455
  2488
haftmann@32681
  2489
lemma (in ab_semigroup_idem_mult) fold1_set:
haftmann@32681
  2490
  assumes "xs \<noteq> []"
haftmann@32681
  2491
  shows "fold1 times (set xs) = foldl times (hd xs) (tl xs)"
haftmann@32681
  2492
proof -
haftmann@32681
  2493
  interpret fun_left_comm_idem times by (fact fun_left_comm_idem)
haftmann@32681
  2494
  from assms obtain y ys where xs: "xs = y # ys"
haftmann@32681
  2495
    by (cases xs) auto
haftmann@32681
  2496
  show ?thesis
haftmann@32681
  2497
  proof (cases "set ys = {}")
haftmann@32681
  2498
    case True with xs show ?thesis by simp
haftmann@32681
  2499
  next
haftmann@32681
  2500
    case False
haftmann@32681
  2501
    then have "fold1 times (insert y (set ys)) = fold times y (set ys)"
haftmann@32681
  2502
      by (simp only: finite_set fold1_eq_fold_idem)
haftmann@32681
  2503
    with xs show ?thesis by (simp add: fold_set mult_commute)
haftmann@32681
  2504
  qed
haftmann@32681
  2505
qed
haftmann@32681
  2506
haftmann@32681
  2507
lemma (in lattice) Inf_fin_set_fold [code_unfold]:
haftmann@32681
  2508
  "Inf_fin (set (x # xs)) = foldl inf x xs"
haftmann@32681
  2509
proof -
haftmann@32681
  2510
  interpret ab_semigroup_idem_mult "inf :: 'a \<Rightarrow> 'a \<Rightarrow> 'a"
haftmann@32681
  2511
    by (fact ab_semigroup_idem_mult_inf)
haftmann@32681
  2512
  show ?thesis
haftmann@32681
  2513
    by (simp add: Inf_fin_def fold1_set del: set.simps)
haftmann@32681
  2514
qed
haftmann@32681
  2515
haftmann@32681
  2516
lemma (in lattice) Sup_fin_set_fold [code_unfold]:
haftmann@32681
  2517
  "Sup_fin (set (x # xs)) = foldl sup x xs"
haftmann@32681
  2518
proof -
haftmann@32681
  2519
  interpret ab_semigroup_idem_mult "sup :: 'a \<Rightarrow> 'a \<Rightarrow> 'a"
haftmann@32681
  2520
    by (fact ab_semigroup_idem_mult_sup)
haftmann@32681
  2521
  show ?thesis
haftmann@32681
  2522
    by (simp add: Sup_fin_def fold1_set del: set.simps)
haftmann@32681
  2523
qed
haftmann@32681
  2524
haftmann@32681
  2525
lemma (in linorder) Min_fin_set_fold [code_unfold]:
haftmann@32681
  2526
  "Min (set (x # xs)) = foldl min x xs"
haftmann@32681
  2527
proof -
haftmann@32681
  2528
  interpret ab_semigroup_idem_mult "min :: 'a \<Rightarrow> 'a \<Rightarrow> 'a"
haftmann@32681
  2529
    by (fact ab_semigroup_idem_mult_min)
haftmann@32681
  2530
  show ?thesis
haftmann@32681
  2531
    by (simp add: Min_def fold1_set del: set.simps)
haftmann@32681
  2532
qed
haftmann@32681
  2533
haftmann@32681
  2534
lemma (in linorder) Max_fin_set_fold [code_unfold]:
haftmann@32681
  2535
  "Max (set (x # xs)) = foldl max x xs"
haftmann@32681
  2536
proof -
haftmann@32681
  2537
  interpret ab_semigroup_idem_mult "max :: 'a \<Rightarrow> 'a \<Rightarrow> 'a"
haftmann@32681
  2538
    by (fact ab_semigroup_idem_mult_max)
haftmann@32681
  2539
  show ?thesis
haftmann@32681
  2540
    by (simp add: Max_def fold1_set del: set.simps)
haftmann@32681
  2541
qed
haftmann@32681
  2542
haftmann@32681
  2543
lemma (in complete_lattice) Inf_set_fold [code_unfold]:
haftmann@32681
  2544
  "Inf (set xs) = foldl inf top xs"
haftmann@34007
  2545
proof -
haftmann@34007
  2546
  interpret fun_left_comm_idem "inf :: 'a \<Rightarrow> 'a \<Rightarrow> 'a"
haftmann@34007
  2547
    by (fact fun_left_comm_idem_inf)
haftmann@34007
  2548
  show ?thesis by (simp add: Inf_fold_inf fold_set inf_commute)
haftmann@34007
  2549
qed
haftmann@32681
  2550
haftmann@32681
  2551
lemma (in complete_lattice) Sup_set_fold [code_unfold]:
haftmann@32681
  2552
  "Sup (set xs) = foldl sup bot xs"
haftmann@34007
  2553
proof -
haftmann@34007
  2554
  interpret fun_left_comm_idem "sup :: 'a \<Rightarrow> 'a \<Rightarrow> 'a"
haftmann@34007
  2555
    by (fact fun_left_comm_idem_sup)
haftmann@34007
  2556
  show ?thesis by (simp add: Sup_fold_sup fold_set sup_commute)
haftmann@34007
  2557
qed
haftmann@34007
  2558
haftmann@34007
  2559
lemma (in complete_lattice) INFI_set_fold:
haftmann@34007
  2560
  "INFI (set xs) f = foldl (\<lambda>y x. inf (f x) y) top xs"
haftmann@34007
  2561
  unfolding INFI_def set_map [symmetric] Inf_set_fold foldl_map
haftmann@34007
  2562
    by (simp add: inf_commute)
haftmann@34007
  2563
haftmann@34007
  2564
lemma (in complete_lattice) SUPR_set_fold:
haftmann@34007
  2565
  "SUPR (set xs) f = foldl (\<lambda>y x. sup (f x) y) bot xs"
haftmann@34007
  2566
  unfolding SUPR_def set_map [symmetric] Sup_set_fold foldl_map
haftmann@34007
  2567
    by (simp add: sup_commute)
haftmann@31455
  2568
wenzelm@35115
  2569
nipkow@24645
  2570
subsubsection {* @{text upt} *}
wenzelm@13114
  2571
nipkow@17090
  2572
lemma upt_rec[code]: "[i..<j] = (if i<j then i#[Suc i..<j] else [])"
nipkow@17090
  2573
-- {* simp does not terminate! *}
nipkow@13145
  2574
by (induct j) auto
wenzelm@13142
  2575
nipkow@32005
  2576
lemmas upt_rec_number_of[simp] = upt_rec[of "number_of m" "number_of n", standard]
nipkow@32005
  2577
nipkow@15425
  2578
lemma upt_conv_Nil [simp]: "j <= i ==> [i..<j] = []"
nipkow@13145
  2579
by (subst upt_rec) simp
wenzelm@13114
  2580
nipkow@15425
  2581
lemma upt_eq_Nil_conv[simp]: "([i..<j] = []) = (j = 0 \<or> j <= i)"
nipkow@15281
  2582
by(induct j)simp_all
nipkow@15281
  2583
nipkow@15281
  2584
lemma upt_eq_Cons_conv:
nipkow@24526
  2585
 "([i..<j] = x#xs) = (i < j & i = x & [i+1..<j] = xs)"
nipkow@24526
  2586
apply(induct j arbitrary: x xs)
nipkow@15281
  2587
 apply simp
nipkow@15281
  2588
apply(clarsimp simp add: append_eq_Cons_conv)
nipkow@15281
  2589
apply arith
nipkow@15281
  2590
done
nipkow@15281
  2591
nipkow@15425
  2592
lemma upt_Suc_append: "i <= j ==> [i..<(Suc j)] = [i..<j]@[j]"
nipkow@13145
  2593
-- {* Only needed if @{text upt_Suc} is deleted from the simpset. *}
nipkow@13145
  2594
by simp
wenzelm@13114
  2595
nipkow@15425
  2596
lemma upt_conv_Cons: "i < j ==> [i..<j] = i # [Suc i..<j]"
haftmann@26734
  2597
  by (simp add: upt_rec)
wenzelm@13114
  2598
nipkow@15425
  2599
lemma upt_add_eq_append: "i<=j ==> [i..<j+k] = [i..<j]@[j..<j+k]"
nipkow@13145
  2600
-- {* LOOPS as a simprule, since @{text "j <= j"}. *}
nipkow@13145
  2601
by (induct k) auto
wenzelm@13114
  2602
nipkow@15425
  2603
lemma length_upt [simp]: "length [i..<j] = j - i"
nipkow@13145
  2604
by (induct j) (auto simp add: Suc_diff_le)
wenzelm@13114
  2605
nipkow@15425
  2606
lemma nth_upt [simp]: "i + k < j ==> [i..<j] ! k = i + k"
nipkow@13145
  2607
apply (induct j)
nipkow@13145
  2608
apply (auto simp add: less_Suc_eq nth_append split: nat_diff_split)
nipkow@13145
  2609
done
wenzelm@13114
  2610
nipkow@17906
  2611
nipkow@17906
  2612
lemma hd_upt[simp]: "i < j \<Longrightarrow> hd[i..<j] = i"
nipkow@17906
  2613
by(simp add:upt_conv_Cons)
nipkow@17906
  2614
nipkow@17906
  2615
lemma last_upt[simp]: "i < j \<Longrightarrow> last[i..<j] = j - 1"
nipkow@17906
  2616
apply(cases j)
nipkow@17906
  2617
 apply simp
nipkow@17906
  2618
by(simp add:upt_Suc_append)
nipkow@17906
  2619
nipkow@24526
  2620
lemma take_upt [simp]: "i+m <= n ==> take m [i..<n] = [i..<i+m]"
nipkow@24526
  2621
apply (induct m arbitrary: i, simp)
nipkow@13145
  2622
apply (subst upt_rec)
nipkow@13145
  2623
apply (rule sym)
nipkow@13145
  2624
apply (subst upt_rec)
nipkow@13145
  2625
apply (simp del: upt.simps)
nipkow@13145
  2626
done
nipkow@3507
  2627
nipkow@17501
  2628
lemma drop_upt[simp]: "drop m [i..<j] = [i+m..<j]"
nipkow@17501
  2629
apply(induct j)
nipkow@17501
  2630
apply auto
nipkow@17501
  2631
done
nipkow@17501
  2632
nipkow@24645
  2633
lemma map_Suc_upt: "map Suc [m..<n] = [Suc m..<Suc n]"
nipkow@13145
  2634
by (induct n) auto
wenzelm@13114
  2635
nipkow@24526
  2636
lemma nth_map_upt: "i < n-m ==> (map f [m..<n]) ! i = f(m+i)"
nipkow@24526
  2637
apply (induct n m  arbitrary: i rule: diff_induct)
nipkow@13145
  2638
prefer 3 apply (subst map_Suc_upt[symmetric])
nipkow@13145
  2639
apply (auto simp add: less_diff_conv nth_upt)
nipkow@13145
  2640
done
wenzelm@13114
  2641
berghofe@13883
  2642
lemma nth_take_lemma:
nipkow@24526
  2643
  "k <= length xs ==> k <= length ys ==>
berghofe@13883
  2644
     (!!i. i < k --> xs!i = ys!i) ==> take k xs = take k ys"
nipkow@24526
  2645
apply (atomize, induct k arbitrary: xs ys)
paulson@14208
  2646
apply (simp_all add: less_Suc_eq_0_disj all_conj_distrib, clarify)
nipkow@13145
  2647
txt {* Both lists must be non-empty *}
paulson@14208
  2648
apply (case_tac xs, simp)
paulson@14208
  2649
apply (case_tac ys, clarify)
nipkow@13145
  2650
 apply (simp (no_asm_use))
nipkow@13145
  2651
apply clarify
nipkow@13145
  2652
txt {* prenexing's needed, not miniscoping *}
nipkow@13145
  2653
apply (simp (no_asm_use) add: all_simps [symmetric] del: all_simps)
nipkow@13145
  2654
apply blast
nipkow@13145
  2655
done
wenzelm@13114
  2656
wenzelm@13114
  2657
lemma nth_equalityI:
wenzelm@13114
  2658
 "[| length xs = length ys; ALL i < length xs. xs!i = ys!i |] ==> xs = ys"
nipkow@13145
  2659
apply (frule nth_take_lemma [OF le_refl eq_imp_le])
nipkow@13145
  2660
apply (simp_all add: take_all)
nipkow@13145
  2661
done
wenzelm@13142
  2662
haftmann@24796
  2663
lemma map_nth:
haftmann@24796
  2664
  "map (\<lambda>i. xs ! i) [0..<length xs] = xs"
haftmann@24796
  2665
  by (rule nth_equalityI, auto)