(* Title: HOL/Library/List_Prefix.thy
Author: Tobias Nipkow and Markus Wenzel, TU Muenchen
*)
header {* List prefixes and postfixes *}
theory List_Prefix
imports List Main
begin
subsection {* Prefix order on lists *}
instantiation list :: (type) order
begin
definition
prefix_def [code del]: "xs \<le> ys = (\<exists>zs. ys = xs @ zs)"
definition
strict_prefix_def [code del]: "xs < ys = (xs \<le> ys \<and> xs \<noteq> (ys::'a list))"
instance
by intro_classes (auto simp add: prefix_def strict_prefix_def)
end
lemma prefixI [intro?]: "ys = xs @ zs ==> xs \<le> ys"
unfolding prefix_def by blast
lemma prefixE [elim?]:
assumes "xs \<le> ys"
obtains zs where "ys = xs @ zs"
using assms unfolding prefix_def by blast
lemma strict_prefixI' [intro?]: "ys = xs @ z # zs ==> xs < ys"
unfolding strict_prefix_def prefix_def by blast
lemma strict_prefixE' [elim?]:
assumes "xs < ys"
obtains z zs where "ys = xs @ z # zs"
proof -
from `xs < ys` obtain us where "ys = xs @ us" and "xs \<noteq> ys"
unfolding strict_prefix_def prefix_def by blast
with that show ?thesis by (auto simp add: neq_Nil_conv)
qed
lemma strict_prefixI [intro?]: "xs \<le> ys ==> xs \<noteq> ys ==> xs < (ys::'a list)"
unfolding strict_prefix_def by blast
lemma strict_prefixE [elim?]:
fixes xs ys :: "'a list"
assumes "xs < ys"
obtains "xs \<le> ys" and "xs \<noteq> ys"
using assms unfolding strict_prefix_def by blast
subsection {* Basic properties of prefixes *}
theorem Nil_prefix [iff]: "[] \<le> xs"
by (simp add: prefix_def)
theorem prefix_Nil [simp]: "(xs \<le> []) = (xs = [])"
by (induct xs) (simp_all add: prefix_def)
lemma prefix_snoc [simp]: "(xs \<le> ys @ [y]) = (xs = ys @ [y] \<or> xs \<le> ys)"
proof
assume "xs \<le> ys @ [y]"
then obtain zs where zs: "ys @ [y] = xs @ zs" ..
show "xs = ys @ [y] \<or> xs \<le> ys"
by (metis append_Nil2 butlast_append butlast_snoc prefixI zs)
next
assume "xs = ys @ [y] \<or> xs \<le> ys"
then show "xs \<le> ys @ [y]"
by (metis order_eq_iff strict_prefixE strict_prefixI' xt1(7))
qed
lemma Cons_prefix_Cons [simp]: "(x # xs \<le> y # ys) = (x = y \<and> xs \<le> ys)"
by (auto simp add: prefix_def)
lemma same_prefix_prefix [simp]: "(xs @ ys \<le> xs @ zs) = (ys \<le> zs)"
by (induct xs) simp_all
lemma same_prefix_nil [iff]: "(xs @ ys \<le> xs) = (ys = [])"
by (metis append_Nil2 append_self_conv order_eq_iff prefixI)
lemma prefix_prefix [simp]: "xs \<le> ys ==> xs \<le> ys @ zs"
by (metis order_le_less_trans prefixI strict_prefixE strict_prefixI)
lemma append_prefixD: "xs @ ys \<le> zs \<Longrightarrow> xs \<le> zs"
by (auto simp add: prefix_def)
theorem prefix_Cons: "(xs \<le> y # ys) = (xs = [] \<or> (\<exists>zs. xs = y # zs \<and> zs \<le> ys))"
by (cases xs) (auto simp add: prefix_def)
theorem prefix_append:
"(xs \<le> ys @ zs) = (xs \<le> ys \<or> (\<exists>us. xs = ys @ us \<and> us \<le> zs))"
apply (induct zs rule: rev_induct)
apply force
apply (simp del: append_assoc add: append_assoc [symmetric])
apply (metis append_eq_appendI)
done
lemma append_one_prefix:
"xs \<le> ys ==> length xs < length ys ==> xs @ [ys ! length xs] \<le> ys"
unfolding prefix_def
by (metis Cons_eq_appendI append_eq_appendI append_eq_conv_conj
eq_Nil_appendI nth_drop')
theorem prefix_length_le: "xs \<le> ys ==> length xs \<le> length ys"
by (auto simp add: prefix_def)
lemma prefix_same_cases:
"(xs\<^isub>1::'a list) \<le> ys \<Longrightarrow> xs\<^isub>2 \<le> ys \<Longrightarrow> xs\<^isub>1 \<le> xs\<^isub>2 \<or> xs\<^isub>2 \<le> xs\<^isub>1"
unfolding prefix_def by (metis append_eq_append_conv2)
lemma set_mono_prefix: "xs \<le> ys \<Longrightarrow> set xs \<subseteq> set ys"
by (auto simp add: prefix_def)
lemma take_is_prefix: "take n xs \<le> xs"
unfolding prefix_def by (metis append_take_drop_id)
lemma map_prefixI: "xs \<le> ys \<Longrightarrow> map f xs \<le> map f ys"
by (auto simp: prefix_def)
lemma prefix_length_less: "xs < ys \<Longrightarrow> length xs < length ys"
by (auto simp: strict_prefix_def prefix_def)
lemma strict_prefix_simps [simp]:
"xs < [] = False"
"[] < (x # xs) = True"
"(x # xs) < (y # ys) = (x = y \<and> xs < ys)"
by (simp_all add: strict_prefix_def cong: conj_cong)
lemma take_strict_prefix: "xs < ys \<Longrightarrow> take n xs < ys"
apply (induct n arbitrary: xs ys)
apply (case_tac ys, simp_all)[1]
apply (metis order_less_trans strict_prefixI take_is_prefix)
done
lemma not_prefix_cases:
assumes pfx: "\<not> ps \<le> ls"
obtains
(c1) "ps \<noteq> []" and "ls = []"
| (c2) a as x xs where "ps = a#as" and "ls = x#xs" and "x = a" and "\<not> as \<le> xs"
| (c3) a as x xs where "ps = a#as" and "ls = x#xs" and "x \<noteq> a"
proof (cases ps)
case Nil then show ?thesis using pfx by simp
next
case (Cons a as)
note c = `ps = a#as`
show ?thesis
proof (cases ls)
case Nil then show ?thesis by (metis append_Nil2 pfx c1 same_prefix_nil)
next
case (Cons x xs)
show ?thesis
proof (cases "x = a")
case True
have "\<not> as \<le> xs" using pfx c Cons True by simp
with c Cons True show ?thesis by (rule c2)
next
case False
with c Cons show ?thesis by (rule c3)
qed
qed
qed
lemma not_prefix_induct [consumes 1, case_names Nil Neq Eq]:
assumes np: "\<not> ps \<le> ls"
and base: "\<And>x xs. P (x#xs) []"
and r1: "\<And>x xs y ys. x \<noteq> y \<Longrightarrow> P (x#xs) (y#ys)"
and r2: "\<And>x xs y ys. \<lbrakk> x = y; \<not> xs \<le> ys; P xs ys \<rbrakk> \<Longrightarrow> P (x#xs) (y#ys)"
shows "P ps ls" using np
proof (induct ls arbitrary: ps)
case Nil then show ?case
by (auto simp: neq_Nil_conv elim!: not_prefix_cases intro!: base)
next
case (Cons y ys)
then have npfx: "\<not> ps \<le> (y # ys)" by simp
then obtain x xs where pv: "ps = x # xs"
by (rule not_prefix_cases) auto
show ?case by (metis Cons.hyps Cons_prefix_Cons npfx pv r1 r2)
qed
subsection {* Parallel lists *}
definition
parallel :: "'a list => 'a list => bool" (infixl "\<parallel>" 50) where
"(xs \<parallel> ys) = (\<not> xs \<le> ys \<and> \<not> ys \<le> xs)"
lemma parallelI [intro]: "\<not> xs \<le> ys ==> \<not> ys \<le> xs ==> xs \<parallel> ys"
unfolding parallel_def by blast
lemma parallelE [elim]:
assumes "xs \<parallel> ys"
obtains "\<not> xs \<le> ys \<and> \<not> ys \<le> xs"
using assms unfolding parallel_def by blast
theorem prefix_cases:
obtains "xs \<le> ys" | "ys < xs" | "xs \<parallel> ys"
unfolding parallel_def strict_prefix_def by blast
theorem parallel_decomp:
"xs \<parallel> ys ==> \<exists>as b bs c cs. b \<noteq> c \<and> xs = as @ b # bs \<and> ys = as @ c # cs"
proof (induct xs rule: rev_induct)
case Nil
then have False by auto
then show ?case ..
next
case (snoc x xs)
show ?case
proof (rule prefix_cases)
assume le: "xs \<le> ys"
then obtain ys' where ys: "ys = xs @ ys'" ..
show ?thesis
proof (cases ys')
assume "ys' = []"
then show ?thesis by (metis append_Nil2 parallelE prefixI snoc.prems ys)
next
fix c cs assume ys': "ys' = c # cs"
then show ?thesis
by (metis Cons_eq_appendI eq_Nil_appendI parallelE prefixI
same_prefix_prefix snoc.prems ys)
qed
next
assume "ys < xs" then have "ys \<le> xs @ [x]" by (simp add: strict_prefix_def)
with snoc have False by blast
then show ?thesis ..
next
assume "xs \<parallel> ys"
with snoc obtain as b bs c cs where neq: "(b::'a) \<noteq> c"
and xs: "xs = as @ b # bs" and ys: "ys = as @ c # cs"
by blast
from xs have "xs @ [x] = as @ b # (bs @ [x])" by simp
with neq ys show ?thesis by blast
qed
qed
lemma parallel_append: "a \<parallel> b \<Longrightarrow> a @ c \<parallel> b @ d"
apply (rule parallelI)
apply (erule parallelE, erule conjE,
induct rule: not_prefix_induct, simp+)+
done
lemma parallel_appendI: "xs \<parallel> ys \<Longrightarrow> x = xs @ xs' \<Longrightarrow> y = ys @ ys' \<Longrightarrow> x \<parallel> y"
by (simp add: parallel_append)
lemma parallel_commute: "a \<parallel> b \<longleftrightarrow> b \<parallel> a"
unfolding parallel_def by auto
subsection {* Postfix order on lists *}
definition
postfix :: "'a list => 'a list => bool" ("(_/ >>= _)" [51, 50] 50) where
"(xs >>= ys) = (\<exists>zs. xs = zs @ ys)"
lemma postfixI [intro?]: "xs = zs @ ys ==> xs >>= ys"
unfolding postfix_def by blast
lemma postfixE [elim?]:
assumes "xs >>= ys"
obtains zs where "xs = zs @ ys"
using assms unfolding postfix_def by blast
lemma postfix_refl [iff]: "xs >>= xs"
by (auto simp add: postfix_def)
lemma postfix_trans: "\<lbrakk>xs >>= ys; ys >>= zs\<rbrakk> \<Longrightarrow> xs >>= zs"
by (auto simp add: postfix_def)
lemma postfix_antisym: "\<lbrakk>xs >>= ys; ys >>= xs\<rbrakk> \<Longrightarrow> xs = ys"
by (auto simp add: postfix_def)
lemma Nil_postfix [iff]: "xs >>= []"
by (simp add: postfix_def)
lemma postfix_Nil [simp]: "([] >>= xs) = (xs = [])"
by (auto simp add: postfix_def)
lemma postfix_ConsI: "xs >>= ys \<Longrightarrow> x#xs >>= ys"
by (auto simp add: postfix_def)
lemma postfix_ConsD: "xs >>= y#ys \<Longrightarrow> xs >>= ys"
by (auto simp add: postfix_def)
lemma postfix_appendI: "xs >>= ys \<Longrightarrow> zs @ xs >>= ys"
by (auto simp add: postfix_def)
lemma postfix_appendD: "xs >>= zs @ ys \<Longrightarrow> xs >>= ys"
by (auto simp add: postfix_def)
lemma postfix_is_subset: "xs >>= ys ==> set ys \<subseteq> set xs"
proof -
assume "xs >>= ys"
then obtain zs where "xs = zs @ ys" ..
then show ?thesis by (induct zs) auto
qed
lemma postfix_ConsD2: "x#xs >>= y#ys ==> xs >>= ys"
proof -
assume "x#xs >>= y#ys"
then obtain zs where "x#xs = zs @ y#ys" ..
then show ?thesis
by (induct zs) (auto intro!: postfix_appendI postfix_ConsI)
qed
lemma postfix_to_prefix: "xs >>= ys \<longleftrightarrow> rev ys \<le> rev xs"
proof
assume "xs >>= ys"
then obtain zs where "xs = zs @ ys" ..
then have "rev xs = rev ys @ rev zs" by simp
then show "rev ys <= rev xs" ..
next
assume "rev ys <= rev xs"
then obtain zs where "rev xs = rev ys @ zs" ..
then have "rev (rev xs) = rev zs @ rev (rev ys)" by simp
then have "xs = rev zs @ ys" by simp
then show "xs >>= ys" ..
qed
lemma distinct_postfix: "distinct xs \<Longrightarrow> xs >>= ys \<Longrightarrow> distinct ys"
by (clarsimp elim!: postfixE)
lemma postfix_map: "xs >>= ys \<Longrightarrow> map f xs >>= map f ys"
by (auto elim!: postfixE intro: postfixI)
lemma postfix_drop: "as >>= drop n as"
unfolding postfix_def
apply (rule exI [where x = "take n as"])
apply simp
done
lemma postfix_take: "xs >>= ys \<Longrightarrow> xs = take (length xs - length ys) xs @ ys"
by (clarsimp elim!: postfixE)
lemma parallelD1: "x \<parallel> y \<Longrightarrow> \<not> x \<le> y"
by blast
lemma parallelD2: "x \<parallel> y \<Longrightarrow> \<not> y \<le> x"
by blast
lemma parallel_Nil1 [simp]: "\<not> x \<parallel> []"
unfolding parallel_def by simp
lemma parallel_Nil2 [simp]: "\<not> [] \<parallel> x"
unfolding parallel_def by simp
lemma Cons_parallelI1: "a \<noteq> b \<Longrightarrow> a # as \<parallel> b # bs"
by auto
lemma Cons_parallelI2: "\<lbrakk> a = b; as \<parallel> bs \<rbrakk> \<Longrightarrow> a # as \<parallel> b # bs"
by (metis Cons_prefix_Cons parallelE parallelI)
lemma not_equal_is_parallel:
assumes neq: "xs \<noteq> ys"
and len: "length xs = length ys"
shows "xs \<parallel> ys"
using len neq
proof (induct rule: list_induct2)
case Nil
then show ?case by simp
next
case (Cons a as b bs)
have ih: "as \<noteq> bs \<Longrightarrow> as \<parallel> bs" by fact
show ?case
proof (cases "a = b")
case True
then have "as \<noteq> bs" using Cons by simp
then show ?thesis by (rule Cons_parallelI2 [OF True ih])
next
case False
then show ?thesis by (rule Cons_parallelI1)
qed
qed
subsection {* Executable code *}
lemma less_eq_code [code]:
"([]\<Colon>'a\<Colon>{eq, ord} list) \<le> xs \<longleftrightarrow> True"
"(x\<Colon>'a\<Colon>{eq, ord}) # xs \<le> [] \<longleftrightarrow> False"
"(x\<Colon>'a\<Colon>{eq, ord}) # xs \<le> y # ys \<longleftrightarrow> x = y \<and> xs \<le> ys"
by simp_all
lemma less_code [code]:
"xs < ([]\<Colon>'a\<Colon>{eq, ord} list) \<longleftrightarrow> False"
"[] < (x\<Colon>'a\<Colon>{eq, ord})# xs \<longleftrightarrow> True"
"(x\<Colon>'a\<Colon>{eq, ord}) # xs < y # ys \<longleftrightarrow> x = y \<and> xs < ys"
unfolding strict_prefix_def by auto
lemmas [code] = postfix_to_prefix
end