(* Title: HOL/Library/List_Prefix.thy
ID: $Id$
Author: Tobias Nipkow and Markus Wenzel, TU Muenchen
*)
header {* List prefixes and postfixes *}
theory List_Prefix
imports Main
begin
subsection {* Prefix order on lists *}
instance list :: (type) ord ..
defs (overloaded)
prefix_def: "xs \<le> ys == \<exists>zs. ys = xs @ zs"
strict_prefix_def: "xs < ys == xs \<le> ys \<and> xs \<noteq> (ys::'a list)"
instance list :: (type) order
by intro_classes (auto simp add: prefix_def strict_prefix_def)
lemma prefixI [intro?]: "ys = xs @ zs ==> xs \<le> ys"
by (unfold prefix_def) blast
lemma prefixE [elim?]: "xs \<le> ys ==> (!!zs. ys = xs @ zs ==> C) ==> C"
by (unfold prefix_def) blast
lemma strict_prefixI' [intro?]: "ys = xs @ z # zs ==> xs < ys"
by (unfold strict_prefix_def prefix_def) blast
lemma strict_prefixE' [elim?]:
"xs < ys ==> (!!z zs. ys = xs @ z # zs ==> C) ==> C"
proof -
assume r: "!!z zs. ys = xs @ z # zs ==> C"
assume "xs < ys"
then obtain us where "ys = xs @ us" and "xs \<noteq> ys"
by (unfold strict_prefix_def prefix_def) blast
with r show ?thesis by (auto simp add: neq_Nil_conv)
qed
lemma strict_prefixI [intro?]: "xs \<le> ys ==> xs \<noteq> ys ==> xs < (ys::'a list)"
by (unfold strict_prefix_def) blast
lemma strict_prefixE [elim?]:
"xs < ys ==> (xs \<le> ys ==> xs \<noteq> (ys::'a list) ==> C) ==> C"
by (unfold strict_prefix_def) 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"
proof (cases zs rule: rev_cases)
assume "zs = []"
with zs have "xs = ys @ [y]" by simp
thus ?thesis ..
next
fix z zs' assume "zs = zs' @ [z]"
with zs have "ys = xs @ zs'" by simp
hence "xs \<le> ys" ..
thus ?thesis ..
qed
next
assume "xs = ys @ [y] \<or> xs \<le> ys"
thus "xs \<le> ys @ [y]"
proof
assume "xs = ys @ [y]"
thus ?thesis by simp
next
assume "xs \<le> ys"
then obtain zs where "ys = xs @ zs" ..
hence "ys @ [y] = xs @ (zs @ [y])" by simp
thus ?thesis ..
qed
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 = [])"
proof -
have "(xs @ ys \<le> xs @ []) = (ys \<le> [])" by (rule same_prefix_prefix)
thus ?thesis by simp
qed
lemma prefix_prefix [simp]: "xs \<le> ys ==> xs \<le> ys @ zs"
proof -
assume "xs \<le> ys"
then obtain us where "ys = xs @ us" ..
hence "ys @ zs = xs @ (us @ zs)" by simp
thus ?thesis ..
qed
lemma append_prefixD: "xs @ ys \<le> zs \<Longrightarrow> xs \<le> zs"
by(simp add:prefix_def) blast
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 simp
apply blast
done
lemma append_one_prefix:
"xs \<le> ys ==> length xs < length ys ==> xs @ [ys ! length xs] \<le> ys"
apply (unfold prefix_def)
apply (auto simp add: nth_append)
apply (case_tac zs)
apply auto
done
theorem prefix_length_le: "xs \<le> ys ==> length xs \<le> length ys"
by (auto simp add: prefix_def)
lemma prefix_same_cases:
"\<lbrakk> (xs\<^isub>1::'a list) \<le> ys; xs\<^isub>2 \<le> ys \<rbrakk> \<Longrightarrow> xs\<^isub>1 \<le> xs\<^isub>2 \<or> xs\<^isub>2 \<le> xs\<^isub>1"
apply(simp add:prefix_def)
apply(erule exE)+
apply(simp add: append_eq_append_conv_if split:if_splits)
apply(rule disjI2)
apply(rule_tac x = "drop (size xs\<^isub>2) xs\<^isub>1" in exI)
apply clarify
apply(drule sym)
apply(insert append_take_drop_id[of "length xs\<^isub>2" xs\<^isub>1])
apply simp
apply(rule disjI1)
apply(rule_tac x = "drop (size xs\<^isub>1) xs\<^isub>2" in exI)
apply clarify
apply(insert append_take_drop_id[of "length xs\<^isub>1" xs\<^isub>2])
apply simp
done
lemma set_mono_prefix:
"xs \<le> ys \<Longrightarrow> set xs \<subseteq> set ys"
by(fastsimp simp add:prefix_def)
subsection {* Parallel lists *}
constdefs
parallel :: "'a list => 'a list => bool" (infixl "\<parallel>" 50)
"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"
by (unfold parallel_def) blast
lemma parallelE [elim]:
"xs \<parallel> ys ==> (\<not> xs \<le> ys ==> \<not> ys \<le> xs ==> C) ==> C"
by (unfold parallel_def) blast
theorem prefix_cases:
"(xs \<le> ys ==> C) ==>
(ys < xs ==> C) ==>
(xs \<parallel> ys ==> C) ==> C"
by (unfold parallel_def strict_prefix_def) 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
hence False by auto
thus ?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' = []" with ys have "xs = ys" by simp
with snoc have "[x] \<parallel> []" by auto
hence False by blast
thus ?thesis ..
next
fix c cs assume ys': "ys' = c # cs"
with snoc ys have "xs @ [x] \<parallel> xs @ c # cs" by (simp only:)
hence "x \<noteq> c" by auto
moreover have "xs @ [x] = xs @ x # []" by simp
moreover from ys ys' have "ys = xs @ c # cs" by (simp only:)
ultimately show ?thesis by blast
qed
next
assume "ys < xs" hence "ys \<le> xs @ [x]" by (simp add: strict_prefix_def)
with snoc have False by blast
thus ?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
subsection {* Postfix order on lists *}
(*
constdefs
postfix :: "'a list => 'a list => bool" ("(_/ >= _)" [51, 50] 50)
"xs >= ys == \<exists>zs. xs = zs @ ys"
lemma postfix_refl [simp, intro!]: "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_lemma: "xs = zs @ ys \<Longrightarrow> set ys \<subseteq> set xs"
by (induct zs, auto)
lemma postfix_is_subset: "xs >= ys \<Longrightarrow> set ys \<subseteq> set xs"
by (unfold postfix_def, erule exE, erule postfix_is_subset_lemma)
lemma postfix_ConsD2_lemma [rule_format]: "x#xs = zs @ y#ys \<longrightarrow> xs >= ys"
by (induct zs, auto intro!: postfix_appendI postfix_ConsI)
lemma postfix_ConsD2: "x#xs >= y#ys \<Longrightarrow> xs >= ys"
by (auto simp add: postfix_def dest!: postfix_ConsD2_lemma)
lemma postfix2prefix: "(xs >= ys) = (rev ys <= rev xs)"
apply (unfold prefix_def postfix_def, safe)
apply (rule_tac x = "rev zs" in exI, simp)
apply (rule_tac x = "rev zs" in exI)
apply (rule rev_is_rev_conv [THEN iffD1], simp)
done
*)
end