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(* Title: HOL/Library/Sublist_Order.thy
Authors: Peter Lammich, Uni Muenster <peter.lammich@uni-muenster.de>
Florian Haftmann, Tobias Nipkow, TU Muenchen
*)
header {* Sublist Ordering *}
theory Sublist_Order
imports Main
begin
text {*
This theory defines sublist ordering on lists.
A list @{text ys} is a sublist of a list @{text xs},
iff one obtains @{text ys} by erasing some elements from @{text xs}.
*}
subsection {* Definitions and basic lemmas *}
instantiation list :: (type) ord
begin
inductive less_eq_list where
empty [simp, intro!]: "[] \<le> xs"
| drop: "ys \<le> xs \<Longrightarrow> ys \<le> x # xs"
| take: "ys \<le> xs \<Longrightarrow> x # ys \<le> x # xs"
definition
"(xs \<Colon> 'a list) < ys \<longleftrightarrow> xs \<le> ys \<and> \<not> ys \<le> xs"
instance proof qed
end
lemma le_list_length: "xs \<le> ys \<Longrightarrow> length xs \<le> length ys"
by (induct rule: less_eq_list.induct) auto
lemma le_list_same_length: "xs \<le> ys \<Longrightarrow> length xs = length ys \<Longrightarrow> xs = ys"
by (induct rule: less_eq_list.induct) (auto dest: le_list_length)
lemma not_le_list_length[simp]: "length ys < length xs \<Longrightarrow> ~ xs <= ys"
by (metis le_list_length linorder_not_less)
lemma le_list_below_empty [simp]: "xs \<le> [] \<longleftrightarrow> xs = []"
by (auto dest: le_list_length)
lemma le_list_drop_many: "xs \<le> ys \<Longrightarrow> xs \<le> zs @ ys"
by (induct zs) (auto intro: drop)
lemma [code]: "[] <= xs \<longleftrightarrow> True"
by(metis less_eq_list.empty)
lemma [code]: "(x#xs) <= [] \<longleftrightarrow> False"
by simp
lemma le_list_drop_Cons: assumes "x#xs <= ys" shows "xs <= ys"
proof-
{ fix xs' ys'
assume "xs' <= ys"
hence "ALL x xs. xs' = x#xs \<longrightarrow> xs <= ys"
proof induct
case empty thus ?case by simp
next
case drop thus ?case by (metis less_eq_list.drop)
next
case take thus ?case by (simp add: drop)
qed }
from this[OF assms] show ?thesis by simp
qed
lemma le_list_drop_Cons2:
assumes "x#xs <= x#ys" shows "xs <= ys"
using assms
proof cases
case drop thus ?thesis by (metis le_list_drop_Cons list.inject)
qed simp_all
lemma le_list_drop_Cons_neq: assumes "x # xs <= y # ys"
shows "x ~= y \<Longrightarrow> x # xs <= ys"
using assms proof cases qed auto
lemma le_list_Cons2_iff[simp,code]: "(x#xs) <= (y#ys) \<longleftrightarrow>
(if x=y then xs <= ys else (x#xs) <= ys)"
by (metis drop take le_list_drop_Cons2 le_list_drop_Cons_neq)
lemma le_list_take_many_iff: "zs @ xs \<le> zs @ ys \<longleftrightarrow> xs \<le> ys"
by (induct zs) (auto intro: take)
lemma le_list_Cons_EX:
assumes "x # ys <= zs" shows "EX us vs. zs = us @ x # vs & ys <= vs"
proof-
{ fix xys zs :: "'a list" assume "xys <= zs"
hence "ALL x ys. xys = x#ys \<longrightarrow> (EX us vs. zs = us @ x # vs & ys <= vs)"
proof induct
case empty show ?case by simp
next
case take thus ?case by (metis list.inject self_append_conv2)
next
case drop thus ?case by (metis append_eq_Cons_conv)
qed
} with assms show ?thesis by blast
qed
instantiation list :: (type) order
begin
instance proof
fix xs ys :: "'a list"
show "xs < ys \<longleftrightarrow> xs \<le> ys \<and> \<not> ys \<le> xs" unfolding less_list_def ..
next
fix xs :: "'a list"
show "xs \<le> xs" by (induct xs) (auto intro!: less_eq_list.drop)
next
fix xs ys :: "'a list"
assume "xs <= ys"
hence "ys <= xs \<longrightarrow> xs = ys"
proof induct
case empty show ?case by simp
next
case take thus ?case by simp
next
case drop thus ?case
by(metis le_list_drop_Cons le_list_length Suc_length_conv Suc_n_not_le_n)
qed
moreover assume "ys <= xs"
ultimately show "xs = ys" by blast
next
fix xs ys zs :: "'a list"
assume "xs <= ys"
hence "ys <= zs \<longrightarrow> xs <= zs"
proof (induct arbitrary:zs)
case empty show ?case by simp
next
case (take xs ys x) show ?case
proof
assume "x # ys <= zs"
with take show "x # xs <= zs"
by(metis le_list_Cons_EX le_list_drop_many less_eq_list.take local.take(2))
qed
next
case drop thus ?case by (metis le_list_drop_Cons)
qed
moreover assume "ys <= zs"
ultimately show "xs <= zs" by blast
qed
end
lemma le_list_append_le_same_iff: "xs @ ys <= ys \<longleftrightarrow> xs=[]"
by (auto dest: le_list_length)
lemma le_list_append_mono: "\<lbrakk> xs <= xs'; ys <= ys' \<rbrakk> \<Longrightarrow> xs@ys <= xs'@ys'"
apply (induct rule:less_eq_list.induct)
apply (metis eq_Nil_appendI le_list_drop_many)
apply (metis Cons_eq_append_conv le_list_drop_Cons order_eq_refl order_trans)
apply simp
done
lemma less_list_length: "xs < ys \<Longrightarrow> length xs < length ys"
by (metis le_list_length le_list_same_length le_neq_implies_less less_list_def)
lemma less_list_empty [simp]: "[] < xs \<longleftrightarrow> xs \<noteq> []"
by (metis empty order_less_le)
lemma less_list_below_empty[simp]: "xs < [] \<longleftrightarrow> False"
by (metis empty less_list_def)
lemma less_list_drop: "xs < ys \<Longrightarrow> xs < x # ys"
by (unfold less_le) (auto intro: less_eq_list.drop)
lemma less_list_take_iff: "x # xs < x # ys \<longleftrightarrow> xs < ys"
by (metis le_list_Cons2_iff less_list_def)
lemma less_list_drop_many: "xs < ys \<Longrightarrow> xs < zs @ ys"
by(metis le_list_append_le_same_iff le_list_drop_many order_less_le self_append_conv2)
lemma less_list_take_many_iff: "zs @ xs < zs @ ys \<longleftrightarrow> xs < ys"
by (metis le_list_take_many_iff less_list_def)
subsection {* Appending elements *}
lemma le_list_rev_take_iff[simp]: "xs @ zs \<le> ys @ zs \<longleftrightarrow> xs \<le> ys" (is "?L = ?R")
proof
{ fix xs' ys' xs ys zs :: "'a list" assume "xs' <= ys'"
hence "xs' = xs @ zs & ys' = ys @ zs \<longrightarrow> xs <= ys"
proof (induct arbitrary: xs ys zs)
case empty show ?case by simp
next
case (drop xs' ys' x)
{ assume "ys=[]" hence ?case using drop(1) by auto }
moreover
{ fix us assume "ys = x#us"
hence ?case using drop(2) by(simp add: less_eq_list.drop) }
ultimately show ?case by (auto simp:Cons_eq_append_conv)
next
case (take xs' ys' x)
{ assume "xs=[]" hence ?case using take(1) by auto }
moreover
{ fix us vs assume "xs=x#us" "ys=x#vs" hence ?case using take(2) by auto}
moreover
{ fix us assume "xs=x#us" "ys=[]" hence ?case using take(2) by bestsimp }
ultimately show ?case by (auto simp:Cons_eq_append_conv)
qed }
moreover assume ?L
ultimately show ?R by blast
next
assume ?R thus ?L by(metis le_list_append_mono order_refl)
qed
lemma less_list_rev_take: "xs @ zs < ys @ zs \<longleftrightarrow> xs < ys"
by (unfold less_le) auto
lemma le_list_rev_drop_many: "xs \<le> ys \<Longrightarrow> xs \<le> ys @ zs"
by (metis append_Nil2 empty le_list_append_mono)
subsection {* Relation to standard list operations *}
lemma le_list_map: "xs \<le> ys \<Longrightarrow> map f xs \<le> map f ys"
by (induct rule: less_eq_list.induct) (auto intro: less_eq_list.drop)
lemma le_list_filter_left[simp]: "filter f xs \<le> xs"
by (induct xs) (auto intro: less_eq_list.drop)
lemma le_list_filter: "xs \<le> ys \<Longrightarrow> filter f xs \<le> filter f ys"
by (induct rule: less_eq_list.induct) (auto intro: less_eq_list.drop)
lemma "xs \<le> ys \<longleftrightarrow> (EX N. xs = sublist ys N)" (is "?L = ?R")
proof
assume ?L
thus ?R
proof induct
case empty show ?case by (metis sublist_empty)
next
case (drop xs ys x)
then obtain N where "xs = sublist ys N" by blast
hence "xs = sublist (x#ys) (Suc ` N)"
by (clarsimp simp add:sublist_Cons inj_image_mem_iff)
thus ?case by blast
next
case (take xs ys x)
then obtain N where "xs = sublist ys N" by blast
hence "x#xs = sublist (x#ys) (insert 0 (Suc ` N))"
by (clarsimp simp add:sublist_Cons inj_image_mem_iff)
thus ?case by blast
qed
next
assume ?R
then obtain N where "xs = sublist ys N" ..
moreover have "sublist ys N <= ys"
proof (induct ys arbitrary:N)
case Nil show ?case by simp
next
case Cons thus ?case by (auto simp add:sublist_Cons drop)
qed
ultimately show ?L by simp
qed
end