Theory List_lexord

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theory List_lexord
imports Main

(*  Title:      HOL/Library/List_lexord.thy
Author: Norbert Voelker
*)


header {* Lexicographic order on lists *}

theory List_lexord
imports List Main
begin


instantiation list :: (ord) ord
begin


definition
list_less_def [code del]: "(xs::('a::ord) list) < ys <-> (xs, ys) ∈ lexord {(u,v). u < v}"


definition
list_le_def [code del]: "(xs::('a::ord) list) ≤ ys <-> (xs < ys ∨ xs = ys)"


instance ..

end

instance list :: (order) order
proof
fix xs :: "'a list"
show "xs ≤ xs" by (simp add: list_le_def)
next
fix xs ys zs :: "'a list"
assume "xs ≤ ys" and "ys ≤ zs"
then show "xs ≤ zs" by (auto simp add: list_le_def list_less_def)
(rule lexord_trans, auto intro: transI)

next
fix xs ys :: "'a list"
assume "xs ≤ ys" and "ys ≤ xs"
then show "xs = ys" apply (auto simp add: list_le_def list_less_def)
apply (rule lexord_irreflexive [THEN notE])
defer
apply (rule lexord_trans) apply (auto intro: transI) done
next
fix xs ys :: "'a list"
show "xs < ys <-> xs ≤ ys ∧ ¬ ys ≤ xs"
apply (auto simp add: list_less_def list_le_def)
defer
apply (rule lexord_irreflexive [THEN notE])
apply auto
apply (rule lexord_irreflexive [THEN notE])
defer
apply (rule lexord_trans) apply (auto intro: transI) done
qed

instance list :: (linorder) linorder
proof
fix xs ys :: "'a list"
have "(xs, ys) ∈ lexord {(u, v). u < v} ∨ xs = ys ∨ (ys, xs) ∈ lexord {(u, v). u < v}"
by (rule lexord_linear) auto
then show "xs ≤ ys ∨ ys ≤ xs"
by (auto simp add: list_le_def list_less_def)
qed

instantiation list :: (linorder) distrib_lattice
begin


definition
[code del]: "(inf :: 'a list => _) = min"


definition
[code del]: "(sup :: 'a list => _) = max"


instance
by intro_classes
(auto simp add: inf_list_def sup_list_def min_max.sup_inf_distrib1)


end

lemma not_less_Nil [simp]: "¬ (x < [])"
by (unfold list_less_def) simp

lemma Nil_less_Cons [simp]: "[] < a # x"
by (unfold list_less_def) simp

lemma Cons_less_Cons [simp]: "a # x < b # y <-> a < b ∨ a = b ∧ x < y"
by (unfold list_less_def) simp

lemma le_Nil [simp]: "x ≤ [] <-> x = []"
by (unfold list_le_def, cases x) auto

lemma Nil_le_Cons [simp]: "[] ≤ x"
by (unfold list_le_def, cases x) auto

lemma Cons_le_Cons [simp]: "a # x ≤ b # y <-> a < b ∨ a = b ∧ x ≤ y"
by (unfold list_le_def) auto

lemma less_code [code]:
"xs < ([]::'a::{eq, order} list) <-> False"
"[] < (x::'a::{eq, order}) # xs <-> True"
"(x::'a::{eq, order}) # xs < y # ys <-> x < y ∨ x = y ∧ xs < ys"

by simp_all

lemma less_eq_code [code]:
"x # xs ≤ ([]::'a::{eq, order} list) <-> False"
"[] ≤ (xs::'a::{eq, order} list) <-> True"
"(x::'a::{eq, order}) # xs ≤ y # ys <-> x < y ∨ x = y ∧ xs ≤ ys"

by simp_all

end