(* Title: HOL/LOrder.thy
ID: $Id$
Author: Steven Obua, TU Muenchen
*)
header {* Lattice Orders *}
theory LOrder
imports Orderings
begin
text {*
The theory of lattices developed here is taken from the book:
\begin{itemize}
\item \emph{Lattice Theory} by Garret Birkhoff, American Mathematical Society 1979.
\end{itemize}
*}
constdefs
is_meet :: "(('a::order) \<Rightarrow> 'a \<Rightarrow> 'a) \<Rightarrow> bool"
"is_meet m == ! a b x. m a b \<le> a \<and> m a b \<le> b \<and> (x \<le> a \<and> x \<le> b \<longrightarrow> x \<le> m a b)"
is_join :: "(('a::order) \<Rightarrow> 'a \<Rightarrow> 'a) \<Rightarrow> bool"
"is_join j == ! a b x. a \<le> j a b \<and> b \<le> j a b \<and> (a \<le> x \<and> b \<le> x \<longrightarrow> j a b \<le> x)"
lemma is_meet_unique:
assumes "is_meet u" "is_meet v" shows "u = v"
proof -
{
fix a b :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"
assume a: "is_meet a"
assume b: "is_meet b"
{
fix x y
let ?za = "a x y"
let ?zb = "b x y"
from a have za_le: "?za <= x & ?za <= y" by (auto simp add: is_meet_def)
with b have "?za <= ?zb" by (auto simp add: is_meet_def)
}
}
note f_le = this
show "u = v" by ((rule ext)+, simp_all add: order_antisym prems f_le)
qed
lemma is_join_unique:
assumes "is_join u" "is_join v" shows "u = v"
proof -
{
fix a b :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"
assume a: "is_join a"
assume b: "is_join b"
{
fix x y
let ?za = "a x y"
let ?zb = "b x y"
from a have za_le: "x <= ?za & y <= ?za" by (auto simp add: is_join_def)
with b have "?zb <= ?za" by (auto simp add: is_join_def)
}
}
note f_le = this
show "u = v" by ((rule ext)+, simp_all add: order_antisym prems f_le)
qed
axclass join_semilorder < order
join_exists: "? j. is_join j"
axclass meet_semilorder < order
meet_exists: "? m. is_meet m"
axclass lorder < join_semilorder, meet_semilorder
constdefs
meet :: "('a::meet_semilorder) \<Rightarrow> 'a \<Rightarrow> 'a"
"meet == THE m. is_meet m"
join :: "('a::join_semilorder) \<Rightarrow> 'a \<Rightarrow> 'a"
"join == THE j. is_join j"
lemma is_meet_meet: "is_meet (meet::'a \<Rightarrow> 'a \<Rightarrow> ('a::meet_semilorder))"
proof -
from meet_exists obtain k::"'a \<Rightarrow> 'a \<Rightarrow> 'a" where "is_meet k" ..
with is_meet_unique[of _ k] show ?thesis
by (simp add: meet_def theI[of is_meet])
qed
lemma meet_unique: "(is_meet m) = (m = meet)"
by (insert is_meet_meet, auto simp add: is_meet_unique)
lemma is_join_join: "is_join (join::'a \<Rightarrow> 'a \<Rightarrow> ('a::join_semilorder))"
proof -
from join_exists obtain k::"'a \<Rightarrow> 'a \<Rightarrow> 'a" where "is_join k" ..
with is_join_unique[of _ k] show ?thesis
by (simp add: join_def theI[of is_join])
qed
lemma join_unique: "(is_join j) = (j = join)"
by (insert is_join_join, auto simp add: is_join_unique)
lemma meet_left_le: "meet a b \<le> (a::'a::meet_semilorder)"
by (insert is_meet_meet, auto simp add: is_meet_def)
lemma meet_right_le: "meet a b \<le> (b::'a::meet_semilorder)"
by (insert is_meet_meet, auto simp add: is_meet_def)
lemma meet_imp_le: "x \<le> a \<Longrightarrow> x \<le> b \<Longrightarrow> x \<le> meet a (b::'a::meet_semilorder)"
by (insert is_meet_meet, auto simp add: is_meet_def)
lemma join_left_le: "a \<le> join a (b::'a::join_semilorder)"
by (insert is_join_join, auto simp add: is_join_def)
lemma join_right_le: "b \<le> join a (b::'a::join_semilorder)"
by (insert is_join_join, auto simp add: is_join_def)
lemma join_imp_le: "a \<le> x \<Longrightarrow> b \<le> x \<Longrightarrow> join a b \<le> (x::'a::join_semilorder)"
by (insert is_join_join, auto simp add: is_join_def)
lemmas meet_join_le = meet_left_le meet_right_le join_left_le join_right_le
lemma is_meet_min: "is_meet (min::'a \<Rightarrow> 'a \<Rightarrow> ('a::linorder))"
by (auto simp add: is_meet_def min_def)
lemma is_join_max: "is_join (max::'a \<Rightarrow> 'a \<Rightarrow> ('a::linorder))"
by (auto simp add: is_join_def max_def)
instance linorder \<subseteq> meet_semilorder
proof
from is_meet_min show "? (m::'a\<Rightarrow>'a\<Rightarrow>('a::linorder)). is_meet m" by auto
qed
instance linorder \<subseteq> join_semilorder
proof
from is_join_max show "? (j::'a\<Rightarrow>'a\<Rightarrow>('a::linorder)). is_join j" by auto
qed
instance linorder \<subseteq> lorder ..
lemma meet_min: "meet = (min :: 'a\<Rightarrow>'a\<Rightarrow>('a::linorder))"
by (simp add: is_meet_meet is_meet_min is_meet_unique)
lemma join_max: "join = (max :: 'a\<Rightarrow>'a\<Rightarrow>('a::linorder))"
by (simp add: is_join_join is_join_max is_join_unique)
lemma meet_idempotent[simp]: "meet x x = x"
by (rule order_antisym, simp_all add: meet_left_le meet_imp_le)
lemma join_idempotent[simp]: "join x x = x"
by (rule order_antisym, simp_all add: join_left_le join_imp_le)
lemma meet_comm: "meet x y = meet y x"
by (rule order_antisym, (simp add: meet_left_le meet_right_le meet_imp_le)+)
lemma join_comm: "join x y = join y x"
by (rule order_antisym, (simp add: join_right_le join_left_le join_imp_le)+)
lemma meet_assoc: "meet (meet x y) z = meet x (meet y z)" (is "?l=?r")
proof -
have "?l <= meet x y & meet x y <= x & ?l <= z & meet x y <= y" by (simp add: meet_left_le meet_right_le)
hence "?l <= x & ?l <= y & ?l <= z" by auto
hence "?l <= ?r" by (simp add: meet_imp_le)
hence a:"?l <= meet x (meet y z)" by (simp add: meet_imp_le)
have "?r <= meet y z & meet y z <= y & meet y z <= z & ?r <= x" by (simp add: meet_left_le meet_right_le)
hence "?r <= x & ?r <= y & ?r <= z" by (auto)
hence "?r <= meet x y & ?r <= z" by (simp add: meet_imp_le)
hence b:"?r <= ?l" by (simp add: meet_imp_le)
from a b show "?l = ?r" by auto
qed
lemma join_assoc: "join (join x y) z = join x (join y z)" (is "?l=?r")
proof -
have "join x y <= ?l & x <= join x y & z <= ?l & y <= join x y" by (simp add: join_left_le join_right_le)
hence "x <= ?l & y <= ?l & z <= ?l" by auto
hence "join y z <= ?l & x <= ?l" by (simp add: join_imp_le)
hence a:"?r <= ?l" by (simp add: join_imp_le)
have "join y z <= ?r & y <= join y z & z <= join y z & x <= ?r" by (simp add: join_left_le join_right_le)
hence "y <= ?r & z <= ?r & x <= ?r" by auto
hence "join x y <= ?r & z <= ?r" by (simp add: join_imp_le)
hence b:"?l <= ?r" by (simp add: join_imp_le)
from a b show "?l = ?r" by auto
qed
lemma meet_left_comm: "meet a (meet b c) = meet b (meet a c)"
by (simp add: meet_assoc[symmetric, of a b c], simp add: meet_comm[of a b], simp add: meet_assoc)
lemma meet_left_idempotent: "meet y (meet y x) = meet y x"
by (simp add: meet_assoc meet_comm meet_left_comm)
lemma join_left_comm: "join a (join b c) = join b (join a c)"
by (simp add: join_assoc[symmetric, of a b c], simp add: join_comm[of a b], simp add: join_assoc)
lemma join_left_idempotent: "join y (join y x) = join y x"
by (simp add: join_assoc join_comm join_left_comm)
lemmas meet_aci = meet_assoc meet_comm meet_left_comm meet_left_idempotent
lemmas join_aci = join_assoc join_comm join_left_comm join_left_idempotent
lemma le_def_meet: "(x <= y) = (meet x y = x)"
proof -
have u: "x <= y \<longrightarrow> meet x y = x"
proof
assume "x <= y"
hence "x <= meet x y & meet x y <= x" by (simp add: meet_imp_le meet_left_le)
thus "meet x y = x" by auto
qed
have v:"meet x y = x \<longrightarrow> x <= y"
proof
have a:"meet x y <= y" by (simp add: meet_right_le)
assume "meet x y = x"
hence "x = meet x y" by auto
with a show "x <= y" by (auto)
qed
from u v show ?thesis by blast
qed
lemma le_def_join: "(x <= y) = (join x y = y)"
proof -
have u: "x <= y \<longrightarrow> join x y = y"
proof
assume "x <= y"
hence "join x y <= y & y <= join x y" by (simp add: join_imp_le join_right_le)
thus "join x y = y" by auto
qed
have v:"join x y = y \<longrightarrow> x <= y"
proof
have a:"x <= join x y" by (simp add: join_left_le)
assume "join x y = y"
hence "y = join x y" by auto
with a show "x <= y" by (auto)
qed
from u v show ?thesis by blast
qed
lemma meet_join_absorp: "meet x (join x y) = x"
proof -
have a:"meet x (join x y) <= x" by (simp add: meet_left_le)
have b:"x <= meet x (join x y)" by (rule meet_imp_le, simp_all add: join_left_le)
from a b show ?thesis by auto
qed
lemma join_meet_absorp: "join x (meet x y) = x"
proof -
have a:"x <= join x (meet x y)" by (simp add: join_left_le)
have b:"join x (meet x y) <= x" by (rule join_imp_le, simp_all add: meet_left_le)
from a b show ?thesis by auto
qed
lemma meet_mono: "y \<le> z \<Longrightarrow> meet x y \<le> meet x z"
proof -
assume a: "y <= z"
have "meet x y <= x & meet x y <= y" by (simp add: meet_left_le meet_right_le)
with a have "meet x y <= x & meet x y <= z" by auto
thus "meet x y <= meet x z" by (simp add: meet_imp_le)
qed
lemma join_mono: "y \<le> z \<Longrightarrow> join x y \<le> join x z"
proof -
assume a: "y \<le> z"
have "x <= join x z & z <= join x z" by (simp add: join_left_le join_right_le)
with a have "x <= join x z & y <= join x z" by auto
thus "join x y <= join x z" by (simp add: join_imp_le)
qed
lemma distrib_join_le: "join x (meet y z) \<le> meet (join x y) (join x z)" (is "_ <= ?r")
proof -
have a: "x <= ?r" by (rule meet_imp_le, simp_all add: join_left_le)
from meet_join_le have b: "meet y z <= ?r"
by (rule_tac meet_imp_le, (blast intro: order_trans)+)
from a b show ?thesis by (simp add: join_imp_le)
qed
lemma distrib_meet_le: "join (meet x y) (meet x z) \<le> meet x (join y z)" (is "?l <= _")
proof -
have a: "?l <= x" by (rule join_imp_le, simp_all add: meet_left_le)
from meet_join_le have b: "?l <= join y z"
by (rule_tac join_imp_le, (blast intro: order_trans)+)
from a b show ?thesis by (simp add: meet_imp_le)
qed
lemma meet_join_eq_imp_le: "a = c \<or> a = d \<or> b = c \<or> b = d \<Longrightarrow> meet a b \<le> join c d"
by (insert meet_join_le, blast intro: order_trans)
lemma modular_le: "x \<le> z \<Longrightarrow> join x (meet y z) \<le> meet (join x y) z" (is "_ \<Longrightarrow> ?t <= _")
proof -
assume a: "x <= z"
have b: "?t <= join x y" by (rule join_imp_le, simp_all add: meet_join_le meet_join_eq_imp_le)
have c: "?t <= z" by (rule join_imp_le, simp_all add: meet_join_le a)
from b c show ?thesis by (simp add: meet_imp_le)
qed
end