Theory SemilatAlg
section ‹More on Semilattices›
theory SemilatAlg
imports Typing_Framework Product
begin
definition lesubstep_type :: "(nat × 's) list ⇒ 's ord ⇒ (nat × 's) list ⇒ bool"
("(_ /≤|_| _)" [50, 0, 51] 50) where
"x ≤|r| y ≡ ∀(p,s) ∈ set x. ∃s'. (p,s') ∈ set y ∧ s <=_r s'"
primrec plusplussub :: "'a list ⇒ ('a ⇒ 'a ⇒ 'a) ⇒ 'a ⇒ 'a" ("(_ /++'__ _)" [65, 1000, 66] 65) where
"[] ++_f y = y"
| "(x#xs) ++_f y = xs ++_f (x +_f y)"
definition bounded :: "'s step_type ⇒ nat ⇒ bool" where
"bounded step n == ∀p<n. ∀s. ∀(q,t)∈set(step p s). q<n"
definition pres_type :: "'s step_type ⇒ nat ⇒ 's set ⇒ bool" where
"pres_type step n A == ∀s∈A. ∀p<n. ∀(q,s')∈set (step p s). s' ∈ A"
definition mono :: "'s ord ⇒ 's step_type ⇒ nat ⇒ 's set ⇒ bool" where
"mono r step n A ==
∀s p t. s ∈ A ∧ p < n ∧ s <=_r t ⟶ step p s ≤|r| step p t"
lemma pres_typeD:
"⟦ pres_type step n A; s∈A; p<n; (q,s')∈set (step p s) ⟧ ⟹ s' ∈ A"
by (unfold pres_type_def, blast)
lemma monoD:
"⟦ mono r step n A; p < n; s∈A; s <=_r t ⟧ ⟹ step p s ≤|r| step p t"
by (unfold mono_def, blast)
lemma boundedD:
"⟦ bounded step n; p < n; (q,t) ∈ set (step p xs) ⟧ ⟹ q < n"
by (unfold bounded_def, blast)
lemma lesubstep_type_refl [simp, intro]:
"(⋀x. x <=_r x) ⟹ x ≤|r| x"
by (unfold lesubstep_type_def) auto
lemma lesub_step_typeD:
"a ≤|r| b ⟹ (x,y) ∈ set a ⟹ ∃y'. (x, y') ∈ set b ∧ y <=_r y'"
by (unfold lesubstep_type_def) blast
lemma list_update_le_listI [rule_format]:
"set xs <= A ⟶ set ys <= A ⟶ xs <=[r] ys ⟶ p < size xs ⟶
x <=_r ys!p ⟶ semilat(A,r,f) ⟶ x∈A ⟶
xs[p := x +_f xs!p] <=[r] ys"
apply (unfold Listn.le_def lesub_def semilat_def)
apply (simp add: list_all2_conv_all_nth nth_list_update)
done
lemma plusplus_closed: assumes "semilat (A, r, f)" shows
"⋀y. ⟦ set x ⊆ A; y ∈ A⟧ ⟹ x ++_f y ∈ A" (is "PROP ?P")
proof -
interpret Semilat A r f using assms by (rule Semilat.intro)
show "PROP ?P" proof (induct x)
show "⋀y. y ∈ A ⟹ [] ++_f y ∈ A" by simp
fix y x xs
assume y: "y ∈ A" and xs: "set (x#xs) ⊆ A"
assume IH: "⋀y. ⟦ set xs ⊆ A; y ∈ A⟧ ⟹ xs ++_f y ∈ A"
from xs obtain x: "x ∈ A" and xs': "set xs ⊆ A" by simp
from x y have "(x +_f y) ∈ A" ..
with xs' have "xs ++_f (x +_f y) ∈ A" by (rule IH)
thus "(x#xs) ++_f y ∈ A" by simp
qed
qed
lemma (in Semilat) pp_ub2:
"⋀y. ⟦ set x ⊆ A; y ∈ A⟧ ⟹ y <=_r x ++_f y"
proof (induct x)
from semilat show "⋀y. y <=_r [] ++_f y" by simp
fix y a l
assume y: "y ∈ A"
assume "set (a#l) ⊆ A"
then obtain a: "a ∈ A" and x: "set l ⊆ A" by simp
assume "⋀y. ⟦set l ⊆ A; y ∈ A⟧ ⟹ y <=_r l ++_f y"
hence IH: "⋀y. y ∈ A ⟹ y <=_r l ++_f y" using x .
from a y have "y <=_r a +_f y" ..
also from a y have "a +_f y ∈ A" ..
hence "(a +_f y) <=_r l ++_f (a +_f y)" by (rule IH)
finally have "y <=_r l ++_f (a +_f y)" .
thus "y <=_r (a#l) ++_f y" by simp
qed
lemma (in Semilat) pp_ub1:
shows "⋀y. ⟦set ls ⊆ A; y ∈ A; x ∈ set ls⟧ ⟹ x <=_r ls ++_f y"
proof (induct ls)
show "⋀y. x ∈ set [] ⟹ x <=_r [] ++_f y" by simp
fix y s ls
assume "set (s#ls) ⊆ A"
then obtain s: "s ∈ A" and ls: "set ls ⊆ A" by simp
assume y: "y ∈ A"
assume
"⋀y. ⟦set ls ⊆ A; y ∈ A; x ∈ set ls⟧ ⟹ x <=_r ls ++_f y"
hence IH: "⋀y. x ∈ set ls ⟹ y ∈ A ⟹ x <=_r ls ++_f y" using ls .
assume "x ∈ set (s#ls)"
then obtain xls: "x = s ∨ x ∈ set ls" by simp
moreover {
assume xs: "x = s"
from s y have "s <=_r s +_f y" ..
also from s y have "s +_f y ∈ A" ..
with ls have "(s +_f y) <=_r ls ++_f (s +_f y)" by (rule pp_ub2)
finally have "s <=_r ls ++_f (s +_f y)" .
with xs have "x <=_r ls ++_f (s +_f y)" by simp
}
moreover {
assume "x ∈ set ls"
hence "⋀y. y ∈ A ⟹ x <=_r ls ++_f y" by (rule IH)
moreover from s y have "s +_f y ∈ A" ..
ultimately have "x <=_r ls ++_f (s +_f y)" .
}
ultimately
have "x <=_r ls ++_f (s +_f y)" by blast
thus "x <=_r (s#ls) ++_f y" by simp
qed
lemma (in Semilat) pp_lub:
assumes z: "z ∈ A"
shows
"⋀y. y ∈ A ⟹ set xs ⊆ A ⟹ ∀x ∈ set xs. x <=_r z ⟹ y <=_r z ⟹ xs ++_f y <=_r z"
proof (induct xs)
fix y assume "y <=_r z" thus "[] ++_f y <=_r z" by simp
next
fix y l ls assume y: "y ∈ A" and "set (l#ls) ⊆ A"
then obtain l: "l ∈ A" and ls: "set ls ⊆ A" by auto
assume "∀x ∈ set (l#ls). x <=_r z"
then obtain lz: "l <=_r z" and lsz: "∀x ∈ set ls. x <=_r z" by auto
assume "y <=_r z" with lz have "l +_f y <=_r z" using l y z ..
moreover
from l y have "l +_f y ∈ A" ..
moreover
assume "⋀y. y ∈ A ⟹ set ls ⊆ A ⟹ ∀x ∈ set ls. x <=_r z ⟹ y <=_r z
⟹ ls ++_f y <=_r z"
ultimately
have "ls ++_f (l +_f y) <=_r z" using ls lsz by -
thus "(l#ls) ++_f y <=_r z" by simp
qed
lemma ub1':
assumes "semilat (A, r, f)"
shows "⟦∀(p,s) ∈ set S. s ∈ A; y ∈ A; (a,b) ∈ set S⟧
⟹ b <=_r map snd [(p', t')←S. p' = a] ++_f y"
proof -
interpret Semilat A r f using assms by (rule Semilat.intro)
let "b <=_r ?map ++_f y" = ?thesis
assume "y ∈ A"
moreover
assume "∀(p,s) ∈ set S. s ∈ A"
hence "set ?map ⊆ A" by auto
moreover
assume "(a,b) ∈ set S"
hence "b ∈ set ?map" by (induct S, auto)
ultimately
show ?thesis by - (rule pp_ub1)
qed
lemma plusplus_empty:
"∀s'. (q, s') ∈ set S ⟶ s' +_f ss ! q = ss ! q ⟹
(map snd [(p', t') ← S. p' = q] ++_f ss ! q) = ss ! q"
by (induct S) auto
end