Theory Quotient_List
section ‹Quotient infrastructure for the list type›
theory Quotient_List
imports Quotient_Set Quotient_Product Quotient_Option
begin
subsection ‹Rules for the Quotient package›
lemma map_id [id_simps]:
"map id = id"
by (fact List.map.id)
lemma list_all2_eq [id_simps]:
"list_all2 (=) = (=)"
proof (rule ext)+
fix xs ys
show "list_all2 (=) xs ys ⟷ xs = ys"
by (induct xs ys rule: list_induct2') simp_all
qed
lemma reflp_list_all2:
assumes "reflp R"
shows "reflp (list_all2 R)"
proof (rule reflpI)
from assms have *: "⋀xs. R xs xs" by (rule reflpE)
fix xs
show "list_all2 R xs xs"
by (induct xs) (simp_all add: *)
qed
lemma list_symp:
assumes "symp R"
shows "symp (list_all2 R)"
proof (rule sympI)
from assms have *: "⋀xs ys. R xs ys ⟹ R ys xs" by (rule sympE)
fix xs ys
assume "list_all2 R xs ys"
then show "list_all2 R ys xs"
by (induct xs ys rule: list_induct2') (simp_all add: *)
qed
lemma list_transp:
assumes "transp R"
shows "transp (list_all2 R)"
proof (rule transpI)
from assms have *: "⋀xs ys zs. R xs ys ⟹ R ys zs ⟹ R xs zs" by (rule transpE)
fix xs ys zs
assume "list_all2 R xs ys" and "list_all2 R ys zs"
then show "list_all2 R xs zs"
by (induct arbitrary: zs) (auto simp: list_all2_Cons1 intro: *)
qed
lemma list_equivp [quot_equiv]:
"equivp R ⟹ equivp (list_all2 R)"
by (blast intro: equivpI reflp_list_all2 list_symp list_transp elim: equivpE)
lemma list_quotient3 [quot_thm]:
assumes "Quotient3 R Abs Rep"
shows "Quotient3 (list_all2 R) (map Abs) (map Rep)"
proof (rule Quotient3I)
from assms have "⋀x. Abs (Rep x) = x" by (rule Quotient3_abs_rep)
then show "⋀xs. map Abs (map Rep xs) = xs" by (simp add: comp_def)
next
from assms have "⋀x y. R (Rep x) (Rep y) ⟷ x = y" by (rule Quotient3_rel_rep)
then show "⋀xs. list_all2 R (map Rep xs) (map Rep xs)"
by (simp add: list_all2_map1 list_all2_map2 list_all2_eq)
next
fix xs ys
from assms have "⋀x y. R x x ∧ R y y ∧ Abs x = Abs y ⟷ R x y" by (rule Quotient3_rel)
then show "list_all2 R xs ys ⟷ list_all2 R xs xs ∧ list_all2 R ys ys ∧ map Abs xs = map Abs ys"
by (induct xs ys rule: list_induct2') auto
qed
declare [[mapQ3 list = (list_all2, list_quotient3)]]
lemma cons_prs [quot_preserve]:
assumes q: "Quotient3 R Abs Rep"
shows "(Rep ---> (map Rep) ---> (map Abs)) (#) = (#)"
by (auto simp add: fun_eq_iff comp_def Quotient3_abs_rep [OF q])
lemma cons_rsp [quot_respect]:
assumes q: "Quotient3 R Abs Rep"
shows "(R ===> list_all2 R ===> list_all2 R) (#) (#)"
by auto
lemma nil_prs [quot_preserve]:
assumes q: "Quotient3 R Abs Rep"
shows "map Abs [] = []"
by simp
lemma nil_rsp [quot_respect]:
assumes q: "Quotient3 R Abs Rep"
shows "list_all2 R [] []"
by simp
lemma map_prs_aux:
assumes a: "Quotient3 R1 abs1 rep1"
and b: "Quotient3 R2 abs2 rep2"
shows "(map abs2) (map ((abs1 ---> rep2) f) (map rep1 l)) = map f l"
by (induct l)
(simp_all add: Quotient3_abs_rep[OF a] Quotient3_abs_rep[OF b])
lemma map_prs [quot_preserve]:
assumes a: "Quotient3 R1 abs1 rep1"
and b: "Quotient3 R2 abs2 rep2"
shows "((abs1 ---> rep2) ---> (map rep1) ---> (map abs2)) map = map"
and "((abs1 ---> id) ---> map rep1 ---> id) map = map"
by (simp_all only: fun_eq_iff map_prs_aux[OF a b] comp_def)
(simp_all add: Quotient3_abs_rep[OF a] Quotient3_abs_rep[OF b])
lemma map_rsp [quot_respect]:
assumes q1: "Quotient3 R1 Abs1 Rep1"
and q2: "Quotient3 R2 Abs2 Rep2"
shows "((R1 ===> R2) ===> (list_all2 R1) ===> list_all2 R2) map map"
and "((R1 ===> (=)) ===> (list_all2 R1) ===> (=)) map map"
unfolding list_all2_eq [symmetric] by (rule list.map_transfer)+
lemma foldr_prs_aux:
assumes a: "Quotient3 R1 abs1 rep1"
and b: "Quotient3 R2 abs2 rep2"
shows "abs2 (foldr ((abs1 ---> abs2 ---> rep2) f) (map rep1 l) (rep2 e)) = foldr f l e"
by (induct l) (simp_all add: Quotient3_abs_rep[OF a] Quotient3_abs_rep[OF b])
lemma foldr_prs [quot_preserve]:
assumes a: "Quotient3 R1 abs1 rep1"
and b: "Quotient3 R2 abs2 rep2"
shows "((abs1 ---> abs2 ---> rep2) ---> (map rep1) ---> rep2 ---> abs2) foldr = foldr"
apply (simp add: fun_eq_iff)
by (simp only: fun_eq_iff foldr_prs_aux[OF a b])
(simp)
lemma foldl_prs_aux:
assumes a: "Quotient3 R1 abs1 rep1"
and b: "Quotient3 R2 abs2 rep2"
shows "abs1 (foldl ((abs1 ---> abs2 ---> rep1) f) (rep1 e) (map rep2 l)) = foldl f e l"
by (induct l arbitrary:e) (simp_all add: Quotient3_abs_rep[OF a] Quotient3_abs_rep[OF b])
lemma foldl_prs [quot_preserve]:
assumes a: "Quotient3 R1 abs1 rep1"
and b: "Quotient3 R2 abs2 rep2"
shows "((abs1 ---> abs2 ---> rep1) ---> rep1 ---> (map rep2) ---> abs1) foldl = foldl"
by (simp add: fun_eq_iff foldl_prs_aux [OF a b])
lemma foldl_rsp[quot_respect]:
assumes q1: "Quotient3 R1 Abs1 Rep1"
and q2: "Quotient3 R2 Abs2 Rep2"
shows "((R1 ===> R2 ===> R1) ===> R1 ===> list_all2 R2 ===> R1) foldl foldl"
by (rule foldl_transfer)
lemma foldr_rsp[quot_respect]:
assumes q1: "Quotient3 R1 Abs1 Rep1"
and q2: "Quotient3 R2 Abs2 Rep2"
shows "((R1 ===> R2 ===> R2) ===> list_all2 R1 ===> R2 ===> R2) foldr foldr"
by (rule foldr_transfer)
lemma list_all2_rsp:
assumes r: "∀x y. R x y ⟶ (∀a b. R a b ⟶ S x a = T y b)"
and l1: "list_all2 R x y"
and l2: "list_all2 R a b"
shows "list_all2 S x a = list_all2 T y b"
using l1 l2
by (induct arbitrary: a b rule: list_all2_induct,
auto simp: list_all2_Cons1 list_all2_Cons2 r)
lemma [quot_respect]:
"((R ===> R ===> (=)) ===> list_all2 R ===> list_all2 R ===> (=)) list_all2 list_all2"
by (rule list.rel_transfer)
lemma [quot_preserve]:
assumes a: "Quotient3 R abs1 rep1"
shows "((abs1 ---> abs1 ---> id) ---> map rep1 ---> map rep1 ---> id) list_all2 = list_all2"
apply (simp add: fun_eq_iff)
apply clarify
apply (induct_tac xa xb rule: list_induct2')
apply (simp_all add: Quotient3_abs_rep[OF a])
done
lemma [quot_preserve]:
assumes a: "Quotient3 R abs1 rep1"
shows "(list_all2 ((rep1 ---> rep1 ---> id) R) l m) = (l = m)"
by (induct l m rule: list_induct2') (simp_all add: Quotient3_rel_rep[OF a])
lemma list_all2_find_element:
assumes a: "x ∈ set a"
and b: "list_all2 R a b"
shows "∃y. (y ∈ set b ∧ R x y)"
using b a by induct auto
lemma list_all2_refl:
assumes a: "⋀x y. R x y = (R x = R y)"
shows "list_all2 R x x"
by (induct x) (auto simp add: a)
end