Theory Quotient_Type

theory Quotient_Type
imports Main
(*  Title:      HOL/Library/Quotient_Type.thy
    Author:     Markus Wenzel, TU Muenchen

section ‹Quotient types›

theory Quotient_Type
imports Main

text ‹We introduce the notion of quotient types over equivalence relations
  via type classes.›

subsection ‹Equivalence relations and quotient types›

text ‹Type class ‹equiv› models equivalence relations
  ‹∼ :: 'a ⇒ 'a ⇒ bool›.›

class eqv =
  fixes eqv :: "'a ⇒ 'a ⇒ bool"  (infixl "∼" 50)

class equiv = eqv +
  assumes equiv_refl [intro]: "x ∼ x"
    and equiv_trans [trans]: "x ∼ y ⟹ y ∼ z ⟹ x ∼ z"
    and equiv_sym [sym]: "x ∼ y ⟹ y ∼ x"

lemma equiv_not_sym [sym]: "¬ x ∼ y ⟹ ¬ y ∼ x"
proof -
  assume "¬ x ∼ y"
  then show "¬ y ∼ x" by (rule contrapos_nn) (rule equiv_sym)

lemma not_equiv_trans1 [trans]: "¬ x ∼ y ⟹ y ∼ z ⟹ ¬ x ∼ z"
proof -
  assume "¬ x ∼ y" and "y ∼ z"
  show "¬ x ∼ z"
    assume "x ∼ z"
    also from ‹y ∼ z› have "z ∼ y" ..
    finally have "x ∼ y" .
    with ‹¬ x ∼ y› show False by contradiction

lemma not_equiv_trans2 [trans]: "x ∼ y ⟹ ¬ y ∼ z ⟹ ¬ x ∼ z"
proof -
  assume "¬ y ∼ z"
  then have "¬ z ∼ y" ..
  assume "x ∼ y"
  then have "y ∼ x" ..
  finally have "¬ z ∼ x" .
  then show "¬ x ∼ z" ..


text ‹The quotient type ‹'a quot› consists of all \emph{equivalence
  classes} over elements of the base type @{typ 'a}.›

definition (in eqv) "quot = {{x. a ∼ x} | a. True}"

typedef (overloaded) 'a quot = "quot :: 'a::eqv set set"
  unfolding quot_def by blast

lemma quotI [intro]: "{x. a ∼ x} ∈ quot"
  unfolding quot_def by blast

lemma quotE [elim]:
  assumes "R ∈ quot"
  obtains a where "R = {x. a ∼ x}"
  using assms unfolding quot_def by blast

text ‹Abstracted equivalence classes are the canonical representation of
  elements of a quotient type.›

definition "class" :: "'a::equiv ⇒ 'a quot"  ("⌊_⌋")
  where "⌊a⌋ = Abs_quot {x. a ∼ x}"

theorem quot_exhaust: "∃a. A = ⌊a⌋"
proof (cases A)
  fix R
  assume R: "A = Abs_quot R"
  assume "R ∈ quot"
  then have "∃a. R = {x. a ∼ x}" by blast
  with R have "∃a. A = Abs_quot {x. a ∼ x}" by blast
  then show ?thesis unfolding class_def .

lemma quot_cases [cases type: quot]:
  obtains a where "A = ⌊a⌋"
  using quot_exhaust by blast

subsection ‹Equality on quotients›

text ‹Equality of canonical quotient elements coincides with the original

theorem quot_equality [iff?]: "⌊a⌋ = ⌊b⌋ ⟷ a ∼ b"
  assume eq: "⌊a⌋ = ⌊b⌋"
  show "a ∼ b"
  proof -
    from eq have "{x. a ∼ x} = {x. b ∼ x}"
      by (simp only: class_def Abs_quot_inject quotI)
    moreover have "a ∼ a" ..
    ultimately have "a ∈ {x. b ∼ x}" by blast
    then have "b ∼ a" by blast
    then show ?thesis ..
  assume ab: "a ∼ b"
  show "⌊a⌋ = ⌊b⌋"
  proof -
    have "{x. a ∼ x} = {x. b ∼ x}"
    proof (rule Collect_cong)
      fix x show "(a ∼ x) = (b ∼ x)"
        from ab have "b ∼ a" ..
        also assume "a ∼ x"
        finally show "b ∼ x" .
        note ab
        also assume "b ∼ x"
        finally show "a ∼ x" .
    then show ?thesis by (simp only: class_def)

subsection ‹Picking representing elements›

definition pick :: "'a::equiv quot ⇒ 'a"
  where "pick A = (SOME a. A = ⌊a⌋)"

theorem pick_equiv [intro]: "pick ⌊a⌋ ∼ a"
proof (unfold pick_def)
  show "(SOME x. ⌊a⌋ = ⌊x⌋) ∼ a"
  proof (rule someI2)
    show "⌊a⌋ = ⌊a⌋" ..
    fix x assume "⌊a⌋ = ⌊x⌋"
    then have "a ∼ x" ..
    then show "x ∼ a" ..

theorem pick_inverse [intro]: "⌊pick A⌋ = A"
proof (cases A)
  fix a assume a: "A = ⌊a⌋"
  then have "pick A ∼ a" by (simp only: pick_equiv)
  then have "⌊pick A⌋ = ⌊a⌋" ..
  with a show ?thesis by simp

text ‹The following rules support canonical function definitions on quotient
  types (with up to two arguments). Note that the stripped-down version
  without additional conditions is sufficient most of the time.›

theorem quot_cond_function:
  assumes eq: "⋀X Y. P X Y ⟹ f X Y ≡ g (pick X) (pick Y)"
    and cong: "⋀x x' y y'. ⌊x⌋ = ⌊x'⌋ ⟹ ⌊y⌋ = ⌊y'⌋
      ⟹ P ⌊x⌋ ⌊y⌋ ⟹ P ⌊x'⌋ ⌊y'⌋ ⟹ g x y = g x' y'"
    and P: "P ⌊a⌋ ⌊b⌋"
  shows "f ⌊a⌋ ⌊b⌋ = g a b"
proof -
  from eq and P have "f ⌊a⌋ ⌊b⌋ = g (pick ⌊a⌋) (pick ⌊b⌋)" by (simp only:)
  also have "... = g a b"
  proof (rule cong)
    show "⌊pick ⌊a⌋⌋ = ⌊a⌋" ..
    show "⌊pick ⌊b⌋⌋ = ⌊b⌋" ..
    show "P ⌊a⌋ ⌊b⌋" by (rule P)
    ultimately show "P ⌊pick ⌊a⌋⌋ ⌊pick ⌊b⌋⌋" by (simp only:)
  finally show ?thesis .

theorem quot_function:
  assumes "⋀X Y. f X Y ≡ g (pick X) (pick Y)"
    and "⋀x x' y y'. ⌊x⌋ = ⌊x'⌋ ⟹ ⌊y⌋ = ⌊y'⌋ ⟹ g x y = g x' y'"
  shows "f ⌊a⌋ ⌊b⌋ = g a b"
  using assms and TrueI
  by (rule quot_cond_function)

theorem quot_function':
  "(⋀X Y. f X Y ≡ g (pick X) (pick Y)) ⟹
    (⋀x x' y y'. x ∼ x' ⟹ y ∼ y' ⟹ g x y = g x' y') ⟹
    f ⌊a⌋ ⌊b⌋ = g a b"
  by (rule quot_function) (simp_all only: quot_equality)