17ccc283a9
Most notable changes: rename apo011 -> apd011 and apd011 -> apdt011 make an argument of pathover_of_eq explicit
145 lines
5.6 KiB
Text
145 lines
5.6 KiB
Text
/-
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Copyright (c) 2015 Floris van Doorn. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Authors: Floris van Doorn
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Declaration of set-quotients, i.e. quotient of a mere relation which is then set-truncated.
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-/
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import function algebra.relation types.trunc types.eq hit.quotient
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open eq is_trunc trunc quotient equiv
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namespace set_quotient
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section
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parameters {A : Type} (R : A → A → Prop)
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-- set-quotients are just set-truncations of (type) quotients
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definition set_quotient : Type := trunc 0 (quotient R)
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parameter {R}
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definition class_of (a : A) : set_quotient :=
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tr (class_of _ a)
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definition eq_of_rel {a a' : A} (H : R a a') : class_of a = class_of a' :=
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ap tr (eq_of_rel _ H)
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theorem is_set_set_quotient [instance] : is_set set_quotient :=
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begin unfold set_quotient, exact _ end
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protected definition rec {P : set_quotient → Type} [Pt : Πaa, is_set (P aa)]
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(Pc : Π(a : A), P (class_of a)) (Pp : Π⦃a a' : A⦄ (H : R a a'), Pc a =[eq_of_rel H] Pc a')
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(x : set_quotient) : P x :=
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begin
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apply (@trunc.rec_on _ _ P x),
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{ intro x', apply Pt},
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{ intro y, induction y,
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{ apply Pc},
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{ exact pathover_of_pathover_ap P tr (Pp H)}}
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end
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protected definition rec_on [reducible] {P : set_quotient → Type} (x : set_quotient)
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[Pt : Πaa, is_set (P aa)] (Pc : Π(a : A), P (class_of a))
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(Pp : Π⦃a a' : A⦄ (H : R a a'), Pc a =[eq_of_rel H] Pc a') : P x :=
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rec Pc Pp x
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theorem rec_eq_of_rel {P : set_quotient → Type} [Pt : Πaa, is_set (P aa)]
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(Pc : Π(a : A), P (class_of a)) (Pp : Π⦃a a' : A⦄ (H : R a a'), Pc a =[eq_of_rel H] Pc a')
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{a a' : A} (H : R a a') : apd (rec Pc Pp) (eq_of_rel H) = Pp H :=
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!is_set.elimo
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protected definition elim {P : Type} [Pt : is_set P] (Pc : A → P)
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(Pp : Π⦃a a' : A⦄ (H : R a a'), Pc a = Pc a') (x : set_quotient) : P :=
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rec Pc (λa a' H, pathover_of_eq _ (Pp H)) x
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protected definition elim_on [reducible] {P : Type} (x : set_quotient) [Pt : is_set P]
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(Pc : A → P) (Pp : Π⦃a a' : A⦄ (H : R a a'), Pc a = Pc a') : P :=
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elim Pc Pp x
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theorem elim_eq_of_rel {P : Type} [Pt : is_set P] (Pc : A → P)
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(Pp : Π⦃a a' : A⦄ (H : R a a'), Pc a = Pc a') {a a' : A} (H : R a a')
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: ap (elim Pc Pp) (eq_of_rel H) = Pp H :=
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begin
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apply eq_of_fn_eq_fn_inv !(pathover_constant (eq_of_rel H)),
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rewrite [▸*,-apd_eq_pathover_of_eq_ap,↑elim,rec_eq_of_rel],
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end
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protected definition rec_prop {P : set_quotient → Type} [Pt : Πaa, is_prop (P aa)]
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(Pc : Π(a : A), P (class_of a)) (x : set_quotient) : P x :=
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rec Pc (λa a' H, !is_prop.elimo) x
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protected definition elim_prop {P : Type} [Pt : is_prop P] (Pc : A → P) (x : set_quotient)
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: P :=
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elim Pc (λa a' H, !is_prop.elim) x
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end
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end set_quotient
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attribute set_quotient.class_of [constructor]
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attribute set_quotient.rec set_quotient.elim [unfold 7] [recursor 7]
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attribute set_quotient.rec_on set_quotient.elim_on [unfold 4]
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open sigma relation function
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namespace set_quotient
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variables {A B C : Type} (R : A → A → Prop) (S : B → B → Prop) (T : C → C → Prop)
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definition is_surjective_class_of : is_surjective (class_of : A → set_quotient R) :=
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λx, set_quotient.rec_on x (λa, tr (fiber.mk a idp)) (λa a' r, !is_prop.elimo)
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/- non-dependent universal property -/
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definition set_quotient_arrow_equiv (B : Type) [H : is_set B] :
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(set_quotient R → B) ≃ (Σ(f : A → B), Π(a a' : A), R a a' → f a = f a') :=
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begin
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fapply equiv.MK,
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{ intro f, exact ⟨λa, f (class_of a), λa a' r, ap f (eq_of_rel r)⟩},
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{ intro v x, induction v with f p, exact set_quotient.elim_on x f p},
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{ intro v, induction v with f p, esimp, apply ap (sigma.mk f),
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apply eq_of_homotopy3, intro a a' r, apply elim_eq_of_rel},
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{ intro f, apply eq_of_homotopy, intro x, refine set_quotient.rec_on x _ _: esimp,
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intro a, reflexivity,
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intro a a' r, apply eq_pathover, apply hdeg_square, apply elim_eq_of_rel}
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end
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protected definition code [unfold 4] (a : A) (x : set_quotient R) [H : is_equivalence R]
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: Prop :=
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set_quotient.elim_on x (R a)
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begin
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intros a' a'' H1,
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refine to_inv !trunctype_eq_equiv _, esimp,
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apply ua,
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apply equiv_of_is_prop,
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{ intro H2, exact is_transitive.trans R H2 H1},
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{ intro H2, apply is_transitive.trans R H2, exact is_symmetric.symm R H1}
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end
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protected definition encode {a : A} {x : set_quotient R} (p : class_of a = x)
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[H : is_equivalence R] : set_quotient.code R a x :=
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begin
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induction p, esimp, apply is_reflexive.refl R
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end
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definition rel_of_eq {a a' : A} (p : class_of a = class_of a' :> set_quotient R)
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[H : is_equivalence R] : R a a' :=
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set_quotient.encode R p
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variables {R S T}
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definition quotient_unary_map [unfold 7] (f : A → B) (H : Π{a a'} (r : R a a'), S (f a) (f a')) :
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set_quotient R → set_quotient S :=
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set_quotient.elim (class_of ∘ f) (λa a' r, eq_of_rel (H r))
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definition quotient_binary_map [unfold 11 12] (f : A → B → C)
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(H : Π{a a'} (r : R a a') {b b'} (s : S b b'), T (f a b) (f a' b'))
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[HR : is_reflexive R] [HS : is_reflexive S] :
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set_quotient R → set_quotient S → set_quotient T :=
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begin
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refine set_quotient.elim _ _,
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{ intro a, refine set_quotient.elim _ _,
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{ intro b, exact class_of (f a b)},
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{ intro b b' s, apply eq_of_rel, apply H, apply is_reflexive.refl R, exact s}},
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{ intro a a' r, apply eq_of_homotopy, refine set_quotient.rec _ _,
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{ intro b, esimp, apply eq_of_rel, apply H, exact r, apply is_reflexive.refl S},
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{ intro b b' s, apply eq_pathover, esimp, apply is_set.elims}}
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end
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end set_quotient
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