mirror of https://github.com/nmvdw/HITs-Examples
331 lines
8.4 KiB
Coq
331 lines
8.4 KiB
Coq
Require Import HoTT.
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Require Import FSets lattice_interface.
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Section interface.
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Context `{Univalence}.
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Variable (T : Type -> Type)
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(f : forall A, T A -> FSet A).
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Context `{forall A, hasMembership (T A) A
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, forall A, hasEmpty (T A)
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, forall A, hasSingleton (T A) A
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, forall A, hasUnion (T A)
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, forall A, hasComprehension (T A) A}.
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Class sets :=
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{
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f_empty : forall A, f A ∅ = ∅ ;
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f_singleton : forall A a, f A (singleton a) = {|a|};
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f_union : forall A X Y, f A (union X Y) = (f A X) ∪ (f A Y);
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f_filter : forall A φ X, f A (filter φ X) = {| f A X & φ |};
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f_member : forall A a X, member a X = a ∈ (f A X)
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}.
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Global Instance f_surjective A `{sets} : IsSurjection (f A).
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Proof.
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unfold IsSurjection.
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hinduction ; try (intros ; apply path_ishprop).
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- simple refine (BuildContr _ _ _).
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* refine (tr(∅;_)).
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apply f_empty.
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* intros ; apply path_ishprop.
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- intro a.
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simple refine (BuildContr _ _ _).
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* refine (tr({|a|};_)).
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apply f_singleton.
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* intros ; apply path_ishprop.
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- intros Y1 Y2 [X1' ?] [X2' ?].
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simple refine (BuildContr _ _ _).
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* simple refine (Trunc_rec _ X1') ; intros [X1 fX1].
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simple refine (Trunc_rec _ X2') ; intros [X2 fX2].
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refine (tr(X1 ∪ X2;_)).
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rewrite f_union, fX1, fX2.
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reflexivity.
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* intros ; apply path_ishprop.
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Defined.
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End interface.
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Section quotient_surjection.
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Variable (A B : Type)
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(f : A -> B)
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(H : IsSurjection f).
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Context `{IsHSet B} `{Univalence}.
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Definition f_eq : relation A := fun a1 a2 => f a1 = f a2.
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Definition quotientB : Type := quotient f_eq.
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Global Instance quotientB_recursion : HitRecursion quotientB :=
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{
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indTy := _;
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recTy :=
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forall (P : Type) (HP: IsHSet P) (u : A -> P),
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(forall x y : A, f_eq x y -> u x = u y) -> quotientB -> P;
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H_inductor := quotient_ind f_eq ;
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H_recursor := @quotient_rec _ f_eq _
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}.
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Global Instance R_refl : Reflexive f_eq.
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Proof.
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intro.
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reflexivity.
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Defined.
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Global Instance R_sym : Symmetric f_eq.
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Proof.
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intros a b Hab.
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apply (Hab^).
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Defined.
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Global Instance R_trans : Transitive f_eq.
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Proof.
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intros a b c Hab Hbc.
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apply (Hab @ Hbc).
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Defined.
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Definition quotientB_to_B : quotientB -> B.
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Proof.
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hrecursion.
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- apply f.
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- done.
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Defined.
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Instance quotientB_emb : IsEmbedding (quotientB_to_B).
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Proof.
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apply isembedding_isinj_hset.
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unfold isinj.
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hrecursion ; [ | intros; apply path_ishprop ].
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intro.
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hrecursion ; [ | intros; apply path_ishprop ].
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intros.
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by apply related_classes_eq.
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Defined.
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Instance quotientB_surj : IsSurjection (quotientB_to_B).
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Proof.
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apply BuildIsSurjection.
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intros Y.
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destruct (H Y).
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simple refine (Trunc_rec _ center) ; intros [a fa].
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apply (tr(class_of _ a;fa)).
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Defined.
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Definition quotient_iso : quotientB <~> B.
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Proof.
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refine (BuildEquiv _ _ quotientB_to_B _).
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apply isequiv_surj_emb ; apply _.
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Defined.
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Definition reflect_eq : forall (X Y : A),
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f X = f Y -> f_eq X Y.
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Proof.
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done.
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Defined.
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Lemma same_class : forall (X Y : A),
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class_of f_eq X = class_of f_eq Y -> f_eq X Y.
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Proof.
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intros.
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simple refine (classes_eq_related _ _ _ _) ; assumption.
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Defined.
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End quotient_surjection.
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Arguments quotient_iso {_} {_} _ {_} {_} {_}.
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Ltac reduce T :=
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intros ;
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repeat (rewrite (f_empty T _)
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|| rewrite (f_singleton T _)
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|| rewrite (f_union T _)
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|| rewrite (f_filter T _)
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|| rewrite (f_member T _)).
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Section quotient_properties.
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Variable (T : Type -> Type).
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Variable (f : forall {A : Type}, T A -> FSet A).
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Context `{sets T f}.
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Definition set_eq A := f_eq (T A) (FSet A) (f A).
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Definition View A : Type := quotientB (T A) (FSet A) (f A).
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Instance f_is_surjective A : IsSurjection (f A).
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Proof.
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apply (f_surjective T f A).
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Defined.
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Global Instance view_union (A : Type) : hasUnion (View A).
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Proof.
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intros X Y.
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apply (quotient_iso _)^-1.
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simple refine (union _ _).
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- simple refine (quotient_iso (f A) X).
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- simple refine (quotient_iso (f A) Y).
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Defined.
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Definition well_defined_union (A : Type) (X Y : T A) :
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(class_of _ X) ∪ (class_of _ Y) = class_of _ (X ∪ Y).
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Proof.
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rewrite <- (eissect (quotient_iso _)).
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simpl.
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rewrite (f_union T _).
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reflexivity.
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Defined.
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Global Instance view_comprehension (A : Type) : hasComprehension (View A) A.
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Proof.
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intros ϕ X.
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apply (quotient_iso _)^-1.
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simple refine ({|_ & ϕ|}).
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apply (quotient_iso (f A) X).
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Defined.
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Definition well_defined_filter (A : Type) (ϕ : A -> Bool) (X : T A) :
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{|class_of _ X & ϕ|} = class_of _ {|X & ϕ|}.
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Proof.
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rewrite <- (eissect (quotient_iso _)).
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simpl.
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rewrite (f_filter T _).
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reflexivity.
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Defined.
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Global Instance View_empty A : hasEmpty (View A).
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Proof.
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apply ((quotient_iso _)^-1 ∅).
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Defined.
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Definition well_defined_empty A : ∅ = class_of (set_eq A) ∅.
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Proof.
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rewrite <- (eissect (quotient_iso _)).
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simpl.
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rewrite (f_empty T _).
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reflexivity.
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Defined.
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Global Instance View_singleton A: hasSingleton (View A) A.
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Proof.
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intro a ; apply ((quotient_iso _)^-1 {|a|}).
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Defined.
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Definition well_defined_sungleton A (a : A) : {|a|} = class_of _ {|a|}.
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Proof.
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rewrite <- (eissect (quotient_iso _)).
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simpl.
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rewrite (f_singleton T _).
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reflexivity.
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Defined.
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Global Instance View_member A : hasMembership (View A) A.
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Proof.
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intros a ; unfold View.
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hrecursion.
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- apply (member a).
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- intros X Y HXY.
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reduce T.
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apply (ap _ HXY).
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Defined.
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Instance View_max A : maximum (View A).
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Proof.
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apply view_union.
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Defined.
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Hint Unfold Commutative Associative Idempotent NeutralL NeutralR View_max view_union.
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Instance bottom_view A : bottom (View A).
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Proof.
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apply View_empty.
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Defined.
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Ltac sq1 := autounfold ; intros ; try f_ap
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; rewrite ?(eisretr (quotient_iso _))
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; eauto with lattice_hints typeclass_instances.
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Ltac sq2 := autounfold ; intros
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; rewrite <- (eissect (quotient_iso _)), ?(eisretr (quotient_iso _))
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; f_ap ; simpl
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; reduce T ; eauto with lattice_hints typeclass_instances.
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Global Instance view_lattice A : JoinSemiLattice (View A).
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Proof.
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split ; try sq1 ; try sq2.
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Defined.
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End quotient_properties.
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Arguments set_eq {_} _ {_} _ _.
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Section properties.
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Context `{Univalence}.
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Variable (T : Type -> Type) (f : forall A, T A -> FSet A).
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Context `{sets T f}.
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Definition set_subset : forall A, T A -> T A -> hProp :=
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fun A X Y => (f A X) ⊆ (f A Y).
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Definition empty_isIn : forall (A : Type) (a : A),
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a ∈ ∅ = False_hp.
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Proof.
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by (reduce T).
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Defined.
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Definition singleton_isIn : forall (A : Type) (a b : A),
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a ∈ {|b|} = merely (a = b).
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Proof.
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by (reduce T).
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Defined.
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Definition union_isIn : forall (A : Type) (a : A) (X Y : T A),
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a ∈ (X ∪ Y) = lor (a ∈ X) (a ∈ Y).
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Proof.
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by (reduce T).
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Defined.
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Definition filter_isIn : forall (A : Type) (a : A) (ϕ : A -> Bool) (X : T A),
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member a (filter ϕ X) = if ϕ a then member a X else False_hp.
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Proof.
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reduce T.
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apply properties.comprehension_isIn.
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Defined.
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Definition reflect_f_eq : forall (A : Type) (X Y : T A),
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class_of (set_eq f) X = class_of (set_eq f) Y -> set_eq f X Y.
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Proof.
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intros.
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refine (same_class _ _ _ _ _ _) ; assumption.
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Defined.
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Ltac via_quotient := intros ; apply reflect_f_eq ; simpl
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; rewrite <- ?(well_defined_union T _), <- ?(well_defined_empty T _)
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; eauto with lattice_hints typeclass_instances.
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Lemma union_comm : forall A (X Y : T A),
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set_eq f (X ∪ Y) (Y ∪ X).
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Proof.
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via_quotient.
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Defined.
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Lemma union_assoc : forall A (X Y Z : T A),
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set_eq f ((X ∪ Y) ∪ Z) (X ∪ (Y ∪ Z)).
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Proof.
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via_quotient.
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Defined.
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Lemma union_idem : forall A (X : T A),
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set_eq f (X ∪ X) X.
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Proof.
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via_quotient.
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Defined.
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Lemma union_neutralL : forall A (X : T A),
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set_eq f (∅ ∪ X) X.
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Proof.
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via_quotient.
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Defined.
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Lemma union_neutralR : forall A (X : T A),
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set_eq f (X ∪ ∅) X.
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Proof.
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via_quotient.
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Defined.
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End properties. |