267 lines
11 KiB
Text
267 lines
11 KiB
Text
-- Copyright (c) 2014 Microsoft Corporation. All rights reserved.
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-- Released under Apache 2.0 license as described in the file LICENSE.
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-- Author: Jeremy Avigad, Jakob von Raumer
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-- Ported from Coq HoTT
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prelude
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import .path .function
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open eq function
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-- Equivalences
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-- ------------
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-- This is our definition of equivalence. In the HoTT-book it's called
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-- ihae (half-adjoint equivalence).
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structure is_equiv [class] {A B : Type} (f : A → B) :=
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(inv : B → A)
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(retr : (f ∘ inv) ∼ id)
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(sect : (inv ∘ f) ∼ id)
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(adj : Πx, retr (f x) = ap f (sect x))
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-- A more bundled version of equivalence to calculate with
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structure equiv (A B : Type) :=
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(to_fun : A → B)
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(to_is_equiv : is_equiv to_fun)
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-- Some instances and closure properties of equivalences
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namespace is_equiv
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postfix `⁻¹` := inv
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variables {A B C : Type} (f : A → B) (g : B → C) {f' : A → B}
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-- The identity function is an equivalence.
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definition id_is_equiv : (@is_equiv A A id) := is_equiv.mk id (λa, idp) (λa, idp) (λa, idp)
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-- The composition of two equivalences is, again, an equivalence.
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protected definition compose [Hf : is_equiv f] [Hg : is_equiv g] : (is_equiv (g ∘ f)) :=
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is_equiv.mk ((inv f) ∘ (inv g))
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(λc, ap g (retr f (g⁻¹ c)) ⬝ retr g c)
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(λa, ap (inv f) (sect g (f a)) ⬝ sect f a)
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(λa, (whiskerL _ (adj g (f a))) ⬝
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(ap_pp g _ _)⁻¹ ⬝
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ap02 g (concat_A1p (retr f) (sect g (f a))⁻¹ ⬝
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(ap_compose (inv f) f _ ◾ adj f a) ⬝
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(ap_pp f _ _)⁻¹
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) ⬝
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(ap_compose f g _)⁻¹
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)
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-- Any function equal to an equivalence is an equivlance as well.
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definition path_closed [Hf : is_equiv f] (Heq : f = f') : (is_equiv f') :=
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eq.rec_on Heq Hf
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-- Any function pointwise equal to an equivalence is an equivalence as well.
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definition homotopy_closed [Hf : is_equiv f] (Hty : f ∼ f') : (is_equiv f') :=
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let sect' := (λ b, (Hty (inv f b))⁻¹ ⬝ retr f b) in
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let retr' := (λ a, (ap (inv f) (Hty a))⁻¹ ⬝ sect f a) in
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let adj' := (λ (a : A),
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let ff'a := Hty a in
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let invf := inv f in
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let secta := sect f a in
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let retrfa := retr f (f a) in
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let retrf'a := retr f (f' a) in
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have eq1 : _ = _,
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from calc ap f secta ⬝ ff'a
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= retrfa ⬝ ff'a : ap _ (@adj _ _ f _ _)
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... = ap (f ∘ invf) ff'a ⬝ retrf'a : concat_A1p
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... = ap f (ap invf ff'a) ⬝ retrf'a : ap_compose invf f,
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have eq2 : _ = _,
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from calc retrf'a
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= (ap f (ap invf ff'a))⁻¹ ⬝ (ap f secta ⬝ ff'a) : moveL_Vp _ _ _ (eq1⁻¹)
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... = ap f (ap invf ff'a)⁻¹ ⬝ (ap f secta ⬝ Hty a) : ap_V invf ff'a
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... = ap f (ap invf ff'a)⁻¹ ⬝ (Hty (invf (f a)) ⬝ ap f' secta) : concat_Ap
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... = (ap f (ap invf ff'a)⁻¹ ⬝ Hty (invf (f a))) ⬝ ap f' secta : concat_pp_p
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... = (ap f ((ap invf ff'a)⁻¹) ⬝ Hty (invf (f a))) ⬝ ap f' secta : ap_V
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... = (Hty (invf (f' a)) ⬝ ap f' ((ap invf ff'a)⁻¹)) ⬝ ap f' secta : concat_Ap
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... = (Hty (invf (f' a)) ⬝ (ap f' (ap invf ff'a))⁻¹) ⬝ ap f' secta : ap_V
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... = Hty (invf (f' a)) ⬝ ((ap f' (ap invf ff'a))⁻¹ ⬝ ap f' secta) : concat_pp_p,
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have eq3 : _ = _,
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from calc (Hty (invf (f' a)))⁻¹ ⬝ retrf'a
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= (ap f' (ap invf ff'a))⁻¹ ⬝ ap f' secta : moveR_Vp _ _ _ eq2
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... = (ap f' ((ap invf ff'a)⁻¹)) ⬝ ap f' secta : ap_V
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... = ap f' ((ap invf ff'a)⁻¹ ⬝ secta) : ap_pp,
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eq3) in
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is_equiv.mk (inv f) sect' retr' adj'
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end is_equiv
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namespace is_equiv
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context
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parameters {A B : Type} (f : A → B) (g : B → A)
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(ret : f ∘ g ∼ id) (sec : g ∘ f ∼ id)
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definition adjointify_sect' : g ∘ f ∼ id :=
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(λx, ap g (ap f (inverse (sec x))) ⬝ ap g (ret (f x)) ⬝ sec x)
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definition adjointify_adj' : Π (x : A), ret (f x) = ap f (adjointify_sect' x) :=
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(λ (a : A),
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let fgretrfa := ap f (ap g (ret (f a))) in
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let fgfinvsect := ap f (ap g (ap f ((sec a)⁻¹))) in
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let fgfa := f (g (f a)) in
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let retrfa := ret (f a) in
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have eq1 : ap f (sec a) = _,
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from calc ap f (sec a)
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= idp ⬝ ap f (sec a) : !concat_1p⁻¹
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... = (ret (f a) ⬝ (ret (f a)⁻¹)) ⬝ ap f (sec a) : {!concat_pV⁻¹}
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... = ((ret (fgfa))⁻¹ ⬝ ap (f ∘ g) (ret (f a))) ⬝ ap f (sec a) : {!concat_pA1⁻¹}
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... = ((ret (fgfa))⁻¹ ⬝ fgretrfa) ⬝ ap f (sec a) : {ap_compose g f _}
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... = (ret (fgfa))⁻¹ ⬝ (fgretrfa ⬝ ap f (sec a)) : !concat_pp_p,
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have eq2 : ap f (sec a) ⬝ idp = (ret fgfa)⁻¹ ⬝ (fgretrfa ⬝ ap f (sec a)),
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from !concat_p1 ⬝ eq1,
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have eq3 : idp = _,
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from calc idp
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= (ap f (sec a))⁻¹ ⬝ ((ret fgfa)⁻¹ ⬝ (fgretrfa ⬝ ap f (sec a))) : moveL_Vp _ _ _ eq2
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... = (ap f (sec a)⁻¹ ⬝ (ret fgfa)⁻¹) ⬝ (fgretrfa ⬝ ap f (sec a)) : !concat_p_pp
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... = (ap f ((sec a)⁻¹) ⬝ (ret fgfa)⁻¹) ⬝ (fgretrfa ⬝ ap f (sec a)) : {!ap_V⁻¹}
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... = ((ap f ((sec a)⁻¹) ⬝ (ret fgfa)⁻¹) ⬝ fgretrfa) ⬝ ap f (sec a) : !concat_p_pp
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... = ((retrfa⁻¹ ⬝ ap (f ∘ g) (ap f ((sec a)⁻¹))) ⬝ fgretrfa) ⬝ ap f (sec a) : {!concat_pA1⁻¹}
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... = ((retrfa⁻¹ ⬝ fgfinvsect) ⬝ fgretrfa) ⬝ ap f (sec a) : {ap_compose g f _}
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... = (retrfa⁻¹ ⬝ (fgfinvsect ⬝ fgretrfa)) ⬝ ap f (sec a) : {!concat_p_pp⁻¹}
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... = retrfa⁻¹ ⬝ ap f (ap g (ap f ((sec a)⁻¹)) ⬝ ap g (ret (f a))) ⬝ ap f (sec a) : {!ap_pp⁻¹}
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... = retrfa⁻¹ ⬝ (ap f (ap g (ap f ((sec a)⁻¹)) ⬝ ap g (ret (f a))) ⬝ ap f (sec a)) : !concat_p_pp⁻¹
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... = retrfa⁻¹ ⬝ ap f ((ap g (ap f ((sec a)⁻¹)) ⬝ ap g (ret (f a))) ⬝ sec a) : {!ap_pp⁻¹},
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have eq4 : ret (f a) = ap f ((ap g (ap f ((sec a)⁻¹)) ⬝ ap g (ret (f a))) ⬝ sec a),
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from moveR_M1 _ _ eq3,
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eq4)
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definition adjointify : is_equiv f :=
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is_equiv.mk g ret adjointify_sect' adjointify_adj'
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end
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end is_equiv
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namespace is_equiv
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variables {A B: Type} (f : A → B)
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--The inverse of an equivalence is, again, an equivalence.
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definition inv_closed [instance] [Hf : is_equiv f] : (is_equiv (inv f)) :=
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adjointify (inv f) f (sect f) (retr f)
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end is_equiv
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namespace is_equiv
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variables {A : Type}
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section
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variables {B C : Type} (f : A → B) {f' : A → B} [Hf : is_equiv f]
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include Hf
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definition cancel_R (g : B → C) [Hgf : is_equiv (g ∘ f)] : (is_equiv g) :=
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have Hfinv [visible] : is_equiv (f⁻¹), from inv_closed f,
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@homotopy_closed _ _ _ _ (compose (f⁻¹) (g ∘ f)) (λb, ap g (@retr _ _ f _ b))
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definition cancel_L (g : C → A) [Hgf : is_equiv (f ∘ g)] : (is_equiv g) :=
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have Hfinv [visible] : is_equiv (f⁻¹), from inv_closed f,
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@homotopy_closed _ _ _ _ (compose (f ∘ g) (f⁻¹)) (λa, sect f (g a))
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--Rewrite rules
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definition moveR_M {x : A} {y : B} (p : x = (inv f) y) : (f x = y) :=
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(ap f p) ⬝ (@retr _ _ f _ y)
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definition moveL_M {x : A} {y : B} (p : (inv f) y = x) : (y = f x) :=
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(moveR_M f (p⁻¹))⁻¹
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definition moveR_V {x : B} {y : A} (p : x = f y) : (inv f) x = y :=
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ap (f⁻¹) p ⬝ sect f y
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definition moveL_V {x : B} {y : A} (p : f y = x) : y = (inv f) x :=
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(moveR_V f (p⁻¹))⁻¹
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definition ap_closed [instance] (x y : A) : is_equiv (ap f) :=
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adjointify (ap f)
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(λq, (inverse (sect f x)) ⬝ ap (f⁻¹) q ⬝ sect f y)
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(λq, !ap_pp
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⬝ whiskerR !ap_pp _
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⬝ ((!ap_V ⬝ inverse2 ((adj f _)⁻¹))
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◾ (inverse (ap_compose (f⁻¹) f _))
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◾ (adj f _)⁻¹)
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⬝ concat_pA1_p (retr f) _ _
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⬝ whiskerR !concat_Vp _
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⬝ !concat_1p)
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(λp, whiskerR (whiskerL _ ((ap_compose f (f⁻¹) _)⁻¹)) _
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⬝ concat_pA1_p (sect f) _ _
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⬝ whiskerR !concat_Vp _
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⬝ !concat_1p)
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-- The function equiv_rect says that given an equivalence f : A → B,
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-- and a hypothesis from B, one may always assume that the hypothesis
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-- is in the image of e.
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-- In fibrational terms, if we have a fibration over B which has a section
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-- once pulled back along an equivalence f : A → B, then it has a section
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-- over all of B.
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definition equiv_rect (P : B -> Type) :
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(Πx, P (f x)) → (Πy, P y) :=
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(λg y, eq.transport _ (retr f y) (g (f⁻¹ y)))
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definition equiv_rect_comp (P : B → Type)
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(df : Π (x : A), P (f x)) (x : A) : equiv_rect f P df (f x) = df x :=
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calc equiv_rect f P df (f x)
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= transport P (retr f (f x)) (df (f⁻¹ (f x))) : idp
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... = transport P (ap f (sect f x)) (df (f⁻¹ (f x))) : adj f
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... = transport (P ∘ f) (sect f x) (df (f⁻¹ (f x))) : transport_compose
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... = df x : apD df (sect f x)
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end
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--Transporting is an equivalence
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protected definition transport [instance] (P : A → Type) {x y : A} (p : x = y) : (is_equiv (transport P p)) :=
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is_equiv.mk (transport P (p⁻¹)) (transport_pV P p) (transport_Vp P p) (transport_pVp P p)
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end is_equiv
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namespace equiv
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instance [persistent] to_is_equiv
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infix `≃`:25 := equiv
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context
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parameters {A B C : Type} (eqf : A ≃ B)
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private definition f : A → B := to_fun eqf
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private definition Hf [instance] : is_equiv f := to_is_equiv eqf
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protected definition refl : A ≃ A := equiv.mk id is_equiv.id_is_equiv
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theorem trans (eqg: B ≃ C) : A ≃ C :=
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equiv.mk ((to_fun eqg) ∘ f)
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(is_equiv.compose f (to_fun eqg))
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theorem path_closed (f' : A → B) (Heq : to_fun eqf = f') : A ≃ B :=
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equiv.mk f' (is_equiv.path_closed f Heq)
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theorem symm : B ≃ A :=
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equiv.mk (is_equiv.inv f) !is_equiv.inv_closed
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theorem cancel_R (g : B → C) [Hgf : is_equiv (g ∘ f)] : B ≃ C :=
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equiv.mk g (is_equiv.cancel_R f _)
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theorem cancel_L (g : C → A) [Hgf : is_equiv (f ∘ g)] : C ≃ A :=
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equiv.mk g (is_equiv.cancel_L f _)
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protected theorem transport (P : A → Type) {x y : A} {p : x = y} : (P x) ≃ (P y) :=
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equiv.mk (transport P p) (is_equiv.transport P p)
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end
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context
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parameters {A B : Type} (eqf eqg : A ≃ B)
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private definition Hf [instance] : is_equiv (to_fun eqf) := to_is_equiv eqf
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private definition Hg [instance] : is_equiv (to_fun eqg) := to_is_equiv eqg
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--We need this theorem for the funext_from_ua proof
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theorem inv_eq (p : eqf = eqg)
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: is_equiv.inv (to_fun eqf) = is_equiv.inv (to_fun eqg) :=
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eq.rec_on p idp
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end
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-- calc enviroment
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-- Note: Calculating with substitutions needs univalence
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calc_trans trans
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calc_refl refl
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calc_symm symm
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end equiv
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