260 lines
8.9 KiB
Text
260 lines
8.9 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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Author: Floris van Doorn
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Ported from Coq HoTT
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Theorems about embeddings and surjections
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-/
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import hit.trunc types.equiv cubical.square
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open equiv sigma sigma.ops eq trunc is_trunc pi is_equiv fiber prod
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variables {A B : Type} (f : A → B) {b : B}
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definition is_embedding [class] (f : A → B) := Π(a a' : A), is_equiv (ap f : a = a' → f a = f a')
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definition is_surjective [class] (f : A → B) := Π(b : B), ∥ fiber f b ∥
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definition is_split_surjective [class] (f : A → B) := Π(b : B), fiber f b
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structure is_retraction [class] (f : A → B) :=
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(sect : B → A)
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(right_inverse : Π(b : B), f (sect b) = b)
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structure is_section [class] (f : A → B) :=
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(retr : B → A)
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(left_inverse : Π(a : A), retr (f a) = a)
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definition is_weakly_constant [class] (f : A → B) := Π(a a' : A), f a = f a'
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structure is_constant [class] (f : A → B) :=
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(pt : B)
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(eq : Π(a : A), f a = pt)
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structure is_conditionally_constant [class] (f : A → B) :=
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(g : ∥A∥ → B)
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(eq : Π(a : A), f a = g (tr a))
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namespace function
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abbreviation sect [unfold 4] := @is_retraction.sect
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abbreviation right_inverse [unfold 4] := @is_retraction.right_inverse
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abbreviation retr [unfold 4] := @is_section.retr
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abbreviation left_inverse [unfold 4] := @is_section.left_inverse
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definition is_equiv_ap_of_embedding [instance] [H : is_embedding f] (a a' : A)
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: is_equiv (ap f : a = a' → f a = f a') :=
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H a a'
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variable {f}
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definition is_injective_of_is_embedding [reducible] [H : is_embedding f] {a a' : A}
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: f a = f a' → a = a' :=
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(ap f)⁻¹
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definition is_embedding_of_is_injective [HA : is_hset A] [HB : is_hset B]
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(H : Π(a a' : A), f a = f a' → a = a') : is_embedding f :=
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begin
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intro a a',
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fapply adjointify,
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{exact (H a a')},
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{intro p, apply is_hset.elim},
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{intro p, apply is_hset.elim}
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end
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variable (f)
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definition is_hprop_is_embedding [instance] : is_hprop (is_embedding f) :=
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by unfold is_embedding; exact _
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definition is_hprop_fiber_of_is_embedding [H : is_embedding f] (b : B) :
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is_hprop (fiber f b) :=
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begin
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apply is_hprop.mk, intro v w,
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induction v with a p, induction w with a' q, induction q,
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fapply fiber_eq,
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{ esimp, apply is_injective_of_is_embedding p},
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{ esimp [is_injective_of_is_embedding], symmetry, apply right_inv}
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end
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variable {f}
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definition is_surjective_rec_on {P : Type} (H : is_surjective f) (b : B) [Pt : is_hprop P]
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(IH : fiber f b → P) : P :=
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trunc.rec_on (H b) IH
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variable (f)
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definition is_surjective_of_is_split_surjective [instance] [H : is_split_surjective f]
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: is_surjective f :=
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λb, tr (H b)
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definition is_hprop_is_surjective [instance] : is_hprop (is_surjective f) :=
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by unfold is_surjective; exact _
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definition is_weakly_constant_ap [instance] [H : is_weakly_constant f] (a a' : A) :
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is_weakly_constant (ap f : a = a' → f a = f a') :=
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take p q : a = a',
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have Π{b c : A} {r : b = c}, (H a b)⁻¹ ⬝ H a c = ap f r, from
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(λb c r, eq.rec_on r !con.left_inv),
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this⁻¹ ⬝ this
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definition is_constant_ap [unfold 4] [instance] [H : is_constant f] (a a' : A)
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: is_constant (ap f : a = a' → f a = f a') :=
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begin
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induction H with b q,
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fapply is_constant.mk,
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{ exact q a ⬝ (q a')⁻¹},
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{ intro p, induction p, exact !con.right_inv⁻¹}
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end
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definition is_contr_is_retraction [instance] [H : is_equiv f] : is_contr (is_retraction f) :=
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begin
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have H2 : (Σ(g : B → A), Πb, f (g b) = b) ≃ is_retraction f,
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begin
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fapply equiv.MK,
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{intro x, induction x with g p, constructor, exact p},
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{intro h, induction h, apply sigma.mk, assumption},
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{intro h, induction h, reflexivity},
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{intro x, induction x, reflexivity},
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end,
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apply is_trunc_equiv_closed, exact H2,
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apply is_equiv.is_contr_right_inverse
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end
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definition is_contr_is_section [instance] [H : is_equiv f] : is_contr (is_section f) :=
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begin
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have H2 : (Σ(g : B → A), Πa, g (f a) = a) ≃ is_section f,
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begin
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fapply equiv.MK,
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{intro x, induction x with g p, constructor, exact p},
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{intro h, induction h, apply sigma.mk, assumption},
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{intro h, induction h, reflexivity},
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{intro x, induction x, reflexivity},
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end,
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apply is_trunc_equiv_closed, exact H2,
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fapply is_trunc_equiv_closed,
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{apply sigma_equiv_sigma_id, intro g, apply eq_equiv_homotopy},
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fapply is_trunc_equiv_closed,
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{apply fiber.sigma_char},
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fapply is_contr_fiber_of_is_equiv,
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exact to_is_equiv (arrow_equiv_arrow_left_rev A (equiv.mk f H)),
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end
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definition is_embedding_of_is_equiv [instance] [H : is_equiv f] : is_embedding f :=
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λa a', _
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definition is_equiv_of_is_surjective_of_is_embedding
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[H : is_embedding f] [H' : is_surjective f] : is_equiv f :=
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@is_equiv_of_is_contr_fun _ _ _
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(λb, is_surjective_rec_on H' b
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(λa, is_contr.mk a
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(λa',
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fiber_eq ((ap f)⁻¹ ((point_eq a) ⬝ (point_eq a')⁻¹))
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(by rewrite (right_inv (ap f)); rewrite inv_con_cancel_right))))
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definition is_split_surjective_of_is_retraction [H : is_retraction f] : is_split_surjective f :=
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λb, fiber.mk (sect f b) (right_inverse f b)
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definition is_constant_compose_point [constructor] [instance] (b : B)
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: is_constant (f ∘ point : fiber f b → B) :=
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is_constant.mk b (λv, by induction v with a p;exact p)
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definition is_embedding_of_is_hprop_fiber [H : Π(b : B), is_hprop (fiber f b)] : is_embedding f :=
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begin
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intro a a',
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fapply adjointify,
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{ intro p, exact ap point (is_hprop.elim (fiber.mk a p) (fiber.mk a' idp))},
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{ exact abstract begin
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intro p, rewrite [-ap_compose],
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apply @is_constant.eq _ _ _ (is_constant_ap (f ∘ point) (fiber.mk a p) (fiber.mk a' idp))
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end end },
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{ intro p, induction p, rewrite [▸*,is_hprop_elim_self]},
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end
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-- definition is_embedding_of_is_section_inv' [H : is_section f] {a : A} {b : B} (p : f a = b) :
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-- a = retr f b :=
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-- (left_inverse f a)⁻¹ ⬝ ap (retr f) p
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-- definition is_embedding_of_is_section_inv [H : is_section f] {a a' : A} (p : f a = f a') :
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-- a = a' :=
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-- is_embedding_of_is_section_inv' f p ⬝ left_inverse f a'
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-- definition is_embedding_of_is_section [constructor] [instance] [H : is_section f]
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-- : is_embedding f :=
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-- begin
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-- intro a a',
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-- fapply adjointify,
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-- { exact is_embedding_of_is_section_inv f},
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-- { exact abstract begin
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-- assert H2 : Π {b : B} (p : f a = b), ap f (is_embedding_of_is_section_inv' f p) = p ⬝ _,
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-- { }
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-- -- intro p, rewrite [+ap_con,-ap_compose],
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-- -- check_expr natural_square (left_inverse f),
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-- -- induction H with g q, esimp,
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-- end end },
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-- { intro p, induction p, esimp, apply con.left_inv},
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-- end
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definition is_retraction_of_is_equiv [instance] [H : is_equiv f] : is_retraction f :=
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is_retraction.mk f⁻¹ (right_inv f)
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definition is_section_of_is_equiv [instance] [H : is_equiv f] : is_section f :=
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is_section.mk f⁻¹ (left_inv f)
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definition is_equiv_of_is_section_of_is_retraction [H1 : is_retraction f] [H2 : is_section f]
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: is_equiv f :=
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let g := sect f in let h := retr f in
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adjointify f
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(g)
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(right_inverse f)
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(λa, calc
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g (f a) = h (f (g (f a))) : left_inverse
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... = h (f a) : right_inverse f
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... = a : left_inverse)
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section
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local attribute is_equiv_of_is_section_of_is_retraction [instance]
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variable (f)
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definition is_hprop_is_retraction_prod_is_section : is_hprop (is_retraction f × is_section f) :=
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begin
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apply is_hprop_of_imp_is_contr, intro H, induction H with H1 H2,
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exact _,
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end
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end
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variable {f}
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definition is_retraction_trunc_functor [instance] (r : A → B) [H : is_retraction r]
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(n : trunc_index) : is_retraction (trunc_functor n r) :=
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is_retraction.mk
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(trunc_functor n (sect r))
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(λb,
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((trunc_functor_compose n (sect r) r) b)⁻¹
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⬝ trunc_homotopy n (right_inverse r) b
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⬝ trunc_functor_id B n b)
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-- Lemma 3.11.7
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definition is_contr_retract (r : A → B) [H : is_retraction r] : is_contr A → is_contr B :=
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begin
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intro CA,
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apply is_contr.mk (r (center A)),
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intro b,
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exact ap r (center_eq (is_retraction.sect r b)) ⬝ (is_retraction.right_inverse r b)
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end
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local attribute is_hprop_is_retraction_prod_is_section [instance]
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definition is_retraction_prod_is_section_equiv_is_equiv
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: (is_retraction f × is_section f) ≃ is_equiv f :=
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begin
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apply equiv_of_is_hprop,
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intro H, induction H, apply is_equiv_of_is_section_of_is_retraction,
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intro H, split, repeat exact _
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end
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/-
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The definitions
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is_surjective_of_is_equiv
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is_equiv_equiv_is_embedding_times_is_surjective
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are in types.trunc
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-/
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end function
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