368 lines
13 KiB
Text
368 lines
13 KiB
Text
/-
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Copyright (c) 2015 Ulrik Buchholtz. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Authors: Ulrik Buchholtz, Floris van Doorn
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Connectedness of types and functions
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-/
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import types.trunc types.arrow_2 types.lift
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open eq is_trunc is_equiv nat equiv trunc function fiber funext pi pointed
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definition is_conn [reducible] (n : ℕ₋₂) (A : Type) : Type :=
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is_contr (trunc n A)
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definition is_conn_fun [reducible] (n : ℕ₋₂) {A B : Type} (f : A → B) : Type :=
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Πb : B, is_conn n (fiber f b)
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definition is_conn_inf [reducible] (A : Type) : Type := Πn, is_conn n A
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definition is_conn_fun_inf [reducible] {A B : Type} (f : A → B) : Type := Πn, is_conn_fun n f
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namespace is_conn
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definition is_conn_equiv_closed (n : ℕ₋₂) {A B : Type}
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: A ≃ B → is_conn n A → is_conn n B :=
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begin
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intros H C,
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fapply @is_contr_equiv_closed (trunc n A) _,
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apply trunc_equiv_trunc,
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assumption
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end
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theorem is_conn_of_le (A : Type) {n k : ℕ₋₂} (H : n ≤ k) [is_conn k A] : is_conn n A :=
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begin
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apply is_contr_equiv_closed,
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apply trunc_trunc_equiv_left _ H
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end
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theorem is_conn_fun_of_le {A B : Type} (f : A → B) {n k : ℕ₋₂} (H : n ≤ k)
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[is_conn_fun k f] : is_conn_fun n f :=
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λb, is_conn_of_le _ H
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definition is_conn_of_is_conn_succ (n : ℕ₋₂) (A : Type) [is_conn (n.+1) A] : is_conn n A :=
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is_trunc_trunc_of_le A -2 (trunc_index.self_le_succ n)
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namespace is_conn_fun
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section
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parameters (n : ℕ₋₂) {A B : Type} {h : A → B}
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(H : is_conn_fun n h) (P : B → Type) [Πb, is_trunc n (P b)]
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private definition rec.helper : (Πa : A, P (h a)) → Πb : B, trunc n (fiber h b) → P b :=
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λt b, trunc.rec (λx, point_eq x ▸ t (point x))
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private definition rec.g : (Πa : A, P (h a)) → (Πb : B, P b) :=
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λt b, rec.helper t b (@center (trunc n (fiber h b)) (H b))
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-- induction principle for n-connected maps (Lemma 7.5.7)
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protected definition rec : is_equiv (λs : Πb : B, P b, λa : A, s (h a)) :=
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adjointify (λs a, s (h a)) rec.g
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begin
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intro t, apply eq_of_homotopy, intro a, unfold rec.g, unfold rec.helper,
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rewrite [@center_eq _ (H (h a)) (tr (fiber.mk a idp))],
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end
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begin
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intro k, apply eq_of_homotopy, intro b, unfold rec.g,
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generalize (@center _ (H b)), apply trunc.rec, apply fiber.rec,
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intros a p, induction p, reflexivity
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end
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protected definition elim : (Πa : A, P (h a)) → (Πb : B, P b) :=
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@is_equiv.inv _ _ (λs a, s (h a)) rec
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protected definition elim_β : Πf : (Πa : A, P (h a)), Πa : A, elim f (h a) = f a :=
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λf, apd10 (@is_equiv.right_inv _ _ (λs a, s (h a)) rec f)
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end
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section
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parameters (n k : ℕ₋₂) {A B : Type} {f : A → B}
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(H : is_conn_fun n f) (P : B → Type) [HP : Πb, is_trunc (n +2+ k) (P b)]
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include H HP
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-- Lemma 8.6.1
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proposition elim_general : is_trunc_fun k (pi_functor_left f P) :=
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begin
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revert P HP,
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induction k with k IH: intro P HP t,
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{ apply is_contr_fiber_of_is_equiv, apply is_conn_fun.rec, exact H, exact HP},
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{ apply is_trunc_succ_intro,
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intros x y, cases x with g p, cases y with h q,
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have e : fiber (λr : g ~ h, (λa, r (f a))) (apd10 (p ⬝ q⁻¹))
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≃ (fiber.mk g p = fiber.mk h q
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:> fiber (λs : (Πb, P b), (λa, s (f a))) t),
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begin
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apply equiv.trans !fiber.sigma_char,
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have e' : Πr : g ~ h,
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((λa, r (f a)) = apd10 (p ⬝ q⁻¹))
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≃ (ap (λv, (λa, v (f a))) (eq_of_homotopy r) ⬝ q = p),
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begin
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intro r,
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refine equiv.trans _ (eq_con_inv_equiv_con_eq q p
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(ap (λv a, v (f a)) (eq_of_homotopy r))),
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rewrite [-(ap (λv a, v (f a)) (apd10_eq_of_homotopy r))],
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rewrite [-(apd10_ap_precompose_dependent f (eq_of_homotopy r))],
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apply equiv.symm,
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apply eq_equiv_fn_eq (@apd10 A (λa, P (f a)) (λa, g (f a)) (λa, h (f a)))
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end,
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apply equiv.trans (sigma.sigma_equiv_sigma_right e'), clear e',
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apply equiv.trans (equiv.symm (sigma.sigma_equiv_sigma_left
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eq_equiv_homotopy)),
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apply equiv.symm, apply equiv.trans !fiber_eq_equiv,
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apply sigma.sigma_equiv_sigma_right, intro r,
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apply eq_equiv_eq_symm
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end,
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apply @is_trunc_equiv_closed _ _ k e, clear e,
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apply IH (λb : B, (g b = h b)) (λb, @is_trunc_eq (P b) (n +2+ k) (HP b) (g b) (h b))}
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end
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end
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section
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universe variables u v
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parameters (n : ℕ₋₂) {A : Type.{u}} {B : Type.{v}} {h : A → B}
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parameter sec : ΠP : B → trunctype.{max u v} n,
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is_retraction (λs : (Πb : B, P b), λ a, s (h a))
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private definition s := sec (λb, trunctype.mk' n (trunc n (fiber h b)))
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include sec
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-- the other half of Lemma 7.5.7
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definition intro : is_conn_fun n h :=
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begin
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intro b,
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apply is_contr.mk (@is_retraction.sect _ _ _ s (λa, tr (fiber.mk a idp)) b),
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esimp, apply trunc.rec, apply fiber.rec, intros a p,
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apply transport
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(λz : (Σy, h a = y), @sect _ _ _ s (λa, tr (mk a idp)) (sigma.pr1 z) =
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tr (fiber.mk a (sigma.pr2 z)))
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(@center_eq _ (is_contr_sigma_eq (h a)) (sigma.mk b p)),
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exact apd10 (@right_inverse _ _ _ s (λa, tr (fiber.mk a idp))) a
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end
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end
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end is_conn_fun
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-- Connectedness is related to maps to and from the unit type, first to
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section
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parameters (n : ℕ₋₂) (A : Type)
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definition is_conn_of_map_to_unit
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: is_conn_fun n (const A unit.star) → is_conn n A :=
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begin
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intro H, unfold is_conn_fun at H,
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exact is_conn_equiv_closed n (fiber.fiber_star_equiv A) _,
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end
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definition is_conn_fun_to_unit_of_is_conn [H : is_conn n A] :
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is_conn_fun n (const A unit.star) :=
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begin
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intro u, induction u,
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exact is_conn_equiv_closed n (fiber.fiber_star_equiv A)⁻¹ᵉ _,
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end
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-- now maps from unit
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definition is_conn_of_map_from_unit (a₀ : A) (H : is_conn_fun n (const unit a₀))
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: is_conn n .+1 A :=
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is_contr.mk (tr a₀)
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begin
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apply trunc.rec, intro a,
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exact trunc.elim (λz : fiber (const unit a₀) a, ap tr (point_eq z))
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(@center _ (H a))
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end
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definition is_conn_fun_from_unit (a₀ : A) [H : is_conn n .+1 A]
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: is_conn_fun n (const unit a₀) :=
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begin
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intro a,
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apply is_conn_equiv_closed n (equiv.symm (fiber_const_equiv A a₀ a)),
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apply @is_contr_equiv_closed _ _ (tr_eq_tr_equiv n a₀ a),
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end
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end
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-- as special case we get elimination principles for pointed connected types
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namespace is_conn
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open pointed unit
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section
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parameters (n : ℕ₋₂) {A : Type*}
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[H : is_conn n .+1 A] (P : A → Type) [Πa, is_trunc n (P a)]
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include H
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protected definition rec : is_equiv (λs : Πa : A, P a, s (Point A)) :=
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@is_equiv_compose
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(Πa : A, P a) (unit → P (Point A)) (P (Point A))
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(λf, f unit.star) (λs x, s (Point A))
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(is_conn_fun.rec n (is_conn_fun_from_unit n A (Point A)) P)
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(to_is_equiv (arrow_unit_left (P (Point A))))
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protected definition elim : P (Point A) → (Πa : A, P a) :=
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@is_equiv.inv _ _ (λs, s (Point A)) rec
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protected definition elim_β (p : P (Point A)) : elim p (Point A) = p :=
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@is_equiv.right_inv _ _ (λs, s (Point A)) rec p
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end
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section
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parameters (n k : ℕ₋₂) {A : Type*}
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[H : is_conn n .+1 A] (P : A → Type) [Πa, is_trunc (n +2+ k) (P a)]
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include H
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proposition elim_general (p : P (Point A))
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: is_trunc k (fiber (λs : (Πa : A, P a), s (Point A)) p) :=
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@is_trunc_equiv_closed
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(fiber (λs x, s (Point A)) (λx, p))
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(fiber (λs, s (Point A)) p)
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k
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(equiv.symm (fiber.equiv_postcompose _ (arrow_unit_left (P (Point A))) _))
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(is_conn_fun.elim_general n k (is_conn_fun_from_unit n A (Point A)) P (λx, p))
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end
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end is_conn
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-- Lemma 7.5.2
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definition minus_one_conn_of_surjective {A B : Type} (f : A → B)
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: is_surjective f → is_conn_fun -1 f :=
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begin
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intro H, intro b,
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exact @is_contr_of_inhabited_prop (∥fiber f b∥) (is_trunc_trunc -1 (fiber f b)) (H b),
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end
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definition is_surjection_of_minus_one_conn {A B : Type} (f : A → B)
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: is_conn_fun -1 f → is_surjective f :=
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begin
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intro H, intro b,
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exact @center (∥fiber f b∥) (H b),
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end
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definition merely_of_minus_one_conn {A : Type} : is_conn -1 A → ∥A∥ :=
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λH, @center (∥A∥) H
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definition minus_one_conn_of_merely {A : Type} : ∥A∥ → is_conn -1 A :=
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@is_contr_of_inhabited_prop (∥A∥) (is_trunc_trunc -1 A)
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section
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open arrow
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variables {f g : arrow}
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-- Lemma 7.5.4
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definition retract_of_conn_is_conn [instance] (r : arrow_hom f g) [H : is_retraction r]
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(n : ℕ₋₂) [K : is_conn_fun n f] : is_conn_fun n g :=
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begin
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intro b, unfold is_conn,
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apply is_contr_retract (trunc_functor n (retraction_on_fiber r b)),
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exact K (on_cod (arrow.is_retraction.sect r) b)
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end
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end
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-- Corollary 7.5.5
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definition is_conn_homotopy (n : ℕ₋₂) {A B : Type} {f g : A → B}
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(p : f ~ g) (H : is_conn_fun n f) : is_conn_fun n g :=
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@retract_of_conn_is_conn _ _
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(arrow.arrow_hom_of_homotopy p) (arrow.is_retraction_arrow_hom_of_homotopy p) n H
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-- all types are -2-connected
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definition is_conn_minus_two (A : Type) : is_conn -2 A :=
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_
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-- merely inhabited types are -1-connected
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definition is_conn_minus_one (A : Type) (a : ∥ A ∥) : is_conn -1 A :=
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is_contr.mk a (is_prop.elim _)
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definition is_conn_trunc [instance] (A : Type) (n k : ℕ₋₂) [H : is_conn n A]
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: is_conn n (trunc k A) :=
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begin
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apply is_trunc_equiv_closed, apply trunc_trunc_equiv_trunc_trunc
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end
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definition is_conn_eq [instance] (n : ℕ₋₂) {A : Type} (a a' : A) [is_conn (n.+1) A] :
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is_conn n (a = a') :=
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begin
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apply is_trunc_equiv_closed, apply tr_eq_tr_equiv,
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end
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definition is_conn_loop [instance] (n : ℕ₋₂) (A : Type*) [is_conn (n.+1) A] : is_conn n (Ω A) :=
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!is_conn_eq
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open pointed
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definition is_conn_ptrunc [instance] (A : Type*) (n k : ℕ₋₂) [H : is_conn n A]
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: is_conn n (ptrunc k A) :=
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is_conn_trunc A n k
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-- the following trivial cases are solved by type class inference
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definition is_conn_of_is_contr (k : ℕ₋₂) (A : Type) [is_contr A] : is_conn k A := _
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definition is_conn_fun_of_is_equiv (k : ℕ₋₂) {A B : Type} (f : A → B) [is_equiv f] :
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is_conn_fun k f :=
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_
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-- Lemma 7.5.14
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theorem is_equiv_trunc_functor_of_is_conn_fun [instance] {A B : Type} (n : ℕ₋₂) (f : A → B)
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[H : is_conn_fun n f] : is_equiv (trunc_functor n f) :=
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begin
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fapply adjointify,
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{ intro b, induction b with b, exact trunc_functor n point (center (trunc n (fiber f b)))},
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{ intro b, induction b with b, esimp, generalize center (trunc n (fiber f b)), intro v,
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induction v with v, induction v with a p, esimp, exact ap tr p},
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{ intro a, induction a with a, esimp, rewrite [center_eq (tr (fiber.mk a idp))]}
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end
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theorem trunc_equiv_trunc_of_is_conn_fun {A B : Type} (n : ℕ₋₂) (f : A → B)
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[H : is_conn_fun n f] : trunc n A ≃ trunc n B :=
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equiv.mk (trunc_functor n f) (is_equiv_trunc_functor_of_is_conn_fun n f)
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definition is_conn_fun_trunc_functor_of_le {n k : ℕ₋₂} {A B : Type} (f : A → B) (H : k ≤ n)
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[H2 : is_conn_fun k f] : is_conn_fun k (trunc_functor n f) :=
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begin
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apply is_conn_fun.intro,
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intro P, have Πb, is_trunc n (P b), from (λb, is_trunc_of_le _ H),
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fconstructor,
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{ intro f' b,
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induction b with b,
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refine is_conn_fun.elim k H2 _ _ b, intro a, exact f' (tr a)},
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{ intro f', apply eq_of_homotopy, intro a,
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induction a with a, esimp, rewrite [is_conn_fun.elim_β]}
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end
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definition is_conn_fun_trunc_functor_of_ge {n k : ℕ₋₂} {A B : Type} (f : A → B) (H : n ≤ k)
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[H2 : is_conn_fun k f] : is_conn_fun k (trunc_functor n f) :=
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begin
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apply is_conn_fun_of_is_equiv,
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apply is_equiv_trunc_functor_of_le f H
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end
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-- Exercise 7.18
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definition is_conn_fun_trunc_functor {n k : ℕ₋₂} {A B : Type} (f : A → B)
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[H2 : is_conn_fun k f] : is_conn_fun k (trunc_functor n f) :=
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begin
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eapply algebra.le_by_cases k n: intro H,
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{ exact is_conn_fun_trunc_functor_of_le f H},
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{ exact is_conn_fun_trunc_functor_of_ge f H}
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end
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open lift
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definition is_conn_fun_lift_functor (n : ℕ₋₂) {A B : Type} (f : A → B) [is_conn_fun n f] :
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is_conn_fun n (lift_functor f) :=
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begin
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intro b, cases b with b, apply is_trunc_equiv_closed_rev,
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{ apply trunc_equiv_trunc, apply fiber_lift_functor}
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end
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open trunc_index
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definition is_conn_fun_inf.mk_nat {A B : Type} {f : A → B} (H : Π(n : ℕ), is_conn_fun n f)
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: is_conn_fun_inf f :=
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begin
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intro n,
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cases n with n, { exact _},
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cases n with n, { have -1 ≤ of_nat 0, from dec_star, apply is_conn_fun_of_le f this},
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rewrite -of_nat_add_two, exact _
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end
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definition is_conn_inf.mk_nat {A : Type} (H : Π(n : ℕ), is_conn n A) : is_conn_inf A :=
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begin
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intro n,
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cases n with n, { exact _},
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cases n with n, { have -1 ≤ of_nat 0, from dec_star, apply is_conn_of_le A this},
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rewrite -of_nat_add_two, exact _
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end
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end is_conn
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