From 0acc5c786d91d842395b0c8911f3e6fa1fbbf40c Mon Sep 17 00:00:00 2001 From: favonia Date: Fri, 9 Jun 2017 11:55:34 -0600 Subject: [PATCH] Add fwedge_down_left. --- homotopy/fwedge.hlean | 41 ++++++++++++++++++++++++++++++++++++++--- 1 file changed, 38 insertions(+), 3 deletions(-) diff --git a/homotopy/fwedge.hlean b/homotopy/fwedge.hlean index 246a114..102addd 100644 --- a/homotopy/fwedge.hlean +++ b/homotopy/fwedge.hlean @@ -7,7 +7,7 @@ The Wedge Sum of a family of Pointed Types -/ import homotopy.wedge ..move_to_lib ..choice -open eq pushout pointed unit trunc_index sigma bool equiv trunc choice unit is_trunc sigma.ops lift +open eq is_equiv pushout pointed unit trunc_index sigma bool equiv trunc choice unit is_trunc sigma.ops lift function definition fwedge' {I : Type} (F : I → Type*) : Type := pushout (λi, ⟨i, Point (F i)⟩) (λi, ⋆) definition pt' [constructor] {I : Type} {F : I → Type*} : fwedge' F := inr ⋆ @@ -123,6 +123,15 @@ namespace fwedge { exact con.left_inv (respect_pt g) } end + definition fwedge_pmap_pinl [constructor] {I : Type} {F : I → Type*} : fwedge_pmap (λi, pinl i) ~* pid (⋁ F) := + begin + fconstructor, + { intro x, induction x, + reflexivity, reflexivity, + apply eq_pathover, apply hdeg_square, refine !elim_glue ⬝ !ap_id⁻¹ }, + { reflexivity } + end + definition fwedge_pmap_equiv [constructor] {I : Type} (F : I → Type*) (X : Type*) : ⋁F →* X ≃ Πi, F i →* X := begin @@ -203,8 +212,34 @@ namespace fwedge } end - definition plift_fwedge.{u v} {I : Type} {F : I → pType.{u}} : plift.{u v} (⋁ F) ≃* ⋁ (λ i, plift.{u v} (F i)) := + definition plift_fwedge.{u v} {I : Type} (F : I → pType.{u}) : plift.{u v} (⋁ F) ≃* ⋁ (plift.{u v} ∘ F) := calc plift.{u v} (⋁ F) ≃* ⋁ F : by exact !pequiv_plift ⁻¹ᵉ* - ... ≃* ⋁ (λ i, plift.{u v} (F i)) : by exact fwedge_pequiv (λ i, !pequiv_plift) + ... ≃* ⋁ (λ i, plift.{u v} (F i)) : by exact fwedge_pequiv (λ i, !pequiv_plift) + + definition fwedge_down_left.{u v} {I : Type} (F : I → pType) : ⋁ (F ∘ down.{u v}) ≃* ⋁ F := + let pto := @fwedge_pmap (lift.{u v} I) (F ∘ down) (⋁ F) (λ i, pinl (down i)) in + let pfrom := @fwedge_pmap I F (⋁ (F ∘ down.{u v})) (λ i, pinl (up.{u v} i)) in + begin + fapply pequiv_of_pmap, + { exact pto }, + fapply adjointify, + { exact pfrom }, + { intro x, exact calc pto (pfrom x) = fwedge_pmap (λ i, (pto ∘* pfrom) ∘* pinl i) x : by exact (fwedge_pmap_eta (pto ∘* pfrom) x)⁻¹ + ... = fwedge_pmap (λ i, pto ∘* (pfrom ∘* pinl i)) x : by exact fwedge_pmap_phomotopy (λ i, passoc pto pfrom (pinl i)) x + ... = fwedge_pmap (λ i, pto ∘* pinl (up.{u v} i)) x : by exact fwedge_pmap_phomotopy (λ i, pwhisker_left pto (fwedge_pmap_beta (λ i, pinl (up.{u v} i)) i)) x + ... = fwedge_pmap pinl x : by exact fwedge_pmap_phomotopy (λ i, fwedge_pmap_beta (λ i, (pinl (down.{u v} i))) (up.{u v} i)) x + ... = x : by exact fwedge_pmap_pinl x + }, + { intro x, exact calc pfrom (pto x) = fwedge_pmap (λ i, (pfrom ∘* pto) ∘* pinl i) x : by exact (fwedge_pmap_eta (pfrom ∘* pto) x)⁻¹ + ... = fwedge_pmap (λ i, pfrom ∘* (pto ∘* pinl i)) x : by exact fwedge_pmap_phomotopy (λ i, passoc pfrom pto (pinl i)) x + ... = fwedge_pmap (λ i, pfrom ∘* pinl (down.{u v} i)) x : by exact fwedge_pmap_phomotopy (λ i, pwhisker_left pfrom (fwedge_pmap_beta (λ i, pinl (down.{u v} i)) i)) x + ... = fwedge_pmap pinl x : by exact fwedge_pmap_phomotopy (λ i, + begin induction i with i, + exact fwedge_pmap_beta (λ i, (pinl (up.{u v} i))) i + end + ) x + ... = x : by exact fwedge_pmap_pinl x + } + end end fwedge