/- Copyright (c) 2014 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Module: algebra.category.morphism Author: Floris van Doorn -/ import .basic algebra.relation algebra.binary open eq eq.ops category namespace morphism variables {ob : Type} [C : category ob] include C variables {a b c : ob} {g : b ⟶ c} {f : a ⟶ b} {h : b ⟶ a} inductive is_section [class] (f : a ⟶ b) : Type := mk : ∀{g}, g ∘ f = id → is_section f inductive is_retraction [class] (f : a ⟶ b) : Type := mk : ∀{g}, f ∘ g = id → is_retraction f inductive is_iso [class] (f : a ⟶ b) : Type := mk : ∀{g}, g ∘ f = id → f ∘ g = id → is_iso f attribute is_iso [multiple-instances] definition retraction_of (f : a ⟶ b) [H : is_section f] : hom b a := is_section.rec (λg h, g) H definition section_of (f : a ⟶ b) [H : is_retraction f] : hom b a := is_retraction.rec (λg h, g) H definition inverse (f : a ⟶ b) [H : is_iso f] : hom b a := is_iso.rec (λg h1 h2, g) H postfix `⁻¹` := inverse theorem inverse_compose (f : a ⟶ b) [H : is_iso f] : f⁻¹ ∘ f = id := is_iso.rec (λg h1 h2, h1) H theorem compose_inverse (f : a ⟶ b) [H : is_iso f] : f ∘ f⁻¹ = id := is_iso.rec (λg h1 h2, h2) H theorem retraction_compose (f : a ⟶ b) [H : is_section f] : retraction_of f ∘ f = id := is_section.rec (λg h, h) H theorem compose_section (f : a ⟶ b) [H : is_retraction f] : f ∘ section_of f = id := is_retraction.rec (λg h, h) H theorem iso_imp_retraction [instance] (f : a ⟶ b) [H : is_iso f] : is_section f := is_section.mk !inverse_compose theorem iso_imp_section [instance] (f : a ⟶ b) [H : is_iso f] : is_retraction f := is_retraction.mk !compose_inverse theorem id_is_iso [instance] : is_iso (ID a) := is_iso.mk !id_compose !id_compose theorem inverse_is_iso [instance] (f : a ⟶ b) [H : is_iso f] : is_iso (f⁻¹) := is_iso.mk !compose_inverse !inverse_compose theorem left_inverse_eq_right_inverse {f : a ⟶ b} {g g' : hom b a} (Hl : g ∘ f = id) (Hr : f ∘ g' = id) : g = g' := calc g = g ∘ id : symm !id_right ... = g ∘ f ∘ g' : {symm Hr} ... = (g ∘ f) ∘ g' : !assoc ... = id ∘ g' : {Hl} ... = g' : !id_left theorem retraction_eq_intro [H : is_section f] (H2 : f ∘ h = id) : retraction_of f = h := left_inverse_eq_right_inverse !retraction_compose H2 theorem section_eq_intro [H : is_retraction f] (H2 : h ∘ f = id) : section_of f = h := symm (left_inverse_eq_right_inverse H2 !compose_section) theorem inverse_eq_intro_right [H : is_iso f] (H2 : f ∘ h = id) : f⁻¹ = h := left_inverse_eq_right_inverse !inverse_compose H2 theorem inverse_eq_intro_left [H : is_iso f] (H2 : h ∘ f = id) : f⁻¹ = h := symm (left_inverse_eq_right_inverse H2 !compose_inverse) theorem section_eq_retraction (f : a ⟶ b) [Hl : is_section f] [Hr : is_retraction f] : retraction_of f = section_of f := retraction_eq_intro !compose_section theorem section_retraction_imp_iso (f : a ⟶ b) [Hl : is_section f] [Hr : is_retraction f] : is_iso f := is_iso.mk (subst (section_eq_retraction f) (retraction_compose f)) (compose_section f) theorem inverse_unique (H H' : is_iso f) : @inverse _ _ _ _ f H = @inverse _ _ _ _ f H' := inverse_eq_intro_left !inverse_compose theorem inverse_involutive (f : a ⟶ b) [H : is_iso f] : (f⁻¹)⁻¹ = f := inverse_eq_intro_right !inverse_compose theorem retraction_of_id : retraction_of (ID a) = id := retraction_eq_intro !id_compose theorem section_of_id : section_of (ID a) = id := section_eq_intro !id_compose theorem iso_of_id : (ID a)⁻¹ = id := inverse_eq_intro_left !id_compose theorem composition_is_section [instance] [Hf : is_section f] [Hg : is_section g] : is_section (g ∘ f) := is_section.mk (calc (retraction_of f ∘ retraction_of g) ∘ g ∘ f = retraction_of f ∘ retraction_of g ∘ g ∘ f : symm (assoc _ _ (g ∘ f)) ... = retraction_of f ∘ (retraction_of g ∘ g) ∘ f : {assoc _ g f} ... = retraction_of f ∘ id ∘ f : {retraction_compose g} ... = retraction_of f ∘ f : {id_left f} ... = id : !retraction_compose) theorem composition_is_retraction [instance] (Hf : is_retraction f) (Hg : is_retraction g) : is_retraction (g ∘ f) := is_retraction.mk (calc (g ∘ f) ∘ section_of f ∘ section_of g = g ∘ f ∘ section_of f ∘ section_of g : symm !assoc ... = g ∘ (f ∘ section_of f) ∘ section_of g : {assoc f _ _} ... = g ∘ id ∘ section_of g : {compose_section f} ... = g ∘ section_of g : {id_left (section_of g)} ... = id : !compose_section) theorem composition_is_inverse [instance] (Hf : is_iso f) (Hg : is_iso g) : is_iso (g ∘ f) := !section_retraction_imp_iso structure isomorphic (a b : ob) := (iso : a ⟶ b) [is_iso : is_iso iso] infix `≅`:50 := morphism.isomorphic namespace isomorphic open relation attribute is_iso [instance] theorem refl (a : ob) : a ≅ a := mk id theorem symm ⦃a b : ob⦄ (H : a ≅ b) : b ≅ a := mk (inverse (iso H)) theorem trans ⦃a b c : ob⦄ (H1 : a ≅ b) (H2 : b ≅ c) : a ≅ c := mk (iso H2 ∘ iso H1) theorem is_equivalence_eq [instance] (T : Type) : is_equivalence isomorphic := is_equivalence.mk refl symm trans end isomorphic inductive is_mono [class] (f : a ⟶ b) : Prop := mk : (∀c (g h : hom c a), f ∘ g = f ∘ h → g = h) → is_mono f inductive is_epi [class] (f : a ⟶ b) : Prop := mk : (∀c (g h : hom b c), g ∘ f = h ∘ f → g = h) → is_epi f theorem mono_elim [H : is_mono f] {g h : c ⟶ a} (H2 : f ∘ g = f ∘ h) : g = h := is_mono.rec (λH3, H3 c g h H2) H theorem epi_elim [H : is_epi f] {g h : b ⟶ c} (H2 : g ∘ f = h ∘ f) : g = h := is_epi.rec (λH3, H3 c g h H2) H theorem section_is_mono [instance] (f : a ⟶ b) [H : is_section f] : is_mono f := is_mono.mk (λ c g h H, calc g = id ∘ g : symm !id_left ... = (retraction_of f ∘ f) ∘ g : {symm (retraction_compose f)} ... = retraction_of f ∘ f ∘ g : symm !assoc ... = retraction_of f ∘ f ∘ h : {H} ... = (retraction_of f ∘ f) ∘ h : !assoc ... = id ∘ h : {retraction_compose f} ... = h : !id_left) theorem retraction_is_epi [instance] (f : a ⟶ b) [H : is_retraction f] : is_epi f := is_epi.mk (λ c g h H, calc g = g ∘ id : symm !id_right ... = g ∘ f ∘ section_of f : {symm (compose_section f)} ... = (g ∘ f) ∘ section_of f : !assoc ... = (h ∘ f) ∘ section_of f : {H} ... = h ∘ f ∘ section_of f : symm !assoc ... = h ∘ id : {compose_section f} ... = h : !id_right) --these theorems are now proven automatically using type classes --should they be instances? theorem id_is_mono : is_mono (ID a) theorem id_is_epi : is_epi (ID a) theorem composition_is_mono [instance] [Hf : is_mono f] [Hg : is_mono g] : is_mono (g ∘ f) := is_mono.mk (λ d h₁ h₂ H, have H2 : g ∘ (f ∘ h₁) = g ∘ (f ∘ h₂), from symm (assoc g f h₁) ▸ symm (assoc g f h₂) ▸ H, mono_elim (mono_elim H2)) theorem composition_is_epi [instance] [Hf : is_epi f] [Hg : is_epi g] : is_epi (g ∘ f) := is_epi.mk (λ d h₁ h₂ H, have H2 : (h₁ ∘ g) ∘ f = (h₂ ∘ g) ∘ f, from assoc h₁ g f ▸ assoc h₂ g f ▸ H, epi_elim (epi_elim H2)) end morphism namespace morphism --rewrite lemmas for inverses, modified from --https://github.com/JasonGross/HoTT-categories/blob/master/theories/Categories/Category/Morphisms.v namespace iso section variables {ob : Type} [C : category ob] include C variables {a b c d : ob} (f : b ⟶ a) (r : c ⟶ d) (q : b ⟶ c) (p : a ⟶ b) (g : d ⟶ c) variable [Hq : is_iso q] include Hq theorem compose_pV : q ∘ q⁻¹ = id := !compose_inverse theorem compose_Vp : q⁻¹ ∘ q = id := !inverse_compose theorem compose_V_pp : q⁻¹ ∘ (q ∘ p) = p := calc q⁻¹ ∘ (q ∘ p) = (q⁻¹ ∘ q) ∘ p : assoc (q⁻¹) q p ... = id ∘ p : {inverse_compose q} ... = p : id_left p theorem compose_p_Vp : q ∘ (q⁻¹ ∘ g) = g := calc q ∘ (q⁻¹ ∘ g) = (q ∘ q⁻¹) ∘ g : assoc q (q⁻¹) g ... = id ∘ g : {compose_inverse q} ... = g : id_left g theorem compose_pp_V : (r ∘ q) ∘ q⁻¹ = r := calc (r ∘ q) ∘ q⁻¹ = r ∘ q ∘ q⁻¹ : (assoc r q (q⁻¹))⁻¹ ... = r ∘ id : {compose_inverse q} ... = r : id_right r theorem compose_pV_p : (f ∘ q⁻¹) ∘ q = f := calc (f ∘ q⁻¹) ∘ q = f ∘ q⁻¹ ∘ q : (assoc f (q⁻¹) q)⁻¹ ... = f ∘ id : {inverse_compose q} ... = f : id_right f theorem inv_pp [H' : is_iso p] : (q ∘ p)⁻¹ = p⁻¹ ∘ q⁻¹ := have H1 : (p⁻¹ ∘ q⁻¹) ∘ q ∘ p = p⁻¹ ∘ (q⁻¹ ∘ (q ∘ p)), from (assoc (p⁻¹) (q⁻¹) (q ∘ p))⁻¹, have H2 : (p⁻¹) ∘ (q⁻¹ ∘ (q ∘ p)) = p⁻¹ ∘ p, from congr_arg _ (compose_V_pp q p), have H3 : p⁻¹ ∘ p = id, from inverse_compose p, inverse_eq_intro_left (H1 ⬝ H2 ⬝ H3) --the proof using calc is hard for the unifier (needs ~90k steps) -- inverse_eq_intro_left -- (calc -- (p⁻¹ ∘ (q⁻¹)) ∘ q ∘ p = p⁻¹ ∘ (q⁻¹ ∘ (q ∘ p)) : assoc (p⁻¹) (q⁻¹) (q ∘ p)⁻¹ -- ... = (p⁻¹) ∘ p : congr_arg (λx, p⁻¹ ∘ x) (compose_V_pp q p) -- ... = id : inverse_compose p) theorem inv_Vp [H' : is_iso g] : (q⁻¹ ∘ g)⁻¹ = g⁻¹ ∘ q := inverse_involutive q ▸ inv_pp (q⁻¹) g theorem inv_pV [H' : is_iso f] : (q ∘ f⁻¹)⁻¹ = f ∘ q⁻¹ := inverse_involutive f ▸ inv_pp q (f⁻¹) theorem inv_VV [H' : is_iso r] : (q⁻¹ ∘ r⁻¹)⁻¹ = r ∘ q := inverse_involutive r ▸ inv_Vp q (r⁻¹) end section variables {ob : Type} {C : category ob} include C variables {d c b a : ob} {i : b ⟶ c} {f : b ⟶ a} {r : c ⟶ d} {q : b ⟶ c} {p : a ⟶ b} {g : d ⟶ c} {h : c ⟶ b} {x : b ⟶ d} {z : a ⟶ c} {y : d ⟶ b} {w : c ⟶ a} variable [Hq : is_iso q] include Hq theorem moveR_Mp (H : y = q⁻¹ ∘ g) : q ∘ y = g := H⁻¹ ▸ compose_p_Vp q g theorem moveR_pM (H : w = f ∘ q⁻¹) : w ∘ q = f := H⁻¹ ▸ compose_pV_p f q theorem moveR_Vp (H : z = q ∘ p) : q⁻¹ ∘ z = p := H⁻¹ ▸ compose_V_pp q p theorem moveR_pV (H : x = r ∘ q) : x ∘ q⁻¹ = r := H⁻¹ ▸ compose_pp_V r q theorem moveL_Mp (H : q⁻¹ ∘ g = y) : g = q ∘ y := (moveR_Mp (H⁻¹))⁻¹ theorem moveL_pM (H : f ∘ q⁻¹ = w) : f = w ∘ q := (moveR_pM (H⁻¹))⁻¹ theorem moveL_Vp (H : q ∘ p = z) : p = q⁻¹ ∘ z := (moveR_Vp (H⁻¹))⁻¹ theorem moveL_pV (H : r ∘ q = x) : r = x ∘ q⁻¹ := (moveR_pV (H⁻¹))⁻¹ theorem moveL_1V (H : h ∘ q = id) : h = q⁻¹ := (inverse_eq_intro_left H)⁻¹ theorem moveL_V1 (H : q ∘ h = id) : h = q⁻¹ := (inverse_eq_intro_right H)⁻¹ theorem moveL_1M (H : i ∘ q⁻¹ = id) : i = q := moveL_1V H ⬝ inverse_involutive q theorem moveL_M1 (H : q⁻¹ ∘ i = id) : i = q := moveL_V1 H ⬝ inverse_involutive q theorem moveR_1M (H : id = i ∘ q⁻¹) : q = i := (moveL_1M (H⁻¹))⁻¹ theorem moveR_M1 (H : id = q⁻¹ ∘ i) : q = i := (moveL_M1 (H⁻¹))⁻¹ theorem moveR_1V (H : id = h ∘ q) : q⁻¹ = h := (moveL_1V (H⁻¹))⁻¹ theorem moveR_V1 (H : id = q ∘ h) : q⁻¹ = h := (moveL_V1 (H⁻¹))⁻¹ end end iso end morphism