feat(precategory): add composition of nat. trans. with functor
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2 changed files with 22 additions and 2 deletions
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@ -150,7 +150,7 @@ namespace iso
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namespace iso
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namespace iso
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attribute to_hom [coercion]
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attribute to_hom [coercion]
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definition MK (f : a ⟶ b) (g : b ⟶ a) (H1 : g ∘ f = id) (H2 : f ∘ g = id) :=
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protected definition MK (f : a ⟶ b) (g : b ⟶ a) (H1 : g ∘ f = id) (H2 : f ∘ g = id) :=
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@mk _ _ _ _ f (is_iso.mk H1 H2)
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@mk _ _ _ _ f (is_iso.mk H1 H2)
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definition to_inv (f : a ≅ b) : b ⟶ a :=
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definition to_inv (f : a ≅ b) : b ⟶ a :=
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@ -15,7 +15,7 @@ structure nat_trans {C D : Precategory} (F G : C ⇒ D) :=
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namespace nat_trans
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namespace nat_trans
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infixl `⟹`:25 := nat_trans -- \==>
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infixl `⟹`:25 := nat_trans -- \==>
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variables {C D E : Precategory} {F G H I : C ⇒ D} {F' G' : D ⇒ E}
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variables {B C D E : Precategory} {F G H I : C ⇒ D} {F' G' : D ⇒ E}
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attribute natural_map [coercion]
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attribute natural_map [coercion]
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@ -108,6 +108,26 @@ namespace nat_trans
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: (θ ∘nf G) ∘n (F' ∘fn η) = (G' ∘fn η) ∘n (θ ∘nf F) :=
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: (θ ∘nf G) ∘n (F' ∘fn η) = (G' ∘fn η) ∘n (θ ∘nf F) :=
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nat_trans_eq_mk (λc, (naturality θ (η c))⁻¹)
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nat_trans_eq_mk (λc, (naturality θ (η c))⁻¹)
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definition fn_n_distrib (F' : D ⇒ E) (η : G ⟹ H) (θ : F ⟹ G)
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: F' ∘fn (η ∘n θ) = (F' ∘fn η) ∘n (F' ∘fn θ) :=
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nat_trans_eq_mk (λc, !respect_comp)
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definition n_nf_distrib (η : G ⟹ H) (θ : F ⟹ G) (F' : B ⇒ C)
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: (η ∘n θ) ∘nf F' = (η ∘nf F') ∘n (θ ∘nf F') :=
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nat_trans_eq_mk (λc, idp)
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definition fn_id (F' : D ⇒ E) : F' ∘fn nat_trans.ID F = nat_trans.id :=
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nat_trans_eq_mk (λc, !respect_id)
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definition id_nf (F' : B ⇒ C) : nat_trans.ID F ∘nf F' = nat_trans.id :=
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nat_trans_eq_mk (λc, idp)
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definition id_fn (η : G ⟹ H) (c : C) : (functor.id ∘fn η) c = η c :=
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idp
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definition nf_id (η : G ⟹ H) (c : C) : (η ∘nf functor.id) c = η c :=
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idp
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definition nat_trans_of_eq [reducible] (p : F = G) : F ⟹ G :=
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definition nat_trans_of_eq [reducible] (p : F = G) : F ⟹ G :=
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nat_trans.mk (λc, hom_of_eq (ap010 to_fun_ob p c))
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nat_trans.mk (λc, hom_of_eq (ap010 to_fun_ob p c))
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(λa b f, eq.rec_on p (!id_right ⬝ !id_left⁻¹))
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(λa b f, eq.rec_on p (!id_right ⬝ !id_left⁻¹))
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