Localization of adjunctions #
In this file, we show that if we have an adjunction adj : G ⊣ F such that both
functors G : C₁ ⥤ C₂ and F : C₂ ⥤ C₁ induce functors
G' : D₁ ⥤ D₂ and F' : D₂ ⥤ D₁ on localized categories, i.e. that we
have localization functors L₁ : C₁ ⥤ D₁ and L₂ : C₂ ⥤ D₂ with respect
to morphism properties W₁ and W₂ respectively, and 2-commutative diagrams
[CatCommSq G L₁ L₂ G'] and [CatCommSq F L₂ L₁ F'], then we have an
induced adjunction Adjunction.localization L₁ W₁ L₂ W₂ G' F' : G' ⊣ F'.
noncomputable def
CategoryTheory.Adjunction.Localization.ε
{C₁ : Type u_1}
{C₂ : Type u_2}
{D₁ : Type u_3}
{D₂ : Type u_4}
[Category.{u_5, u_1} C₁]
[Category.{u_6, u_2} C₂]
[Category.{u_7, u_3} D₁]
[Category.{u_8, u_4} D₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
(L₁ : Functor C₁ D₁)
(W₁ : MorphismProperty C₁)
[L₁.IsLocalization W₁]
(L₂ : Functor C₂ D₂)
(G' : Functor D₁ D₂)
(F' : Functor D₂ D₁)
[CatCommSq G L₁ L₂ G']
[CatCommSq F L₂ L₁ F']
:
Auxiliary definition of the unit morphism for the adjunction Adjunction.localization
Equations
- One or more equations did not get rendered due to their size.
Instances For
theorem
CategoryTheory.Adjunction.Localization.ε_app
{C₁ : Type u_1}
{C₂ : Type u_2}
{D₁ : Type u_3}
{D₂ : Type u_4}
[Category.{u_6, u_1} C₁]
[Category.{u_8, u_2} C₂]
[Category.{u_5, u_3} D₁]
[Category.{u_7, u_4} D₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
(L₁ : Functor C₁ D₁)
(W₁ : MorphismProperty C₁)
[L₁.IsLocalization W₁]
(L₂ : Functor C₂ D₂)
(G' : Functor D₁ D₂)
(F' : Functor D₂ D₁)
[CatCommSq G L₁ L₂ G']
[CatCommSq F L₂ L₁ F']
(X₁ : C₁)
:
(ε adj L₁ W₁ L₂ G' F').app (L₁.obj X₁) = CategoryStruct.comp (L₁.map (adj.unit.app X₁))
(CategoryStruct.comp ((CatCommSq.iso F L₂ L₁ F').hom.app (G.obj X₁))
(F'.map ((CatCommSq.iso G L₁ L₂ G').hom.app X₁)))
noncomputable def
CategoryTheory.Adjunction.Localization.η
{C₁ : Type u_1}
{C₂ : Type u_2}
{D₁ : Type u_3}
{D₂ : Type u_4}
[Category.{u_5, u_1} C₁]
[Category.{u_6, u_2} C₂]
[Category.{u_7, u_3} D₁]
[Category.{u_8, u_4} D₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
(L₁ : Functor C₁ D₁)
(L₂ : Functor C₂ D₂)
(W₂ : MorphismProperty C₂)
[L₂.IsLocalization W₂]
(G' : Functor D₁ D₂)
(F' : Functor D₂ D₁)
[CatCommSq G L₁ L₂ G']
[CatCommSq F L₂ L₁ F']
:
Auxiliary definition of the counit morphism for the adjunction Adjunction.localization
Equations
- One or more equations did not get rendered due to their size.
Instances For
theorem
CategoryTheory.Adjunction.Localization.η_app
{C₁ : Type u_1}
{C₂ : Type u_2}
{D₁ : Type u_3}
{D₂ : Type u_4}
[Category.{u_8, u_1} C₁]
[Category.{u_7, u_2} C₂]
[Category.{u_6, u_3} D₁]
[Category.{u_5, u_4} D₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
(L₁ : Functor C₁ D₁)
(L₂ : Functor C₂ D₂)
(W₂ : MorphismProperty C₂)
[L₂.IsLocalization W₂]
(G' : Functor D₁ D₂)
(F' : Functor D₂ D₁)
[CatCommSq G L₁ L₂ G']
[CatCommSq F L₂ L₁ F']
(X₂ : C₂)
:
(η adj L₁ L₂ W₂ G' F').app (L₂.obj X₂) = CategoryStruct.comp (G'.map ((CatCommSq.iso F L₂ L₁ F').inv.app X₂))
(CategoryStruct.comp ((CatCommSq.iso G L₁ L₂ G').inv.app (F.obj X₂)) (L₂.map (adj.counit.app X₂)))
noncomputable def
CategoryTheory.Adjunction.localization
{C₁ : Type u_1}
{C₂ : Type u_2}
{D₁ : Type u_3}
{D₂ : Type u_4}
[Category.{u_5, u_1} C₁]
[Category.{u_6, u_2} C₂]
[Category.{u_7, u_3} D₁]
[Category.{u_8, u_4} D₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
(L₁ : Functor C₁ D₁)
(W₁ : MorphismProperty C₁)
[L₁.IsLocalization W₁]
(L₂ : Functor C₂ D₂)
(W₂ : MorphismProperty C₂)
[L₂.IsLocalization W₂]
(G' : Functor D₁ D₂)
(F' : Functor D₂ D₁)
[CatCommSq G L₁ L₂ G']
[CatCommSq F L₂ L₁ F']
:
If adj : G ⊣ F is an adjunction between two categories C₁ and C₂ that
are equipped with localization functors L₁ : C₁ ⥤ D₁ and L₂ : C₂ ⥤ D₂ with
respect to W₁ : MorphismProperty C₁ and W₂ : MorphismProperty C₂, and that
the functors F : C₂ ⥤ C₁ and G : C₁ ⥤ C₂ induce functors F' : D₂ ⥤ D₁
and G' : D₁ ⥤ D₂ on the localized categories, then the adjunction adj
induces an adjunction G' ⊣ F'.
Equations
- One or more equations did not get rendered due to their size.
Instances For
@[simp]
theorem
CategoryTheory.Adjunction.localization_unit_app
{C₁ : Type u_1}
{C₂ : Type u_2}
{D₁ : Type u_3}
{D₂ : Type u_4}
[Category.{u_6, u_1} C₁]
[Category.{u_8, u_2} C₂]
[Category.{u_5, u_3} D₁]
[Category.{u_7, u_4} D₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
(L₁ : Functor C₁ D₁)
(W₁ : MorphismProperty C₁)
[L₁.IsLocalization W₁]
(L₂ : Functor C₂ D₂)
(W₂ : MorphismProperty C₂)
[L₂.IsLocalization W₂]
(G' : Functor D₁ D₂)
(F' : Functor D₂ D₁)
[CatCommSq G L₁ L₂ G']
[CatCommSq F L₂ L₁ F']
(X₁ : C₁)
:
(adj.localization L₁ W₁ L₂ W₂ G' F').unit.app (L₁.obj X₁) = CategoryStruct.comp (L₁.map (adj.unit.app X₁))
(CategoryStruct.comp ((CatCommSq.iso F L₂ L₁ F').hom.app (G.obj X₁))
(F'.map ((CatCommSq.iso G L₁ L₂ G').hom.app X₁)))
@[simp]
theorem
CategoryTheory.Adjunction.localization_counit_app
{C₁ : Type u_1}
{C₂ : Type u_2}
{D₁ : Type u_3}
{D₂ : Type u_4}
[Category.{u_8, u_1} C₁]
[Category.{u_7, u_2} C₂]
[Category.{u_6, u_3} D₁]
[Category.{u_5, u_4} D₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
(L₁ : Functor C₁ D₁)
(W₁ : MorphismProperty C₁)
[L₁.IsLocalization W₁]
(L₂ : Functor C₂ D₂)
(W₂ : MorphismProperty C₂)
[L₂.IsLocalization W₂]
(G' : Functor D₁ D₂)
(F' : Functor D₂ D₁)
[CatCommSq G L₁ L₂ G']
[CatCommSq F L₂ L₁ F']
(X₂ : C₂)
:
(adj.localization L₁ W₁ L₂ W₂ G' F').counit.app (L₂.obj X₂) = CategoryStruct.comp (G'.map ((CatCommSq.iso F L₂ L₁ F').inv.app X₂))
(CategoryStruct.comp ((CatCommSq.iso G L₁ L₂ G').inv.app (F.obj X₂)) (L₂.map (adj.counit.app X₂)))
theorem
CategoryTheory.Adjunction.isLocalization
{C₁ : Type u_1}
{C₂ : Type u_2}
[Category.{u_6, u_1} C₁]
[Category.{u_5, u_2} C₂]
{G : Functor C₁ C₂}
{F : Functor C₂ C₁}
(adj : G ⊣ F)
[F.Full]
[F.Faithful]
: