HepLean Documentation

Mathlib.CategoryTheory.Whiskering

Whiskering #

Given a functor F : C ⥤ D and functors G H : D ⥤ E and a natural transformation α : G ⟶ H, we can construct a new natural transformation F ⋙ G ⟶ F ⋙ H, called whiskerLeft F α. This is the same as the horizontal composition of 𝟙 F with α.

This operation is functorial in F, and we package this as whiskeringLeft. Here (whiskeringLeft.obj F).obj G is F ⋙ G, and (whiskeringLeft.obj F).map α is whiskerLeft F α. (That is, we might have alternatively named this as the "left composition functor".)

We also provide analogues for composition on the right, and for these operations on isomorphisms.

At the end of the file, we provide the left and right unitors, and the associator, for functor composition. (In fact functor composition is definitionally associative, but very often relying on this causes extremely slow elaboration, so it is better to insert it explicitly.) We also show these natural isomorphisms satisfy the triangle and pentagon identities.

@[elab_without_expected_type]

If α : G ⟶ H then whiskerLeft F α : (F ⋙ G) ⟶ (F ⋙ H) has components α.app (F.obj X).

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    @[elab_without_expected_type]

    If α : G ⟶ H then whisker_right α F : (G ⋙ F) ⟶ (G ⋙ F) has components F.map (α.app X).

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      @[simp]
      theorem CategoryTheory.whiskeringLeft_map_app_app (C : Type u₁) [CategoryTheory.Category.{v₁, u₁} C] (D : Type u₂) [CategoryTheory.Category.{v₂, u₂} D] (E : Type u₃) [CategoryTheory.Category.{v₃, u₃} E] :
      ∀ {X Y : CategoryTheory.Functor C D} (τ : X Y) (H : CategoryTheory.Functor D E) (c : C), (((CategoryTheory.whiskeringLeft C D E).map τ).app H).app c = H.map (τ.app c)

      Left-composition gives a functor (C ⥤ D) ⥤ ((D ⥤ E) ⥤ (C ⥤ E)).

      (whiskeringLeft.obj F).obj G is F ⋙ G, and (whiskeringLeft.obj F).map α is whiskerLeft F α.

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        @[simp]

        Right-composition gives a functor (D ⥤ E) ⥤ ((C ⥤ D) ⥤ (C ⥤ E)).

        (whiskeringRight.obj H).obj F is F ⋙ H, and (whiskeringRight.obj H).map α is whiskerRight α H.

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          @[simp]
          theorem CategoryTheory.Functor.FullyFaithful.whiskeringRight_preimage_app {D : Type u₂} [CategoryTheory.Category.{v₂, u₂} D] {E : Type u₃} [CategoryTheory.Category.{v₃, u₃} E] {F : CategoryTheory.Functor D E} (hF : F.FullyFaithful) (C : Type u_1) [CategoryTheory.Category.{u_2, u_1} C] :
          ∀ {X Y : CategoryTheory.Functor C D} (f : ((CategoryTheory.whiskeringRight C D E).obj F).obj X ((CategoryTheory.whiskeringRight C D E).obj F).obj Y) (X_1 : C), ((hF.whiskeringRight C).preimage f).app X_1 = hF.preimage (f.app X_1)

          If F : D ⥤ E is fully faithful, then so is (whiskeringRight C D E).obj F : (C ⥤ D) ⥤ C ⥤ E.

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            The isomorphism between left-whiskering on the identity functor and the identity of the functor between the resulting functor categories.

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              The isomorphism between left-whiskering on the composition of functors and the composition of two left-whiskering applications.

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                The isomorphism between right-whiskering on the identity functor and the identity of the functor between the resulting functor categories.

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                  The isomorphism between right-whiskering on the composition of functors and the composition of two right-whiskering applications.

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                    If α : G ≅ H is a natural isomorphism then iso_whisker_left F α : (F ⋙ G) ≅ (F ⋙ H) has components α.app (F.obj X).

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                      If α : G ≅ H then iso_whisker_right α F : (G ⋙ F) ≅ (H ⋙ F) has components F.map_iso (α.app X).

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                        The left unitor, a natural isomorphism ((𝟭 _) ⋙ F) ≅ F.

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                          The right unitor, a natural isomorphism (F ⋙ (𝟭 B)) ≅ F.

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                            The associator for functors, a natural isomorphism ((F ⋙ G) ⋙ H) ≅ (F ⋙ (G ⋙ H)).

                            (In fact, iso.refl _ will work here, but it tends to make Lean slow later, and it's usually best to insert explicit associators.)

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