HepLean Documentation

Mathlib.CategoryTheory.Skeletal

Skeleton of a category #

Define skeletal categories as categories in which any two isomorphic objects are equal.

Construct the skeleton of an arbitrary category by taking isomorphism classes, and show it is a skeleton of the original category.

In addition, construct the skeleton of a thin category as a partial ordering, and (noncomputably) show it is a skeleton of the original category. The advantage of this special case being handled separately is that lemmas and definitions about orderings can be used directly, for example for the subobject lattice. In addition, some of the commutative diagrams about the functors commute definitionally on the nose which is convenient in practice.

A category is skeletal if isomorphic objects are equal.

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    IsSkeletonOf C D F says that F : D ⥤ C exhibits D as a skeletal full subcategory of C, in particular F is a (strong) equivalence and D is skeletal.

    • The category D has isomorphic objects equal

    • eqv : F.IsEquivalence

      The functor F is an equivalence

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      The functor F is an equivalence

      If C is thin and skeletal, then any naturally isomorphic functors to C are equal.

      Construct the skeleton category as the induced category on the isomorphism classes, and derive its category structure.

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        The functor from the skeleton of C to C.

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          The equivalence between the skeleton and the category itself.

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            Two categories which are categorically equivalent have skeletons with equivalent objects.

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              Construct the skeleton category by taking the quotient of objects. This construction gives a preorder with nice definitional properties, but is only really appropriate for thin categories. If your original category is not thin, you probably want to be using skeleton instead of this.

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                The functor from a category to its thin skeleton.

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                  The constructions here are intended to be used when the category C is thin, even though some of the statements can be shown without this assumption.

                  @[simp]
                  theorem CategoryTheory.ThinSkeleton.map_map {C : Type u₁} [CategoryTheory.Category.{v₁, u₁} C] {D : Type u₂} [CategoryTheory.Category.{v₂, u₂} D] (F : CategoryTheory.Functor C D) {X : CategoryTheory.ThinSkeleton C} {Y : CategoryTheory.ThinSkeleton C} :
                  ∀ (a : X Y), (CategoryTheory.ThinSkeleton.map F).map a = Quotient.recOnSubsingleton₂ (motive := fun (x x_1 : CategoryTheory.ThinSkeleton C) => (x x_1)(Quotient.map F.obj x Quotient.map F.obj x_1)) X Y (fun (x x_1 : C) (k : x x_1) => CategoryTheory.homOfLE ) a

                  A functor C ⥤ D computably lowers to a functor ThinSkeleton C ⥤ ThinSkeleton D.

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                    Given a natural transformation F₁ ⟶ F₂, induce a natural transformation map F₁ ⟶ map F₂.

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                      This provides natural transformations map₂Functor F x₁ ⟶ map₂Functor F x₂ given x₁ ⟶ x₂

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                        A functor C ⥤ D ⥤ E computably lowers to a functor ThinSkeleton C ⥤ ThinSkeleton D ⥤ ThinSkeleton E

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                          Use Quotient.out to create a functor out of the thin skeleton.

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                            The equivalence between the thin skeleton and the category itself.

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                              An adjunction between thin categories gives an adjunction between their thin skeletons.

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                                When e : C ≌ α is a categorical equivalence from a thin category C to some partial order α, the ThinSkeleton C is order isomorphic to α.

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