Density_theorem_(category_theory) Knowpia

In category theory, a branch of mathematics, the density theorem states that every presheaf of sets is a colimit of representable presheaves in a canonical way.^[1]

For example, by definition, a simplicial set is a presheaf on the simplex category Δ and a representable simplicial set is exactly of the form $\Delta ^{n}=\operatorname {Hom} (-,[n])$ (called the standard n-simplex) so the theorem says: for each simplicial set X,

X\simeq \varinjlim \Delta ^{n}

where the colim runs over an index category determined by X.

Statement edit

Let F be a presheaf on a category C; i.e., an object of the functor category ${\widehat {C}}=\mathbf {Fct} (C^{\text{op}},\mathbf {Set} )$ . For an index category over which a colimit will run, let I be the category of elements of F: it is the category where

an object is a pair $(U,x)$ consisting of an object U in C and an element $x\in F(U)$ ,
a morphism $(U,x)\to (V,y)$ consists of a morphism $u:U\to V$ in C such that $(Fu)(y)=x.$

It comes with the forgetful functor $p:I\to C$ .

Then F is the colimit of the diagram (i.e., a functor)

I{\overset {p}{\to }}C\to {\widehat {C}}

where the second arrow is the Yoneda embedding: $U\mapsto h_{U}=\operatorname {Hom} (-,U)$ .

Proof edit

Let f denote the above diagram. To show the colimit of f is F, we need to show: for every presheaf G on C, there is a natural bijection:

\operatorname {Hom} _{\widehat {C}}(F,G)\simeq \operatorname {Hom} (f,\Delta _{G})

where $\Delta _{G}$ is the constant functor with value G and Hom on the right means the set of natural transformations. This is because the universal property of a colimit amounts to saying $\varinjlim -$ is the left adjoint to the diagonal functor $\Delta _{-}.$

For this end, let $\alpha :f\to \Delta _{G}$ be a natural transformation. It is a family of morphisms indexed by the objects in I:

\alpha _{U,x}:f(U,x)=h_{U}\to \Delta _{G}(U,x)=G

that satisfies the property: for each morphism $(U,x)\to (V,y),u:U\to V$ in I, $\alpha _{V,y}\circ h_{u}=\alpha _{U,x}$ (since $f((U,x)\to (V,y))=h_{u}.$ )

The Yoneda lemma says there is a natural bijection $G(U)\simeq \operatorname {Hom} (h_{U},G)$ . Under this bijection, $\alpha _{U,x}$ corresponds to a unique element $g_{U,x}\in G(U)$ . We have:

(Gu)(g_{V,y})=g_{U,x}

because, according to the Yoneda lemma, $Gu:G(V)\to G(U)$ corresponds to $-\circ h_{u}:\operatorname {Hom} (h_{V},G)\to \operatorname {Hom} (h_{U},G).$

Now, for each object U in C, let $\theta _{U}:F(U)\to G(U)$ be the function given by $\theta _{U}(x)=g_{U,x}$ . This determines the natural transformation $\theta :F\to G$ ; indeed, for each morphism $(U,x)\to (V,y),u:U\to V$ in I, we have:

(Gu\circ \theta _{V})(y)=(Gu)(g_{V,y})=g_{U,x}=(\theta _{U}\circ Fu)(y),

since $(Fu)(y)=x$ . Clearly, the construction $\alpha \mapsto \theta$ is reversible. Hence, $\alpha \mapsto \theta$ is the requisite natural bijection.