Limit and colimit of presheaves

In category theory, a branch of mathematics, a limit or a colimit of presheaves on a category C is a limit or colimit in the functor category ${\displaystyle \hat{C}=𝐅𝐜𝐭(C^{\text{op}},𝐒𝐞𝐭)}$.^[1]

The category ${\displaystyle \hat{C}}$ admits small limits and small colimits.^[2] Explicitly, if ${\displaystyle f:I\to \hat{C}}$ is a functor from a small category I and U is an object in C, then ${\displaystyle \underset{i\in I}{\underrightarrow{\lim }}f(i)}$ is computed pointwise:

${\displaystyle (\underrightarrow{\lim }f(i))(U)=\underrightarrow{\lim }f(i)(U).}$

The same is true for small limits. Concretely this means that, for example, a fiber product exists and is computed pointwise.

When C is small, by the Yoneda lemma, one can view C as the full subcategory of ${\displaystyle \hat{C}}$. If ${\displaystyle \eta :C\to D}$ is a functor, if ${\displaystyle f:I\to C}$ is a functor from a small category I and if the colimit ${\displaystyle \underrightarrow{\lim }f}$ in ${\displaystyle \hat{C}}$ is representable; i.e., isomorphic to an object in C, then,^[3] in D,

${\displaystyle \eta (\underrightarrow{\lim }f)\simeq \underrightarrow{\lim }\eta \circ f,}$

(in particular the colimit on the right exists in D.)

The density theorem states that every presheaf is a colimit of representable presheaves.

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