Lemma 14.17.2. Assume the category $\mathcal{C}$ has coproducts of any two objects and countable limits. Let $U$ be a simplicial set, with $U_ n$ finite nonempty for all $n \geq 0$. Let $V$ be a simplicial object of $\mathcal{C}$. Then the functor
is representable.
Proof. A morphism from $X \times U$ into $V$ is given by a collection of morphisms $f_ u : X \to V_ n$ with $n \geq 0$ and $u \in U_ n$. And such a collection actually defines a morphism if and only if for all $\varphi : [m] \to [n]$ all the diagrams
commute. Thus it is natural to introduce a category $\mathcal{U}$ and a functor $\mathcal{V} : \mathcal{U}^{opp} \to \mathcal{C}$ as follows:
The set of objects of $\mathcal{U}$ is $\coprod _{n \geq 0} U_ n$,
a morphism from $u' \in U_ m$ to $u \in U_ n$ is a $\varphi : [m] \to [n]$ such that $U(\varphi )(u) = u'$
for $u \in U_ n$ we set $\mathcal{V}(u) = V_ n$, and
for $\varphi : [m] \to [n]$ such that $U(\varphi )(u) = u'$ we set $\mathcal{V}(\varphi ) = V(\varphi ) : V_ n \to V_ m$.
At this point it is clear that our functor is nothing but the functor defining
Thus if $\mathcal{C}$ has countable limits then this limit and hence an object representing the functor of the lemma exist. $\square$
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