In this paper, we consider those morphisms $p : P\to B$ of posets for which the induced geometric morphism of presheaf toposes is exponentiable in the category of Grothendieck toposes. In particular, we show that a necessary condition is that the induced map $p^{\downarrow} : P^{\downarrow}\to B^{\downarrow}$ is exponentiable in the category of topological spaces, where $P^{\downarrow}$ is the space whose points are elements of $P$ and open sets are downward closed subsets of $P$. Along the way, we show that $p^{\downarrow} : P^{\downarrow}\to B^{\downarrow}$ is exponentiable if and only if $p : P\to B$ is exponentiable in the category of posets and satisfies an additional compactness condition. The criteria for exponentiability of morphisms of posets is related to (but weaker than) the factorization-lifting property for exponentiability of morphisms in the category of small categories (considered independently by Giraud and Conduché).