Exponentiable Higher Toposes

Abstract

We characterise the class of exponentiable ∞-toposes: X is exponentiable if and only if Sh( X) is a continuous ∞-category. The heart of the proof is the description of the ∞-category of C-valued sheaves on X as an ∞-category of functors that satisfy finite limits conditions as well as filtered colimits conditions (instead of limits conditions purely); we call such functors ω-continuous sheaves. As an application, we show that when X is exponentiable, its ∞-category of stable sheaves Sh( X, Sp) is a dualisable object in the ∞-category of presentable stable ∞-categories.