Internal Grothendieck construction for enriched categories

Abstract

Given a cartesian closed category V, we introduce an internal category of elements ∫C F associated to a V-functor F Cop V. When V is extensive, we show that this internal Grothendieck construction gives an equivalence of categories between V-functors Cop V and internal discrete fibrations over C, which can be promoted to an equivalence of V-categories. Using this construction, we prove a representation theorem for V-categories, stating that a V-functor F Cop V is V-representable if and only if its internal category of elements ∫C F has an internal terminal object. We further obtain a characterization formulated completely in terms of V-categories using shifted V-categories of elements. Moreover, in the presence of V-tensors, we show that it is enough to consider V-terminal objects in the underlying V-category Und∫C F to test the representability of a V-functor F. We apply these results to the study of weighted V-limits, and also obtain a novel result describing weighted V-limits as certain conical internal limits.