The (∞,2)-category of internal (∞,1)-categories

Abstract

We define and study the (∞,2)-category Cat∞(C) of (∞,1)-categories internal to a general (∞,1)-category C via an associated externalization construction. In the first part, we show various formal closure properties of Cat∞(C) regarding limits, tensors, cotensors and internal mapping objects under the assumption of various suitable closure properties of C. In particular, we show that Cat∞(C) defines a cartesian closed full sub-∞-cosmos of the ∞-cosmos Fun(Cop,Cat∞) of C-indexed (∞,1)-categories under suitable assumptions on C. We furthermore characterize the objects of Cat∞(C) by means of a Yoneda lemma that expresses indexed diagrams of internal shape over C in terms of an (∞,1)-categorical totalization. In the second part, we relate the general theory developed to this point to results in the model categorical literature. We show that every model category M gives rise to a ''hands-on'' ∞-cosmos Cat∞(M) (of not-necessarily cofibrant objects) directly by restriction of the Reedy model structure on M^op. We then define an according right derived model categorical externalization functor, and use it to show that the (∞,1)-categorical and the model categorical constructions correspond to one another whenever C is presentable and M is a suitable presentation thereof.