Cartesian Fibrations of (∞,2)-categories

Abstract

In this article we introduce four variance flavours of cartesian 2-fibrations of ∞-bicategories with ∞-bicategorical fibres, in the framework of scaled simplicial sets. Given a map p E →B of ∞-bicategories, we define p-(co)cartesian arrows and inner/outer triangles by means of lifting properties against p. Inner/outer (co)cartesian 2-fibrations are then defined to be maps with enough (co)cartesian lifts for arrows and enough inner/outer lifts for triangles, together with a compatibility property with respect to whiskerings in the outer case. By doing so, we also recover in particular the case of ∞-bicategories fibred in ∞-categories studied in previous work. We also prove that equivalences of such 2-fibrations can be tested fiberwise. As a motivating example, we show that the domain projection d(1,C)→ C is a prototypical example of an outer cartesian 2-fibration, where RMap(X,Y) denotes the ∞-bicategory of functors, lax natural transformations and modifications. We then define inner/outer (co)cartesian 2-fibrations of categories enriched in ∞-categories, and we show that a fibration p E → B of such categories is a (co)cartesian inner/outer 2-fibration if and only if the corresponding scaled nerve Nsc(p) NscE → NscB is a fibration of this type between ∞-bicategories.