A local-global principle for parametrized ∞-categories

Abstract

We prove a local-global principle for ∞-categories over any base ∞-category C: we show that any ∞-category B C over C is determined by the following data: the collection of fibers BX for X running through the set of equivalence classes of objects of C endowed with the action of the space of automorphisms AutX(B) on the fiber, the local data, together with a locally cartesian fibration D C and AutX(B)-linear equivalences DX P(BX) to the ∞-category of presheaves on BX, the gluing data. As applications we describe the ∞-category of small ∞-categories over [1] in terms of the ∞-category of left fibrations and prove an end formula for mapping spaces of the internal hom of the ∞-category of small ∞-categories over [1] and the conditionally existing internal hom of the ∞-category of small ∞-categories over any small ∞-category C. Considering functoriality in C we obtain as a corollary that the double ∞-category CORR of correspondences is the pullback of the double ∞-category PRL of presentable ∞-categories along the functor ∞Cat PrL taking presheaves. We deduce that ∞-categories over any ∞-category C are classified by normal lax 2-functors.