Marked colimits and higher cofinality

Abstract

Given a marked ∞-category D (i.e. an ∞-category equipped with a specified collection of morphisms) and a functor F: D B with values in an ∞-bicategory, we define colim F, the marked colimit of F. We provide a definition of weighted colimits in ∞-bicategories when the indexing diagram is an ∞-category and show that they can be computed in terms of marked colimits. In the maximally marked case D, our construction retrieves the ∞-categorical colimit of F in the underlying ∞-category B ⊂eq B. In the specific case when B=Cat∞, the ∞-bicategory of ∞-categories and D is minimally marked, we recover the definition of lax colimit of Gepner-Haugseng-Nikolaus. We show that a suitable ∞-localization of the associated coCartesian fibration UnD(F) computes colim F. Our main theorem is a characterization of those functors of marked ∞-categories f:C D which are marked cofinal. More precisely, we provide sufficient and necessary criteria for the restriction of diagrams along f to preserve marked colimits.