Comparing lax functors of (∞,2)-categories

Abstract

In this work, we study oplax normalised functors of (∞,2)-categories. Our main theorem is a comparison between the notion of oplax normalised functor of scaled simplicial sets due to Gagna-Harpaz-Lanari and the corresponding notion in the setting of complete Segal objects in (∞,1)-categories studied by Gaitsgory and Rozenblyum. As a corollary, we derive that the Gray tensor product of (∞,2)-categories as defined by Gaitsgory-Rozenblyum is equivalent to that of Gagna-Harpaz-Lanari. Moreover, we construct an (∞,2)-categorical variant of the quintet functor of Ehresmann, from the (∞,2)-category of (∞,2)-categories to the (∞,2)-category of double (∞,1)-categories and show that it is fully faithful. As a key technical ingredient, given (C,E) an (∞,2)-category equipped with a collection of morphisms and a functor of (∞,2)-categories f:C D, we construct a right adjoint to the restriction functor f* from the (∞,2)-category of functors D C\!at(∞,2) and natural transformations to the (∞,2)-category of functors C C\!at(∞,2) and partially lax (according to E) natural transformations. We apply this new technology of partially lax Kan extensions to the study of complete Segal objects in (∞,1)-categories and double (∞,1)-categories which allows us to define the notion of an enhanced Segal object (resp. enhanced double (∞,1)-category), the former yielding yet another model for the theory of (∞,2)-categories.

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