The universality of the Rezk nerve

Abstract

We functorially associate to each relative ∞-category (R,W) a simplicial space NR∞(R,W), called its Rezk nerve (a straightforward generalization of Rezk's "classification diagram" construction for relative categories). We prove the following local and global universal properties of this construction: (i) that the complete Segal space generated by the Rezk nerve NR∞(R,W) is precisely the one corresponding to the localization R[[W-1]]; and (ii) that the Rezk nerve functor defines an equivalence RelCat∞ [[ WBK-1 ]] Cat∞ from a localization of the ∞-category of relative ∞-categories to the ∞-category of ∞-categories.