Groupoidal and truncated n-quasi-categories

Abstract

We define groupoidal and (n+k)-truncated n-quasi-categories, which are the translation to the world of n-quasi-categories of groupoidal and truncated (∞, n)--spaces defined by Rezk. We show that these objects are the fibrant objects of model structures on the category of presheaves on n obtained by localisation of Ara's model structure for n-quasi-categories. Furthermore, we prove that the inclusion n induces a Quillen equivalence between the model structure for groupoidal (resp. and n-truncated) n-quasi-categories and the Kan-Quillen model structure for spaces (resp. homotopy n-types) on simplicial sets. To get to these results, we also construct a cylinder object for n-quasi-categories.