Understanding higher structures through Quillen-Segal objects

Abstract

If M is a model category and U: A → M is a functor, we defined a Quillen-Segal U-object as a weak equivalence F: s(F) t(F) such that t(F)=U(b) for some b∈ A. If U is the nerve functor U: Cat → sSetJ, with the Joyal model structure on sSet, then studying the comma category (sSetJ U) leads naturally to concepts, such as Lurie's ∞-operad. It also gives simple examples of presentable, stable ∞-category, and higher topos. If we consider the coherent nerve U: sCatB → sSetJ, then the theory of QS-objects directly connects with the program of Riehl and Verity. If we apply our main result when U is the identity Id: sSetQ → sSetQ, with the Quillen model structure, the homotopy theory of QS-objects is equivalent to that of Kan complexes and we believe that this is an avatar of Voevodsky's Univalence axiom. This equivalence holds for any combinatorial and left proper M. This result agrees with our intuition, since by essence the `Quillen-Segal type' is the Equivalence type