Koszul Duality in Higher Topoi

Abstract

We show that there is an equivalence in any n-topos X between the pointed and k-connective objects of X and the Ek-group objects of the (n-k-1)-truncation of X. This recovers, up to equivalence of ∞-categories, some classical results regarding algebraic models for k-connective, (n-1)-coconnective homotopy types. Further, it extends those results to the case of sheaves of such homotopy types. We also show that for any pointed and k-connective object X of X there is an equivalence between the ∞-category of modules in X over the associative algebra k X, and the ∞-category of comodules in X for the cocommutative coalgebra k-1X. All of these equivalences are given by truncations of Lurie's ∞-categorical bar and cobar constructions, hence the terminology "Koszul duality".