A general method to construct cube-like categories and applications to homotopy theory

Abstract

In this paper, we introduce a method to construct new categories which look like "cubes", and discuss model structures on the presheaf categories over them. First, we introduce a notion of thin-powered structure on small categories, which provides a generalized notion of "power-sets" on categories. Next, we see that if a small category R admits a good thin-powered structure, we can construct a new category (R) called the cubicalization of the category. We also see that (R) is equipped with enough structures so that many arguments made for the classical cube category are also available. In particular, it is a test category in the sense of Grothendieck. The resulting categories contain the cube category , the cube category with connections c, the extended cubical category introduced by Isaacson, and cube categories G symmetrized by more general group operads G. We finally discuss model structures on the presheaf categories (R) over cubicalizations. We prove that (R) admits a model structure such that the simplicial realization (R) SSet is a left Quillen functor. Moreover, in the case of G for group operads G, G is a monoidal model category, and we have a sequence of monoidal Quillen equivalences Set G SSet. For example, if G=B is the group operad consisting of braid groups, the category B is a braided monoidal model category whose homotopy category is equivalent to that of SSet.