Representation Cohomology of a Small Category

Abstract

Let C be a simplicial object in the category Cat of small categories. For a field k, taking the Grothendieck groups of isomorphism classes of kCn-modules gives rise to a cochain complex, whose cohomology, which we refer to as representation cohomology, is the object studied in this article. In particular, to any small category C, we associate a simplicial object in Cat, where for each n 0 the objects of the level n category are the simplices of the nerve of C. The basic properties of the resulting representation cohomology of these simplicial objects and certain subobjects are then studied in detail. We present some general theoretical computations in favourable cases.