Representations and cohomology of a family of finite supergroup schemes

Abstract

We examine the cohomology and representation theory of a family of finite supergroup schemes of the form ( Ga-× Ga-) ( Ga(r)× ( Z/p)s). In particular, we show that a certain relation holds in the cohomology ring, and deduce that for finite supergroup schemes having this as a quotient, both cohomology mod nilpotents and projectivity of modules is detected on proper sub-super\-group schemes. This special case feeds into the proof of a more general detection theorem for unipotent finite supergroup schemes, in a separate work of the authors joint with Iyengar and Krause. We also completely determine the cohomology ring in the smallest cases, namely ( Ga- × Ga-) Ga(1) and ( Ga- × Ga-) Z/p. The computation uses the local cohomology spectral sequence for group cohomology, which we describe in the context of finite supergroup schemes.