On the cohomological spectrum and support varieties for infinitesimal unipotent supergroup schemes

Abstract

We show that if G is an infinitesimal elementary supergroup scheme of height ≤ r, then the cohomological spectrum |G| of G is naturally homeomorphic to the variety Nr(G) of supergroup homomorphisms : Mr → G from a certain (non-algebraic) affine supergroup scheme Mr into G. In the case r=1, we further identify the cohomological support variety of a finite-dimensional G-supermodule M as a subset of N1(G). We then discuss how our methods, when combined with recently-announced results by Benson, Iyengar, Krause, and Pevtsova, can be applied to extend the homeomorphism Nr(G) |G| to arbitrary infinitesimal unipotent supergroup schemes.