Support Theory for Extended Drinfeld Doubles

Abstract

Following earlier work with Cris Negron on the cohomology of Drinfeld doubles D( G(r)), we develop a "geometric theory" of support varieties for "extended Drinfeld doubles" D( G(r)) of Frobenius kernels G(r) of smooth linear algebraic groups G over a field k of characteristic p > 0. To a D( G(r))-module M we associate the space ( D( G(r)))M of equivalence classes of "pairs of π-points" and prove most of the desired properties of M ( D( G(r)))M. Namely, this association satisfies the "tensor product property" and admits a natural continuous map D to cohomological support theory. Moreover, for M finite dimensional and with suitable conditions on G(r), this association provides a "projectivity test", D is a homeomorphism, and identifies ( D( G(r)))M with the cohomological support variety of M for various classes of D( G(r))-modules M.