Cohomology for Drinfeld doubles of some infinitesimal group schemes

Abstract

Consider a field k of characteristic p > 0, Gr the r-th Frobenius kernel of a smooth algebraic group G, DGr the Drinfeld double of Gr, and M a finite dimensional DGr-module. We prove that the cohomology algebra H*(DGr,k) is finitely generated and that H*(DGr,M) is a finitely generated module over this cohomology algebra. We exhibit a finite map of algebras θr:H*(Gr,k) S(g) H*(DGr,k) which offers an approach to support varieties for DGr-modules. For many examples of interest, θr is injective and induces an isomorphism of associated reduced schemes. Additionally, for M an irreducible DGr-module, θr enables us to identify the support variety of M in terms of the support variety of M viewed as a Gr-module.