Support varieties of line bundle cohomology groups for SL3 (k)

Abstract

Let G= SL3(k) where k is a field of characteristic p > 0 and let λ ∈ X(T) be any weight with corresponding line bundle L(λ) on G/B. In this paper we compute the support varieties for all modules of the form Hi(λ):= Hi(G/B, L(λ)) over the first Frobenius kernel G1. The calculation involves certain recursive character formulas given by Donkin which can be used to compute the characters of the line bundle cohomology groups. In the case where λ is a p-regular weight and M=Hi(λ)≠ 0 for some i, these formulas are used to show that any pth root of unity ζ is not a root of the generic dimension of M. To handle the case where λ is not p-regular, we employ techniques similar to those used by Drupieski, Nakano and Parshall to show that the module Hi(λ) is not projective over G1 whenever it is nonzero and λ lies outside of the Steinberg block.