Vanishing Cohomology of Dominant Line Bundles for Real Groups

Abstract

In Broer1993, it was shown that certain line bundles on N=T*G/B have vanishing higher cohomology. We prove a generalization of this theorem for real reductive algebraic groups. More specifically, if Nθ denotes the cone of nilpotent elements in a Cartan subspace p, we have a similar construction of a resolution of singularities Nθ. We prove that for a certain cone of weights Hi(Nθ,ONθ(λ))=0 for i> 0. This follows by combining a simple calculation of the canonical bundle for Nθ with Grauert-Riemenschneider vanishing. Restricting to the structure sheaf, we get a characterization of the singularities of the normalization of Nθ. We use this to show that for groups of QCT (Definition 2), C[Nθ] is equivalent as a K-representation to a certain cohomologically induced module giving a new proof of a result in KostantRallis1971.