📝 SummarXiv

Abstract

In \cite{Broer1993}, it was shown that certain line bundles on $\widetilde{\mathcal{N}}=T^*G/B$ have vanishing higher cohomology. We prove a generalization of this theorem for real reductive groups in the case when $G$ is adjoint. More specifically, if $\mathcal{N}_\theta$ denotes the cone of nilpotent elements in a Cartan subspace $\mathfrak{p},$ we have a similar construction of a resolution of singularities $\widetilde{\mathcal{N}_\theta}.$ We prove that for a certain cone of weights $H^i(\widetilde{\mathcal{N}_\theta},\mathcal{O}_{\widetilde{\mathcal{N}_\theta}}(\lambda))=0$ for $i> 0.$ This follows by combining a simple calculation of the canonical bundle for $\widetilde{\mathcal{N}_\theta}$ with Grauert-Riemanshneider vanishing. We use this to show that for groups of QCT (Definition 2), $\mathbb{C}[\mathcal{N}_\theta]$ is equivalent as a $K$-representation to a certain cohomologically induced module giving a new proof of a result in \cite{KostantRallis1971}.