On Harish-Chandra modules over quantizations of nilpotent orbits

TL;DR

This paper provides a geometric classification of irreducible Harish-Chandra modules over quantizations of nilpotent orbit algebras, revealing when the classification is bijective and describing the image in specific cases.

Contribution

It introduces a geometric framework for classifying Harish-Chandra modules over quantized nilpotent orbit algebras, including explicit descriptions for certain Lie algebras.

Findings

Embedding of modules into twisted local systems

Bijectivity in classical cases like $K ot i G$ and certain Lie algebras

Partial classification results for exceptional Lie algebras

Abstract

Let $G$ be a semisimple algebraic group over the complex numbers and $K$ be a connected reductive group mapping to $G$ so that the Lie algebra of $K$ gets identified with a symmetric subalgebra of $\mathfrak{g}$. So we can talk about Harish-Chandra $(\mathfrak{g},K)$-modules, where $\mathfrak{g}$ is the Lie algebra of $G$. The goal of this paper is to give a geometric classification of irreducible Harish-Chandra modules with full support over the filtered quantizations of the algebras of the form $\mathbb{C}[\mathbb{O}]$, where $\mathbb{O}$ is a nilpotent orbit in $\mathfrak{g}$ with codimension of the boundary at least $4$. Namely, we embed the set of isomorphism classes of irreducible Harish-Chandra modules into the set of isomorphism classes of irreducible $K$-equivariant suitably twisted local systems on $\mathbb{O}\cap \mathfrak{k}^\perp$. We show that under certain conditions, for example when $K\subset G$ or when $\mathfrak{g}\cong \mathfrak{so}_n,\mathfrak{sp}_{2n}$, this embedding is in fact a bijection. On the other hand, for $\mathfrak{g}=\mathfrak{sl}_n$ and $K=\operatorname{Spin}_n$, the embedding is not bijective and we give a description of the image. Finally, we perform a partial classification for exceptional Lie algebras.