A new proof for the partition algorithm of the annihilator varieties of highest weight modules

Abstract

Let L(λ) be a simple highest weight module of a classical Lie algebra g with highest weight λ-ρ, where ρ is half the sum of positive roots. Joseph proved that the associated variety of the annihilator ideal of L(λ) (also called the annihilator variety) is the Zariski closure of a nilpotent orbit in g*. Recently, Bai--Ma--Wang introduced a partition algorithm to describe this corresponding nilpotent orbit for a given highest weight module L(λ). In this paper, we present a new direct proof of Bai--Ma--Wang's partition algorithm using Sommers duality.