On the variety of 1-dimensional representations of finite W-algebras in low rank

Abstract

Let g be a simple Lie algebra over C and let e ∈ g be nilpotent. We consider the finite W-algebra U( g,e) associated to e and the problem of determining the variety E( g,e) of 1-dimensional representations of U( g,e). For g of low rank, we report on computer calculations that have been used to determine the structure of E( g,e), and the action of the component group e of the centralizer of e on E( g,e). As a consequence, we provide two examples where the nilpotent orbit of e is induced, but there is a 1-dimensional e-stable U( g,e)-module which is not induced via Losev's parabolic induction functor. In turn this gives examples where there is a "non-induced" multiplicity free primitive ideal of U( g).