Translation for finite W-algebras

Abstract

A finite W-algebra U(,e) is a certain finitely generated algebra that can be viewed as the enveloping algebra of the Slodowy slice to the adjoint orbit of a nilpotent element e of a complex reductive Lie algebra . It is possible to give the tensor product of a U(,e)-module with a finite dimensional U()-module the structure of a U(,e)-module; we refer to such tensor products as translations. In this paper, we present a number of fundamental properties of these translations, which are expected to be of importance in understanding the representation theory of U(,e).