Support varieties of ( g, k)-modules of finite type

Abstract

Let g be a reductive Lie algebra over an algebraically closed field of characteristic 0 and k be a reductive in g-subalgebra. Let M be a finitely generated (possibly, infinite-dimensional) g-module. We say that M is a ( g, k)-module if M is a direct sum of a (possibly, infinite) amount of simple finite-dimensional k-modules. We say that M is of finite type if M is a ( g, k)-module and Hom k(V, M)<∞ for any simple k-module V. Let X be a variety of all Borel subalgebras of g. Let M be a finitely generated ( g, k)-module of finite type. In this article we prove that M is holonomic, i.e. M is governed by some subvariety LM⊂ X and some local system SM on it. Furthermore we provide a finite list in which LM necessarily appear.