On the structure of the fundamental series of generalized Harish-Chandra modules

Abstract

We continue the study of the fundamental series of generalized Harish-Chandra modules initiated in [PZ2]. Generalized Harish-Chandra modules are (g,k)-modules of finite type where g is a semisimple Lie algebra and k ⊂ g is a reductive in g subalgebra. A first result of the present paper is that a fundamental series module is a g-module of finite length. We then define the notions of strongly and weakly reconstructible simple (g,k)-modules M which reflect to what extent M can be determined via its appearance in the socle of a fundamental series module. In the second part of the paper we concentrate on the case k sl(2) and prove a sufficient condition for strong reconstructibility. This strengthens our main result from [PZ2] for the case k = sl(2). We also compute the sl(2)-characters of all simple strongly reconstructible (and some weakly reconstructible) (g,sl(2))-modules. We conclude the paper by discussing a functor between a generalization of the category O and a category of (g,sl(2))-modules, and we conjecture that this functor is an equivalence of categories.