Generalized Harish-Chandra modules with generic minimal k-type
Abstract
We make a first step towards a classification of simple generalized Harish-Chandra modules which are not Harish-Chandra modules or weight modules of finite type. For an arbitrary algebraic reductive pair of complex Lie algebras (,), we construct, via cohomological induction, the fundamental series F· (,E) of generalized Harish-Chandra modules. We then use F· (,E) to characterize any simple generalized Harish-Chandra module with generic minimal -type. More precisely, we prove that any such simple (,)-module of finite type arises as the unique simple submodule of an appropriate fundamental series module Fs(,E) in the middle dimension s. Under the stronger assumption that contains a semisimple regular element of , we prove that any simple (,)-module with generic minimal -type is necessarily of finite type, and hence obtain a reconstruction theorem for a class of simple (,)-modules which can a priori have infinite type. We also obtain generic general versions of some classical theorems of Harish-Chandra, such as the Harish-Chandra admissibility theorem. The paper is concluded by examples, in particular we compute the genericity condition on a -type for any pair (,) with s (2).
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