Bounded generalized Harish-Chandra modules

Abstract

Let be a complex reductive Lie algebra and ⊂ be any reductive in subalgebra. We call a (,)-module M bounded if the -multiplicities of M are uniformly bounded. In this paper we initiate a general study of simple bounded (,)-modules. We prove a strong necessary condition for a subalgebra to be bounded (Corollary cor1.6), i.e. to admit an infinite-dimensional simple bounded (,)-module, and then establish a sufficient condition for a subalgebra to be bounded (Theorem thGroups2). As a result we are able to classify all maximal bounded reductive subalgebras of =(n). In the second half of the paper we describe in detail simple bounded infinite-dimensional (,(2))-modules, and in particular compute their characters and minimal (2)-types. We show that if (2) is a bounded subalgebra of which is not contained in a proper ideal of , then (2) (2), (3),(4); alltogether, up to conjugation there are five possible embeddings of (2) as a bounded subalgebra into as above. In two of these cases (2) is a symmetric subalgebra, and many results about simple bounded (,(2))-modules are known. A case where our results are entirely new is the case of a principal (2)-subalgebra in (4).