Construction of Irreducible U(g)G'-Modules and Discretely Decomposable Restrictions

Abstract

In this paper, we study the irreducibility of U(g)G'-modules on the spaces of intertwining operators in the branching problem of reductive Lie algebras, and construct a family of finite-dimensional irreducible U(g)G'-modules using the Zuckerman derived functors. We provide criteria for the irreducibility of U(g)G'-modules in the cases of generalized Verma modules, cohomologically induced modules, and discrete series representations. We treat only discrete decomposable restrictions with certain dominance conditions (quasi-abelian and in the good range). To describe the U(g)G'-modules, we give branching laws of cohomologically induced modules using ones of generalized Verma modules when K' acts on K/LK transitively.

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