On the restriction of Zuckerman's derived functor modules Aq(λ) to reductive subgroups

Abstract

In this article, we study the restriction of Zuckerman's derived functor (g,K)-modules Aq(λ) to g' for symmetric pairs of reductive Lie algebras (g,g'). When the restriction decomposes into irreducible (g',K')-modules, we give an upper bound for the branching law. In particular, we prove that each (g',K')-module occurring in the restriction is isomorphic to a submodule of Aq'(λ') for a parabolic subalgebra q' of g', and determine their associated varieties. For the proof, we construct Aq(λ) on complex partial flag varieties by using D-modules.