Computing the Cousin-Zuckerman Resolution and the Lusztig-Vogan Bijection

Abstract

The goal of this article is to give a proof of a result seemingly absent from the literature characterizing global sections of standard D-modules on the flag variety. This characterization yields a mixture of the Langlands Classification of admissible representations with the Knapp-Zuckerman classification of tempered representations of a real reductive group. We use this result to compute the Cousin-Zuckerman resolution of the trivial representation in terms of standard (g,K)-modules. Further, in the case of GL(n,H) we use this to prove the Lusztig-Vogan bijection for n=2,3 and compute the lowest K-type map for the zero and principal orbits for general n as well as the image of the trivial representation for even orbits.