On Categories of Admissible (g,sl(2))-Modules

Abstract

Let g be a complex finite-dimensional semisimple Lie algebra and k be any sl(2)-subalgebra of g. In this paper we prove an earlier conjecture by Penkov and Zuckerman claiming that the first derived Zuckerman functor provides an equivalence between a truncation of a thick parabolic category O for g and a truncation of the category of admissible (g, k)-modules. This latter truncated category consists of admissible (g, k)-modules with sufficiently large minimal k-type. We construct an explicit functor inverse to the Zuckerman functor in this setting. As a corollary we obtain an estimate for the global injective dimension of the inductive completion of the truncated category of admissible (g, k)-modules.