On the Self-adjoint properties of the standard Whittaker (g, K)-modules

Abstract

The structure of the standard Whittaker (g, K)-module is examined in the case when the group in question is a real split reductive linear Lie group. This module is an injective object in the category of Harish-Chandra (g, K)-modules which admit a fixed infinitesimal character. The global character of this module is determined. The main theorem of this paper is that it has a self-adjoint structure. Also obtained are the explicit socle filtrations of the standard Whittaker (g, K)-modules for the rank two split groups SL(3,R), Sp(2,R) and G2(split).

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