Annihilator of ( g,K)-modules of O(p,q)

Abstract

Let g denote the complexified Lie algebra of G= O(p,q) and K a maximal compact subgroup of G. In the previous paper, we constructed ( g,K)-modules associated to the finite-dimensional representation of sl2 of dimension m+1, which we denote by M+(m) and M-(m). The aim of this paper is to show that the annihilator of M(m) is the Joseph ideal if and only if m=0. We shall see that an element of the symmetric of square S2( g) that is given in terms of the Casimir elements of g and the complexified Lie algebra of K plays a critical role in the proof of the main result.