On the asymptotic support of Plancherel measures for homogeneous spaces

Abstract

Let G be a real linear reductive group and let H be a unimodular, locally algebraic subgroup. Let supp L2(G/H) be the set of irreducible unitary representations of G contributing to the decomposition of L2(G/H), namely the support of the Plancherel measure. In this paper, we will relate supp L2(G/H) with the image of moment map from the cotangent bundle T*(G/H) g*. For the homogeneous space X=G/H, we attach a complex Levi subgroup LX of the complexification of G and we show that in some sense "most" of representations in supp L2(G/H) are obtained as quantizations of coadjoint orbits O such that O G/L and that the complexification of L is conjugate to LX. Moreover, the union of such coadjoint orbits O coincides asymptotically with the moment map image. As a corollary, we show that L2(G/H) has a discrete series if the moment map image contains a nonempty subset of elliptic elements.