Representations associated to small nilpotent orbits for real Spin groups

Abstract

The results in this paper provide a comparison between the K-structure of unipotent representations and regular sections of bundles on nilpotent orbits. Precisely, let G0 =Spin(a,b) with a+b=2n, the nonlinear double cover of Spin(a,b), and let K=Spin(a, C)× Spin(b, C) be the complexification of the maximal compact subgroup of G0. We consider the nilpotent orbit Oc parametrized by [3 \ 22k \ 12n-4k-3] with k>0. We provide a list of unipotent representations that are genuine, and prove that the list is complete using the coherent continuation representation. Separately we compute K-spectra of the regular functions on certain real forms O of Oc transforming according to appropriate characters under CK( O), and then match them with the K-types of the genuine unipotent representations. The results provide instances for the orbit philosophy.