The local character expansion as branching rules: nilpotent cones and the case of SL(2)

Abstract

We show there exist representations of each maximal compact subgroup K of the p-adic group G=SL(2,F), attached to each nilpotent coadjoint orbit, such that every irreducible representation of G, upon restriction to a suitable subgroup of K, is a sum of these five representations in the Grothendieck group. This is a representation-theoretic analogue of the analytic local character expansion due to Harish-Chandra and Howe. Moreover, we show for general connected reductive groups that the wave front set of many irreducible positive-depth representations of G are completely determined by the nilpotent support of their unrefined minimal K-types.