Local theta lifting of generalized Whittaker models associated to nilpotent orbits

Abstract

Let (G,G) be a reductive dual pair over a local field k of characteristic 0, and denote by V and V the standard modules of G and G, respectively. Consider the set Max Hom(V,V) of full rank elements in Hom(V,V), and the nilpotent orbit correspondence O ⊂ g and (O)⊂ g induced by elements of Max Hom(V,V) via the moment maps. Let (π,V) be a smooth irreducible representation of G. We show that there is a correspondence of the generalized Whittaker models of π of type O and of (π) of type (O), where (π) is the full theta lift of π . When (G,G) is in the stable range with G the smaller member, every nilpotent orbit O ⊂ g is in the image of the moment map from Max Hom (V,V). In this case, and for k non-Archimedean, the result has been previously obtained by Mglin in a different approach.