Euler Poincare Characteristic for the Oscillator Representation

Abstract

Suppose (G,G') is a dual pair of subgroups of a metaplectic group. The dual pair correspondence is a bijection between (subsets of the) irreducible representations of G and G', defined by the non-vanishing of Hom(ω,π×π'), where ω is the oscillator representation. Alternatively one considers HomG(ω,π) as a G'-module. It is fruitful to replace Hom with Exti, and general considerations suggest that the Euler-Poincare characteristic EP(ω,π), the alternating sum of Exti(ω,π), will be a more elementary object. We restrict to the case of p-adic groups, and prove that EP(ω,π) is a well defined element of the Grothendieck group of finite length representations of G', and show that it is indeed more elementary than Hom(ω,π). We expect that computation of EP, together with vanishing results for higher Ext groups, will be a useful tool in computing the dual pair correspondence, and will help to elucidate the structure of Hom(ω,π).