The characterization of theta-distinguished representations of GLn

Abstract

Let θ and θ' be a pair of exceptional representations in the sense of Kazhdan and Patterson [KP], of a metaplectic double cover of GLn. The tensor θθ' is a (very large) representation of GLn. We characterize its irreducible generic quotients. In the square-integrable case, these are precisely the representations whose symmetric square L-function has a pole at s=0. Our proof of this case involves a new globalization result. In the general case these are the representations induced from distinguished data or pairs of representations and their contragradients. The combinatorial analysis is based on a complete determination of the twisted Jacquet modules of θ. As a corollary, θ is shown to admit a new "metaplectic Shalika model".