Non-Generic Unramified Representations in Metaplectic Covering Groups

Abstract

Let G(r) denote the metaplectic covering group of the linear algebraic group G. In this paper we study conditions on unramified representations of the group G(r) not to have a nonzero Whittaker function. We state a general Conjecture about the possible unramified characters such that the unramified sub-representation of IndB(r)G(r)δB1/2 will have no nonzero Whittaker function. We prove this Conjecture for the groups GLn(r) with r n-1, and for the exceptional groups G2(r) when r 2.