The sign of linear periods

Abstract

Let G be a group with subgroup H, and let (π,V) be a complex representation of G. The natural action of the normalizer N of H in G on the space HomH(π,C) of H-invariant linear forms on V, provides a representation π of N trivial on H, which is a character when HomH(π,C) is one dimensional. If moreover G is a reductive group over a local field, and π is smooth irreducible, it is an interesting problem to express π in terms of the possibly conjectural Langlands parameter φπ of π. In this paper we consider the following situation: G=GLm(D) for D a central division algebra of dimension d2 over a local field F of characteristic zero, H is the centralizer of a non central element δ∈ G such that δ2 is in the center of G, and π has generic Jacquet-Langlands transfer to GLmd(F). In this setting the space HomH(π,C) is at most one dimensional. When HomH(π,C) C and H≠ N, we prove that the value of the π on the non trivial class of NH is (-1)mε(φπ) where ε(φπ) is the root number of φπ. Along the way we extend many useful multiplicity one results for linear and Shalika models to the case of non split G. When F is p-adic we also classify standard modules with linear periods and Shalika models, which are new results even when D=F.