Mathematics – Representation Theory
Scientific paper
2009-04-06
Pacific Journal of Mathematics, 243 no. 2 (2009)
Mathematics
Representation Theory
9 pages. v2:corrected version, to appear in Pacific Journal of Mathematics
Scientific paper
Let F be either R or C. Let $(\pi,V)$ be an irreducible admissible smooth \Fre representation of GL(2n,F). A Shalika functional $\phi:V \to \C$ is a continuous linear functional such that for any $g\in GL_n(F), A \in \Mat_{n \times n}(F)$ and $v\in V$ we have $$ \phi[\pi g & A 0 & g)v] = \exp(2\pi i \re(\tr (g^{-1}A))) \phi(v).$$ In this paper we prove that the space of Shalika functionals on V is at most one dimensional. For non-Archimedean F (of characteristic zero) this theorem was proven in [JR].
Aizenbud Avraham
Gourevitch Dmitry
Jacquet Herve
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