On Shalika Periods and a Theorem of Jacquet-Martin
arXiv:0705.1576
Abstract
Let Ïbe a cuspidal automorphic representation of GL_4 with central character μ^2. It is known that Ïhas Shalika period with respect to μif and only if the L-function L^S(s, Ï, \bigwedge^2\otimesμ^{-1}) has a pole at s=1. Recentlt, Jacquet and Martin considered the analogous question for cuspidal representations Ï_D of the inner form GL_2(D)(\A), and obtained a partial result via the relative trace formula. In this paper, we provide a complete solution to this problem via the method of theta correspondence, and give necessary and sufficient conditions for the existence of Shalika period for Ï_D. We also resolve the analogous question in the local setting.