On linear periods

Abstract

Let π' be a cuspidal automorphic representation of GL2n, which is assumed to be the Jacquet-Langlands transfer from a cuspidal automorphic representation π of GL2m(D), where D is a division algebra so that GL2m(D) is an inner form of GL2n. In this paper, we consider the relation between linear periods on π and π'. We conjecture that the non-vanishing of the linear period on π would imply the non-vanishing of that on π'. We illustrate an approach using a relative trace formula towards this conjecture, and prove the existence of smooth transfer over non-archimedean local fields.