On Sp-distinguished representations of the quasi-split unitary groups

Abstract

We study Sp2n(F)-distinction for representations of the quasi-split unitary group U2n(E/F) in 2n variables with respect to a quadratic extension E/F of p-adic fields. A conjecture of Dijols and Prasad predicts that no tempered representation is distinguished. We verify this for a large family of representations in terms of the Moeglin-Tadic classification of the discrete series. We further study distinction for some families of non-tempered representations. In particular, we exhibit L-packets with no distinguished members that transfer under stable base change to Sp2n(E)-distinguished representations of GL2n(E).