Supercuspidal representations of GLn(F) distinguished by a unitary involution

Abstract

Let F/F0 be a quadratic extension of non-archimedean locally compact fields of residue characteristic p≠ 2. Let R be an algebraically closed field of characteristic different from p. For π a supercuspidal representation of G=GLn(F) over R and Gτ a unitary group in n variables contained in G, we prove that π is distinguished by Gτ if and only if π is Galois invariant. When R=C and F is a p-adic field, this result first as a conjecture proposed by Jacquet was proved in 2010's by Feigon-Lapid-Offen by using global method. Our proof is local which works for both complex case and l-modular case with l≠ p. We further study the dimension of HomGτ(π,1) and show that it is at most one.