Cuspidal -modular representations of GLn(F) distinguished by a Galois involution, II

Abstract

Let F/F0 be a quadratic extension of non-Archimedean locally compact fields with residual characteristic p≠2, and be a prime number different from p. We classify those -modular cuspidal irreducible representations of GLn(F) which are GLn(F0)-distinguished, that is, which carry a non-zero GLn(F0)-invariant linear form. In the case when ≠2, an -modular cuspidal representation of GLn(F) is GLn(F0)-distinguished if and only if it lifts to a GLn(F0)-distinguished cuspidal -adic representation, whereas when =2, it is GLn(F0)-distinguished if and only if it is conjugate-self-dual.