Cuspidal -modular representations of GLn(F) distinguished by a Galois involution
Abstract
Let F/F0 be a quadratic extension of non-Archimedean locally compact fields of residual characteristic p≠2 with Galois automorphism σ, and let R be an algebraically closed field of characteristic \0,p\. We reduce the classification of GLn(F0)-distinguished cuspidal R-representations of GLn(F) to the level 0 setting. Moreover, under a parity condition, we give necessary conditions for a σ-selfdual cuspidal R-representation to be distinguished. Finally, we classify the distinguished cuspidal F-representations of GLn(F) having a distinguished cuspidal lift to Q.
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