Distinguished representations for SL(n,F)

Abstract

Let F be a finite field, and let E be either a quadratic field extension E/F or the split algebra F F. We study distinguished representations of SL2n(F) by the subgroup H := SL2n(F) GLn(E), which is a variation of the work of Anandavardhanan and Prasad on distinguished representations of SLn(E) by the subgroup SLn(F). This is in a similar framework of our earlier work of a p-adic non-split variation of Anandavardhanan-Prasad over finite fields. We give a formula for the dimension of the complex vector space HomH(π, 1) in terms of certain characters of F×, where π is an irreducible representation which is also distinguished by H.

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