Distinguished Representations for SLn(D) where D is a quaternion division algebra over a p-adic field

Abstract

Let D be a quaternion division algebra over a non-archimedean local field F of characteristic zero. Let E/F be a quadratic extension and SLn*(E) = GLn(E) SLn(D). We study distinguished representations of SLn(D) by the subgroup SLn*(E). Let π be an irreducible admissible representation of SLn(D) which is distinguished by SLn*(E). We give a multiplicity formula, i.e. a formula for the dimension of the C-vector space HomSLn*(E) (π, 1), where 1 denotes the trivial representation of SLn*(E). This work is a non-split inner form analog of a work by Anandavardhanan-Prasad which gives a multiplicity formula for SLn(F)-distinguished irreducible admissible representation of SLn(E).