Klyachko models of p-adic special linear groups

Abstract

We study Klyachko models of SL(n, F), where F is a nonarchimedean local field. In particular, using results of Klyachko models for GL(n, F) due to Heumos, Rallis, Offen and Sayag, we give statements of existence, uniqueness, and disjointness of Klyachko models for admissible representations of SL(n, F), where the uniqueness and disjointness are up to specified conjugacy of the inducing character, and the existence is for unitarizable representations in the case F has characteristic 0. We apply these results to relate the size of an L-packet containing a given representation of SL(n, F) to the type of its Klyachko model, and we describe when a self-dual unitarizable representation of SL(n, F) is orthogonal and when it is symplectic.