Contragredients and a multiplicity one theorem for general Spin groups

Abstract

Each orthogonal group (n) has a nontrivial (1)-extension, which we call (n). The identity component of (n) is the more familiar (n), the general Spin group. We prove that the restriction to (n-1) of an irreducible admissible representation of (n) over a nonarchimedean local field of characteristic zero is multiplicity free and also prove the analogous theorem for (n). Our proof uses the method of Aizenbud, Gourevitch, Rallis and Schiffman, who proved the analogous theorem for (n), and Waldspurger, who proved that for (n). We also give an explicit description of the contragredient of an irreducible admissible representation of (n) and (n), which is needed to apply their method to our situations.