Restriction of the metaplectic representation over a p-adic field to an anisotropic torus

Abstract

In this article, we examine the restriction of the metaplectic representation π over a p-adic field k, p≠2, of zero characteristic to an isotropic torus S contained in the symplectic group. First we give necessary and sufficient conditions on the momentum map in order that S be admissible, that is π S decomposes with finite multiplicities. Let us say that a torus contained in the symplectic group is irreducible if its action on the symplectic space is irreducible over k. Then we examine the case when S is a proper subtorus of a maximal irreducible torus T in the symplectic group and give sufficient conditions on T in order that S never be admissible. When these conditions are not satisfied, we give examples of admissible proper tori of a maximal irreducible torus. Finally, for any admissible subtorus S of a certain type of maximal irreducible torus, we compute the multiplicity of the unitary characters of S appearing into π S. We also show that the multiplicity of such a character is equal to the volume of the symplectic reduction of the inverse image under the momentum map of a linear form associated to it.