Lifting banal representations of classical groups

Abstract

Let G be a symplectic or a split orthogonal group over a local non-archimedean field F. A prime is called banal with respect to G if it does not divide the cardinality of the k-points of G, where k is the residue field of F. In this paper we show that for every banal prime , any smooth irreducible F-representation of G(F) admits a lift to Q. We also state similar results for more general classical groups of symplectic, orthogonal or unitary type. As an application we prove Howe-duality in the strongly banal case for symplectic-orthogonal or unitary dual pairs.