Restriction of p-adic representations of GL2(Qp) to parahoric subgroups

Abstract

Without using the p-adic Langlands correspondence, we prove that for many finite length smooth representations of GL2(Qp) on p-torsion modules the GL2(Qp)-linear morphisms coincide with the morphisms that are linear for the normalizer of a parahoric subgroup. We identify this subgroup to be the Iwahori subgroup in the supersingular case, and GL2(Zp) in the principal series case. As an application, we relate the action of parahoric subgroups to the action of the inertia group of Gal(Qp/Qp), and we prove that if an irreducible Banach space representation of GL2(Qp) has infinite GL2(Zp)-length then a twist of has locally algebraic vectors. This answers a question of Dospinescu. We make the simplifying assumption that p > 3 and that all our representations are generic.