Translation functors for locally analytic representations

Abstract

Let G be a p-adic Lie group with reductive Lie algebra g. In analogy to the translation functors introduced by Bernstein and Gelfand on categories of U(g)-modules we consider similarly defined functors on the category of coadmissible modules over the locally analytic distribution algebra D(G) on which the center of U(g) acts locally finite. These functors induce equivalences between certain subcategories of the latter category. Furthermore, these translation functors are naturally related to those on category O via the functors from category O to the category of coadmissible modules. We also investigate the effect of the translation functors on locally analytic representations (V) la associated by the p-adic Langlands correspondence for GL2(Qp) to 2-dimensional Galois representations V.