Rigid Analytic Vectors in Locally Analytic Representations

Abstract

Let H be a uniform pro-p group. Associated to H are rigid analytic affinoid groups n, and their "wide open" subgroups n. Denote by D(H)= C(H)'b the locally analytic distribution algebra of H and by Emerton's ring of n-rigid analytic distributions on H. If V is an admissible locally analytic representation of H, and if V_n- denotes the subspace of n-rigid analytic vectors (with its intrinsic topology), then we show that the continuous dual of V_n- is canonically isomorphic to D(H) V'. From this we deduce the exactness of the functor V V_n- on the category of admissible locally analytic representations of H.