On weak*-convergence in the localized Hardy spaces H1( X) and its application

Abstract

Let ( X, d, μ) be a complete RD-space. Let be an admissible function on X, which means that is a positive function on X and there exist positive constants C0 and k0 such that, for any x,y∈ X, (y)≤ C0 [(x)]1/(1+k0) [(x)+d(x,y)]k0/(1+k0). In this paper, we define a space VMO( X) and show that it is the predual of the localized Hardy space H1( X) introduced by Yang and Zhou YZ. Then we prove a version of the classical theorem of Jones and Journ\'e JJ on weak*-convergence in H1( X). As an application, we give an atomic characterization of H1( X).