Atomic decomposition of real-variable type for Bergman spaces in the unit ball of Cn

Abstract

In this paper, we show that every (weighted) Bergman space Apα (Bn) in the complex ball admits an atomic decomposition of real-variable type for any 0 < p 1 and α > -1. More precisely, for each f ∈ Apα (Bn) there exist a sequence of real-variable (p, \8)α-atoms ak and a scalar sequence \λk \ with Σk | λk |p < \8 such that f = Σk λk Pα (ak), where Pα is the Bergman projection from L2α (Bn) onto A2α (Bn). The proof is constructive, and our construction is based on some sharp estimates about Bergman metric and Bergman kernel functions in Bn.