Bilinear Decompositions of Products of Hardy and Lipschitz Spaces Through Wavelets

Abstract

The aim of this article is to give a complete solution to the problem of the bilinear decompositions of the products of some Hardy spaces Hp(Rn) and their duals in the case when p<1 and near to 1, via wavelets, paraproducts and the theory of bilinear Calder\'on-Zygmund operators. Precisely, the authors establish the bilinear decompositions of the product spaces Hp(Rn)×α (Rn) and Hp(Rn)×α(Rn), where, for all p∈(nn+1,\,1) and α:=n(1p-1), Hp(Rn) denotes the classical real Hardy space, and α and α denote the homogeneous, respectively, the inhomogeneous Lipschitz spaces. Sharpness of these two bilinear decompositions are also proved. As an application, the authors establish some div-curl lemmas at the endpoint case.