Weighted Hardy spaces associated with elliptic operators. Part III: Characterizations of HLp(w) and the weighted Hardy space associated with the Riesz transform

Abstract

We consider Muckenhoupt weights w, and define weighted Hardy spaces HpT(w), where T denotes a conical square function or a non-tangential maximal function defined via the heat or the Poisson semigroup generated by a second order divergence form elliptic operator L. In the range 0<p< 1, we give a molecular characterization of these spaces. Additionally, in the range p∈ Ww(p-(L),p+(L)) we see that these spaces are isomorphic to the Lp(w) spaces. We also consider the Riesz transform ∇ L-12, associated with L, and show that the Hardy spaces Hp∇ L-1/2,q(w) and HpSH,q(w) are isomorphic, in some range of p's, and q∈ Ww(q-(L),q+(L)).