Hardy spaces Hp over non-homogeneous metric measure spaces and their applications

Abstract

Let ( X,d,μ) be a metric measure space satisfying both the geometrically doubling and the upper doubling conditions. Let ∈ (1,∞), 0<p1 q∞, p≠ q, γ∈[1,∞) and ε∈(0,∞). In this article, the authors introduce the atomic Hardy space Hatb,\,p,\,q,\,γ(μ) and the molecular Hardy space Hmb,\,p,\,q,\,γ,\,ε(μ) via the discrete coefficient K(),\,pB,\,S, and prove that the Calder\'on-Zygmund operator is bounded from Hmb,\,p,\,q,\,γ,\,δ(μ) (or Hatb,\,p,\,q,\,γ(μ)) into Lp(μ), and from Hatb,\,(+1)p,\,q,\,γ+1(μ) into Hmb,\,p,\,q,\,γ,\,12(δ -p+)(μ) whose genealized fractional versions are also obtained. The authors also introduce the -weakly doubling condition, with ∈ (1,∞), of the measure μ and construct a non-doubling measure μ satisfying this condition. If μ is -weakly doubling, the authors further introduce the Campanato space Eα,\,q,\,η,\,γ(μ) and show that Eα,\,q,\,η,\,γ(μ) is independent of the choices of , η, γ and q; the authors then introduce the atomic Hardy space Hatb,\,p,\,q,\,γ(μ) and the molecular Hardy space Hmb,\,p,\,q,\,γ,\,ε(μ), which coincide with each other; the authors finally prove that Hatb,\,p,\,q,\,γ(μ) is the predual of E1/p-1,\,1,\,,\,1(μ). Moreover, relations of these Hardy spaces are also discussed.