Orlicz-Hardy Spaces Associated with Divergence Operators on Unbounded Strongly Lipschitz Domains of Rn

Abstract

Let be either Rn or an unbounded strongly Lipschitz domain of Rn, and be a continuous, strictly increasing, subadditive and positive function on (0,∞) of upper type 1 and of strictly critical lower type p∈(n/(n+1),1]. Let L be a divergence form elliptic operator on L2 () with the Neumann boundary condition and the heat semigroup generated by L have the Gaussian property (G∞). In this paper, the authors introduce the Orlicz-Hardy space H,\,L() via the nontangential maximal function associated with \e-tL\t0, and establish its equivalent characterization in terms of the Lusin area function associated with \e-tL\t0. The authors also introduce the "geometrical" Orlicz-Hardy space H,\,z() via the classical Orlicz-Hardy space H(Rn), and prove that the spaces H,\,L() and H,\,z() coincide with equivalent norms, from which, characterizations of H,\,L(), including the vertical and the nontangential maximal function characterizations associated with \e-tL\t0, and the Lusin area function characterization associated with \e-tL\t0, are deduced. All the above results generalize the well-known results of P. Auscher and E. Russ by taking (t) t for all t∈(0,∞).