Weighted Local Orlicz-Hardy Spaces on Domains and Their Applications in Inhomogeneous Dirichlet and Neumann Problems

Abstract

Let be either Rn or a strongly Lipschitz domain of Rn, and ω∈ A∞(Rn) (the class of Muckenhoupt weights). Let L be a second order divergence form elliptic operator on L2 () with the Dirichlet or Neumann boundary condition, and assume that the heat semigroup generated by L has the Gaussian property (G1) with the regularity of their kernels measured by μ∈(0,1]. Let be a continuous, strictly increasing, subadditive, positive and concave function on (0,∞) of critical lower type index p-∈(0,1]. In this paper, the authors introduce the "geometrical" weighted local Orlicz-Hardy spaces hω,\,r() and hω,\,z() via the weighted local Orlicz-Hardy spaces hω(Rn), and obtain their two equivalent characterizations in terms of the nontangential maximal function and the Lusin area function associated with the heat semigroup generated by L when p-∈(n/(n+μ),1]. As applications, the authors prove that the operators ∇2 GD are bounded from hω,\,r() to the weighted Orlicz space Lω(), and from hω,\,r() to itself when is a bounded semiconvex domain in Rn and p-∈(nn+1,1], and the operators ∇2 GN are bounded from hω,\,z() to Lω(), and from hω,\,z() to hω,\,r() when is a bounded convex domain in Rn and p-∈(nn+1,1], where GD and GN denote, respectively, the Dirichlet Green operator and the Neumann Green operator.