Regularity estimates for Green operators of Dirichlet and Neumann problems on weighted Hardy spaces

TL;DR

This paper develops weighted Hardy space theory related to Green operators for Dirichlet and Neumann problems, providing new regularity estimates in both bounded and unbounded domains, especially for the full range of p.

Contribution

It introduces new regularity estimates for Green operators on weighted Hardy spaces for the full range 0<p≤1, including unbounded domains, under weak boundary smoothness.

Findings

Weighted Hardy spaces coincide with atomic decompositions and maximal function definitions.

New regularity estimates for Green operators on Hardy spaces for 0<p≤1.

Estimates applicable to unbounded and less smooth domains.

Abstract

In this paper we first study the generalized weighted Hardy spaces $H^p_{L,w}(X)$ for $0<p\le 1$ associated to nonnegative self-adjoint operators $L$ satisfying Gaussian upper bounds on the space of homogeneous type $X$ in both cases of finite and infinite measure. We show that the weighted Hardy spaces defined via maximal functions and atomic decompositions coincide. Then we prove weighted regularity estimates for the Green operators of the inhomogeneous Dirichlet and Neumann problems in suitable bounded or unbounded domains including bounded semiconvex domains, convex regions above a Lipschitz graph and upper half-spaces. Our estimates are in terms of weighted $L^p$ spaces for the range $1<p<\infty$ and in terms of the new weighted Hardy spaces for the range $0<p\le 1$. Our regularity estimates for the Green operators under the weak smoothness assumptions on the boundaries of the domains are new, especially the estimates on Hardy spaces for the full range $0<p\le 1$ and the case of unbounded domains.