A generalization of Dahlberg's theorem concerning the regularity of harmonic Green potentials期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

A generalization of Dahlberg's theorem concerning the regularity of harmonic Green potentials

Authors:	Dorina Mitrea

Affiliation:	Department of Mathematics, University of Missouri-Columbia, Columbia, Missouri 65211

Abstract:	Let $mathbb{G}_D$ be the solution operator for in , Tr on , where is a bounded domain in $mathbb{R}^n$ . B. E. J. Dahlberg proved that for a bounded Lipschitz domain $Omega, nabla mathbb{G}_D$ maps boundedly into weak- and that there exists such that $nablamathbb{G}_D : L^p (Omega)rightarrow L^{p^{}} (Omega)$ is bounded for $1 < p < n, frac{1}{p^} = frac {1}{p} - frac {1}{n}$ . In this paper, we generalize this result by addressing two aspects. First we are also able to treat the solution operator $mathbb{G}_N$ corresponding to Neumann boundary conditions and, second, we prove mapping properties for these operators acting on Sobolev (rather than Lebesgue) spaces.

Keywords:	Green potentials Poisson problem Lipschitz domain Sobolev spaces

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