<oai_dc:dc xmlns:oai_dc="http://www.openarchives.org/OAI/2.0/oai_dc/" xmlns:dc="http://purl.org/dc/elements/1.1/" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xsi:schemaLocation="http://www.openarchives.org/OAI/2.0/oai_dc/ http://www.openarchives.org/OAI/2.0/oai_dc.xsd">
<dc:title>The Poisson problem in weighted Sobolev spaces on Lipschitz domains</dc:title>
<dc:creator>Marius Mitrea</dc:creator><dc:creator>Michael Taylor</dc:creator>
<dc:subject>35J25</dc:subject><dc:subject>58J32</dc:subject><dc:subject>45P05</dc:subject><dc:subject>Poisson problem</dc:subject><dc:subject>Lipschitz domain</dc:subject><dc:subject>weighted Sobolev spaces</dc:subject>
<dc:description>We study the Poisson problem $\Delta u - Vu = F$ with Dirichlet and Neumann boundary conditions on a Lipschitz domain $\Omega$ in a compact Riemannian manifold equipped with a rough metric tensor. We seek a solution $u$ in the weighted Sobolev space $W^{1,\alpha}_p(\Omega) := \{u \in L^p_{\mathrm{loc}}(\Omega) \mid \mathrm{dist}\,(\cdot,\partial\Omega)^{\alpha}[|u| + |\nabla u|] \in L^p(\Omega)\}$ when $F$ belongs to an analogous space $W^{-1,\alpha}_p(\Omega)$ in the case of the Dirichlet boundary condition, and when $F \in W^{1,-\alpha}_{p&#39;}(\Omega)^{*}$, $1/p + 1/p&#39;=1$, in the case of the Neumann boundary condition. We take Dirichlet boundary data in the Besov space $B^{p,p}_s(\partial\Omega)$, with $s = 1 -\alpha - 1/p$, and obtain sharp results on the range of indices $(s, 1/p)$ for which this problem is well posed, and a parallel result for the Neumann boundary condition. These results are related to the Sobolev-Besov estimates obtained in David Jerison and Carlos E. Kenig (The inhomogeneous Dirichlet problem in Lipschitz domains, J. Funct. Anal. 130 (1995), 161--219), Eugene B. Fabes, Osvaldo Mendez, and Marius Mitrea (Boundary layers on Sobolev-Besov spaces and Poisson&#39;s equation for the Laplacian in Lipschitz domains, J. Funct. Anal. 159 (1998), 323--368), and Marius Mitrea and Michael Taylor (Potential theory on Lipschitz domains in Riemannian manifolds: Sobolev-Besov space results and the Poisson problem, J. Funct. Anal. 176 (2000), 1--79; Sobolev and Besov space estimates for solutions to second order PDE on Lipschitz domains in manifolds with Dini or H\&quot;older continuous metric tensors, Comm. Partial Differential Equations 30 (2005), 1--37). They also complement certain results in Vladimir Maz&#39;ya and Tatyana Shaposhnikova (Higher regularity in the layer potential theory for Lipschitz domains, Indiana Univ. Math. J. 54 (2005), 99--142), whose reading inspired and motivated the current work.</dc:description>
<dc:publisher>Indiana University Mathematics Journal</dc:publisher>
<dc:date>2006</dc:date>
<dc:type>text</dc:type>
<dc:format>pdf</dc:format>
<dc:identifier>10.1512/iumj.2006.55.2767</dc:identifier>
<dc:source>10.1512/iumj.2006.55.2767</dc:source>
<dc:language>en</dc:language>
<dc:relation>Indiana Univ. Math. J. 55 (2006) 1063 - 1090</dc:relation>
<dc:coverage>state-of-the-art mathematics</dc:coverage>
<dc:rights>http://iumj.org/access/</dc:rights>
</oai_dc:dc>