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29 March 2024
 
  » arxiv » 0909.0061

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The mixed problem for the Laplacian in Lipschitz domains
Katharine A. Ott ; Russell M. Brown ;
Date 1 Sep 2009
AbstractWe consider the mixed boundary value problem or Zaremba’s problem for the Laplacian in a bounded Lipschitz domain in R^n. We specify Dirichlet data on part of the boundary and Neumann data on the remainder of the boundary. We assume that the boundary between the sets where we specify Dirichlet and Neumann data is a Lipschitz surface. We require that the Neumann data is in L^p and the Dirichlet data is in the Sobolev space of functions having one derivative in L^p for some p near 1. Under these conditions, there is a unique solution to the mixed problem with the non-tangential maximal function of the gradient of the solution in L^p of the boundary. We also obtain results with data from Hardy spaces when p=1.
Source arXiv, 0909.0061
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