Potential Techniques and Regularity of Boundary Value Problems in Exterior Non-Smooth Domains

## Abstract We study the well‐posedness of the half‐Dirichlet and Poisson problems for Dirac operators in three‐dimensional Lipschitz domains, with a special emphasis on optimal Lebesgue and Sobolev‐Besov estimates. As an application, an elliptization procedure for the Maxwell system is devised. Co

We study boundary value problems of the form -u = f on and Bu = g on the boundary j , with either Dirichlet or Neumann boundary conditions, where is a smooth bounded domain in R n and the data f, g are distributions. This problem has to be first properly reformulated and, for practical applications,

## Abstract The main goal of this paper is to undertake a systematic study of the Stokes and Lamé systems with non‐classical boundary conditions in arbitrary Lipschitz subdomains of **R**^3^. These include prescribing 〈**n**, **u**〉 in concert with **n**×curl **u** on the boundary of the domain in

## Abstract We study the regularity in Sobolev spaces of the solution of transmission problems in a polygonal domain of the plane, with unilateral boundary conditions of Signorini's type in a part of the boundary and Dirichlet or Neumann boundary conditions on the remainder part. We use a penalizat