Exit time moments, boundary value problems, and the geometry of domains in Euclidean space

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,

In this paper we introduce and discuss, in the Clifford algebra framework, certain Hardy-like spaces which are well suited for the study of the Helmholtz equation ⌬ u q k 2 u s 0 in Lipschitz domains of ‫ޒ‬ nq 1 . In particular, in the second part of the paper, these results are used in connection w

## Abstract A mixed boundary value problem for the Stokes system in a polyhedral domain is considered. Here different boundary conditions (in particular, Dirichlet, Neumann, free surface conditions) are prescribed on the faces of the polyhedron. The authors prove the existence of solutions in (weig

## 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