Dirichlet-to-Neumann or Poincar\'e-Steklov operator on fractals described by d -sets

Abstract

In the framework of the Laplacian transport, described by a Robin boundary value problem in an exterior domain in Rn, we generalize the definition of the Poincar\'e-Steklov operator to d-set boundaries, n-2< d<n, and give its spectral properties to compare to the spectra of the interior domain and also of a truncated domain, considered as an approximation of the exterior case. The well-posedness of the Robin boundary value problems for the truncated and exterior domains is given in the general framework of n-sets. The results are obtained thanks to a generalization of the continuity and compactness properties of the trace and extension operators in Sobolev, Lebesgue and Besov spaces, in particular, by a generalization of the classical Rellich-Kondrachov Theorem of compact embeddings for n and d-sets.