Solutions of polyharmonic Dirichlet problems derived from general solutions in the plane

## Abstract The solution of the Dirichlet problem relative to an elliptic operator in a polyhedron has a complex singular behaviour near edges and vertices. Here we show that this solution and its conormal derivative have a global regularity in appropriate weighted Sobolev spaces. We also investiga

## Abstract For an arbitrary differential operator __P__ of order __p__ on an open set __X__ ⊂ R^n^, the Laplacian is defined by Δ = __P__\*__P__. It is an elliptic differential operator of order __2p__ provided the symbol mapping of __P__ is injective. Let __O__ be a relatively compact domain in _

This paper coordinates and formalizes previous ideas on the possibility of creating solutions to electromagnetic wave (i.e. dynamic) problems in three dimensions from the electrostatic and magnetostatic solutions for the corresponding zero-frequency (i.e. static) problems in the same geometry. Exten