Representation theorems for nonvariational solutions of the Helmholtz equation

Abstract

We consider a possibly multiply connected bounded open subset of Rn of class C\1,m\,α for some m∈ N, α∈]0,1[ and we plan to solve both the Dirichlet and the Neumann problem for the Helmholtz equation in and in the exterior of in terms of acoustic layer potentials. Then we turn to prove an integral representation theorem solutions of the Helmholtz equation in terms of an acoustic single layer potential. The main focus of the paper is on α-H\"older continuous solutions which may not have a classical normal derivative at the boundary points of and that may have an infinite Dirichlet integral around the boundary of \, i.e., case m=0. Namely for solutions that do not belong to the classical variational setting.