Integral Equations of Diffraction Problems with Unbounded Smooth Obstacles

Abstract: The paper is devoted to the boundary integral equations method for the diffraction problems on obstacles D in R n with smooth unbounded boundaries for Helmholtz operators with variable coefficients. The diffraction problems are described by the Helmholtz operatorswhere ρ, a belong to the space of the infinitely differentiable functions on R n bounded with all derivatives. We introduce the single and double layer potentials associated with the operator H, and reduce by means of these potentials the Dirichlet, N… Show more

L^p -theory of boundary integral operators for domains with unbounded smooth boundary

L^p -theory of boundary integral operators for domains with unbounded smooth boundary