On singularities of solution of Maxwells equations in axisymmetric domains with conical points

Boundary value problems (BVP) in three-dimensional axisymmetric domains can be treated more efficiently by partial Fourier analysis. Partial Fourier analysis is applied to time-harmonic Maxwellʹs equations in three-dimensional axisymmetric domains (omega)with conical points on the rotation axis thereby reducing the three dimensional BVP to an infinite sequence of 2D BVPs on the plane meridian domain (omega)a(subset of)R2+ of (omega). The regularity of the solutions un (n(element of) N 0:={0, 1, 2,...}) of the two dimensional BVPs is investigated and it is proved that the asymptotic behaviour of the solutions un near an angular point on the rotation axis can be characterized by singularity functions related to the solutions of some associated Legendre equations. By means of numerical experiments, it is shown that the solutions un for n(element of) N 0\{1} belong to the Sobolev space H2 irrespective of the size of the solid angle at the conical point. However, the regularity of the coefficient u1 depends on the size of the solid angle at the conical point. The singular solutions of the three dimensional BVP are obtained by Fourier synthesis.