Solution of the problem of the excitation of two annular cylinders by an electric dipole of arbitrary orientation
Abstract
The problem of the excitation of two annular cylinders by the radiation field of an arbitrarily oriented dipole is reduced to the solution of two external boundary value problems for the Helmholtz equation with Dirichlet and Neumann conditions, respectively. The solution is obtained in the form of Fourier series in Fourier integrals, whose coefficients are determined, by a truncation technique, from infinite systems of linear equations.
 Publication:

Differentsialnye Uravneniia
 Pub Date:
 November 1976
 Bibcode:
 1976DnU....12.2068I
 Keywords:

 Boundary Value Problems;
 Circular Cylinders;
 Dipole Moments;
 Electric Dipoles;
 Wave Excitation;
 Fourier Series;
 Helmholtz Equations;
 Laplace Transformation;
 Linear Equations;
 Spherical Waves;
 Vectors (Mathematics);
 Wave Equations;
 Communications and Radar