Title :
The excitation of a perfectly conducting half-plane by a dipole field
Author_Institution :
Carnegie Institute of Technology, Pittsburgh, PA, USA
fDate :
7/1/1956 12:00:00 AM
Abstract :
Starting with the solution of two scalar problems in diffraction theory derived by MacDonald in 1915, it is shown that the following problem may be solved. An electric or magnetic dipole is situated in the presence of a semi-infinite, perfectly conducting, thin plane. This problem may be solved by appealing to an appropriate representation of the electromagnetic field. When the formulation is complete, we are left merely with a two-dimensional Poisson equation. The method serves to show why some orientations of the dipole are simpler to handle than others.
Keywords :
Antenna proximity factors; Dipole antennas; Electromagnetic diffraction; Contracts; Electromagnetic diffraction; Electromagnetic fields; Electromagnetic scattering; H infinity control; Magnetic fields; Poisson equations; Silver;
Journal_Title :
Antennas and Propagation, IRE Transactions on
DOI :
10.1109/TAP.1956.1144406
