Abstract :
The singularity of the electric fields, proportional to the radial coordinate value Rν-1, is investigated for a very sharp, perfectly conducting cone of arbitrary cross section. It is shown that, in the limit of a very small cone, the exponent ν tends to zero in proportion with the inverse of the logarithm of the maximum opening angle. Results are shown for the circular and elliptic cone, with the flat sector as a special case, and for the pyramid with n equal faces. An expression, valid for arbitrary opening angles, is presented in the case of a flat sector
Keywords :
electric fields; electromagnetic field theory; arbitrary cross section; arbitrary opening angles; circular cone; electric fields; electric singularity; elliptic cone; flat sector; perfectly conducting cone; pyramid; sharp cone; Antennas and propagation; Boundary conditions; Dielectrics; Differential equations; Eigenvalues and eigenfunctions; Electromagnetic fields; Manufacturing; Telephony;
