Dyadic Green's functions for a coaxial line
Abstract
The eigenfunction expansions of the dyadic Green's functions for a coaxial line are derived in detail using the method of the magnetic dyadic Green's function. The irrotational vector wave function is not necessary for the derivation using this method. A dyadic boundary condition for the discontinuity of the tangential component of the magnetic dyadic Green's function is employed in order to facilitate the derivation of the expression for the electric dyadic Green's function.
- Publication:
-
IEEE Transactions on Antennas and Propagation
- Pub Date:
- March 1983
- DOI:
- Bibcode:
- 1983ITAP...31..355T
- Keywords:
-
- Coaxial Cables;
- Dyadics;
- Electromagnetic Wave Transmission;
- Green'S Functions;
- Maxwell Equation;
- Wave Functions;
- Antenna Radiation Patterns;
- Boundary Conditions;
- Boundary Value Problems;
- Discontinuity;
- Eigenvalues;
- Point Sources;
- Electronics and Electrical Engineering