Palaeomagnetic Study of Dated Pre-Cambrian Rocks of the Front Range, Colorado-Wyoming
Abstract
The electric dyadic Green's function for a spherical resonator is expressed as a sum of two dyadics given in closed form and a dyadic given in the form of a series. The first two dyadics diverge at the source point and they represent a low-frequency approximation for the Green's function, valid up to frequencies moderately lower than the resonant frequency of the dominant mode. The dyadic given in the form of a series is finite at the source and takes into account cavity resonances. It is given either as a one-index series, whose terms are transcendental functions of the frequency, or as a double series, whose terms are rational functions of the frequency. Both series have very good converging properties everywhere inside the cavity.
- Publication:
-
IEEE Transactions on Microwave Theory Techniques
- Pub Date:
- May 1985
- DOI:
- Bibcode:
- 1985ITMTT..33..407B
- Keywords:
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- Cavity Resonators;
- Green'S Functions;
- Microwave Resonance;
- Singularity (Mathematics);
- Spheres;
- Dyadics;
- Field Mode Theory;
- Resonant Frequencies;
- Series Expansion;
- Electronics and Electrical Engineering