The static electric field distribution between two semi-infinite circular cylinders: A model for the feed gap field of a dipole antenna

The static electric field distribution in the gap between two solid perfectly conducting semi-infinite cylinders is obtained in terms of a Fourier-Bessel eigenfunction series. For dipole antennas whose cylinder diameter 2a and gap length 2d are both much less than the operating wavelength \lambda ,...

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Bibliographic Details
Published in:I.R.E. transactions on antennas and propagation 1987-11, Vol.35 (11), p.1273-1280
Main Authors: Tam Do-Nhat, MacPhie, R.
Format: Article
Language:English
Subjects:
Antenna feeds
Antenna theory
Antennas
Aperture antennas
Applied sciences
Conformal mapping
Dipole antennas
Eigenvalues and eigenfunctions
Engine cylinders
Exact sciences and technology
Polynomials
Radiocommunications
Solid modeling
Telecommunications
Telecommunications and information theory
Voltage
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Summary:The static electric field distribution in the gap between two solid perfectly conducting semi-infinite cylinders is obtained in terms of a Fourier-Bessel eigenfunction series. For dipole antennas whose cylinder diameter 2a and gap length 2d are both much less than the operating wavelength \lambda , this field can serve as the quasistatic excitation field in the gap of the dipole. However, the Fourier-Bessel series is slowly convergent. It is transformed into a rapidly convergent series of ultrasphetical polynomials whose weighting function explicitly satisfies the Meixner edge condition. Numerical results are presented graphically for both the axial electric field on the gap surface and the associated potential distribution. Gap ratios of d/a from 0.01 to 10.0 are considered and it is shown that as d/a \rightarrow 0 the solution approaches the two-dimensional solution obtainable by conformal mapping.
ISSN:0018-926X
0096-1973
1558-2221
DOI:10.1109/TAP.1987.1144002