Abstract
The general solution for the field pattern of a circular array is adapted to include the effect of a concentric reflecting cylinder. Two solutions are presented, one giving the field as a Fourier series, and the other as an infinite series of Bessel functions. The results are general, being applicable to any array dimensions and for arbitrary distribution of excitation. The solution is idealized to the extent of assuming a continuous current sheet, rather than discrete elements, and an infinitely long cylindrical reflector.
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