Abstract
Modal solutions of circular cylindrical structure problems sometimes involve products of Bessel functions under infinite summations that are slowly convergent. In this paper, we give a convergence acceleration method for an infinite summation arising from the numerical solution of a scattering problem. The philosophy of the method could be extended or modified for the computation of other complicated circular cylindrical structure problems.
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Herper JC, Hessel A, Tomasic B (1985) Element pattern of an axial dipole in a cylindrical phased array: theory and Experiment. IEEE Trans Antennas Propag 33:259–272
Abromowitz M, Stegun IA (1965) Handbook of mathematical functions. Dover, Washington, D.C.
Balanis CA (1989) Advanced engineering electromagnetics. John Wiley, Tempe, Arizona
Cwick T (1990) Coupling into and scattering from cylindrical structures covered periodically with metal patches. IEEE Trans Antennas Propag 38:220–226
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Uzer, A., Ege, T. An improved convergence acceleration method for the strip grating cylindrical surface problem. Electr Eng 86, 55–60 (2003). https://doi.org/10.1007/s00202-003-0181-7
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DOI: https://doi.org/10.1007/s00202-003-0181-7