References
- Richmond JH. Scattering by a ferrite-coated conducting sphere. IEEE Trans. Antennas Propagat. 1987;35:73–79.
- Gurwich I, Kleiman M, Shiloah N, Cohen A. Scattering of electromagnetic radiation by multilayered spheroidal particles: recursive procedure, Appl. Opt. 2000;39:470–477.
- Geng Y-L. Scattering of a plane wave by an anisotropic ferrite-coated conducting sphere. IET Microw. Antennas Propagat. 2008;2:158–162.
- Ren W, Wu XB, Yi Z, Lin WG. Properties of wave functions in homogeneous anisotropic media. Phys. Rev. E. 1995;51:671–679.
- Beker B, Umashankar KR, Taflove A. Electromagnetic scattering by arbitrarily shaped two-dimensions perfectly conducting objects coated with homogeneous anisotropic materials. Electromagnetics. 1990;10:387–406.
- Yeh C. The diffraction of waves by a penetrable ribbon. J. Math. Phys. 1963;4:65–71.
- Ragheb HA, Shafai L. Electromagnetic scattering from a dielectric-coated elliptic cylinder. Can. J. Phys. 1988;66:1115–1122.
- Richmond JH. Scattering by a conducting elliptic cylinder with dielectric coating. Radio Sci. 1988;23:1061–1066.
- Kim CS. Scattering of an obliquely incident wave by a multilayered elliptical lossy dielectric cylinder. Los Angeles, CA: Dept Electrical Engineering, Univ. of California; 1989.
- Ragheb HA, Shafai L, Hamid M. Plane wave scattering by a conducting elliptic cylinder coated by a nonconfocal dielectric. IEEE Trans. Antennas Propagat. 1991;39:218–223.
- Roumeliotis JA, Manthopoulos HK, Manthopoulos VK. Electromagnetic scattering from an infinite circular metallic cylinder coated by an elliptic dielectric one. IEEE Trans. Microwave Theory Tech. 1994;41:2128–2138.
- Caorsi S, Pastorino M, Raffetto M. Electromagnetic scattering by a multilayer elliptic cylinder under transverse-magnetic illumination: series solution in terms of Mathieu functions. IEEE Trans. Antennas Propagat. 1997;45:926–935.
- Caorsi S, Pastorino M, Raffetto M. EM field prediction inside lossy multilayer elliptic cylinders for biological-body modeling and numerical-procedure testing. IEEE Trans. Biomed. Eng. 1999;46:1304–1309.
- Caorsi S, Pastorino M. Scattering by multilayer isorefractive elliptic cylinder. IEEE Trans. Antennas Propagat. 2004;52:189–196.
- Mao S-C, Wu Z-S. Scattering by an infinite homogenous anisotropic elliptic cylinder in terms of Mathieu functions and Fourier series. J. Opt. Soc. Am. A. 2008;25:2925–2931.
- Mao S-C, Wu Z-S, Li H-Y. Three-dimensional scattering by an infinite homogeneous anisotropic elliptic cylinder in terms of Mathieu functions. J. Opt. Soc. Am. A. 2009;26:2282–2291.
- Wu Z-S, Mao S-C, Yang L. Two-dimensional scattering by a conducting elliptic cylinder coated with a homogeneous anisotropic shell. IEEE Trans. Antennas Propagat. 2009;57:3638–3645.
- Mao S-C, Wu Z-S, Jin Z, Wang F. Scattering by a homogeneous anisotropic-coated conducting elliptic cylinder. Wave Random Complex Media. 2011;21:301–312.
- Blanch G. Mathieu functions. In: M Abramowitz, IA Stegun, editors, Handbook of mathematical functions. New York: Dover; 1965. p. 721–746.
- McLachlan NW. Theory and application of Mathieu functions. New York: Oxford University Press; 1947.
- Stratton JA. Electromagnetic theory. New York: McGraw-Hill; 1941.
- Særmark K. A note on addition theorems of Mathieu functions. MZ. Math. Phys. 1959;10:426–428.
- Monzon JC, Damaskos NJ. Two-dimensional scattering by a homogeneous anisotropic rod. IEEE Trans. Antennas Propagat. 1986;34:1243–1249.
- Jin J-M. Available from: http://jin.ece.uiuc.edu/.