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Diffraction by a nonplanar screen. (English) Zbl 0514.73015


MSC:

74J20 Wave scattering in solid mechanics
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References:

[1] Hönl, H.; Maue, A.; Westpfahl, K., Theory of diffraction, (1964), Mir Moscow
[2] Keller, J.B., Geometrical theory of diffraction, J. opt. soc. amer., 52, 116-130, (1962)
[3] Ahluwalia, D.S., Uniform asymptotic theory of diffraction by the edge of a three-dimensional body, SIAM J. appl. math., 18, 2, 287-301, (1970) · Zbl 0189.40801
[4] Babič, V.B.; Buldyrev, V.S., Asymptotic methods in shortwave diffraction problems, (1972), Nauka Moskow
[5] Buslaev, V.S., On the asymptotic behavior of spectral characteristics of exterior problems for the Schrödinger operator, Izv. akad. nauk SSR (ser. mat.), J. sov. math. USSR izv., 9, 139-223, (1975) · Zbl 0324.35006
[6] Philippov, V.B., Diffraction from a curved half-plane, Zap. nauchn. sem. leningrad. otd. mat. inst. AN SSSR, J. sov. math., 9, 626-632, (1978) · Zbl 0396.35026
[7] Babič, V.M.; Kirpicnicova, N.Y., The boundary-layer method in diffraction problems, (1979), Springer Berlin
[8] Babič, V.M., Oscillations of a high-frequency point source near a concave mirror, Zap. nauchn. sem. leningrad. otd. mat. inst. AN SSSR, J. sov. math., 11, 361-371, (1979) · Zbl 0401.35022
[9] Babič, V.M., Oscillating point source near a concave mirror, Zap. nauchn. sem. leningrad. otd. mat. inst. AN SSSR, 89, 3-13, (1978)
[10] Philippov, V.B., Shortwave asymptotics of the current in the problem of diffraction from nonplanar screens, Zap. nauchn. sem. leningrad. otd. mat. inst. AN SSSR, J sov. math., 11, 479-487, (1979) · Zbl 0401.35028
[11] Philippov, V.B., Shortwave asymptotics of the current and the angle diagram for the problem of diffraction by nonplanar screens, (), 47-50
[12] Ishihara, T.; Felsen, L.B.; Green, A., High-frequency fields excited by a line source located on a perfectly conducting concave cylindrical surface, IEEE trans. ant. prop., 26, 6, 757-767, (1978)
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