An approximate solution to diffraction by an anisotropic impedance half-plane at skew incidence

Author

Senior, T.B.A. ; Legault, S.R.

Author_Institution

Dept. of Electr. Eng. & Comput. Sci., Michigan Univ., Ann Arbor, MI, USA

Volume

3

fYear

1997

fDate

13-18 July 1997

Firstpage

1784

Abstract

The problem of diffraction by an anisotropic half-plane illuminated by a plane wave at skew incidence is considered. At normal incidence the anisotropy has no effect and the solution is readily available, but skew incidence produces a coupling between the two polarizations and the problem has not yet been solved. The second order difference equation obtained if Maliuzhinets´ (1958) method is employed can be reduced to a pair of first order difference equations and the functions involved are no longer meromorphic. An approximate treatment of the problem which circumvents this difficulty is presented. The solution obtained is valid at all angles of incidence and reduces to the known solution at normal incidence.

Keywords

approximation theory; difference equations; electric impedance; electromagnetic wave diffraction; Maliuzhinets´ method; anisotropic impedance half-plane; approximate solution; diffraction; first order difference equations; polarizations; second order difference equation; skew incidence; Anisotropic magnetoresistance; Boundary conditions; Difference equations; Diffraction; Laboratories; Polarization; Surface impedance; Surface waves; Tensile stress; Time factors;

fLanguage

English

Publisher

ieee

Conference_Titel

Antennas and Propagation Society International Symposium, 1997. IEEE., 1997 Digest

Conference_Location

Montreal, Quebec, Canada

Print_ISBN

0-7803-4178-3

Type

conf

DOI

10.1109/APS.1997.631524

Filename

631524