Title :
Effective method to solve the diffraction on periodical surface problems
Author :
Verbitskii, I.L.
Author_Institution :
Kharkov Inst. of Manage., Ukraine
Abstract :
This report presents the continuation and development of previous works devoted to the diffraction on periodic surfaces. It has been proposed that an effective method to solve this problem in the two-dimensional case, based on the nonstandard application of conformal mapping, is the quasistatic Green function method (QGFM). The QGFM has been improved and the problem has been reduced to the unified system of linear algebraic equations. In this report a method of evaluation of the matrix coefficient of this system is proposed
Keywords :
Green´s function methods; electromagnetic wave diffraction; linear algebra; matrix algebra; periodic structures; conformal mapping; electromagnetic wave diffraction; linear algebraic equations; matrix coefficient; periodic surface; quasistatic Green function method; two-dimensional scattering; Boundary conditions; Conformal mapping; Electromagnetic diffraction; Electromagnetic scattering; Electromagnetic wave polarization; Equations; Green function; Magnetic domains; Surface waves;
Conference_Titel :
Direct and Inverse Problems of Electromagnetic and Acoustic Wave Theory, 2001. DIPED 2001. Proceedings of the 6th International Seminar/Workshop on
Conference_Location :
Lviv
Print_ISBN :
966-02-1876-1
DOI :
10.1109/DIPED.2001.965042
