Title :
Boundary equations in the problems of electromagnetic wave diffraction on 3-D unclosed surfaces
Author :
Chudinovich, I. ; Lytova, A.
Author_Institution :
Kharkov State Univ., Ukraine
Abstract :
This investigation continues the research previously carried out by the authors which were devoted to the diffraction problems on closed surfaces. In these papers the unique solvability of various systems of non-stationary boundary equations was proved in some functional spaces of the Sobolev type. In this paper they consider the problem of electromagnetic wave diffraction on an unclosed surface Γ0 in R3 which models an ideal conductor
Keywords :
Maxwell equations; boundary-value problems; electromagnetic wave diffraction; functional equations; 3D unclosed surfaces; Maxwell system; Sobolev type functional spaces; boundary equations; electromagnetic wave diffraction; ideal conductor; nonstationary boundary equations; open surface; Conductors; Dielectric constant; Electromagnetic diffraction; Electromagnetic modeling; Electromagnetic scattering; H infinity control; Magnetic fields; Maxwell equations; Surface waves;
Conference_Titel :
Mathematical Methods in Electromagnetic Theory, 1998. MMET 98. 1998 International Conference on
Conference_Location :
Kharkov
Print_ISBN :
0-7803-4360-3
DOI :
10.1109/MMET.1998.709831
