Title :
The method of parametric representations of integral and pseudo-differential operators in diffraction problems on electrodynamic structures
Author :
Gandel, Yuriy V. ; Dushkin, V.D.
Author_Institution :
Dept. of Math. & Mech. Eng., V.N. Karazin Kharkiv Nat. Univ., Kharkiv, Ukraine
fDate :
May 28 2012-June 1 2012
Abstract :
Mathematical models of 2D electrodynamic wave diffraction and 3D scalar diffraction problems are the external boundary-value problems for the Helmholtz equation with boundary conditions of the first, second or third kind on the boundary surfaces. One of the effective ways of solving these boundary-value problems consists in their reduction to a singular and hypersingular boundary integral equations by the method of parametric representations of integral and pseudo-differential operators. The numerical solution of integral equations is obtained by using the modifications of discrete singularities method. The reasoning in applying this approach to constructing mathematical models of wave diffraction problems had been discussed.
Keywords :
Helmholtz equations; boundary integral equations; boundary-value problems; electrodynamics; electromagnetic wave diffraction; 2D electrodynamic wave diffraction problems; 3D scalar diffraction problems; Helmholtz equation; boundary conditions; boundary surface; discrete singularity method; electrodynamic structures; external boundary-value problems; hypersingular boundary integral equations; integral operators; mathematical models; parametric representations; pseudodifferential operators; Diffraction; Electromagnetic scattering; Integral equations; Interpolation; Mathematical model; Polynomials;
Conference_Titel :
Days on Diffraction (DD), 2012
Conference_Location :
St. Petersburg
Print_ISBN :
978-1-4673-4418-0
DOI :
10.1109/DD.2012.6402755
