Title :
Inverse scattering problem for a stratified dispersive chiral medium
Author :
Shepelsky, Dmitry
Author_Institution :
Inst. for Low Temp. Phys. & Eng., Kharkov, Ukraine
fDate :
6/21/1905 12:00:00 AM
Abstract :
An inverse problem for a non-homogeneous (stratified) dispersive chiral slab is considered in the frequency domain. The problem is treated as a holomorphic factorization problem in the frequency complex plane. The reconstruction algorithm is based on the reformulation of the scattering problem as a Riemann-Hilbert problem. Uniqueness in the parameter reconstruction under normal incidence of the exciting waves is studied
Keywords :
chirality; dispersive media; electromagnetic wave scattering; frequency-domain analysis; inhomogeneous media; inverse problems; Riemann-Hilbert problem; exciting waves; frequency complex plane; frequency domain; holomorphic factorization problem; inverse problem; inverse scattering problem; nonhomogeneous dispersive chiral slab; normal incidence; parameter reconstruction; reconstruction algorithm; stratified dispersive chiral medium; Anisotropic magnetoresistance; Dispersion; Electromagnetic scattering; Frequency domain analysis; Inverse problems; Ocean temperature; Physics; Reconstruction algorithms; Scattering parameters; Slabs;
Conference_Titel :
Direct and Inverse Problems of Electromagnetic and Acoustic Wave Theory, 1999. Proceedings of IVth International Seminar/Workshop
Conference_Location :
Lviv
Print_ISBN :
966-02-0864-2
DOI :
10.1109/DIPED.1999.822122
