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ISSN 2415-3400 (Online)
ISSN 1028-821X (Print)

ONE-DIMENSIONAL INVERSE PROBLEMS OF ELECTROMAGNETIC PROBING STRATIFIED DIELECTRIC MEDIA

heading: 
APPLIED RADIOPHYSICS
Brovenko, AV, Vert, ii, AA, Melezhik, NP, Melezhik, PN, A. Poyedinchuk, Y
Organization: 

O. Ya. Usikov Institute for Radiophysics and Electronics of the National Academy of Sciences of Ukraine
​12, Proskura st., Kharkov, 61085, Ukraine
E-mail: melezhik@ire.kharkov.ua

L.N.Gumilyov Eurasian National University
2, st. Mirzoyan, Astana,010000, Republic of Kazakhstan
https://doi.org/10.15407/rej2015.04.092
Language: russian
Abstract: 

The problem of permittivity profile reconstruction from reflection coefficient data for a stratified dielectric medium illuminated with a probing plane electromagnetic wave at a finite set of frequencies is considered to deal with a topical problem in the context of the development of state-of-the-art nondestructive methods of testing. The initial problem is reduced to the search of an optimal control (permittivity profile) of the Cauchy problem for the Riccati equation. The optimal control is treated in the class of polynomial functions and is based on the minimization of a relevant functional. A criterion is suggested for choosing polynomial approximations to the permittivity profile, which separates input data sets between training and test sequences of probing frequencies. Error analysis made for the reconstruction of the permittivity imaginary part in a stratified medium shows that the relative error of the reconstruction does not exceed 10 % when the permittivity imaginary part is small (Ime ~ 10–4) and it is under 1 % when the permittivity imaginary part is large (Ime ³ 0.1). The developed algorithms can reconstruct the complex permittivity in a stratified medium to accuracy appropriate for practical applications.
Keywords: inverse problem, permittivity profile, reflection coefficient, stratified medium

Manuscript submitted 09.11.2015 г.
PACS     02.30.Zz
Radiofiz. elektron. 2015, 20(4): 92-97
Full text  (PDF)

References: 
  1. Tikhonravov, A. V. and Trubetskov, M. K., 2005. New methods of multilayer optics. Radiotehnika i elektronika, 50(2), pp. 265–272 (in Russian).
  2. Brovenko, A. V., Melezhik, P. N., Panin, S. B. and Poyedinchuk, A. Ye., 2013. A semi-analytical method for solving problems of wave diffraction by inhomogeneous stratified media. Fizicheskie osnovy priborostroeniya, 2(1), pp. 34–47 (in Russian).
  3. Brovenko, A. V., Vertiy, A. A., Melezhik, N. P., Melezhik, P. N., Poyedinchuk, A. Ye., 2015. A semi-analytical method for solving inverse problems of wave diffraction by inhomogeneous layers. Radiofizika i elektoronika, 6(20)(10), pp. 13–25 (in Russian).
  4. Dmitriyev, V. I., Iliinsky, A. S. and Sveshnikov, A. G., 1976. Development of mathematical methods of investigating direct and inverse problems of electrodynamics. Usp. matemat. nauk, 31(6), pp. 123–141 (in Russian).
  5. Newton, R. G., 1981. Inversion of reflection data for layered media: a review of exact methods. Geophys. J. R. Astr. Soс., 65, pp. 191–215.
  6. Khruslov, Ye. Ya., 1985. One-dimensional inverse problems of electrodynamics. U.S.S.R. Comput. Math. Math. Phys., 25(2), pp. 142–151. DOI: https://doi.org/10.1016/0041-5553(85)90120-X
  7. Pontryagin, L. S., 1976. Mathematical theory of optimal processes. Moscow: Nauka Publ. (in Russian).
  8. Sveshnikov, A. G. and Tikhonravov, A. V., 1989. mathematical methods in the problems of analysis and synthesis of stratified media. Matematicheskoe modelirovanie, 1(7), pp. 13–38 (in Russian).
  9. Ivakhnenko, A. G., 1981. Inductive method of self-organization of complex system models. Kiev: Naukova dumka Publ. (in Russian).