
This article is cited in 5 scientific papers (total in 5 papers)
The developments of mathematical methods for the study of direct and inverse problems in electrodynamics
V. I. Dmitriev^{}, A. S. Il'inskii^{}, A. G. Sveshnikov^{}
Abstract:
Since the discovery of electromagnetic waves and the formulation of Maxwell's equations, the theory of electromagnetic waves has become one of the most important branches of mathematical physics. The variety of problems in electrodynamics has often stimulated the raising and development of new problems in mathematical physics. Examples are the study of the interior structure of the earth by electromagnetic methods, which has promoted the development of the general theory of inverse problems; the propagation of electromagnetic waves in nonhomogeneous media, which has led to the development of the mathematical theory of diffraction; problems of the transmission of ultrahigh frequency electromagnetic waves, which has stimulated the development of the mathematical theory of waveguide propagation of oscillations; problems of synthesizing systems of antennae and various electromagnetic apparatuses, effective solution of which is associated with the development of methods of mathematical projection, and a number of other problems. The development of mathematical models for the class of problems quoted and the creation of effective methods of studying them has long been connected with the name of Andrei Nikolaevich Tikhonov. This paper is a survey of the basic results obtained in this area during the last decade, and is a logical continuation of [1].
Full text:
PDF file (2395 kB)
References:
PDF file
HTML file
English version:
Russian Mathematical Surveys, 1976, 31:6, 133–152
Bibliographic databases:
UDC:
51:538.3
MSC: 78A25, 78A40, 78A45, 78A50 Received: 09.07.1976
Citation:
V. I. Dmitriev, A. S. Il'inskii, A. G. Sveshnikov, “The developments of mathematical methods for the study of direct and inverse problems in electrodynamics”, Uspekhi Mat. Nauk, 31:6(192) (1976), 123–141; Russian Math. Surveys, 31:6 (1976), 133–152
Citation in format AMSBIB
\Bibitem{DmiIliSve76}
\by V.~I.~Dmitriev, A.~S.~Il'inskii, A.~G.~Sveshnikov
\paper The developments of mathematical methods for the study of direct and inverse problems in~electrodynamics
\jour Uspekhi Mat. Nauk
\yr 1976
\vol 31
\issue 6(192)
\pages 123141
\mathnet{http://mi.mathnet.ru/umn4012}
\mathscinet{http://www.ams.org/mathscinetgetitem?mr=502977}
\zmath{https://zbmath.org/?q=an:0342.350510366.35068}
\transl
\jour Russian Math. Surveys
\yr 1976
\vol 31
\issue 6
\pages 133152
\crossref{https://doi.org/10.1070/RM1976v031n06ABEH001582}
Linking options:
http://mi.mathnet.ru/eng/umn4012 http://mi.mathnet.ru/eng/umn/v31/i6/p123
Citing articles on Google Scholar:
Russian citations,
English citations
Related articles on Google Scholar:
Russian articles,
English articles
This publication is cited in the following articles:

P. A. Savenko, “Numerical solution of a class of nonlinear problems in synthesis of radiating systems”, Comput. Math. Math. Phys., 40:6 (2000), 889–899

P. A. Savenko, “Numerical solution of inverse problems in the theory of the synthesis of radiating systems based on a given power directional diagram”, Comput. Math. Math. Phys., 42:10 (2002), 1495–1509

Petro Savenko, “Computational Methods in the Theory of Synthesis of Radio and Acoustic Radiating Systems”, AM, 04:03 (2013), 523

A. V. Kalinin, M. I. Sumin, A. A. Tyukhtina, “Inverse final observation problems for Maxwell's equations in the quasistationary magnetic approximation and stable sequential Lagrange principles for their solving”, Comput. Math. Math. Phys., 57:2 (2017), 189–210

V. N. Stepanov, “Direct and inverse problems of electromagnetic conrol”, J. Appl. Industr. Math., 12:1 (2018), 177–190

Number of views: 
This page:  704  Full text:  283  References:  44  First page:  2 
