Abstract
We consider the problem on the continuation of a solution to a system of Maxwell equations, using its values on a part of the domain boundary.
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References
M. M. Lavrent’ev, Certain Ill-Posed Problems in Mathematical Physics (Ross. Akad. Nauk, Siberian Branch, Computer Center, Novosibirsk, 1962) [in Russian].
R. Lattes and J.-L. Lions, Mé thode de Quasi-Réversibilité et Applications (Dunod, Paris, 1967; Mir, Moscow, 1970).
A. N. Tikhonov and V. Ya. Arsenin, Methods of Solution of Ill-Posed Problems (Nauka, Moscow, 1979) [in Russian].
V. K. Ivanov, V. V. Vasin, and V. P. Tanana, Theory of Linear Ill-Posed Problems and its Applications (Nauka, Moscow, 1978) [in Russian].
M. M. Dzhrbashyan, Integral Transforms and Representation of Functions in a Complex Domain (Nauka, Moscow, 1966) [in Russian].
M. A. Aleksidze, Fundamental Functions in Approximate Solutions of Boundary Problems (Nauka, Moscow, 1991) [in Russian].
J. A. Stratton and L. J. Chu, “Diffraction Theory of ElectromagneticWaves,” Phys. Repav. 56, 99–107 (1939).
Sh. Yarmukhamedov, “The Carleman Function and the Cauchy Problem for the Laplace Equation,” Sib. Matem. Zhurn. 45(3), 702–719 (2004).
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Original Russian Text © E.N. Sattorov, 2008, published in Izvestiya Vysshikh Uchebnykh Zavedenii. Matematika, 2008, No. 8, pp. 78–83.
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Sattorov, E.N. Continuation of a solution to a homogeneous system of Maxwell equations. Russ Math. 52, 65–69 (2008). https://doi.org/10.3103/S1066369X08080094
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DOI: https://doi.org/10.3103/S1066369X08080094