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Decreasing the dimension of a system of scalar equations in the solution of diffraction problems

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Abstract

A vector integral equation is constructed, and an algebraic representation of the equation is considered in the solution of a boundary-value problem in an ideally conducting polyhedron. Moreover, due to the introduction of local coordinate systems on each of the faces of the ideally conducting polyhedron, the integral vector equation relative to the three constituents of the surface current reduces to a system of two scalar integral equations relative to the corresponding components of the current, expressed in the local coordinate systems.

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References

  1. Il’inskii, A. S., Kravtsov, V. V., and Svechnikov, A. G., Matematicheskie modeli elektrodinamiki (Mathematical Models of Electrodynamics), Moscow: Vysshaya Shkola, 1991.

    Google Scholar 

  2. Nikol’skii, V. V. and Nikol’skaya, T. I., Elektrodinamika i rasprostranenie radiovoln: Uchebnoe posobie dlya vuzov (Electrodynamics and the Propagation of Radio Waves: A Textbook for Post-Secondary Educational Institutions), 3rd. ed., Moscow: Nauka, 1989.

    Google Scholar 

  3. Radiotekhnicheskie sistemy (Radiotechnical Systems), Kazarinov, Yu. M., Ed., Moscow: Sovetskoe Radio, 1968.

    Google Scholar 

  4. Markov, G. T., Petrov, B. M., and Grudinskaya, G. P., Elektrodinamika i rasprostranenie radiovoln (Electrodynamics and the Propagation of Radio Waves), Moscow: Sovetskoe Radio, 1979.

    Google Scholar 

  5. Bronshtein, I. N. and Semendyaev, K. A., Spravochnik po matematike dlya inzhenerov, i uchashchikhsya vtuzov (Handbook on Mathematics for Engineers and Students at Post-Secondary Technical Educational Institutions), Moscow: Nauka, 1980.

    Google Scholar 

  6. Vaganov, R. B. and Katsenelenbaum, B. Z., Osnovy teorii diffraktsii (Foundations of Diffraction Theory), Moscow, Nauka, 1982.

    Google Scholar 

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Authors and Affiliations

  1. Rostov Military Institute for Rocket Defense, pr. M. Nagibia 24/5, Rostov-on-Don, 344004, Russia

    A. M. Baiborodov

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  1. A. M. Baiborodov
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Original Russian Text © A.M. Baiborodov, 2007, published in Avtomatika i Vychislitel’naya Tekhnika, 2007, No. 1, pp. 37–44.

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Baiborodov, A.M. Decreasing the dimension of a system of scalar equations in the solution of diffraction problems. Aut. Conrol Comp. Sci. 41, 25–30 (2007). https://doi.org/10.3103/S014641160701004X

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  • DOI: https://doi.org/10.3103/S014641160701004X

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