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Ultra-Wideband, Short-Pulse Electromagnetics 5 pp 137–142Cite as

Electromagnetic Wave Scattering by Smooth Imperfectly Conductive Cylindrical Obstacle

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Conclusion

The problem of wave diffraction by impedance cylindrical smooth surface is solved. The initial boundary value problem is reduced to a few different algebraic systems in l2 of the kind (I+H)x=b, x,b∈l2 This gives relevant basis for efficient numerical algorithm construction for most part of possible physical and engineering applications. The constructed method includes the most complicated case of imperfectly but well conductive cylinder.

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References

  • Yu. A. Tuchkin, 1985, Wave scattering by unclosed cylindrical screen of arbitrary profile with Dirichlet boundary condition, Soviet Physics Doclady, 30.

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  • Yu. A. Tuchkin, 1987, Wave scattering by unclosed cylindrical screen of arbitrary profile with Neumann boundary condition, Soviet Physics Doclady, 32.

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  • Yu. A. Tuchkin, and V. P. Shestopalov, 1990, A wave diffraction by screens of finite thickness, Soviet Physics Doklady, 35.

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  • Yu. A. Tuchkin, 1997, Regularization of one class of system of integral-differential equations of mathematical physics, Doclady of The Ukrainian National Academy of Sciences, ser. A, No. 10, pp.47–51 (in Russian).

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  • V. P. Shestopalov, Yu. A. Tuchkin, A. Ye. Poyedinchuk and Yu. K. Sirenko, 1997, Novel methods for solving direct and inverse problems of diffraction theory, vol. 1: Analytical regularization of electromagnetic boundary value problems, Kharkov: Osnova, (in Russian)

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Authors and Affiliations

  1. Institute of Radiophysics and Electronics, NAS of Ukraine, Kharkov, Ukraine

    Yu. A. Tuchkin

  2. Gebze Institute of Technology, Gebze, Turkey

    Yu. A. Tuchkin

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  1. Yu. A. Tuchkin
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© 2002 Kluwer Academic Publishers

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Tuchkin, Y.A. (2002). Electromagnetic Wave Scattering by Smooth Imperfectly Conductive Cylindrical Obstacle. In: Ultra-Wideband, Short-Pulse Electromagnetics 5. Springer, Boston, MA. https://doi.org/10.1007/0-306-47948-6_16

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  • DOI: https://doi.org/10.1007/0-306-47948-6_16

  • Publisher Name: Springer, Boston, MA

  • Print ISBN: 978-0-306-47338-8

  • Online ISBN: 978-0-306-47948-9

  • eBook Packages: Springer Book Archive

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