Standard

Electromagnetic scattering by a circular impedance cone: diffraction coefficients and surface waves. / Lyalinov, M.A.

в: IMA Journal of Applied Mathematics, Том 79, № 3, 2014, стр. 393-430.

Результаты исследований: Научные публикации в периодических изданияхстатья

Harvard

Lyalinov, MA 2014, 'Electromagnetic scattering by a circular impedance cone: diffraction coefficients and surface waves', IMA Journal of Applied Mathematics, Том. 79, № 3, стр. 393-430. https://doi.org/10.1093/imamat/hxs072

APA

Lyalinov, M. A. (2014). Electromagnetic scattering by a circular impedance cone: diffraction coefficients and surface waves. IMA Journal of Applied Mathematics, 79(3), 393-430. https://doi.org/10.1093/imamat/hxs072

Vancouver

Lyalinov MA. Electromagnetic scattering by a circular impedance cone: diffraction coefficients and surface waves. IMA Journal of Applied Mathematics. 2014;79(3):393-430. https://doi.org/10.1093/imamat/hxs072

Author

Lyalinov, M.A. / Electromagnetic scattering by a circular impedance cone: diffraction coefficients and surface waves. в: IMA Journal of Applied Mathematics. 2014 ; Том 79, № 3. стр. 393-430.

BibTeX

@article{3f5a48e9f3aa4b6da9d7e3dce7ca8395,
title = "Electromagnetic scattering by a circular impedance cone: diffraction coefficients and surface waves",
abstract = "This paper is devoted to the study of electromagnetic scattering of a plane wave by a circular cone with impedance boundary conditions on its surface. The technique developed in the previous works is extended and applied to the electromagnetic diffraction problem with the aim of computing the far- field. It is known that by means of the Kontorovich–Lebedev integral representations for the Debye potentials and a {\textquoteleft}partial{\textquoteright} separation of variables, the problem is reduced to coupled functional difference equations for the relevant spectral functions. For a circular cone, the functional-difference equations are then further reduced to integral equations which are shown to be of Fredholm type. Certain useful integral representations for the solution of {\textquoteleft}Watson–Bessel{\textquoteright} and Sommerfeld types are exploited, which gives a theoretical basis for subsequent evaluation of the far-field (high-frequency) asymptotics for the diffracted field. To that end, we study analytic properties of the integrands in the Sommerfeld integra",
keywords = "impedance boundary conditions, electromagnetic scattering by a cone, diffraction coefficients, surface waves, Sommerfeld and Watson–Bessel integrals, analytic properties, functional and integral equations.",
author = "M.A. Lyalinov",
year = "2014",
doi = "10.1093/imamat/hxs072",
language = "English",
volume = "79",
pages = "393--430",
journal = "IMA Journal of Applied Mathematics",
issn = "0272-4960",
publisher = "Oxford University Press",
number = "3",

}

RIS

TY - JOUR

T1 - Electromagnetic scattering by a circular impedance cone: diffraction coefficients and surface waves

AU - Lyalinov, M.A.

PY - 2014

Y1 - 2014

N2 - This paper is devoted to the study of electromagnetic scattering of a plane wave by a circular cone with impedance boundary conditions on its surface. The technique developed in the previous works is extended and applied to the electromagnetic diffraction problem with the aim of computing the far- field. It is known that by means of the Kontorovich–Lebedev integral representations for the Debye potentials and a ‘partial’ separation of variables, the problem is reduced to coupled functional difference equations for the relevant spectral functions. For a circular cone, the functional-difference equations are then further reduced to integral equations which are shown to be of Fredholm type. Certain useful integral representations for the solution of ‘Watson–Bessel’ and Sommerfeld types are exploited, which gives a theoretical basis for subsequent evaluation of the far-field (high-frequency) asymptotics for the diffracted field. To that end, we study analytic properties of the integrands in the Sommerfeld integra

AB - This paper is devoted to the study of electromagnetic scattering of a plane wave by a circular cone with impedance boundary conditions on its surface. The technique developed in the previous works is extended and applied to the electromagnetic diffraction problem with the aim of computing the far- field. It is known that by means of the Kontorovich–Lebedev integral representations for the Debye potentials and a ‘partial’ separation of variables, the problem is reduced to coupled functional difference equations for the relevant spectral functions. For a circular cone, the functional-difference equations are then further reduced to integral equations which are shown to be of Fredholm type. Certain useful integral representations for the solution of ‘Watson–Bessel’ and Sommerfeld types are exploited, which gives a theoretical basis for subsequent evaluation of the far-field (high-frequency) asymptotics for the diffracted field. To that end, we study analytic properties of the integrands in the Sommerfeld integra

KW - impedance boundary conditions

KW - electromagnetic scattering by a cone, diffraction coefficients

KW - surface waves

KW - Sommerfeld and Watson–Bessel integrals

KW - analytic properties, functional and integral equations.

U2 - 10.1093/imamat/hxs072

DO - 10.1093/imamat/hxs072

M3 - Article

VL - 79

SP - 393

EP - 430

JO - IMA Journal of Applied Mathematics

JF - IMA Journal of Applied Mathematics

SN - 0272-4960

IS - 3

ER -

ID: 7036357