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The Weyl–Van Der Pol Phenomenon in Acoustic Diffraction by a Wedge or a Cone with Impedance Boundary Conditions. / Lyalinov, M.A.

в: Journal of Mathematical Sciences, Том 224, № 1, 2017, стр. 119-134.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Lyalinov, MA 2017, 'The Weyl–Van Der Pol Phenomenon in Acoustic Diffraction by a Wedge or a Cone with Impedance Boundary Conditions', Journal of Mathematical Sciences, Том. 224, № 1, стр. 119-134. https://doi.org/10.1007/s10958-017-3399-z

APA

Lyalinov, M. A. (2017). The Weyl–Van Der Pol Phenomenon in Acoustic Diffraction by a Wedge or a Cone with Impedance Boundary Conditions. Journal of Mathematical Sciences, 224(1), 119-134. https://doi.org/10.1007/s10958-017-3399-z

Vancouver

Lyalinov MA. The Weyl–Van Der Pol Phenomenon in Acoustic Diffraction by a Wedge or a Cone with Impedance Boundary Conditions. Journal of Mathematical Sciences. 2017;224(1):119-134. https://doi.org/10.1007/s10958-017-3399-z

Author

Lyalinov, M.A. / The Weyl–Van Der Pol Phenomenon in Acoustic Diffraction by a Wedge or a Cone with Impedance Boundary Conditions. в: Journal of Mathematical Sciences. 2017 ; Том 224, № 1. стр. 119-134.

BibTeX

@article{73effdd69eaf4a34a85b8bf90bd50787,
title = "The Weyl–Van Der Pol Phenomenon in Acoustic Diffraction by a Wedge or a Cone with Impedance Boundary Conditions",
abstract = "The paper deals with the asymptotic description of a diffraction pattern similar to the classical Weyl–Van der Pol phenomenon (the Weyl–Van der Pol formula). The latter arises in the problem of diffraction of waves generated by a source located near an impedance plane. An incident wave illuminates an impedance wedge or cone. The singular points of the wedge{\textquoteright}s (the edge points) or cone{\textquoteright}s (the vertex of the cone) boundary play the role of an imaginary source, giving rise to a specific boundary layer in some neighborhood of the corresponding impedance surface, provided that the surface impedance is relatively small. From the mathematical point of view, the description of the phenomenon is given by means of the far field asymptotics for the Sommerfeld integral representations of the scattered field. For small impedance of the scattering surface, the singularities describing the surface wave, which propagates from the edge (or from the vertex) along the impedance surface, may be located in a neighborhood of saddle",
author = "M.A. Lyalinov",
year = "2017",
doi = "10.1007/s10958-017-3399-z",
language = "не определен",
volume = "224",
pages = "119--134",
journal = "Journal of Mathematical Sciences",
issn = "1072-3374",
publisher = "Springer Nature",
number = "1",

}

RIS

TY - JOUR

T1 - The Weyl–Van Der Pol Phenomenon in Acoustic Diffraction by a Wedge or a Cone with Impedance Boundary Conditions

AU - Lyalinov, M.A.

PY - 2017

Y1 - 2017

N2 - The paper deals with the asymptotic description of a diffraction pattern similar to the classical Weyl–Van der Pol phenomenon (the Weyl–Van der Pol formula). The latter arises in the problem of diffraction of waves generated by a source located near an impedance plane. An incident wave illuminates an impedance wedge or cone. The singular points of the wedge’s (the edge points) or cone’s (the vertex of the cone) boundary play the role of an imaginary source, giving rise to a specific boundary layer in some neighborhood of the corresponding impedance surface, provided that the surface impedance is relatively small. From the mathematical point of view, the description of the phenomenon is given by means of the far field asymptotics for the Sommerfeld integral representations of the scattered field. For small impedance of the scattering surface, the singularities describing the surface wave, which propagates from the edge (or from the vertex) along the impedance surface, may be located in a neighborhood of saddle

AB - The paper deals with the asymptotic description of a diffraction pattern similar to the classical Weyl–Van der Pol phenomenon (the Weyl–Van der Pol formula). The latter arises in the problem of diffraction of waves generated by a source located near an impedance plane. An incident wave illuminates an impedance wedge or cone. The singular points of the wedge’s (the edge points) or cone’s (the vertex of the cone) boundary play the role of an imaginary source, giving rise to a specific boundary layer in some neighborhood of the corresponding impedance surface, provided that the surface impedance is relatively small. From the mathematical point of view, the description of the phenomenon is given by means of the far field asymptotics for the Sommerfeld integral representations of the scattered field. For small impedance of the scattering surface, the singularities describing the surface wave, which propagates from the edge (or from the vertex) along the impedance surface, may be located in a neighborhood of saddle

U2 - 10.1007/s10958-017-3399-z

DO - 10.1007/s10958-017-3399-z

M3 - статья

VL - 224

SP - 119

EP - 134

JO - Journal of Mathematical Sciences

JF - Journal of Mathematical Sciences

SN - 1072-3374

IS - 1

ER -

ID: 7746466