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On steady-state moving load problems for an elastic half-space. / Bratov, V.; Kaplunov, J.; Prikazchikov, D. A.

PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON DAYS ON DIFFRACTION 2016 (DD). ed. / OV Motygin; AP Kiselev; PV Kapitanova; LI Goray; AY Kazakov; AS Kirpichnikova. IEEE Canada, 2016. p. 84-88 (IEEE Conference Publication).

Research output: Chapter in Book/Report/Conference proceedingConference contributionResearchpeer-review

Harvard

Bratov, V, Kaplunov, J & Prikazchikov, DA 2016, On steady-state moving load problems for an elastic half-space. in OV Motygin, AP Kiselev, PV Kapitanova, LI Goray, AY Kazakov & AS Kirpichnikova (eds), PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON DAYS ON DIFFRACTION 2016 (DD). IEEE Conference Publication, IEEE Canada, pp. 84-88, 2016 International Conference Days on Diffraction, DD 2016, St. Petersburg, Russian Federation, 27/06/16. https://doi.org/10.1109/DD.2016.7756819

APA

Bratov, V., Kaplunov, J., & Prikazchikov, D. A. (2016). On steady-state moving load problems for an elastic half-space. In OV. Motygin, AP. Kiselev, PV. Kapitanova, LI. Goray, AY. Kazakov, & AS. Kirpichnikova (Eds.), PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON DAYS ON DIFFRACTION 2016 (DD) (pp. 84-88). (IEEE Conference Publication). IEEE Canada. https://doi.org/10.1109/DD.2016.7756819

Vancouver

Bratov V, Kaplunov J, Prikazchikov DA. On steady-state moving load problems for an elastic half-space. In Motygin OV, Kiselev AP, Kapitanova PV, Goray LI, Kazakov AY, Kirpichnikova AS, editors, PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON DAYS ON DIFFRACTION 2016 (DD). IEEE Canada. 2016. p. 84-88. (IEEE Conference Publication). https://doi.org/10.1109/DD.2016.7756819

Author

Bratov, V. ; Kaplunov, J. ; Prikazchikov, D. A. / On steady-state moving load problems for an elastic half-space. PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON DAYS ON DIFFRACTION 2016 (DD). editor / OV Motygin ; AP Kiselev ; PV Kapitanova ; LI Goray ; AY Kazakov ; AS Kirpichnikova. IEEE Canada, 2016. pp. 84-88 (IEEE Conference Publication).

BibTeX

@inproceedings{1547966f53794c9b8a86dc4de5f4cd1d,
title = "On steady-state moving load problems for an elastic half-space",
abstract = "The steady-state regime of a moving load on an elastic half-plane is addressed. It is shown that the solution can be expressed through a single harmonic function, similarly to the known eigensolution for surface Rayleigh wave, thus reducing a vector problem in linear elasticity to a scalar one for the Laplace equation. Examples of steadily moving vertical force and punch are investigated, illustrating the proposed approach.",
keywords = "ARBITRARY PROFILE, SCHOLTE WAVES, SURFACE, RAYLEIGH",
author = "V. Bratov and J. Kaplunov and Prikazchikov, {D. A.}",
year = "2016",
doi = "10.1109/DD.2016.7756819",
language = "Английский",
series = "IEEE Conference Publication",
publisher = "IEEE Canada",
pages = "84--88",
editor = "OV Motygin and AP Kiselev and PV Kapitanova and LI Goray and AY Kazakov and AS Kirpichnikova",
booktitle = "PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON DAYS ON DIFFRACTION 2016 (DD)",
address = "Канада",
note = "null ; Conference date: 27-06-2016 Through 01-07-2016",

}

RIS

TY - GEN

T1 - On steady-state moving load problems for an elastic half-space

AU - Bratov, V.

AU - Kaplunov, J.

AU - Prikazchikov, D. A.

PY - 2016

Y1 - 2016

N2 - The steady-state regime of a moving load on an elastic half-plane is addressed. It is shown that the solution can be expressed through a single harmonic function, similarly to the known eigensolution for surface Rayleigh wave, thus reducing a vector problem in linear elasticity to a scalar one for the Laplace equation. Examples of steadily moving vertical force and punch are investigated, illustrating the proposed approach.

AB - The steady-state regime of a moving load on an elastic half-plane is addressed. It is shown that the solution can be expressed through a single harmonic function, similarly to the known eigensolution for surface Rayleigh wave, thus reducing a vector problem in linear elasticity to a scalar one for the Laplace equation. Examples of steadily moving vertical force and punch are investigated, illustrating the proposed approach.

KW - ARBITRARY PROFILE

KW - SCHOLTE WAVES

KW - SURFACE

KW - RAYLEIGH

U2 - 10.1109/DD.2016.7756819

DO - 10.1109/DD.2016.7756819

M3 - статья в сборнике материалов конференции

T3 - IEEE Conference Publication

SP - 84

EP - 88

BT - PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON DAYS ON DIFFRACTION 2016 (DD)

A2 - Motygin, OV

A2 - Kiselev, AP

A2 - Kapitanova, PV

A2 - Goray, LI

A2 - Kazakov, AY

A2 - Kirpichnikova, AS

PB - IEEE Canada

Y2 - 27 June 2016 through 1 July 2016

ER -

ID: 62042072