Standard

Stability of a compressed rod under restrictions on the displacement. / Morozov, N. F.; Tovstik, P. E.

в: Doklady Physics, Том 52, № 1, 01.2007, стр. 55-59.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Morozov, NF & Tovstik, PE 2007, 'Stability of a compressed rod under restrictions on the displacement', Doklady Physics, Том. 52, № 1, стр. 55-59. https://doi.org/10.1134/S1028335807010144

APA

Morozov, N. F., & Tovstik, P. E. (2007). Stability of a compressed rod under restrictions on the displacement. Doklady Physics, 52(1), 55-59. https://doi.org/10.1134/S1028335807010144

Vancouver

Morozov NF, Tovstik PE. Stability of a compressed rod under restrictions on the displacement. Doklady Physics. 2007 Янв.;52(1):55-59. https://doi.org/10.1134/S1028335807010144

Author

Morozov, N. F. ; Tovstik, P. E. / Stability of a compressed rod under restrictions on the displacement. в: Doklady Physics. 2007 ; Том 52, № 1. стр. 55-59.

BibTeX

@article{dad2445de6bd413eaa5f8e26f8586c24,
title = "Stability of a compressed rod under restrictions on the displacement",
abstract = "The problem of plane deformation of a thin elastic inextensible rod of length L supported by a smooth inclined wall and the stability of a compressed rod under restrictions on the displacement were discussed. The problem is distinguished by the presence of a wall preventing the rod from deflection in one of the transverse directions. The deflection in the linear approximation is assumed to be small and the compression force is considered equal to its value in the unstrained state. The linear approximation allows finding only unstable equilibria and it was also demonstrated that the solutions constructed in the linear approximation are unstable as well. It was found that the calculation of the value of A reduced to the determination of the minimum eigenvalue of the linear boundary value problem. It was shown by calculations that either the stability conditions were violated or the condition at the reaction is positive.",
author = "Morozov, {N. F.} and Tovstik, {P. E.}",
year = "2007",
month = jan,
doi = "10.1134/S1028335807010144",
language = "English",
volume = "52",
pages = "55--59",
journal = "Doklady Physics",
issn = "1028-3358",
publisher = "МАИК {"}Наука/Интерпериодика{"}",
number = "1",

}

RIS

TY - JOUR

T1 - Stability of a compressed rod under restrictions on the displacement

AU - Morozov, N. F.

AU - Tovstik, P. E.

PY - 2007/1

Y1 - 2007/1

N2 - The problem of plane deformation of a thin elastic inextensible rod of length L supported by a smooth inclined wall and the stability of a compressed rod under restrictions on the displacement were discussed. The problem is distinguished by the presence of a wall preventing the rod from deflection in one of the transverse directions. The deflection in the linear approximation is assumed to be small and the compression force is considered equal to its value in the unstrained state. The linear approximation allows finding only unstable equilibria and it was also demonstrated that the solutions constructed in the linear approximation are unstable as well. It was found that the calculation of the value of A reduced to the determination of the minimum eigenvalue of the linear boundary value problem. It was shown by calculations that either the stability conditions were violated or the condition at the reaction is positive.

AB - The problem of plane deformation of a thin elastic inextensible rod of length L supported by a smooth inclined wall and the stability of a compressed rod under restrictions on the displacement were discussed. The problem is distinguished by the presence of a wall preventing the rod from deflection in one of the transverse directions. The deflection in the linear approximation is assumed to be small and the compression force is considered equal to its value in the unstrained state. The linear approximation allows finding only unstable equilibria and it was also demonstrated that the solutions constructed in the linear approximation are unstable as well. It was found that the calculation of the value of A reduced to the determination of the minimum eigenvalue of the linear boundary value problem. It was shown by calculations that either the stability conditions were violated or the condition at the reaction is positive.

UR - http://www.scopus.com/inward/record.url?scp=33846891975&partnerID=8YFLogxK

UR - https://elibrary.ru/item.asp?id=13539203

U2 - 10.1134/S1028335807010144

DO - 10.1134/S1028335807010144

M3 - Article

AN - SCOPUS:33846891975

VL - 52

SP - 55

EP - 59

JO - Doklady Physics

JF - Doklady Physics

SN - 1028-3358

IS - 1

ER -

ID: 9283774