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Contact problem for a ring field. / Parfent'eva, O. B.; Semenov, B. N.

In: Leningrad University mechanics bulletin, No. 2, 01.12.1989, p. 61-63.

Research output: Contribution to journalArticlepeer-review

Harvard

Parfent'eva, OB & Semenov, BN 1989, 'Contact problem for a ring field', Leningrad University mechanics bulletin, no. 2, pp. 61-63.

APA

Parfent'eva, O. B., & Semenov, B. N. (1989). Contact problem for a ring field. Leningrad University mechanics bulletin, (2), 61-63.

Vancouver

Parfent'eva OB, Semenov BN. Contact problem for a ring field. Leningrad University mechanics bulletin. 1989 Dec 1;(2):61-63.

Author

Parfent'eva, O. B. ; Semenov, B. N. / Contact problem for a ring field. In: Leningrad University mechanics bulletin. 1989 ; No. 2. pp. 61-63.

BibTeX

@article{ad079ddfd6964808a34c7465910bdfac,
title = "Contact problem for a ring field",
abstract = "In terms of elasticity theory, a problem is solved for an annular region with dry friction conditions specified on the outer boundary. On the basis of the friction theory suggested by Ishlinskii-Kragel 'skii, the effect of the friction force and the time of contact is taken into account. It is shown that relaxational vibrations arise only if the constant velocity of the inner ring boundary is low. There is a limit value ω-1$/ of the angular speed of the inner boundary after which the outer boundary moves without stopping.",
author = "Parfent'eva, {O. B.} and Semenov, {B. N.}",
year = "1989",
month = dec,
day = "1",
language = "English",
pages = "61--63",
journal = "St. Petersburg University mechanics bulletin : Vestnik Sankt-Peterburgskogo universiteta. Mekhanika ",
issn = "0883-623X",
number = "2",

}

RIS

TY - JOUR

T1 - Contact problem for a ring field

AU - Parfent'eva, O. B.

AU - Semenov, B. N.

PY - 1989/12/1

Y1 - 1989/12/1

N2 - In terms of elasticity theory, a problem is solved for an annular region with dry friction conditions specified on the outer boundary. On the basis of the friction theory suggested by Ishlinskii-Kragel 'skii, the effect of the friction force and the time of contact is taken into account. It is shown that relaxational vibrations arise only if the constant velocity of the inner ring boundary is low. There is a limit value ω-1$/ of the angular speed of the inner boundary after which the outer boundary moves without stopping.

AB - In terms of elasticity theory, a problem is solved for an annular region with dry friction conditions specified on the outer boundary. On the basis of the friction theory suggested by Ishlinskii-Kragel 'skii, the effect of the friction force and the time of contact is taken into account. It is shown that relaxational vibrations arise only if the constant velocity of the inner ring boundary is low. There is a limit value ω-1$/ of the angular speed of the inner boundary after which the outer boundary moves without stopping.

UR - http://www.scopus.com/inward/record.url?scp=0024891960&partnerID=8YFLogxK

M3 - Article

AN - SCOPUS:0024891960

SP - 61

EP - 63

JO - St. Petersburg University mechanics bulletin : Vestnik Sankt-Peterburgskogo universiteta. Mekhanika

JF - St. Petersburg University mechanics bulletin : Vestnik Sankt-Peterburgskogo universiteta. Mekhanika

SN - 0883-623X

IS - 2

ER -

ID: 41522827