Standard

Equations of motion of a solid in an ideal fluid flow. / Voronin, L. I.; Sabaneev, V. S.; Tovstik, P. E.

в: Leningrad University mechanics bulletin, № 1, 1989, стр. 14-18.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Voronin, LI, Sabaneev, VS & Tovstik, PE 1989, 'Equations of motion of a solid in an ideal fluid flow', Leningrad University mechanics bulletin, № 1, стр. 14-18.

APA

Voronin, L. I., Sabaneev, V. S., & Tovstik, P. E. (1989). Equations of motion of a solid in an ideal fluid flow. Leningrad University mechanics bulletin, (1), 14-18.

Vancouver

Voronin LI, Sabaneev VS, Tovstik PE. Equations of motion of a solid in an ideal fluid flow. Leningrad University mechanics bulletin. 1989;(1):14-18.

Author

Voronin, L. I. ; Sabaneev, V. S. ; Tovstik, P. E. / Equations of motion of a solid in an ideal fluid flow. в: Leningrad University mechanics bulletin. 1989 ; № 1. стр. 14-18.

BibTeX

@article{0da24e48ab8e442db7e60ec0b8d2ab2f,
title = "Equations of motion of a solid in an ideal fluid flow",
abstract = "The article considers motion of a solid body in an unbounded vortex-free flow of an ideal incompressible fluid. Motion of the fluid unperturbed by the body is assumed to be nonstationary and to have velocity gradients. The force on the body from the fluid is determined under the assumption that the dimensions of the body are substantially less than the characteristic dimensions of the flow. Additional masses, not encountered in the case of motion of a body in a motionless fluid. These masses are calculated for a body shaped like an ellipsoid of revolution.",
author = "Voronin, {L. I.} and Sabaneev, {V. S.} and Tovstik, {P. E.}",
year = "1989",
language = "English",
pages = "14--18",
journal = "St. Petersburg University mechanics bulletin : Vestnik Sankt-Peterburgskogo universiteta. Mekhanika ",
issn = "0883-623X",
number = "1",

}

RIS

TY - JOUR

T1 - Equations of motion of a solid in an ideal fluid flow

AU - Voronin, L. I.

AU - Sabaneev, V. S.

AU - Tovstik, P. E.

PY - 1989

Y1 - 1989

N2 - The article considers motion of a solid body in an unbounded vortex-free flow of an ideal incompressible fluid. Motion of the fluid unperturbed by the body is assumed to be nonstationary and to have velocity gradients. The force on the body from the fluid is determined under the assumption that the dimensions of the body are substantially less than the characteristic dimensions of the flow. Additional masses, not encountered in the case of motion of a body in a motionless fluid. These masses are calculated for a body shaped like an ellipsoid of revolution.

AB - The article considers motion of a solid body in an unbounded vortex-free flow of an ideal incompressible fluid. Motion of the fluid unperturbed by the body is assumed to be nonstationary and to have velocity gradients. The force on the body from the fluid is determined under the assumption that the dimensions of the body are substantially less than the characteristic dimensions of the flow. Additional masses, not encountered in the case of motion of a body in a motionless fluid. These masses are calculated for a body shaped like an ellipsoid of revolution.

UR - http://www.scopus.com/inward/record.url?scp=0024915103&partnerID=8YFLogxK

M3 - Article

AN - SCOPUS:0024915103

SP - 14

EP - 18

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 - 1

ER -

ID: 9285029