Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › Research › peer-review
Axially Symmetric Oscillations of Circular Cylindrical Shell with Localized Mass on Winkler Foundation. / Filippenko, George V.; Zinovieva, Tatiana V.
Advanced Problem in Mechanics II : Proceedings of the XLVIII International Summer School-Conference “Advanced Problems in Mechanics”, 2020, St. Petersburg, Russia. ed. / D. A. Indeitsev; A. M. Krivtsov. Springer Nature, 2022. p. 245-257 (Lecture Notes in Mechanical Engineering).Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › Research › peer-review
}
TY - GEN
T1 - Axially Symmetric Oscillations of Circular Cylindrical Shell with Localized Mass on Winkler Foundation
AU - Filippenko, George V.
AU - Zinovieva, Tatiana V.
N1 - Filippenko, G.V., Zinovieva, T.V. (2022). Axially Symmetric Oscillations of Circular Cylindrical Shell with Localized Mass on Winkler Foundation. In: Indeitsev, D.A., Krivtsov, A.M. (eds) Advanced Problem in Mechanics II. APM 2020. Lecture Notes in Mechanical Engineering. Springer, Cham. https://doi.org/10.1007/978-3-030-92144-6_19
PY - 2022
Y1 - 2022
N2 - The oscillations of a circular cylindrical shell of finite length with additional inertia mass are explored. The shell contacts with an elastic medium, which reaction is represented by Winkler model. Such systems can model various elements of buildings, hydro technical constructions, bridges, oil rigs, various pipes etc. The problem of shell vibrations is investigated using the theory of Kirchhoff-Love shells. The shell is loaded with concentrated mass in the form of zero width “mass belt”. The axisymmetric free harmonic oscillations of the shell are explored. In addition, a computer model using ANSYS software has been developed and the shell oscillations have been analyzed by the finite element method. At some values of the system’s parameters, its anomalous behavior occurs. The nature of the system in the vicinity of dispersion curves special points has been investigated. The influence of system parameters on these processes is analyzed using both approaches.
AB - The oscillations of a circular cylindrical shell of finite length with additional inertia mass are explored. The shell contacts with an elastic medium, which reaction is represented by Winkler model. Such systems can model various elements of buildings, hydro technical constructions, bridges, oil rigs, various pipes etc. The problem of shell vibrations is investigated using the theory of Kirchhoff-Love shells. The shell is loaded with concentrated mass in the form of zero width “mass belt”. The axisymmetric free harmonic oscillations of the shell are explored. In addition, a computer model using ANSYS software has been developed and the shell oscillations have been analyzed by the finite element method. At some values of the system’s parameters, its anomalous behavior occurs. The nature of the system in the vicinity of dispersion curves special points has been investigated. The influence of system parameters on these processes is analyzed using both approaches.
KW - Cylindrical shell
KW - Shell vibrations
KW - Winkler foundation
UR - http://www.scopus.com/inward/record.url?scp=85127141830&partnerID=8YFLogxK
UR - https://www.mendeley.com/catalogue/1c4df142-fb4d-3f61-b9cb-3017fa067ffd/
U2 - 10.1007/978-3-030-92144-6_19
DO - 10.1007/978-3-030-92144-6_19
M3 - Conference contribution
AN - SCOPUS:85127141830
SN - 9783030921439
T3 - Lecture Notes in Mechanical Engineering
SP - 245
EP - 257
BT - Advanced Problem in Mechanics II
A2 - Indeitsev, D. A.
A2 - Krivtsov, A. M.
PB - Springer Nature
T2 - 48th International Conference on Advanced Problems in Mechanics, 2020
Y2 - 21 June 2020 through 26 June 2020
ER -
ID: 100782632