 | | Mechanics of Solids A Journal of Russian Academy of Sciences | | Founded
in January 1966
Issued 6 times a year
Print ISSN 0025-6544 Online ISSN 1934-7936 |
Archive of Issues
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<< Previous article | Volume 59, Issue 6 / 2024 | Next article >> |
A.A. Azarov, A.M. Gouskov, and G.Y. Panovko, "Features of the Dynamics of a Rotating Shaft with Nonlinear Models of Internal Damping and Elasticity," Mech. Solids. 59 (6), 3315-3326 (2024) |
Year |
2024 |
Volume |
59 |
Number |
6 |
Pages |
3315-3326 |
DOI |
10.1134/S0025654424603847 |
Title |
Features of the Dynamics of a Rotating Shaft with Nonlinear Models of Internal Damping and Elasticity |
Author(s) |
A.A. Azarov (Bauman Moscow State Technical University, Moscow, 105005 Russia, 13azarov.ru@gmail.com)
A.M. Gouskov (Bauman Moscow State Technical University, Moscow, 105005 Russia; Mechanical Engineering Research Institute of of the Russian Academy of Sciences, Moscow, 101990 Russia, gouskov_am@mail.ru)
G.Y. Panovko (Mechanical Engineering Research Institute of of the Russian Academy of Sciences, Moscow, 101990 Russia, gpanovko@yandex.ru) |
Abstract |
The article analyzes the influence of nonlinear (cubic) internal damping (in the Kelvin-Voigt model) and cubic nonlinearity of elastic forces on the dynamics of a rotating flexible shaft with distributed mass. The shaft is modeled by a Bernoulli-Euler rod using the Green function; discretization and reduction of the rotating shaft dynamics problem to an integral equation are performed. It is
revealed that in such a system there always exists a branch of limited periodic motions (autovibrations)
at a supercritical rotation speed. In addition, with small internal damping, the periodic branch continues into the subcritical region: upon reaching the critical speed, a subcritical Poincare-Andronov-Hopf bifurcation is realized and there is an unstable branch of periodic motions below the branch of
stable periodic autovibrations (the occurrence of hysteresis when the rotation speed changes). With an increase in the coefficient of internal friction, the hysteresis phenomenon disappears and at a critical
rotation speed, soft excitation of autovibrations of the rotating shaft occurs via the supercritical Poincare-Andronov-Hopf bifurcation. |
Keywords |
shaft, damping, bifurcation, Kelvin-Voigt model, precession |
Received |
14 May 2024 | Revised |
15 June 2024 | Accepted |
16 June 2024 |
Link to Fulltext |
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