Affiliation:
1. Ural Mathematical Center, Udmurt State University, Izhevsk 426034, Russia
Abstract
In this paper, we address the problem of an ellipsoid with axisymmetric mass distribution rolling on a horizontal absolutely rough plane under the assumption that the supporting plane performs periodic vertical oscillations. In the general case, the problem reduces to a system with one and a half degrees of freedom. In this paper, instead of considering exact equations, we use a vibrational potential that describes approximately the dynamics of a rigid body on a vibrating plane. Since the vibrational potential is invariant under rotation about the vertical, the resulting problem with the additional potential is integrable. For this problem, we analyze the influence of vibrations on the linear stability of vertical rotations of the ellipsoid.
Funder
Ministry of Science and Higher Education of Russia
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference40 articles.
1. A pendulum with oscillating suspension;Kapitza;Uspekhi Fiz. Nauk,1951
2. Dynamic stability of a pendulum when its point of suspension vibrates;Kapitza;Sov. Phys. JETP,1951
3. On a new type of dynamical stability;Stephenson;Mem. Proc. Manch. Lit. Phil. Sci.,1908
4. The stability of the equilibrium of a pendulum for vertical oscillations of the point of suspension;Bardin;J. Appl. Math. Mech.,1995
5. Sphere rolling on a moving surface: Application of the fundamental equation of constrained motion;Udwadia;Simul. Model. Pract. Theory,2011
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