Publications

2019

• 1.

  Vetchanin E. V., Mikishanina E. A.

  Vibrational Stability of Periodic Solutions of the Liouville Equations
  Russian Journal of Nonlinear Dynamics, 2019, vol. 15, no. 3, pp. 351-363

  Abstract          pdf  (775.13 Kb)

  The dynamics of a body with a fixed point, variable moments of inertia and internal rotors are considered. A stability analysis of permanent rotations and periodic solutions of the system is carried out. In some simplest cases the stability analysis is reduced to investigating the stability of the zero solution of Hill’s equation. It is shown that by periodically changing the moments of inertia it is possible to stabilize unstable permanent rotations of the system. In addition, stable dynamical regimes can lose stability due to a parametric resonance. It is shown that, as the oscillation frequency of the moments of inertia increases, the dynamics of the system becomes close to an integrable one.

  
  

  Keywords:	Liouville equations, Euler –Poisson equations, Hill’s equation, Mathieu equation, parametric resonance, vibrostabilization, Euler – Poinsot case, Joukowski –Volterra case
  Citation:	Vetchanin E. V., Mikishanina E. A., Vibrational Stability of Periodic Solutions of the Liouville Equations, Russian Journal of Nonlinear Dynamics, 2019, vol. 15, no. 3, pp. 351-363
  DOI:	10.20537/nd190312
  Full text:	pdf (775.13 Kb)

  Journal Info

  Impact-factor RSCI (2022):	0.259 (Q3)
  ISSN (print):	2658-5324
  ISSN (online):	2658-5316
  Site:	http://nd.ics.org.ru/