Non-linear normal forced vibration modes in systems with internal resonance

Nikolay V. Perepelkin, Yuri V. Mikhlin, Christophe Pierre

Research output: Contribution to journalArticlepeer-review

14 Scopus citations

Abstract

The new method of the forced resonance vibrations construction in mechanical systems with internal resonance is represented. According to this approach, the generalized theory of non-linear normal vibration modes by Shaw and Pierre, the modified Rauscher method and the harmonic balance method are combined with a new iterative computation procedure. The proposed approach is used in analysis of the single-disk rotor system with the isotropic-elastic shaft and the non-linear supports of Duffing type. Gyroscopic effects, asymmetrical disposition of the disk on the shaft and internal resonance are also taken into account. The NNM approach allows reducing the 8-DOF problem of the rotor dynamics to the 2-DOF non-linear system for each non-linear normal mode. Both the model of massless supports and the model of supports with inertial effects are considered. It is shown that in last case all resonance regimes are separated into two different kinds. First kind corresponds to cyclic symmetric trajectories in a system's configuration space; the second kind corresponds to centrally symmetric ones. Regimes of the first kind can be evaluated by the use of the simplified mathematical model proposed in this work. Simplified model consists only of four generalized coordinates instead of the eight initial ones.

Original languageEnglish
Pages (from-to)102-115
Number of pages14
JournalInternational Journal of Non-Linear Mechanics
Volume57
DOIs
StatePublished - 2013

Keywords

  • Non-linear vibration modes
  • Rauscher method
  • Resonance forced vibrations
  • Single-disk rotor

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