Analysis of chaotic vibration in a hexagonal centrifugal governor system

Document Type: Persian

Authors

1 - Assistant Professor, Mechanical Engineering Faculty, Isfahan University of Technology

2 Associate Professor, Mechanical Engineering Faculty, Isfahan University of Technology

3 M.Sc., Mechanical Engineering Faculty, Isfahan University of Technology

Abstract

In this paper, the periodic, quasi periodic and chaotic responses of rotational machines with a hexagonal centrifugal governor are studied. The external disturbance is assumed as a sinusoid effect. By using the forth order Rung-Kutta numerical integration method, bifurcation diagram, largest Lyapunov exponent and Lyapunov dimension are calculated and presented to detect the critical controlling parameter. Having known the critical values, phase portrait, Poincare maps, time history and power spectrum are presented to observe periodic, quasi-periodic and chaotic behaviors of the system. Finally, the system damping is used as a parameter to control  chaos. It is shown that by increasing the system damping, the chaotic behavior of the system converts to a periodic motion.

Keywords

References

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Journal of Simulation and Analysis of Novel Technologies in Mechanical Engineering

Volume 1, Issue 1
Summer 2008
Pages 1-12

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