Robust Conversion of Chaos into an Arbitrary Periodic Motion
Authors: Abolhassan Razminia, Mohammad-Ali Sadrnia
Abstract:
One of the most attractive and important field of chaos theory is control of chaos. In this paper, we try to present a simple framework for chaotic motion control using the feedback linearization method. Using this approach, we derive a strategy, which can be easily applied to the other chaotic systems. This task presents two novel results: the desired periodic orbit need not be a solution of the original dynamics and the other is the robustness of response against parameter variations. The illustrated simulations show the ability of these. In addition, by a comparison between a conventional state feedback and our proposed method it is demonstrated that the introduced technique is more efficient.
Keywords: chaos, feedback linearization, robust control, periodic motion.
Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1075887
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[1] R.M.May, "Simple Mathematical Models With Very Complicated Dynamics", Nature 261, 459. 1976.
[2] R.M.Crownover, "Introduction to Fractals and chaos", Jones and Bartlett Publishers, 1995.
[3] A.J.Lichtenber, and M.A.Liebermann,"Regular and Stochastic Motion. Springer, Heidelberg-New York.1982.
[4] B.R. Andrievskii, and A.L.Fradkov, " Control of chaos: Methods and applications. I. Methods:, Avtom.Telemkh, no. 5, pp.3-45. 2003.
[5] Li, T. and Yorke, J.A., Period Three Implies Chaos, Am. Math. Monthly.,1975, vol. 82, pp. 985-992..
[6] A.Razminia, and M.A.Sadrnia, "Chua-s circuit regulation using a nonlinear adaptive feedback technique", International journal of electronics, circuits and systems, Vol 2. No1. 2008.
[7] Yongai Zheng," Controlling chaos based on an adaptive adjustment mechanism", Chaos, Solitons and Fractals,2005.
[8] Battle, E.Fossas, " Stabilization of periodic orbits of the buck converter by time delayed feedback", Int. J. Circ. Theory Appl., vol. 27, pp. 617- 631. 1999.
[9] H.Khalil, " Nonlinear Systems", Prentice hall, 2006..
[10] J Chaohong Cai , Zhenyuan Xu, Wenbo Xu, Converting chaos into periodic motion by state feedback control, Automatica 38 (2002),pp. 1927 - 1933.
[11] R. Ghidossi, D. Veyret, P. Moulin, "Computational fluid dynamics applied to membranes: State of the art and opportunities", Chemical Engineering and Processing, Volume 45, Issue 6, June 2006, Pages 437- 454.
[12] P. Magni, M. Simeoni, I. Poggesi, M. Rocchetti, G. De Nicolao, "A mathematical model to study the effects of drugs administration on tumor growth dynamics", Mathematical Biosciences, Volume 200, Issue 2, April 2006, Pages 127-151.
[13] Shu Chen, Guo-Hua Hu, Chen Guo, Hui-Zhou Liu, "Experimental study and dissipative particle dynamics simulation of the formation and stabilization of gold nanoparticles in PEO-PPO-PEO block copolymer micelles" Chemical Engineering Science, Volume 62, Issues 18-20, September-October 2007, Pages 5251-5256.
[14] Franz S. Hover, Michael S. Triantafyllou, "Application of polynomial chaos in stability and control" Automatica, Volume 42, Issue 5, May 2006, Pages 789-795.
[15] R.L.Devaney, "A First Course in Chaotic Dynamical Systems: Theory and Experiment" Addison-Wesley, 1997.
[16] J.Guckenheimer and Holmes, "Nonlinear oscillation, Dynamical Systems, and Bifurcation of Vector Fields", SpringerVerlag, New York, 1990.
[17] David A. Towers, Vicente R. Varea, "Elementary Lie algebras and Lie A-algebras" Journal of Algebra, Volume 312, Issue 2, 15 June 2007, Pages 891-901.
[18] Jorge Lauret, Cynthia E. Will, "On Anosov automorphisms of manifolds" Journal of Pure and Applied Algebra, Volume 212, Issue 7, July 2008, Pages 1747-1755.
[19] Chen, G., 1996, "Controlling Chaotic Trajectories to Unstable Limit Cycles", Proceedings of the American Control Conference, San Diego, California, pp. 2413-2414.
[20] C.D.Meyer, "Matrix analysis and applied linear algebra", SIAM 2000J.
[21] Wang, and J.Zhang, "Chaotic secure communication based on nonlinear autoregressive filter with changeable parameters", Phy.Lett.A 357, pp.323-329, 2006.
[22] Sinha, S.C., and Joseph, P., "Control of General Dynamical Systems with Periodically Varying Parameters Via Lyapunov-Floquet Transformation", ASME Journal of Dynamical Systems, Measurement, and Control, Vol. 116, pp. 650-658, 1994.
[23] R.L.Devaney, " Topological Bifurcation" Topology Proceedings 28 pp.99-112, 2004.
[24] Alexander L. Fradkov, Robin J. Evans, "Control of chaos: Methods and applications in engineering,", Annual Reviews in Control, Volume 29, Issue 1, 2005, Pages 33-56.