Controlling and synchronizing a fractional-order chaotic system using stability theory of a time-varying fractional-order system

Control and synchronization of fractional-order chaotic systems have attracted wide attention due to their numerous potential applications. To get suitable control method and parameters for fractional-order chaotic systems, the stability analysis of time-varying fractional-order systems should be discussed in the first place. Therefore, this paper analyzes the stability of the time-varying fractional-order systems and presents a stability theorem for the system with the order 0<α<1. This theorem is a sufficient condition which can discriminate the stability of time-varying systems conveniently. Feedback controllers are designed for control and synchronization of the fractional-order Lü chaotic system. The simulation results demonstrate the effectiveness of the proposed theorem.

[1]  Guanrong Chen,et al.  A time-varying complex dynamical network model and its controlled synchronization criteria , 2004, IEEE Trans. Autom. Control..

[2]  Shuyi Shao,et al.  Adaptive sliding mode synchronization for a class of fractional-order chaotic systems with disturbance , 2016 .

[3]  Manuel A. Duarte-Mermoud,et al.  Lyapunov functions for fractional order systems , 2014, Commun. Nonlinear Sci. Numer. Simul..

[4]  N. Arifin,et al.  Synchronization of two different fractional-order chaotic systems with unknown parameters using a robust adaptive nonlinear controller , 2016 .

[5]  ADELEH NOURIAN,et al.  The adaptive synchronization of fractional-order Liu chaotic system with unknown parameters , 2016 .

[6]  Yangquan Chen,et al.  Computers and Mathematics with Applications Stability of Fractional-order Nonlinear Dynamic Systems: Lyapunov Direct Method and Generalized Mittag–leffler Stability , 2022 .

[7]  D. Baleanu,et al.  New aspects of the adaptive synchronization and hyperchaos suppression of a financial model , 2017 .

[8]  Zhu Xin-jian Stability conditions and criteria for fractional order linear time-invariant systems , 2004 .

[9]  I. Stamova Global Mittag-Leffler stability and synchronization of impulsive fractional-order neural networks with time-varying delays , 2014, Nonlinear Dynamics.

[10]  Weisheng Chen,et al.  Lyapunov-based fractional-order controller design to synchronize a class of fractional-order chaotic systems , 2014 .

[11]  Dumitru Baleanu,et al.  Synchronization in a nonidentical fractional order of a proposed modified system , 2015 .

[12]  Dumitru Baleanu,et al.  Chaos synchronization of the discrete fractional logistic map , 2014, Signal Process..

[13]  Abdesselem Boulkroune,et al.  Fuzzy generalized projective synchronization of incommensurate fractional-order chaotic systems , 2016, Neurocomputing.

[14]  Wei Xiang,et al.  Robust synchronization of a class of chaotic systems with disturbance estimation , 2011 .

[15]  Ping Zhou,et al.  Adaptive function projective synchronization between different fractional-order chaotic systems , 2012 .

[16]  M. Nekoui,et al.  Exact method for the stability analysis of time delayed linear-time invariant fractional-order systems , 2015 .

[17]  Jinde Cao,et al.  Adaptive synchronization of fractional-order memristor-based neural networks with time delay , 2015, Nonlinear Dynamics.

[18]  Abdelkrim Boukabou,et al.  Prediction-based feedback control and synchronization algorithm of fractional-order chaotic systems , 2016 .

[19]  Yang Chi-Ching,et al.  One input control for exponential synchronization in generalized Lorenz systems with uncertain parameters , 2012 .

[20]  H. Leung,et al.  Adaptive identification of nonlinear systems with application to chaotic communications , 2000 .

[21]  Jing Zhang,et al.  Synchronisation of a fractional-order chaotic system using finite-time input-to-state stability , 2016, Int. J. Syst. Sci..

[22]  Ahmed Gomaa Radwan,et al.  Fundamentals of fractional-order LTI circuits and systems: number of poles, stability, time and frequency responses , 2016, Int. J. Circuit Theory Appl..

[23]  Zhu Xin-jian Research on the internal and external stability of fractional order linear systems , 2004 .

[24]  Dumitru Baleanu,et al.  Complete synchronization of commensurate fractional order chaotic systems using sliding mode control , 2013 .

[25]  Alain Oustaloup,et al.  Second generation CRONE control , 1993, Proceedings of IEEE Systems Man and Cybernetics Conference - SMC.

[26]  R. Bagley,et al.  On the Appearance of the Fractional Derivative in the Behavior of Real Materials , 1984 .

[27]  Ruoxun Zhang,et al.  Robust chaos synchronization of fractional-order chaotic systems with unknown parameters and uncertain perturbations , 2012 .