Robust adaptive anti-synchronization control of multiple uncertain chaotic systems of different orders

The precise anti-synchronization control of uncertain chaotic systems has always remained an interesting problem. The anti-synchronization control of multiple different orders uncertain chaotic systems increases the complexity and enhances the security of the information signal in secure communications. Hence, it confines the hacking in digital communication systems. This paper proposes a novel adaptive control technique and studies the double combination anti-synchronization of multiple different orders uncertain chaotic systems. The proposed adaptive feedback control technique consists of three fundamental nonlinear components. Each component accomplishes a different objective; (i) stability of the closed-loop, (ii) smooth and fast convergence behaviour of the anti-synchronization error, and (iii) disturbance rejection. The theoretical analysis in (i) to (iii) uses the Lyapunov stability theory. This paper also provides parameters adaptation laws that stabilize the uncertain parameters to some constants. The paper discusses the simulation results of two representative examples of four different orders uncertain chaotic systems. These examples demonstrate anti-synchronization among hyperchaotic Lü, uncertain chaotic Shimizu Morioka, uncertain second-order nonlinear duffing, and uncertain parametrically excited second-order nonlinear pendulum systems. The computer-based simulation results certify the efficiency and performance of the proposed anti-synchronization control approach and compare them with peer works.

[1]  Alex Van den Bossche,et al.  Frequency synchronization of a single-phase grid-connected DC/AC inverter using a double integration method , 2017 .

[2]  Sajid Ali Khan,et al.  Optimized features selection using hybrid PSO-GA for multi-view gender classification , 2015, Int. Arab J. Inf. Technol..

[3]  Anita C. Faul,et al.  Non-linear systems , 2006 .

[4]  M. P. Aghababa,et al.  Finite-time stabilization of uncertain non-autonomous chaotic gyroscopes with nonlinear inputs , 2012 .

[5]  Xuebing Zhang,et al.  Anti-synchronization of Two Different Hyperchaotic Systems via Active and Adaptive Control , 2008 .

[6]  B. Kendall Nonlinear Dynamics and Chaos , 2001 .

[7]  Diyi Chen,et al.  Synchronization and anti-synchronization of fractional dynamical networks , 2015 .

[8]  Yani Zhang,et al.  Distributed adaptive sliding mode control for attitudes synchronization of multiple autonomous underwater vehicles , 2017 .

[9]  Weiping Li,et al.  Applied Nonlinear Control , 1991 .

[10]  J Kurths,et al.  Inverse synchronizations in coupled time-delay systems with inhibitory coupling. , 2009, Chaos.

[11]  Jing Tian,et al.  Anti-synchronization transmission of the laser signal using uncertain neural network , 2015 .

[12]  Vladimir E. Bondarenko,et al.  Information processing, memories, and synchronization in chaotic neural network with the time delay , 2005, Complex..

[13]  M. Noorani,et al.  Anti-synchronization of two hyperchaotic systems via nonlinear control , 2009 .

[14]  Ayman Al-Sawalha Chaos anti-synchronization of two non-identical chaotic systems with known or fully unknown parameters , 2009 .

[15]  Ayub Khan,et al.  Multiswitching compound antisynchronization of four chaotic systems , 2017 .

[16]  Wenhai Qi,et al.  Asynchronous H∞ control of time‐delayed switched systems with actuator saturation via anti‐windup design , 2018 .

[17]  Mohd. Salmi Md. Noorani,et al.  Anti-Synchronization of Chaotic Systems via Adaptive Sliding Mode Control , 2012 .

[19]  M. Noorani,et al.  Adaptive reduced-order anti-synchronization of chaotic systems with fully unknown parameters , 2010 .

[20]  Mohamed Benrejeb,et al.  Feedback control design for Rössler and Chen chaotic systems anti-synchronization , 2010 .

[21]  Mohammad Pourmahmood Aghababa,et al.  Adaptive finite-time stabilization of uncertain non-autonomous chaotic electromechanical gyrostat systems with unknown parameters , 2011 .

[22]  Jun Wu,et al.  Mean-square asymptotical synchronization control and robust analysis of discrete-time neural networks with time-varying delay , 2018 .

[23]  T. Shimizu,et al.  On the bifurcation of a symmetric limit cycle to an asymmetric one in a simple model , 1980 .

[24]  Louis M Pecora,et al.  Synchronization of chaotic systems. , 2015, Chaos.

[25]  Wuneng Zhou,et al.  The lag projective (anti-)synchronization of chaotic systems with bounded nonlinearity via an adaptive control scheme , 2013 .

[26]  José Manoel Balthazar,et al.  On nonlinear dynamics of a parametrically excited pendulum using both active control and passive rotational (MR) damper , 2018 .

[27]  Shariq Hussain,et al.  An Effective Framework for Driver Fatigue Recognition Based on Intelligent Facial Expressions Analysis , 2018, IEEE Access.

[28]  Mohammad Shahzad,et al.  Experimental Study of Synchronization & Anti-synchronization for Spin Orbit Problem of Enceladus , 2013 .

[29]  Weigang Sun,et al.  Controlling anti-synchronization between two weighted dynamical networks , 2012 .

[30]  Yongfang Zhang,et al.  Synchronization, anti-synchronization and circuit realization of a novel hyper-chaotic system , 2018 .

[31]  Emad E Mahmoud,et al.  Complex anti-synchronization of two indistinguishable chaotic complex nonlinear models , 2019 .

[32]  Pushali Trikha,et al.  Compound difference anti-synchronization between chaotic systems of integer and fractional order , 2019, SN Applied Sciences.

[33]  Ying-Cheng Lai,et al.  ANTIPHASE SYNCHRONISM IN CHAOTIC SYSTEMS , 1998 .

[34]  Hee-Jun Kang,et al.  Continuous adaptive finite-time modified function projective lag synchronization of uncertain hyperchaotic systems , 2018, Trans. Inst. Meas. Control.

[35]  Sergej Celikovský,et al.  On the anti-synchronization detection for the generalized Lorenz system and its applications to secure encryption , 2010, Kybernetika.

[36]  Zhongshen Li,et al.  Robust adaptive anti-synchronization of two different hyperchaotic systems with external uncertainties , 2011 .

[37]  F. Alsaadi,et al.  Dynamic system with no equilibrium and its chaos anti-synchronization , 2018 .

[38]  Maamar Bettayeb,et al.  Single channel secure communication scheme based on synchronization of fractional-order chaotic Chua’s systems , 2018, Trans. Inst. Meas. Control.

[39]  Yongbao Wu,et al.  Finite-time lag synchronization of coupled reaction–diffusion systems with time-varying delay via periodically intermittent control , 2019 .

[40]  Yi Shen,et al.  Compound-combination anti-synchronization of five simplest memristor chaotic systems , 2016 .

[41]  Junyong Zhai,et al.  Adaptive second-order fast nonsingular terminal sliding mode control for robotic manipulators. , 2019, ISA transactions.