Oscillation free robust adaptive synchronization of chaotic systems with parametric uncertainties

The complexity of the closed-loop system, short transient response time, and fast synchronization error convergence rates are the three basic parameters that limit hacking in the data encryption and secure the communication systems. This paper addresses the following two challenges: The full-order synchronization (FOS) of two parametrically excited second-order nonlinear pendulum (PENP) chaotic systems with uncertain parameters. The reduced-order synchronization (ROS) between the canonical projection part of an uncertain third-order chaotic Rossler and the uncertain PENP systems. This article designs a new robust adaptive synchronization control (RASC) algorithm to address the above two challenges. The proposed controller achieves the FOS and ROS in a shorter transient time, and the synchronization error signals converge to the origin with faster rates in the presence of bounded unknown state-dependent and time-dependent disturbances. The Lyapunov direct method verifies this convergence behavior. The paper provides parameters updated laws that confirm the convergence of the uncertain parameters to some fixed values. The controller does not cancel the nonlinear terms of the plant; this property of the controller keeps the nonlinear terms in the closed-loop that results in the enhanced complexity of the dynamical system. The proposed RASC strategy is successful in synthesizing oscillation free convergence of the synchronization error signals to the origin for reducing the transient time and guarantees the asymptotic stability at the origin. The simulation results endorse the theoretical findings.

[1]  Steven R. Bishop,et al.  Rotating periodic orbits of the parametrically excited pendulum , 1995 .

[2]  Ma Yongguang,et al.  Finite-Time Adaptive Synchronization of a New Hyperchaotic System with Uncertain Parameters , 2014 .

[3]  Georges Kaddoum,et al.  Wireless Chaos-Based Communication Systems: A Comprehensive Survey , 2016, IEEE Access.

[4]  Shaocheng Tong,et al.  Neural Networks-Based Adaptive Finite-Time Fault-Tolerant Control for a Class of Strict-Feedback Switched Nonlinear Systems , 2019, IEEE Transactions on Cybernetics.

[5]  Mohammad Pourmahmood Aghababa,et al.  Chaos suppression of rotational machine systems via finite-time control method , 2012 .

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

[7]  Matthew P. Cartmell,et al.  Rotating orbits of a parametrically-excited pendulum , 2005 .

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

[9]  M. Mossa Al-sawalha,et al.  Reduced-order synchronization of time-delay chaotic systems with known and unknown parameters , 2016 .

[10]  Jorma K. Merikoski,et al.  Means and the mean value theorem , 2009 .

[11]  U. Vincent,et al.  A simple adaptive control for full and reduced-order synchronization of uncertain time-varying chaotic systems , 2009 .

[12]  Ayub Khan,et al.  Measuring chaos and synchronization of chaotic satellite systems using sliding mode control , 2018 .

[13]  Fuzhong Nian,et al.  Hybrid synchronization of heterogeneous chaotic systems on dynamic network , 2016 .

[14]  Shaocheng Tong,et al.  Fuzzy-Based Multierror Constraint Control for Switched Nonlinear Systems and Its Applications , 2019, IEEE Transactions on Fuzzy Systems.

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

[16]  Jinde Cao,et al.  Synchronization of Coupled Markovian Reaction–Diffusion Neural Networks With Proportional Delays Via Quantized Control , 2019, IEEE Transactions on Neural Networks and Learning Systems.

[17]  Mrinal K. Mandal,et al.  Symmetric key image encryption using chaotic Rossler system , 2014, Secur. Commun. Networks.

[18]  Mohammad Pourmahmood Aghababa,et al.  Robust synchronization of a chaotic mechanical system with nonlinearities in control inputs , 2013 .

[19]  Dieter Rüthing,et al.  On Young's inequality , 1994 .

[20]  Han Ho Choi,et al.  Adaptive synchronization method for chaotic permanent magnet synchronous motor , 2014, Math. Comput. Simul..

[21]  Steven R. Bishop,et al.  Symmetry-breaking in the response of the parametrically excited pendulum model , 2005 .

[22]  Yuhua Xu,et al.  Hybrid Synchronization of Uncertain Generalized Lorenz System by Adaptive Control , 2018, J. Control. Sci. Eng..

[23]  Mohd. Salmi Md. Noorani,et al.  Adaptive Increasing-Order Synchronization and Anti-Synchronization of Chaotic Systems with Uncertain Parameters , 2011 .

[24]  Ayub Khan,et al.  Synchronization Among Different Switches of Four Non-identical Chaotic Systems via Adaptive Control , 2018, Arabian Journal for Science and Engineering.

[25]  Wuquan Li,et al.  Finite-time generalized synchronization of chaotic systems with different order , 2011 .

[26]  Mohammad Pourmahmood Aghababa,et al.  Nonsingular terminal sliding mode approach applied to synchronize chaotic systems with unknown parameters and nonlinear inputs , 2012 .

[27]  Tahereh Binazadeh,et al.  Observer-based synchronization of uncertain chaotic systems subject to input saturation , 2018, Trans. Inst. Meas. Control.

[28]  Li Liu,et al.  Synchronization Stability Analysis of Medical Cyber-Physical Cloud System Considering Multi-Closed-Loops , 2019, J. Circuits Syst. Comput..

[29]  Song Zheng,et al.  Multi-switching combination synchronization of three different chaotic systems via nonlinear control , 2016 .

[30]  Zhongkui Sun,et al.  Full- and reduced-order synchronization of a class of time-varying systems containing uncertainties , 2008 .

[31]  Saleh Mobayen,et al.  Finite-time chaos synchronization and its application in wireless sensor networks , 2018, Trans. Inst. Meas. Control.

[32]  Shaocheng Tong,et al.  Barrier Lyapunov functions for Nussbaum gain adaptive control of full state constrained nonlinear systems , 2017, Autom..

[33]  Mohammad Shahzad,et al.  Global chaos synchronization of new chaotic system using linear active control , 2015, Complex..

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

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

[36]  Ali Kazemy,et al.  Synchronization of chaotic Lur’e systems with state and transmission line time delay: a linear matrix inequality approach , 2017 .

[37]  Yan-Jun Liu,et al.  Adaptive neural network-based control for a class of nonlinear pure-feedback systems with time-varying full state constraints , 2018, IEEE/CAA Journal of Automatica Sinica.

[38]  O. Rössler An equation for continuous chaos , 1976 .

[39]  M. P. Aghababa,et al.  Synchronization of nonlinear chaotic electromechanical gyrostat systems with uncertainties , 2012 .

[40]  Nisar Ahmed,et al.  Stabilization and synchronization of 5-D memristor oscillator using sliding mode control , 2018, Journal of the Chinese Institute of Engineers.