The synchronization of chaotic systems with different dimensions by a robust generalized active control

Abstract Active control strategy is a powerful control technique in synchronizing chaotic/hyperchaotic systems. Until now, active control techniques have been employed to synchronize chaotic systems with the same orders. The present study overcomes the limitations of synchronization of chaotic systems of similar dimensions using active control. In this article, the authors investigate the synchronization problem for a drive-response chaotic system with different orders under the effect of both unknown model uncertainties and external disturbance. Based on the Lyapunov stability theory and Routh–Hurwitz criterion, a robust generalized active control approach is proposed and sufficient algebraic conditions are derived to compute a suitable linear controller gain matrix that guarantees the globally exponentially stable synchronization. Two examples are presented to illustrate the main results, namely reduced-order synchronization between the hyperchaotic Lu and the unified chaotic systems and the increased-order synchronization between the unified chaotic and the hyperchaotic Lu systems. There are three main contributions of the present study: (a) generalization of the active control for synchronization of a class of chaotic systems with different orders; (b) a recursive approach is proposed to compute a suitable linear controller gain matrix and (c) reduced (increased) order synchronization under the effect of both unknown model uncertainties and external disturbances. A comparative study has been done with our results and previously published work in terms of synchronization speed and quality. Future applications of the proposed reduced (increased) order synchronization approach are discussed. Finally, numerical simulations are given to verify the effectiveness of the proposed reduced (increased) order active synchronization approach.

[1]  Ming-Chung Ho,et al.  Reduced-order synchronization of chaotic systems with parameters unknown , 2006 .

[2]  H. Agiza,et al.  Synchronization of Rossler and Chen chaotic dynamical systems using active control , 2001, Physics Letters A.

[3]  Mohammad Shahzad,et al.  A Research on the Synchronization of Two Novel Chaotic Systems Based on a Nonlinear Active Control Algorithm , 2014 .

[4]  Uchechukwu E. Vincent,et al.  Synchronization and anti-synchronization of chaos in an extended Bonhöffer–van der Pol oscillator using active control , 2009 .

[5]  Z. Ge,et al.  The generalized synchronization of a Quantum-CNN chaotic oscillator with different order systems , 2008 .

[6]  E. Bai,et al.  On the synchronization of a class of electronic circuits that exhibit chaos , 2002 .

[7]  Ying Wang,et al.  Study on spatiotemporal chaos synchronization among complex networks with diverse structures , 2014 .

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

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

[10]  Song Zheng,et al.  Partial switched modified function projective synchronization of unknown complex nonlinear systems , 2015 .

[11]  Alexander N. Pisarchik,et al.  Synchronization of Shilnikov chaos in a CO2 laser with feedback , 2001 .

[12]  S. Strogatz Nonlinear Dynamics and Chaos: With Applications to Physics, Biology, Chemistry and Engineering , 1995 .

[13]  Karl Pearson F.R.S. LIII. On lines and planes of closest fit to systems of points in space , 1901 .

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

[15]  Idan Tuval,et al.  Noise and synchronization in pairs of beating eukaryotic flagella. , 2009, Physical review letters.

[16]  M. M. El-Dessoky,et al.  Adaptive synchronization of a hyperchaotic system with uncertain parameter , 2006 .

[17]  Er-Wei Bai,et al.  Synchronization of the unified chaotic systems via active control , 2006 .

[18]  张超,et al.  Synchronization between two different chaotic systems with nonlinear feedback control , 2007 .

[19]  Er-Wei Bai,et al.  Chaos synchronization in RCL-shunted Josephson junction via active control , 2007 .

[20]  Mohammad Pourmahmood Aghababa,et al.  Design of a robust nonlinear controller for a synchronous generator connected to an infinite bus , 2016, Complex..

[21]  J. Fell,et al.  The role of phase synchronization in memory processes , 2011, Nature Reviews Neuroscience.

[22]  K. S. Ojo,et al.  Generalized reduced-order hybrid combination synchronization of three Josephson junctions via backstepping technique , 2014 .

[23]  H.-K. Chen CHAOS AND CHAOS SYNCHRONIZATION OF A SYMMETRIC GYRO WITH LINEAR-PLUS-CUBIC DAMPING , 2002 .

[24]  Yao-Chen Hung,et al.  Synchronization of two different systems by using generalized active control , 2002 .

[25]  FEI YU,et al.  Erratum to “Antisynchronization of a novel hyperchaotic system with parameter mismatch and external disturbances” , 2012 .

[26]  Ki-Ryong Kwon,et al.  Perceptual encryption with compression for secure vector map data processing , 2014, Digit. Signal Process..

[27]  R. Femat,et al.  Synchronization of chaotic systems with different order. , 2002, Physical review. E, Statistical, nonlinear, and soft matter physics.