Synchronization for chaotic systems and chaos-based secure communications via both reduced-order and step-by-step sliding mode observers

Abstract This paper considers the problems of the chaos synchronization and chaos-based secure communication when the observer matching condition is not satisfied. An auxiliary drive signal vector which may satisfy the observer matching condition is constructed. By using the drive signals of original system, a step-by-step sliding mode observer is considered to obtain the exact estimates of the auxiliary drive signals and their derivatives. A reduced-order observer is designed to asymptotically estimate the states of the drive system. By using the estimates of states and the derivatives of the auxiliary signals, an information signal recovery method which does not use any derivative information of original drive system is developed. Finally, a numerical simulation example is given to illustrate the effectiveness of the proposed methods.

[1]  Guanrong Chen,et al.  Secure synchronization of a class of chaotic systems from a nonlinear observer approach , 2005, IEEE Transactions on Automatic Control.

[2]  Gonzalo Álvarez,et al.  Some Basic Cryptographic Requirements for Chaos-Based Cryptosystems , 2003, Int. J. Bifurc. Chaos.

[3]  Pengcheng Wei,et al.  Weak synchronization of chaotic neural networks with parameter mismatch via periodically intermittent control , 2011 .

[4]  Mao-Yin Chen,et al.  Unknown input observer based chaotic secure communication , 2008 .

[5]  Teh-Lu Liao,et al.  An observer-based approach for chaotic synchronization with applications to secure communications , 1999 .

[6]  T. Floquet,et al.  On Sliding Mode Observers for Systems with Unknown Inputs , 2006, International Workshop on Variable Structure Systems, 2006. VSS'06..

[7]  Carroll,et al.  Synchronization in chaotic systems. , 1990, Physical review letters.

[8]  W. P. M. H. Heemels,et al.  Observer Design for Lur'e Systems With Multivalued Mappings: A Passivity Approach , 2009, IEEE Transactions on Automatic Control.

[9]  Kun-Lin Wu,et al.  A simple method to synchronize chaotic systems and its application to secure communications , 2008, Math. Comput. Model..

[10]  Zhenya Yan,et al.  Q-S (lag or anticipated) synchronization backstepping scheme in a class of continuous-time hyperchaotic systems--a symbolic-numeric computation approach. , 2005, Chaos.

[11]  Stefen Hui,et al.  Sliding-mode observers for systems with unknown inputs: A high-gain approach , 2010, Autom..

[12]  Shou-Wei Gao,et al.  Singular observer approach for chaotic synchronization and private communication , 2011 .

[13]  Yang Li Some new less conservative criteria for impulsive synchronization of a hyperchaotic Lorenz system based on small impulsive signals , 2010 .

[14]  Henk Nijmeijer,et al.  An observer looks at synchronization , 1997 .

[15]  Chuandong Li,et al.  Synchronization of a class of coupled chaotic delayed systems with parameter mismatch. , 2007, Chaos.

[16]  Donghua Zhou,et al.  A sliding mode observer based secure communication scheme , 2005 .

[17]  Fanglai Zhu,et al.  Observer-based synchronization of uncertain chaotic system and its application to secure communications☆ , 2009 .

[18]  Samuel Bowong,et al.  Unknown inputs' adaptive observer for a class of chaotic systems with uncertainties , 2008, Math. Comput. Model..

[19]  Xinzhi Liu,et al.  Impulsively synchronizing chaotic systems with delay and applications to secure communication , 2005, Autom..

[20]  Martin J. Corless,et al.  State and Input Estimation for a Class of Uncertain Systems , 1998, Autom..

[21]  Noureddine Manamanni,et al.  Exact differentiation and sliding mode observers for switched Lagrangian systems , 2006 .

[22]  Xin-Chu Fu,et al.  Projective Synchronization of Driving–Response Systems and Its Application to Secure Communication , 2009, IEEE Transactions on Circuits and Systems I: Regular Papers.

[23]  A. Levant Sliding order and sliding accuracy in sliding mode control , 1993 .

[24]  M. I. Castellanos,et al.  Super twisting algorithm-based step-by-step sliding mode observers for nonlinear systems with unknown inputs , 2007, Int. J. Syst. Sci..

[25]  王发强,et al.  Synchronization of hyperchaotic Lorenz system based on passive control , 2006 .

[26]  F. Zhu Full-order and reduced-order observer-based synchronization for chaotic systems with unknown disturbances and parameters☆ , 2008 .

[27]  Yu Zhang,et al.  Parameter estimations of parametrically excited pendulums based on chaos feedback synchronization , 2006 .

[28]  F. M. Kakmeni,et al.  A new adaptive observer-based synchronization scheme for private communication , 2006 .

[29]  Guanrong Chen,et al.  Chaos quasisynchronization induced by impulses with parameter mismatches. , 2006, Chaos.

[30]  Robin J. Evans,et al.  Adaptive Observer-Based Synchronization of Chaotic Systems With First-Order Coder in the Presence of Information Constraints , 2008, IEEE Transactions on Circuits and Systems I: Regular Papers.