Finite Time Synchronization of Chaotic Systems Without Linear Term and Its Application in Secure Communication

A definition of finite time synchronization of chaotic system was proposed, and a special theorem was proposed to solve the difficult problem of constructing a finite time stable system. After that, a hybrid construction method was proposed by integrating a common stable system and a finite time stable system. That reveals how to construct a finite time stable system, and it is very useful in secure communication since the convergence time is a very important factor that will affect its application in engineering realization. Above theorem and method was applied in the chaotic synchronization and two kinds of synchronization methods were proposed with estimation of unknown parameters. At last, a secure communication scheme was constructed by using above finite time synchronous method of chaotic systems. Also, numerical simulation was done, and the rightness of all the above proposed theorems and methods was shown.

[1]  Wei Zhang,et al.  Finite-time chaos control of unified chaotic systems with uncertain parameters , 2009 .

[2]  Changyin Sun,et al.  On switching manifold design for terminal sliding mode control , 2016, J. Frankl. Inst..

[3]  Xinghuo Yu,et al.  Terminal sliding mode control design for uncertain dynamic systems , 1998 .

[4]  Xinghuo Yu,et al.  Chattering free full-order sliding-mode control , 2014, Autom..

[5]  Zhihong Man,et al.  Non-singular terminal sliding mode control of rigid manipulators , 2002, Autom..

[6]  Muhammad El-Taha,et al.  Characterization of the departure process in a closed fork-join synchronization network , 2006, Appl. Math. Comput..

[7]  Albert C. J. Luo,et al.  A theory for synchronization of dynamical systems , 2009 .

[8]  Giuseppe Grassi,et al.  Observer-based hyperchaos synchronization in cascaded discrete-time systems , 2009 .

[9]  Andrey Pototsky,et al.  Synchronization of a large number of continuous one-dimensional stochastic elements with time-delayed mean-field coupling , 2009 .

[10]  Yong Chen,et al.  Generalized Q-S (lag, anticipated and complete) synchronization in modified Chua's circuit and Hindmarsh-Rose systems , 2006, Appl. Math. Comput..

[11]  Jun Muramatsu,et al.  Conditions for common-noise-induced synchronization in time-delay systems , 2008 .

[12]  Juhn-Horng Chen,et al.  A new hyper-chaotic system and its synchronization , 2009 .

[13]  Yong Chen,et al.  The function cascade synchronization approach with uncertain parameters or not for hyperchaotic systems , 2008, Appl. Math. Comput..

[14]  V. Haimo Finite time controllers , 1986 .

[15]  Leonid M. Fridman,et al.  Continuous terminal sliding-mode controller , 2016, Autom..

[16]  Guanrong Chen,et al.  On a new hyperchaotic system , 2008 .

[17]  M. M. El-Dessoky,et al.  Synchronization and anti-synchronization of a hyperchaotic Chen system , 2009 .