Dynamical behaviors and synchronization in the fractional order hyperchaotic Chen system

Abstract Some dynamical behaviors are studied in the fractional order hyperchaotic Chen system which shows hyperchaos with order less than 4. The analytical conditions for achieving synchronization in this system via linear control are investigated theoretically by using the Laplace transform theory. Routh–Hurwitz conditions and numerical simulations are used to show the agreement between the theoretical and numerical results. To the best of our knowledge this is the first example of a hyperchaotic system synchronizable just in the fractional order case, using a specific choice of controllers.

[1]  Xing-yuan Wang,et al.  Synchronization of the fractional order hyperchaos Lorenz systems with activation feedback control , 2009 .

[2]  M. Caputo Linear Models of Dissipation whose Q is almost Frequency Independent-II , 1967 .

[3]  Qionghua Wang,et al.  A fractional-order hyperchaotic system and its synchronization , 2009 .

[4]  A. Matouk Stability conditions, hyperchaos and control in a novel fractional order hyperchaotic system , 2009 .

[5]  E. Ahmed,et al.  On fractional order differential equations model for nonlocal epidemics , 2007, Physica A: Statistical Mechanics and its Applications.

[6]  D. Matignon Stability results for fractional differential equations with applications to control processing , 1996 .

[7]  Chuandong Li,et al.  Lag synchronization of hyperchaos with application to secure communications , 2005 .

[8]  Ahmed M. A. El-Sayed,et al.  On the fractional-order logistic equation , 2007, Appl. Math. Lett..

[9]  A. E. Matouk,et al.  Chaos Synchronization between Two Different Fractional Systems of Lorenz Family , 2009 .

[10]  Andrew G. Glen,et al.  APPL , 2001 .

[11]  P. Butzer,et al.  AN INTRODUCTION TO FRACTIONAL CALCULUS , 2000 .

[12]  B. Onaral,et al.  Linear approximation of transfer function with a pole of fractional power , 1984 .

[13]  Zhenya Yan,et al.  Controlling hyperchaos in the new hyperchaotic Chen system , 2005, Appl. Math. Comput..

[14]  B. M. Fulk MATH , 1992 .

[15]  Henry D. I. Abarbanel,et al.  Analysis of Observed Chaotic Data , 1995 .

[16]  Chunguang Li,et al.  Chaos and hyperchaos in the fractional-order Rössler equations , 2004 .

[17]  Xinjie Li,et al.  Synchronization of fractional hyperchaotic Lü system via unidirectional coupling method , 2008, 2008 7th World Congress on Intelligent Control and Automation.

[18]  N. Ford,et al.  Analysis of Fractional Differential Equations , 2002 .