A Fractional-Order Chaotic System with an Infinite Number of Equilibrium Points

A new 4D fractional-order chaotic system, which has an infinite number of equilibrium points, is introduced. There is no-chaotic behavior for its corresponded integer-order system. We obtain that the largest Lyapunov exponent of this 4D fractional-order chaotic system is 0.8939 and yield the chaotic attractor. A chaotic synchronization scheme is presented for this 4D fractional-order chaotic system. Numerical simulations is verified the effectiveness of the proposed scheme.

[1]  S. Hanson,et al.  Real World Applications , 1997 .

[2]  Darui Zhu,et al.  Control and synchronization of a hyperchaotic system based on passive control , 2012 .

[3]  Hsien-Keng Chen,et al.  Chaos and hybrid projective synchronization of commensurate and incommensurate fractional-order Chen–Lee systems , 2010 .

[4]  Junguo Lu Chaotic dynamics of the fractional-order Lü system and its synchronization , 2006 .

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

[6]  J. Sprott,et al.  Some simple chaotic flows. , 1994, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

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

[8]  Zaid Odibat,et al.  Adaptive feedback control and synchronization of non-identical chaotic fractional order systems , 2010 .

[9]  Ping Zhou,et al.  Multi Drive-One Response Synchronization for Fractional-Order Chaotic Systems , 2012 .

[10]  Zaid Odibat,et al.  A note on phase synchronization in coupled chaotic fractional order systems , 2012 .

[11]  Jinhu Lu,et al.  A New Chaotic Attractor Coined , 2002, Int. J. Bifurc. Chaos.

[12]  Elena Grigorenko,et al.  Chaotic dynamics of the fractional Lorenz system. , 2003, Physical review letters.

[13]  Xingyuan Wang,et al.  Chaos control of a fractional order modified coupled dynamos system , 2009 .

[14]  Elena Grigorenko,et al.  Erratum: Chaotic Dynamics of the Fractional Lorenz System [Phys. Rev. Lett.91, 034101 (2003)] , 2006 .

[15]  E. Lorenz Deterministic nonperiodic flow , 1963 .

[16]  Mohammad Saleh Tavazoei,et al.  Chaos control via a simple fractional-order controller , 2008 .

[17]  Qiang Jia,et al.  Hyperchaos generated from the Lorenz chaotic system and its control , 2007 .

[18]  Xiangjun Wu,et al.  Generalized projective synchronization of the fractional-order Chen hyperchaotic system , 2009 .

[19]  Qingdu Li,et al.  A topological horseshoe in the hyperchaotic Rossler attractor , 2008 .

[20]  Changpin Li,et al.  Chaos in Chen's system with a fractional order , 2004 .

[21]  Zhou Ping,et al.  A new hyperchaos system and its circuit simulation by EWB , 2009 .

[22]  Qingdu Li,et al.  New walking dynamics in the simplest passive bipedal walking model , 2012 .

[23]  Mohammad Saleh Tavazoei,et al.  A necessary condition for double scroll attractor existence in fractional-order systems , 2007 .

[24]  Xiao-Song Yang,et al.  Hyperchaos in a Spacecraft Power System , 2011, Int. J. Bifurc. Chaos.

[25]  Sara Dadras,et al.  Four-wing hyperchaotic attractor generated from a new 4D system with one equilibrium and its fractional-order form , 2012 .

[26]  Guanrong Chen,et al.  YET ANOTHER CHAOTIC ATTRACTOR , 1999 .