A novel methodology for constructing a multi-wing chaotic and hyperchaotic system with a unified step function switching control*

This paper aims at developing a novel method of constructing a class of multi-wing chaotic and hyperchaotic system by introducing a unified step function. In order to overcome the essential difficulties in iteratively adjusting multiple parameters of conventional multi-parameter control, this paper introduces a unified step function controlled by a single parameter for constructing various multi-wing chaotic and hyperchaotic systems. In particular, to the best of the authors' knowledge, this is also the first time to find a non-equilibrium multi-wing hyperchaotic system by means of the unified step function control. According to the heteroclinic loop Shilnikov theorem, some properties for multi-wing attractors and its chaos mechanism are further discussed and analyzed. A circuit for multi-wing systems is designed and implemented for demonstration, which verifies the effectiveness of the proposed approach.

[1]  Awadhesh Prasad,et al.  Complicated basins and the phenomenon of amplitude death in coupled hidden attractors , 2014 .

[2]  Kais Bouallegue,et al.  Multi-scroll and multi-wing chaotic attractor generated with Julia process fractal , 2011 .

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

[4]  Guanrong Chen,et al.  Generation of n-scroll attractors via sine function , 2001 .

[5]  Nikolay V. Kuznetsov,et al.  Hidden attractor in smooth Chua systems , 2012 .

[6]  Guanrong Chen,et al.  Generation of $n\times m$-Wing Lorenz-Like Attractors From a Modified Shimizu–Morioka Model , 2008, IEEE Transactions on Circuits and Systems II: Express Briefs.

[7]  Zhouchao Wei,et al.  Dynamical behaviors of a chaotic system with no equilibria , 2011 .

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

[9]  Julien Clinton Sprott,et al.  Coexisting Hidden Attractors in a 4-D Simplified Lorenz System , 2014, Int. J. Bifurc. Chaos.

[10]  C. P. Silva,et al.  Shil'nikov's theorem-a tutorial , 1993 .

[11]  Daizhan Cheng,et al.  A New Chaotic System and Beyond: the Generalized Lorenz-like System , 2004, Int. J. Bifurc. Chaos.

[12]  Guanrong Chen,et al.  Generating Multiscroll Chaotic Attractors: Theories, Methods and Applications , 2006 .

[13]  Chen Long,et al.  Adaptive generalized synchronization between Chen system and a multi-scroll chaotic system , 2010 .

[14]  Viet-Thanh Pham,et al.  A Novel No-Equilibrium Chaotic System with Multiwing Butterfly Attractors , 2015, Int. J. Bifurc. Chaos.

[15]  Xinghuo Yu,et al.  Generating Grid Multiwing Chaotic Attractors by Constructing Heteroclinic Loops Into Switching Systems , 2011, IEEE Transactions on Circuits and Systems II: Express Briefs.

[16]  王发强,et al.  A new multi-scroll chaotic generator , 2007 .

[17]  Peng Zhang,et al.  Novel Grid Multiwing Butterfly Chaotic Attractors and Their Circuit Design , 2015, IEEE Transactions on Circuits and Systems II: Express Briefs.

[18]  Lee,et al.  Competition between magnetism and superconductivity in rare-earth nickel boride carbides. , 1994, Physical review. B, Condensed matter.

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

[20]  Zhou Dong-hua,et al.  A method of chaotic secure communication based on strong tracking filter , 2015 .