The dynamical analysis of a new chaotic system and simulation

In this paper, we make a study of dynamical properties of a nonlinear monetary system (1.1) towards the solution of the localization problem of compact invariant sets of the system (1.1). Here, a localization signifies a description of a set containing all compact invariant sets of (1.1) in terms of equalities and inequalities defined in the state space R3. Our approach is based on using the first-order extremum conditions and is realized with the help of the iterative theory. We claim that all compact invariant sets of this system are located in the intersection of a ball with two frusta, and we also compute its corresponding parameters of the system. In addition, localization with the help of a two-parameter set of parabolic cylinders is described. Numerical simulation is consistent with the results of theoretical calculation. Copyright © 2013 John Wiley & Sons, Ltd.

[1]  G. Leonov,et al.  Localization of hidden Chuaʼs attractors , 2011 .

[2]  Gennady A. Leonov,et al.  Stability and bifurcations of Phase-Locked Loops for Digital Signal Processors , 2005, Int. J. Bifurc. Chaos.

[3]  Gennady A. Leonov,et al.  Attraktoreingrenzung für nichtlineare Systeme , 1987 .

[4]  Zhenbo Li,et al.  Synchronization of a chaotic finance system , 2011, Appl. Math. Comput..

[5]  Fu Yuli,et al.  On the new results of global attractive set and positive invariant set of the Lorenz chaotic system and the applications to chaos control and synchronization , 2005 .

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

[7]  Nikolay V. Kuznetsov,et al.  Hidden attractors in Dynamical Systems. From Hidden oscillations in Hilbert-Kolmogorov, Aizerman, and Kalman Problems to Hidden Chaotic Attractor in Chua Circuits , 2013, Int. J. Bifurc. Chaos.

[8]  G. Leonov,et al.  Attraktorlokalisierung des Lorenz-Systems , 1987 .

[9]  Louis M. Pecora,et al.  Fundamentals of synchronization in chaotic systems, concepts, and applications. , 1997, Chaos.

[10]  Fuchen Zhang,et al.  Bounds for a new chaotic system and its application in chaos synchronization , 2011 .

[11]  Guanrong Chen,et al.  Estimating the ultimate bound and positively invariant set for the Lorenz system and a unified chaotic system , 2006 .

[12]  Konstantin E. Starkov,et al.  Bounding a domain containing all compact invariant sets of the permanent-magnet motor system , 2009 .

[13]  Xingyuan Wang,et al.  Hopf bifurcation and topological horseshoe of a novel finance chaotic system , 2012 .

[14]  Guanrong Chen,et al.  Estimating the bounds for the Lorenz family of chaotic systems , 2005 .

[15]  Ma Junhai,et al.  Study for the bifurcation topological structure and the global complicated character of a kind of nonlinear finance system (I) , 2001 .

[16]  Wei-Ching Chen,et al.  Dynamics and control of a financial system with time-delayed feedbacks , 2008 .

[17]  Gennady A. Leonov THE PASSING THROUGH RESONANCE OF SYNCHRONOUS MACHINE ON ELASTIC PLATFORM , 2008 .

[18]  Peter Swinnerton-Dyer,et al.  Bounds for trajectories of the Lorenz equations: an illustration of how to choose Liapunov functions , 2001 .

[19]  Konstantin E. Starkov Estimation of the Domain Containing All Compact Invariant Sets of the Optically Injected Laser System , 2007, Int. J. Bifurc. Chaos.

[20]  Alexander P. Krishchenko,et al.  Estimations of domains with cycles , 1997 .

[21]  Han Liang,et al.  Canonical form of a nonlinear monetary system , 2009 .

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

[23]  Alexander P. Krishchenko,et al.  Localization of compact invariant sets of the Lorenz system , 2006 .

[24]  Gennady A. Leonov,et al.  Bounds for attractors and the existence of homoclinic orbits in the lorenz system , 2001 .

[25]  Guanrong Chen,et al.  On the boundedness of solutions of the Chen system , 2007 .

[26]  Fuchen Zhang,et al.  Estimating the ultimate bound and positively invariant set for a synchronous motor and its application in chaos synchronization , 2011 .