On modified time delay hyperchaotic complex Lü system

Time delays are often considered as sources of complex behaviors in dynamical systems. Much progress has been made in the research of time delay systems with real variables. In this article, we will focus our study on time delay complex systems. This paper investigates a modified time delay hyperchaotic complex Lü system. This system is constructed by including the constant delay to one of its states. The behaviors of our time delay system are greatly different from those of the original system without delay. By setting the parameters, we discuss the effect of delay variation on system stability. Numerically, we calculate the range of system parameters at which chaotic and hyperchaotic attractors of different order exist. We found that our system has hyperchaotic attractors of order $$ 2,3,\ldots ,6$$2,3,…,6. However, the modified complex Lü system without delay has only hyperchaotic attractors of order 2. Different forms of modified time delay hyperchaotic complex Lü system are constructed by including the delay into different states of this system. Chaos synchronization in modified time delay hyperchaotic complex Lü system is investigated. The active control method based on Lyapunov–Krasovskii function is used to synchronize the hyperchaotic attractors. In particular, studying the time evolution of errors, we show that this technique is very effective for controlling the behavior of our system.

[1]  P. Saha,et al.  Multiple delay Rössler system—Bifurcation and chaos control , 2008 .

[2]  Lei Zhou,et al.  Synchronization of chaotic Lur'e systems with quantized sampled-data controller , 2014, Commun. Nonlinear Sci. Numer. Simul..

[3]  Tonghua Zhang,et al.  Stability and bifurcation analysis of delay coupled Van der Pol–Duffing oscillators , 2013, Nonlinear Dynamics.

[4]  Emad E. Mahmoud,et al.  Passive control of n-dimensional chaotic complex nonlinear systems , 2013 .

[5]  Emad E. Mahmoud,et al.  Controlling hyperchaotic complex systems with unknown parameters based on adaptive passive method , 2013 .

[6]  Emad E. Mahmoud,et al.  Modified projective phase synchronization of chaotic complex nonlinear systems , 2013, Math. Comput. Simul..

[7]  L. Glass,et al.  Oscillation and chaos in physiological control systems. , 1977, Science.

[8]  David T. J. Liley,et al.  Chaos and generalised multistability in a mesoscopic model of the electroencephalogram , 2009 .

[9]  Bishnu Charan Sarkar,et al.  Design and analysis of a first order time-delayed chaotic system , 2012 .

[10]  Xinchu Fu,et al.  Complex projective synchronization in coupled chaotic complex dynamical systems , 2012 .

[11]  Dibakar Ghosh,et al.  Nonlinear active observer-based generalized synchronization in time-delayed systems , 2009 .

[12]  Emad E. Mahmoud,et al.  On the hyperchaotic complex Lü system , 2009 .

[13]  Song Zheng,et al.  Parameter identification and adaptive impulsive synchronization of uncertain complex-variable chaotic systems , 2013 .

[14]  Dibakar Ghosh,et al.  Projective-dual synchronization in delay dynamical systems with time-varying coupling delay , 2011 .

[15]  Mark J. McGuinness,et al.  The complex Lorenz equations , 1982 .

[16]  A. Wolf,et al.  Determining Lyapunov exponents from a time series , 1985 .

[17]  Zhenya He,et al.  Chaotic behavior in first-order autonomous continuous-time systems with delay , 1996 .

[18]  Emad E. Mahmoud,et al.  Phase and antiphase synchronization of two identical hyperchaotic complex nonlinear systems , 2010 .

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

[20]  Junjie Wei,et al.  Bifurcation analysis for Chen's system with delayed feedback and its application to control of chaos , 2004 .

[21]  N. Abraham,et al.  Global stability properties of the complex Lorenz model , 1996 .

[22]  Gamal M. Mahmoud,et al.  On Autonomous and nonautonomous Modified hyperchaotic Complex Lü Systems , 2011, Int. J. Bifurc. Chaos.

[23]  K. Sudheer,et al.  Adaptive modified function projective synchronization of multiple time-delayed chaotic Rossler system , 2011 .

[24]  Philipp Hövel,et al.  CONTROL OF SYNCHRONIZATION IN DELAY-COUPLED NETWORKS , 2012 .

[25]  S. Ruan,et al.  On the zeros of a third degree exponential polynomial with applications to a delayed model for the control of testosterone secretion. , 2001, IMA journal of mathematics applied in medicine and biology.

[26]  Junhai Ma,et al.  Analysis of the stability and Hopf bifurcation of money supply delay in complex macroeconomic models , 2014 .

[27]  Emad E. Mahmoud,et al.  Adaptive anti-lag synchronization of two identical or non-identical hyperchaotic complex nonlinear systems with uncertain parameters , 2012, J. Frankl. Inst..

[28]  Guangyi Wang,et al.  A new modified hyperchaotic Lü system , 2006 .

[29]  Emad E. Mahmoud,et al.  On projective synchronization of hyperchaotic complex nonlinear systems based on passive theory for secure communications , 2013 .

[30]  Emad E. Mahmoud,et al.  ANALYSIS OF HYPERCHAOTIC COMPLEX LORENZ SYSTEMS , 2008 .

[31]  Emad E. Mahmoud,et al.  Generation and suppression of a new hyperchaotic nonlinear model with complex variables , 2014 .

[32]  Emad E. Mahmoud,et al.  Dynamics and synchronization of new hyperchaotic complex Lorenz system , 2012, Math. Comput. Model..

[33]  Julien Clinton Sprott,et al.  A simple chaotic delay differential equation , 2007 .

[34]  K. Ikeda Multiple-valued stationary state and its instability of the transmitted light by a ring cavity system , 1979 .

[35]  H. Haken,et al.  Detuned lasers and the complex Lorenz equations: Subcritical and supercritical Hopf bifurcations. , 1990, Physical review. A, Atomic, molecular, and optical physics.

[36]  Aiguo Song,et al.  Fuzzy adaptive control of delayed high order nonlinear systems , 2012, Int. J. Autom. Comput..

[37]  Emad E. Mahmoud,et al.  Complex modified projective synchronization of two chaotic complex nonlinear systems , 2013 .

[38]  Xuerong Shi,et al.  A single adaptive controller with one variable for synchronizing two identical time delay hyperchaotic Lorenz systems with mismatched parameters , 2012 .

[39]  Xiao-Song Yang,et al.  Generation of multi-scroll delayed chaotic oscillator , 2006 .

[40]  Kestutis Pyragas,et al.  An electronic analog of the Mackey-Glass system , 1995 .

[41]  Tassos Bountis,et al.  Active Control and Global Synchronization of the Complex Chen and lÜ Systems , 2007, Int. J. Bifurc. Chaos.

[42]  G. Mahmoud,et al.  Lag synchronization of hyperchaotic complex nonlinear systems , 2012 .

[43]  Zhongkui Sun,et al.  Inducing or suppressing chaos in a double-well Duffing oscillator by time delay feedback , 2006 .

[44]  Guanrong Chen,et al.  Synchronization of a network coupled with complex-variable chaotic systems. , 2012, Chaos.

[45]  S. Ruan,et al.  On the zeros of transcendental functions with applications to stability of delay differential equations with two delays , 2003 .