Generation of Hyperchaos from the Lü System with a Sinusoidal Perturbation

This paper introduces a hyperchaotic system from the Lü system with a sinusoïdal perturbation. This hyperchaotic system has more complex dynamical behaviors, and can generate 2-scroll hyperchaotic attractor and 2-scroll chaotic attractor under different control parameters. Theoretical analyses and simulation are conducted to investigate the dynamical behaviors of the proposed hyperchaotic system by means of Lyapunov exponents, analysis of the bifurcation diagram and phase portraits.


Introduction
Therefore, much attention has been paid to the investigation of the existence and applications of hyperchaos. It is well known that hyperchaos can only appear in four-or more dimensional systems and is usually generated from a known low-dimensional system [1]- [8] via some control schemes. With the generating mechanisms, some hyperchaotic systems have been discovered as in [9]- [16]. In this letter, we will report a new hyperchaotic system constructed from the Lü system [17] via a sinusoidal perturbation. The Lü system found in 2004 [17] has many interesting properties such as the existence of two-scroll chaotic attractors with only three equilibria and two 2-scroll chaotic attractors with five equilibria.
It is perhaps expected that the Lü system with a sinusoidal perturbation will exhibit more complex dynamical behaviors. transition from a system to another system. It is also the simplest chaotic attractor among the unified chaotic system. The Lü system [17] is described as ( ) x a y x y xz by z xy cz where x, y, and z are the state variables, and a, b, and c are three system parameters. When ( ) ( ) , , 36, 20,3 a b c = , system (1) demonstrates a chaotic attractor, shown in Figure 1 and the Lyapunov dimension is 2.0669.
Hyperchaotic systems, generally, are classified as chaotic systems with more than one positive Lyapunov exponent, this shows that the chaotic dynamics of the systems are expanded in more than one direction and may give rise to more complex attractors. Hyperchaotic system also should satisfy some basic properties: 1) Hyperchaos exists only in higher dimensional systems, i.e. not less than 4D autonomous system for the continuous time cases.
2) It was suggested that the number of terms in the coupled equations giving rise to instability should be at least two, in which one should be a nonlinear function.
In this study is constructed from (1) a new Lü system with a sinusoidal perturbation on parameter c in the original Lü system. The new system is described where ε is the perturbation amplitude, and is the perturbation angular frequency. The addition of the time varying parametric perturbation εsinωt changes the autonomous system (1) to the non-autonomous system (2), which is equivalent to a four-dimensional autonomous system.
This work, we show that the system (2)  The conditions for achieving hyperchaos are as follows: 1) The minimal dimension of the phase space should be at least four for continuous time systems of integer order.
2) The system has at least two positive Lyapunov exponents, and the sum of all Lyapunov exponents is less than zero.
Using Wolf's algorithm [18], the Lyapunov exponents of the new hyperchao-

Numerical Simulation
In this section, we show how the route to hyperchaos is obtained using bifurcation diagram and phase portraits. This new hyperchaotic system is numerically solved using fourth-order Runge-Kutta formula. For each iteration, the time grid is always 6 2 10 t − ∆ = × seconds and the computations are made using parameters and variables in extended mode. Bifurcation diagrams are is exploited to define the type of behavior leading to hyperchaos. The Lyapunov exponent is calculated using the method described by Wolf et al. [18]. The spectrum of Lyapunov exponents ( Figure 3) agrees with bifurcation sequence. In Figure 4,   corresponding Lyapunov exponents are plotted for varying in the range for and with the same initial condition. Figure 5 shows the 2-D phase plots of the new system (2). It is seen that the new system (2) exhibits two-scroll attractor.

Conclusion
By introducing a sinusoïdal perturbation, this paper presents a Lü system to generate the hyperchaotic behaviors. We discussed dynamic properties such as Lyapunov exponents, phase portraits and bifurcation diagram. The new system has more complex dynamical behaviors, and can generate 2-scroll hyperchaotic attractor in wide parameter ranges. It is very possible that a coexisting intermittent Journal of Applied Mathematics and Physics