Abstract

It has been realized that synchronization using linear feedback control method is efficient compared to nonlinear feedback control method due to the less computational complexity and the synchronization error. For the problem of feedback synchronization of Duffing chaotic system, in the paper, we firstly established three-dimensional Duffing system by method of variable decomposition and, then, studied the synchronization of Duffing chaotic system and designed the control law based on linear feedback control and Lyapunov stability theory. It is proved theoretically that the two identical integer order chaotic systems are synchronized analytically and numerically.

1. Introduction

In recent years, the chaotic control has become one of the important research fields of nonlinear science and received the attention of many scholars around the world. The possibility of synchronizing two chaotic systems has been introduced by Pecora and Carroll [1] and the synchronization of two identical chaotic systems with different initial conditions has been presented in [2]. Moreover, synchronization of two chaotic systems has been studied extensively in the last few years. Most recently, the problem of controlling chaos for new dynamical system has been studied and the sufficient conditions for synchronization of chaotic systems have been derived in [3]. An efficient nonlinear control method has been applied to the synchronization of unified chaotic systems using the Lyapunov method in [4] and a nonlinear control scheme for the synchronization has been presented using the Lyapunov stability theory in [5]. The synchronization of an energy resource system has been investigated and three linear control schemes have been proposed to synchronize an energy resource system in [6]. The synchronization process of a four-dimensional chaotic system by using linear feedback controller, single variable, and adaptive controller methods has been proposed and demonstrated in [7]. Synchronization of energy resource systems has been proposed when the parameters of the master system are unknown and different from the slave system using adaptive linear feedback control in [8].

Chaos synchronization has been of tremendous worldwide interest in communication systems, which has applications in the encryption and decryption of information for secure communications. An adaptive scheme has been exhibited in [9] for chaos synchronization that solves the problem of security in the communications. The authors in [10] have designed secure digital communication systems using chaotic modulation, cryptography, and chaotic synchronization and their security features have been analyzed. Two methods of encoding and decoding message for secure communication based on an adaptive chaos synchronization have been investigated by Xing and Huang [11]. In [12], a new technique has been suggested for synchronizing two chaotic systems and that technique has been applied to digital cryptography [13] for sending and receiving messages.

At present, the main research methods of chaotic control are OGY and feedback control method [14, 15]. The chaos can be controlled by constructing simple fractional order controller in [16]. The chaos synchronization between two different chaotic systems can be realized based on the nonlinear feedback control method in [17]. Feedback technology is commonly used in engineering, and the use of this technology can realize the control of chaotic systems, such as changing unstable fixed point into stable one and controlling the periodic orbit. Chaos synchronization can be regarded as a kind of control that the controlled chaotic system moves in the target system orbit. Generally speaking, feedback methods used in the chaos synchronization can be divided into parameters feedback method and state variable feedback method. Output feedback and linear feedback synchronization of chaotic systems are, respectively, studied in [1821].

Study of chaotic oscillator characteristic is an important subject. Many scientific researchers are interested in it [2225]. However, less research is focused on the problem of Duffing chaotic system control. Therefore, based on the three-dimensional Duffing system and the theory of Lyapunov equation of system stability judgment, the linear state feedback synchronization in Duffing chaotic system is studied in this paper.

2. Three-Dimensional Duffing System

There are many problems in engineering such as packaging systems based on displacement excitation of nonlinear vibrations and pressure sensors nonlinear vibration and so they can be simplified into a forced Duffing equation with cubic nonlinearity, governed bywhere is the solution of (1), are real constants, and the dot represents differentiation with respect to .

Definition 1. The particular form of Duffing system related to system (1) is described aswhere are the amplitude and frequency of driving force, is damping ratio, and is the nonlinear restoring force.

When given the system initial states and in (2), two-dimensional Duffing system under sinusoidal signal drive produces the chaotic phase diagram shown in Figure 1.

Definition 2. Given a constant , system (2) can be converted into the following state equation:

Proof. Choose the following differential equation:Integrating taken in (4) into system (2) yieldswhere is undetermined constant and the value can be determined by the system initial state.

Remark 3. From the above analysis, it follows that and are unbounded, but is used to counteract the effects of . When given and in system (3), and hold. The three-dimensional Duffing chaotic dynamic system (3) is the same as system (2). Under the general conditions, system (2) can be modified to system (3) by adjusting variable to offset the impact of variable .

When given , , , and in (3), three-dimensional Duffing system produces the chaotic phase diagram shown in Figure 2. Its plane projections on the , , and are shown in Figures 3, 4, and 5. By comparing Figures 1 and 3, we can obtain the result that two-dimensional Duffing system and three-dimensional Duffing system are consistent. Figures 4 and 5 can only produce in three-dimensional Duffing system.

The simulation results of equivalent condition are the premise of system initial states and ; otherwise the system status may not be chaotic. When given , , and , simulation result is shown in Figure 6. The system state is not chaotic.

When assuming in (3), the system phase diagram as shown in Figure 7 is chaotic. From the above analysis, results counteracting the effects of initial condition on system state and keeping the system chaotic can be obtained by adjusting the variable .

3. State Feedback Synchronization in Duffing System

Definition 4. Given three positive constants , , and , the response system of state feedback synchronization in Duffing system can be written asWhen driven by the state error feedback, the response system can keep pace with the drive system.

Proof. Constructed from drive and response system, the error system can be described asLet , , and . Then (7) can change intoNow choose (9) as Lyapunov function:From (8) and differentiating (9), we can obtainConsidering that Duffing chaotic system is bounded, and are not bigger than negative . Then (10) can be modified asIf in (11), (8) at the origin is asymptotically stable. The coefficients of , , and in (11) should satisfy the following conditions: (1), and .(2), .

Remark 5. The state feedback system based on (6) is shown in Figure 8. The initial states of drive system are , , and in (5). The initial states of response system are , , and in (6). According to phase diagram of chaos Duffing system, we can know . Utilizing the above conditions in (7) with coefficients , , and , feedback coefficients , , and are to meet the coefficient value range in Section 3. Let , , and . From (11), we can obtain . According to (8), the simulation results based on state feedback method are shown in Figures 9, 10, and 11. Error curves tend to zero. Simulation results show that drive and response system can keep the good synchronization performance.

4. Reduction of State Feedback Terms

Multivariable feedback can realize synchronization of two chaotic systems. But, for many chaotic systems, only single variable signal feedback can achieve synchronization between systems. Feedback coefficient in Section 3 can be further deduced as follows.

Proof. Let and in (6). The response system of state feedback synchronization in Duffing system can be modified to (12), where is a feedback coefficient. ConsiderAccording to (12) and stability proof for the error system in Section 3, we can obtain (13) from (11):From (4), we know the symbol of is the same as that of ; namely, . Equation (13) can be modified aswhere and satisfyIf in (14), and should satisfy the following conditions:(3), .(4), .

Remark 6. From (15), we know that when feedback coefficient is big enough, conditions (3) and (4) are satisfied. Let and select the initial states in (12) similar to (6); then, like that in Section 3, the error of drive and response system tends to zero, and the two systems can keep synchronization too. According to (12), the simulation results based on single variable feedback method are shown in Figures 12, 13, and 14. Error curves tend to zero.

5. Conclusions

Linear and nonlinear feedback controllers can be designed to realize drive-response synchronization of an existing chaotic system. It has shown that synchronization using linear feedback control method is suitable and efficient compared to nonlinear control method due to less synchronization cost and synchronization error. The present work has studied a new three-dimensional chaotic synchronization of Duffing system. On the basis of three-dimensional model, a linear state feedback method is used and has successfully driven the state of response system to zero. This method is simple and practical and can select control parameters in considerable range. In addition, three-dimensional Duffing system is equivalent to two-dimensional system but can show more information, so the structure of new Duffing system is worth future studying of weak signal detection and secret communication.

Conflict of Interests

The authors declare that there is no conflict of interests regarding the publication of this paper.

Acknowledgment

This work is supported by the National Natural Science Foundation of China under Grant Contract 51277011.