Abstract

The problem of exponential synchronization for neural networks is investigated via feedback control in complex environment. By constructing suitable Lyapunov-Krasovskii functionals and applying the piecewise analytic method, some sufficient criteria for exponential synchronization of the addressed neural networks are established in terms of linear matrix inequalities (LMIs). The feedback control in complex environment includes the delayed aperiodically intermittent control and dynamic output feedback control. Moreover, the delayed aperiodically intermittent dynamic output feedback controller is designed based on the established LMIs. A numerical example and its numerical simulations are finally presented to show the effectiveness of obtained theoretical results.

1. Introduction

Neural networks have received significant attention during the past few decades due to their wide range of applications in different fields, such as signal processing, automatic control engineering, associative memory, parallel computing, combinatorial optimization, and pattern recognition [1–4]. In hardware implementation, time delays are inevitable due to the inherent information delivery time between neurons and the finite switching speed of amplifiers. The existence of time delays usually causes oscillation, divergence, or even instability of a system [5, 6], thus a large number of scholars have conducted a number of studies in regard to the dynamic behavior of the delayed neural networks [7–9]. From the perspective of time delays, all the research results can be divided into time-dependent and time-independent. The time-dependent results are usually less conservative than delay-independent ones, especially for systems with small delays. Therefore, many interesting results have been proposed in recent years, especially based on the Lyapunov-Krasovskii functional method, linear matrix inequality (LMI) technique, matrix approach, and so on [10–14]. On the other hand, synchronization is a typical collective behavior in nature, and it is observed in biological and physical systems, such as flocking of birds, synchronous glowing fireflies, wireless sensor networks, and synchronous transmissions of digital signals in communication networks [15, 16]. The earliest research on synchronization can be traced back to the observation of the synchronous coupling phenomenon by C. Huygens in 1673. In general, synchronization means that a system is designed to simulate the dynamic behavior of another system, that is, the state trajectory of two systems is finally identical. Therefore, many important results on synchronization have been obtained in the last few years [17–20], and various control strategies have been developed to design effective controllers for achieving synchronization, such as adaptive control [21], pinning control [22], feedback control [23], impulsive control [24–27], and intermittent control [28].

As a kind of common continuous control, feedback control is widely applied to the system controller design problem. Actually, the feedback control can be divided into state feedback control [29], static output feedback control [30], and dynamic output feedback control [31]. It is well known that all the state variables of many practical systems cannot be measured directly, which means that the state feedback controller can be designed only if a state observer can be designed firstly and this will not only increase the cost but also decrease the system reliability. Therefore, the output feedback controller is more preferable when designing a controller to ensure the desired performance for the closed-loop system [32–34]. Different from continuous feedback control, intermittent control, as a kind of discontinuous feedback control strategy, consists of two parts: the nonzero control time and nonzero rest time. In particular, when the control time is reduced to zero, the intermittent control becomes the discontinuous impulsive control, and when the rest time is reduced to zero, it becomes continuous feedback control. Therefore, intermittent control combines the advantages of impulsive control and continuous feedback control. In the past decade, many valuable results have been obtained for synchronization of neural networks under intermittent control [35–39]. For example, by applying the average dwell time approach, structuring multiple Lyapunov-Krasovskii functions, and using Halanay inequality, new robust synchronization criteria are obtained for switched coupled networks via intermittent control [35]. In [36], the fast synchronization problem for a class of complex dynamical networks with time varying delay by means of periodically intermittent control was investigated. By designing appropriate adaptive intermittent controllers and using the Lyapunov stability theory, some pinning outer synchronization criteria are derived in [37], which can guarantee that the response network asymptotically synchronizes to the drive network.

Obviously, the above research results are periodic intermittent control strategies, which means that each control period and control time is fixed. Compared with the periodically intermittent control strategy, the aperiodically intermittent control has more flexibility and more applicability. Therefore, it is very meaningful to investigate the synchronization of neural networks under the aperiodically intermittent control. It is well known that the aperiodically intermittent control strategies were proposed by Liu and Chen in [40]. As shown in Figure 1, there is a time sequence satisfying . The th time interval , is called the th control period and is called the th control period width. It can be seen clearly from Figure 1 that not all of the times in interval are controlled, among them, the interval is controlled, so is called the control time (or work time) and is called the th control width (control duration); while the interval is not controlled, so is called the rest time and is called the th rest width. Obviously, the control period and control width (or rest width) are both uncertain for different due to the aperiodically intermittent control strategy. In addition, once the control period and control width of every are fixed, that is, , , where and are constants, the aperiodically intermittent control strategy is transformed into the periodically intermittent control strategy, which has been considered in [41–43]. Due to the complexity of the control system, a single control method cannot effectively solve the poor performance of the system. In this case, the hybrid control method emerges at the historic moment, which makes the control system in complex environment. It has drawn researchers’ widespread attention owing to the hybrid controller which combines the advantages of multiple individual controllers in complex environment. It is worth noting that the current attention for hybrid control strategy of synchronization of delayed neural networks is periodically intermittent dynamic output feedback control in complex environment. For example, the dynamic intermittent output feedback controller was designed to achieve exponential synchronization for master-slave neural networks [44]. However, there is no work that focuses on aperiodically intermittent dynamic output feedback control. These motivate the present study.

Figure 1 

Sketch map of aperiodically intermittent control strategy.

In this paper, we investigate the problems of exponential synchronization of neural networks via the feedback control in complex environment. By constructing suitable Lyapunov-Krasovskii functionals and applying the piecewise analytic method, some LMI-based sufficient conditions are established to guarantee the exponential synchronization of the addressed neural networks in terms of linear matrix inequalities (LMIs), which can be easily verified via the LMI toolbox. In particular, we develop the aperiodically intermittent dynamic output feedback control for synchronization of neural networks, consider the time delay in the design of the controller, and introduce the control rate of the control period, which in this sense are better than those results in [29–39]. The rest of this paper is organized as follows. In Section 2, some notations, a definition, and some well-known technical lemmas are given. Section 3 presents the criteria for exponential synchronization of neural networks and the design of the aperiodically intermittent dynamic output feedback controller. A numerical example is provided in Section 4 to demonstrate the effectiveness of the proposed criteria. Finally, the paper is concluded in Section 5.

2. Preliminaries

Notations. Let denotes the set of real numbers, the set of positive numbers, the set of positive integer, the set of nonnegative integer, the -dimensional real spaces equipped with the Euclidean norm , and the -dimensional real spaces. or denotes that the matrix is a symmetric and positive definite or negative definite matrix. The notation and denote the transpose and the inverse of , respectively. If and are symmetric matrices, means that is positive definite matrix. and denote the maximum eigenvalue and the minimum eigenvalue of matrix , respectively. denotes the identity matrix with appropriate dimensions. For any interval , set , and . . Notation always denotes the symmetric block in a symmetric matrix.

Consider the following neural networks with time delay where is the state vector of the network networks; corresponds to the number of neurons; is an external input; is the output vector; denotes a vector-valued initial function; is the self-feedback term; , , and represent the connection weight matrix; is the transmission constant delay; and and represent neuron activation functions satisfying for any , , where and are some positive constants, and for all , . Define and .

In this paper, we consider neural networks (1) as the master system, and the corresponding slave system is given as follows: where is the state vector, is the output vector, denotes a vector-valued initial function, is constant matrix, and represents the control input that will be designed.

Defining as the synchronization error of master system (1) and the slave system (3), we get the following error system of neural networks: where , , and are the initial condition of system (4).

In order to achieve synchronization between system (1) and system (3), we design the following aperiodically intermittent dynamic output feedback controller with time delay: and satisfy where is the state vector of the controller (5), , and are unknown control gain matrices, , is the constant delay.

Define , combining (4) and (5), one can obtain the following closed-loop system: where

To derive the main results, we will introduce the following definition and lemmas.

Definition 1 [17]. The master system (1) and the slave system (3) are said to be exponential synchronization, if there exist constant scalars and such that every solution of the system (7) satisfies where the constant is defined as the exponential synchronization rate and .

Lemma 1 [45]. For any matrix , scalar and a vector function , such that the integrations concerned are well defined, then the following inequality is hold:

Lemma 2 [10]. Given matrices , , and with and , then is equivalent to one of the following conditions: (1) and .(2) and .

3. Main Results

3.1. Exponential Synchronization of Master-Slave Systems

In this section, we shall investigate the exponential synchronization of systems (1) and (3) by constructing suitable Lyapunov-Krasovskii functionals and applying the piecewise analytic method and LMI technique. For the convenience of presentation, in the following, we denote , , and , , where is called the control rate of the th control period.

Theorem 1. The master system (1) and the slave system (3) achieve exponential synchronization under aperiodically intermittent control dynamic output feedback controller (5), if for given scalars and , there exist symmetric positive definite matrices , , , , , , and such that the following inequalities are hold: where

Proof 1. We consider the following Lyapunov-Krasovskii functional candidate for the error system (7) as It is easy to deduced that where and Calculating the derivative of with respect to along the trajectory of error system (7), it can be deduced that Applying Lemma 1 and the Newton-Leibniz formula we have Similarly, it holds that It follows from (2) that and that is, where Furthermore, it follows from the trajectory equation of error system (7) that where , , , and .
When , , the slave system runs in control windows, thus the dynamic output feedback control works. Substituting (21), (22), and (25) into (19) and taking (27) into account, we obtain that If the matrix inequality (12) is satisfied, by Lemma 2, it is equivalent to , then we get Integrating both sides of the inequality (29) with respect to over the time interval , , we have In addition, when , , the slave system runs in free windows and the dynamic output feedback control does not work. We can get similarly, If the matrix inequality (13) is satisfied, by Lemma 2, it is equivalent to , then we get therefore, when , , Combining with (29) and (32), by applying mathematical induction and the piecewise analytic method, we can obtain Thus, for , , we have and for , , From (35) and (36), we get Furthermore, it follows from (17) that Hence, we finally obtain that By Definition 1, the master system (1) can be globally exponentially synchronized with the slave system (3) under the controller (5). The proof is completed.