Abstract

This paper concerns the problem of dynamic output-feedback control for a class of nonlinear systems with nonuniform uncertain sampling via Takagi-Sugeno (T-S) fuzzy control approach. The sampling is not required to be periodic, and the state variables are not required to be measurable. A new type fuzzy dynamic output-feedback sampled-data controller is constructed, and a novel time-dependent Lyapunov-Krasovskii functional is chosen for fuzzy systems under variable sampling. By using Lyapunov stability theory, a sufficient condition for very-strict passive analysis of fuzzy systems with nonuniform uncertain sampling is derived. Based on this condition, a novel fuzzy dynamic output-feedback controller is designed such that the closed-loop system is very-strictly passive. The existence condition of the controller can be solved by convex optimization approach. Finally, a numerical example is provided to demonstrate the effectiveness of the proposed method.

1. Introduction

The fuzzy logic control [15] is one of the most effective approaches to handle complex nonlinear systems and has been applied into various real systems. Takagi-Sugeno (T-S) [6] fuzzy model is a popular and effective method to represent complex nonlinear systems into a weighted sum of some simple linear subsystems [79]. Complex nonlinear systems can be represented by T-S fuzzy model in a set of IF-THEN rules [10]. Recently, many stability and control problems were investigated for T-S fuzzy systems; see, for example, [1115]. The authors in [10] proposed fuzzy control systems design and analysis results via linear matrix inequality (LMI) approach, and paper [7] presented a survey on recent advances and the state of the art of analysis and design of model based fuzzy control systems. More recently, many results on stability analysis, controller synthesis, and filter design for T-S fuzzy systems with time delays have been reported in [1624] and the references therein.

On the other hand, it is significant to study the sampled-data control problems for practical control systems [2531]. In the past few decades, there are two main approaches being utilized to solve stability analysis and control synthesis problems for sampled-data systems. The first one is that a sampled-data system is structured as a discrete-time system [29]. Another is to structure a sampled-data system as a continuous-time system with a delayed control input [31, 32]. It has been shown that the first method is more difficult to analyze or synthesize for complex systems than the second one. Recently, the sampled-data control problem for T-S fuzzy systems via input delay method has received considerable attention. Some state-feedback control design methods have been proposed [3235], and observer-based control approach has been used in [36]. Via input delay approach, the stabilization of nonuniform sampling fuzzy control systems has been studied in [34]. However, it should be mentioned that there are few results on fuzzy dynamic output-feedback controller design for T-S fuzzy systems with nonuniform uncertain sampling. More recently, the passivity analysis and passive control problems for fuzzy systems have received considerable attention, and many results have been reported [3739]. In [39], the authors considered very-strict passive control for T-S fuzzy systems with both state and input delays. When the state variables are not measurable, there are few results about output-feedback control for T-S fuzzy systems based on passive theory, which motivates this study.

In this paper, a new type of dynamic output-feedback control is designed for a class of nonlinear systems with variable sampling. Firstly, by choosing a novel time-dependent Lyapunov-Krasovskii functional and using Lyapunov stability theory, a sufficient condition is presented for very-strict passive analysis for fuzzy systems with nonuniform uncertain sampling. Based on the conception of very-strict passivity, a new sampled-data dynamic output-feedback controller is designed to guarantee that the closed-loop system is very strictly passive. The existence condition of the controller can be solved by convex optimization approach. Finally, a numerical example is given to show the effectiveness of the proposed results. The main contributions of this paper can be summarized as follows: (i) a new dynamic output-feedback sampled-data controller is constructed for T-S fuzzy system with variable sampling; (ii) a novel time-dependent and fuzzy membership dependent Lyapunov-Krasovskii functional is chosen for synthesizing output-feedback sampled-data controller for T-S fuzzy system. The remainder of the paper is organized as follows. The problem to be addressed is formulated in Section 2, and dynamic output-feedback controller is designed for fuzzy systems with variable sampling in Section 3. A numerical example is provided in Section 4 to demonstrate the effectiveness of the developed approach, and Section 5 concludes the paper.

Notation. stands for the -dimensional Euclidean space. and represent, respectively, identity matrix and zero matrix, and is used to denote for simplicity. stands for a block-diagonal matrix. stands for a symmetric and positive definite (semidefinite), and the superscript “” and “−1” stand for matrix transposition and inverse. In symmetric block matrices, we use an asterisk to represent a term that is induced by symmetry.

2. Problem Formulation

Consider the following T-S fuzzy systems.

Plant Rule . IF is and and is THEN where is the state vector, is the control input, is the disturbance input, is the control output, and is the measured output. , , , , , , and are system matrices with appropriate dimensions. The scalar is the number of IF-THEN rules. are the premise variables, is the fuzzy set, , . For a given input and output , the defuzzified output of system (1) is inferred as follows: where denotes the normalized membership functions satisfying where is the grade of membership of in . Notice the facts that and , . Then, it can be seen that and for . Suppose that the updating signal is successfully transmitted from the sampler to the controller and to the zero-order-hold (ZOH) at the instant . It is assumed that the sampling intervals are bounded:

Here denotes the maximum time span between the time at which the state is sampled and the time at which the next update arrives at the destination. The initial conditions of and are given as and for , where is a differentiable function. When the state variables are unmeasurable or unknown, the state-feedback control method is not available. In this paper, a novel dynamic output-feedback sampled-date controller is constructed as follows.

Controller Rule . IF is and is THEN Similar to the fuzzy model, the same fuzzy rule is used to construct the following overall fuzzy control law: where is the state vector of the dynamic controller and denotes the th sampling instant, , and . , , , and are control matrices with appropriate dimensions. is the updating instant time of the ZOH after . Denote for . It is clear that . It can be seen that is sawtooth structure, that is, piecewise-linear with derivative , . Utilizing , the following systems can be obtained:

Applying the fuzzy controller (7) to system (2) and yielding the closed-loop system as follows: where

3. Main Results

In order to develop the main results, the definition is introduced as follows.

Definition 1 (see [39]). System (8) is said to be very-strictly passive if there exist constants , and such that holds for all .

In this section, a novel dynamic output-feedback sampled-data controller for system in (2) is designed to guarantee that the closed-loop system (8) is very-strictly passive. For given dynamic output-feedback control gain matrices , , , , and , the condition of passivity analysis is proposed for the closed-loop system (8).

Theorem 2. Consider the closed-loop system (8), for given scalar and matrices with appropriate dimensions , , , , and ; the closed-loop system (8) is very-strictly passive, if there exist scalars , and matrices , , , , , and with appropriate dimensions, such that the following LMIs hold for : where

Proof. Consider the following Lyapunov-Krasovskii functional: where and , . Hence and is continuous in time. The derivatives of , , and with time can be obtained as It can be seen from condition (13) that . For the second term in the following inequalities can be obtained: where Similarly, for the first term in , we can have
For the last term in , one can have
In addition, the following inequality holds:
It is straight forward to obtain the following results: where
By using Schur complement to LMI conditions (11)–(13) in Theorem 2, the following inequality holds: Integrating both sides of the inequality yields where . From Definition 1, it can be seen that system (8) is very-strictly passive. The proof is finished.

In the following part of this section, the control gain matrices , , , and in (8) will be solved. Based on the LMI conditions in Theorem 2, the existence condition of controller (6) for the closed-loop system in (8) is given in the following theorem.

Theorem 3. Consider the closed-loop system (8), for given scalar , , , , and ; the closed-loop system in (8) is very-strictly passive, if there exist scalars , , matrices , , , , , , , , , and , , , with appropriate dimensions, such that the following LMIs hold for : where Thus, the dynamic output-feedback control gain matrices can be obtained as shown below: where and are nonsingular matrices satisfying

Proof. By the Schur complement, it can be seen that (26) is equivalent to where It is clear to see that which means By the output-feedback controller, the matrix is partitioned and inverted as It can be seen that (32) holds via . According to Schur complement formula, it implies that ; therefore is nonsingular. This shows that there exist nonlinear matrices and such that (32) is satisfied. Set Then, we obtain from (38) that
It follows that which shows that the matrices and in (39) are positive definite. It can be found that the matrix can be expressed as , and it is known that . The following equations can be obtained: Because of the nonsingular matrices and , the control gain matrices , , , and can be solved from (31). Then, by performing a congruent transformation to (36) by diag , the following inequality holds: where It can be seen from that which means Similarly Then, we know that where
For (47), through the congruence transformations by with the change of matrix variables defined by , , and , one has Similarly, It is shown that Therefore, all the conditions in Theorem 2 are satisfied. The proof is completed.

4. Numerical Example

In this section, a numerical example is given to show the effectiveness of the proposed results. We consider the follow fuzzy system.

Plant Rule  1. IF is , THEN

Plant Rule  2. IF is , THEN where

For , , and , it is found that , , and the system with output-feedback sampled-delay controller meets the passive performance. Then the dynamic output-feedback control gain matrices can be obtained as shown below:

5. Conclusions

In this paper, the problem of dynamic output-feedback control has been investigated for a class of nonlinear systems via T-S fuzzy control approach. By using Lyapunov stability theory, a sufficient condition for very-strict passive performance analysis for fuzzy systems with nonuniform uncertain sampling has been derived. Based on the condition, a novel fuzzy dynamic output-feedback controller has been designed such that the closed-loop system is very-strictly passive. The existence condition of the controller has been solved by convex optimization approach. Finally, a numerical example has been provided to demonstrate the effectiveness of the proposed method. In future work, the fault-tolerant control problems [40, 41] will be investigated for fuzzy systems via dynamic output-feedback control design method.

Conflict of Interests

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

Acknowledgments

This work was partially supported by the National Natural Science Foundation of China (61203002, 61304003, and 61304054), the Program for New Century Excellent Talents in University, the Program for Liaoning Innovative Research Team in University (LT2013023), and the Program for Liaoning Excellent Talents in University (LR2013053).