Abstract

This paper proposes a stable adaptive fuzzy control scheme for a class of nonlinear systems with multiple inputs. The multiple inputs T-S fuzzy bilinear model is established to represent the unknown complex systems. A parallel distributed compensation (PDC) method is utilized to design the fuzzy controller without considering the error due to fuzzy modelling and the sufficient conditions of the closed-loop system stability with respect to decay rate are derived by linear matrix inequalities (LMIs). Then the errors caused by fuzzy modelling are considered and the method of adaptive control is used to reduce the effect of the modelling errors, and dynamic performance of the closed-loop system is improved. By Lyapunov stability criterion, the resulting closed-loop system is proved to be asymptotically stable. The main contribution is to deal with the differences between the T-S fuzzy bilinear model and the real system; a global asymptotically stable adaptive control scheme is presented for real complex systems. Finally, illustrative examples are provided to demonstrate the effectiveness of the results proposed in this paper.

1. Introduction

Takagi-Sugeno (T-S) model-based fuzzy control is an effective and flexible tool for control of nonlinear systems. It has attracted wide attention [1–6]. The robust fuzzy control and adaptive fuzzy control approaches based on T-S fuzzy linear model with parameters uncertainties have been extensively studied in [2, 7–9] and the references therein. The adaptive fuzzy control based on T-S fuzzy model is divided into adaptive control based on static T-S fuzzy model (or fuzzy logic systems) and adaptive control based on dynamic T-S fuzzy model. Up to now, many results for the adaptive control based on fuzzy logic system have appeared. Compared with the adaptive control based on fuzzy logic system, the development of the adaptive control based on dynamic T-S fuzzy model is relatively slow; until recent years, the latter has become a focus issue in the control community. Novel research results have emerged in [10–19]. A novel direct T-S fuzzy neural online modelling and control method for a class of nonlinear systems with parametric uncertainties has been proposed, which utilized T-S fuzzy neural model to approximate the virtual linear system and designed the online identification algorithm and robust adaptive tracking controller in [10, 11], respectively. Then the stability of the resulting closed-loop systems was proved by Lyapunov stability criterion. In [13], the adaptive output tracking control problem of parameter strict-feedback system was discussed and the concept of virtual variable also was proposed based on LMI. In [14], the problem of simultaneously estimating the state and unknown inputs was considered in T-S fuzzy systems; sufficient conditions were given for the stability of the observer. The computation of the observer gains was based on solving a series of LMIs. In [17], a T-S fuzzy model is proposed to represent the nonlinear model of microelectromechanical systems gyroscope; a robust adaptive sliding mode control with online identification for the upper bounds of external disturbances and an adaptive estimator for the model uncertainty parameters are proposed in the Lyapunov framework. In [18], a new normal form of a global noncanonical form T-S fuzzy model was derived, and a new solution framework was developed for adaptive control of general discrete-time state-space T-S fuzzy systems with a relative degree. In [19], a novel design scheme of stable adaptive fuzzy control for a class of nonlinear systems was proposed. The parallel distributed compensation (PDC) method was utilized to design the fuzzy controller without the fuzzy modelling error. The sufficient conditions with respect to decay rate were derived by linear matrix inequalities (LMIs) and by small-gain theorem. The adaptive compensation term was adopted to reduce the effect of the modelling. However, the consequence parts of the above T-S fuzzy models [10–19] were linear dynamic model or approximate linear dynamic model, so these methods have inevitable defects for some nonlinear systems.

It is known that bilinear models can describe many physical systems and dynamical processes in engineering fields [20, 21]. There are two main advantages of the bilinear system. One is that it provides a better approximation to a nonlinear system than a linear one, and another is that many real physical processes may be appropriately modelled as bilinear systems when the linear models are inadequate. Considering the advantages of bilinear systems and T-S fuzzy control, the fuzzy control based on the T-S fuzzy model with bilinear rule consequence attracted the interest of researchers [22–26]. The T-S fuzzy bilinear model may be suitable for some classes of nonlinear plants. The robust stabilization for continuous-time fuzzy system with local bilinear model was studied in [22], and then the result was extended to the fuzzy system with time-delay only in the state [23]. The problem of robust stabilization for discrete-time fuzzy system with local bilinear model was investigated in [24]. Reference [25] focuses on the problem of nonfragile guaranteed cost control for a class of T-S discrete-time fuzzy bilinear systems. Based on the parallel distributed compensation approach, the sufficient conditions were derived such that the closed-loop system was asymptotically stable and the cost function value was no more than a certain upper bound in the presence of the additive controller gain perturbations. In [26], an observer-based fuzzy control design was given for discrete-time T-S fuzzy bilinear systems. In [27, 28], authors proposed robust stability conditions for stochastic fuzzy impulsive recurrent neural networks with time-varying delays and uncertain stochastic fuzzy recurrent neural networks with mixed time-varying delays.

However, when there are differences between T-S fuzzy bilinear model and reality systems, these results will not be applied.

Considering the differences of the fuzzy model and the reality systems, in the paper, a stable adaptive fuzzy control for complex nonlinear systems is presented based on multiple inputs T-S fuzzy bilinear system with parameters uncertainties. In consideration of the modelling error, an adaptive fuzzy control is proposed to compensate for the issues. At first, the concept of the so-called PDC and LMI approach is employed to design the state feedback controller without considering the error caused by fuzzy modelling. The sufficient conditions with respect to decay rate are derived in the sense of Lyapunov asymptotic stability. Then the error caused by fuzzy modelling is considered; an adaptive compensation term is designed to reduce the effect of the modelling error. The contributions of this paper are as follows: (i) the differences between T-S fuzzy bilinear model and the real system are considered in the modelling and analysis; (ii) a global asymptotical stable adaptive control scheme is presented for real systems; (iii) a sufficient condition of the closed-loop systems is given. Finally theoretical analysis verifies that the state converges to zero and all signals of the closed-loop systems are bounded.

2. Problem Statement and Basic Assumptions

Consider the nonlinear system in the following form: where and are the vectors of state and control input, respectively. is the unknown continuous function; is the vector of unknown continuous control gain function which satisfies , .

Definition 1 (see [19]). System (1) under the input being zero is globally asymptotically stable with decay rate , if there exists a scalar , such that where is the Lyapunov function candidate and .

Lemma 2 (see [25]). Given two matrices and with appropriate dimensions, one has .

In this paper, our objective is to design an adaptive fuzzy controller so that the closed-loop systems are asymptotically stable; that is, the states of the closed-loop system converge to zero and all signals of the closed-loop systems are bounded.

System (1) can be expressed in terms of the T-S fuzzy model as follows: where are known premise variables that may be functions of the state variables, is the fuzzy set, is the number of the rules, , , is constant matrices, and denotes the model error of the th bilinear model in the th fuzzy space (also called the th fuzzy rule).

The modelling error terms are defined as follows: ,  , and are constant matrices which have of the following forms:

By using the fuzzy inference method with a singleton fuzzification, product inference, and centre average defuzzification, the overall fuzzy model is of the following form: where

We assume , , for all . Therefore, we have

By comparison with (1) and (6), it is easy to see that where ,   , and  .

Remark 3. From now on, unless confusion arises, arguments such as in will be omitted just for notational convenience.

3. Control Design and Stability Analysis

System (6) can be represented by following the T-S fuzzy model without considering the modelling error; that is, ,  . Consider

By using the fuzzy inference method with a singleton fuzzification, product inference, and centre average defuzzification, the overall fuzzy model is of the following form:

Based on the idea of PDC, the th state-feedback controller is designed as follows: where is a vector to be determined and is a scalar to be assigned.

The overall fuzzy control law can be represented by where

Substituting (13) into (11), one can get the closed-loop system where denotes the th column of the .

Theorem 4. Given positive scalars (), if there exist a symmetric positive definite matrix and some constant matrices , such that LMIs (16) and (17) hold, where ,  , Then, the FBS (15) is globally asymptotically stable with decay rate via the fuzzy feedback controller (13), and the gains can be determined by .

Proof. Consider the Lyapunov function candidate as follows: where .
Applying Schur complement lemma, inequality (16) can be written as follows: Premultiplying and postmultiplying (20) by , respectively, we have Applying a similar procedure to inequality (17), we can obtain The time derivative of is By substituting (15) into (23), we can get where First, by premultiplying and postmultiplying by , we can obtain According to Lemma 2, we can get the following: From (26) and (27), we can obtain
Applying similar procedures (26)–(28) to , we can obtain Substituting (28) and (29) into (24), we obtain By substituting (21) and (22) into (30), we can obtain
Then, by Definition 1, the closed-loop fuzzy system (15) is globally asymptotically stable with decay rate . This completes the proof of Theorem 4.

Next, the modelling error in (6) is considered and an adaptive compensation term is adopted to reduce the effects of the modelling error.

Adopt the fuzzy controller in the following form: where compensator will be designed later.

Substituting (32) into (6) yields Suppose that there exists an unknown constant such that Then, from and we have It is easy to see that we can choose a function vector such that and .