Abstract

In this paper, finite-time stabilization problem for a class of nonlinear differential-algebraic systems (NDASs) subject to external disturbance is investigated via a composite control manner. A composite finite-time controller (CFTC) is proposed with a three-stage design procedure. Firstly, based on the adding a power integrator technique, a finite-time control (FTC) law is explicitly designed for the nominal NDAS by only using differential variables. Then, by using homogeneous system theory, a continuous finite-time disturbance observer (CFTDO) is constructed to estimate the disturbance generated by an exogenous system. Finally, a composite controller which consists of a feedforward compensation part based on CFTDO and the obtained FTC law is proposed. Rigorous analysis demonstrates that not only the proposed composite controller can stabilize the NDAS in finite time, but also the proposed control scheme exhibits nominal performance recovery property. Simulation examples are provided to illustrate the effectiveness of the proposed control approach.

1. Introduction

Differential-algebraic systems (DASs) [1–3] known as singular systems [4–7], descriptor systems [8–10], or implicit systems [11] represent an important class of systems. Because DASs provide a more general representation than normal systems in the sense of modelling, many practical systems, such as power systems, robot systems, and economic systems, are beyond the description of normal systems but can be described by DASs [4]. Hence, the analysis and control design problems of DASs have attracted a lot of attention from the engineering and academic fields in the past several decades. However, most existing work focus on linear DASs; see [4–6, 11–14] and the references therein.

Nonlinear DASs (NDASs) characterize a class of rather complex systems, which not only have nonlinearities but also have singular nature of algebraic constraints. Therefore, compared to linear DASs, the investigation of NDASs is more difficult. As far as the control problem for NDASs is concerned, only a few results are available in the literature. Under the assumption that nonlinear differential-algebraic equations can be described by a nonlinear control system on a smooth manifold, the feedback stabilization problem of NDASs was addressed in [15]. For a class of affine nonlinear singular systems, the feedback control problem and exact linearization approach were considered in [7]. By using the feedback linearization approach, the feedback stabilization problem for a class of NDASs was solved in [7]. By linear matrix inequality technique, the work [16] considered the stability and the damping control design problems for a class of NDASs. Based on backstepping technique [17], a robust controller design method was proposed for a class of NDASs. It is known to all that disturbances widely exist in practical control systems and bring negative effects to the control performance of these systems. Disturbance attenuation is of great importance in the control system design [11, 18–23]. In [10], control problem for a class of nonlinear descriptor systems was studied, and the necessary and sufficient condition was derived for the solvability of the problem. By using Hamiltonian function method, the stabilization and control problems for a class of NDASs were addressed in [24]. For a general class of nonlinear singular systems subjected to external disturbance, the work [25] removed the normalizability assumption and proposed a complete solution of output regulation problems. By using internal model approach, robust output regulation problem for a class of nonlinear singular systems subjected to disturbance was investigated in [26]. In order to enhance the disturbance rejection ability of NDASs, a composite hierarchical antidisturbance control method was proposed for a class of nonlinear singular systems with multiple disturbances in [27]. It should be pointed out that almost all the existing results about the control problem of NDASs mentioned above only concern the asymptotic stability which means convergence with an infinite settling time.

Under a finite-time controller, the closed-loop usually demonstrates not only faster convergence rate but also higher accuracy as well as better disturbance rejection properties [28–31]. In view of these advantages, at present, more and more interest has been focused on the system control and design problems by using FTC technique [32–38]. However, most of the finite-time stabilization results available in the literature are only applicable to normal control systems. Due to the inherent characteristics of NDASs, the finite-time stabilization problems of NDASs are more challenging. Recently, an energy based approach was proposed to study the finite-time stabilization and finite-time control problems of a class of nonlinear Hamiltonian descriptor systems in [9]. For a NDAS subjected to nonvanishing disturbance, the issue of how to design a controller such that the corresponding closed-loop system is finite-time stable has not been addressed.

In this paper, we will consider the finite-time stabilization problem for a class of NDASs subject to external disturbance. To deal with this problem, motivated by the recently developed disturbance observer based control technique [18, 22, 23, 39, 40], a composite control approach is obtained by using the adding a power integrator technique [41] and homogeneous system theory [42]. It is shown that under the proposed composite controller the corresponding closed-loop system is finite time stable even in the presence of the nonvanishing external disturbance. The block diagram of the proposed composite control scheme is described by Figure 1. The general design procedure of the composite controller is given according to the following steps. Firstly, when there is no disturbance in NDAS, under some mild conditions, a nominal FTC law is designed recursively by using the adding a power integrator technique. Due to the domination nature of the adopted method, the algebraic variables are not needed to be solved from the algebraic constraints explicitly, and only differential variables are involved in the proposed nominal FTC law. Secondly, to estimate the disturbance, a continuous finite-time disturbance observer (CFTDO) is constructed based on homogeneous systems theory. It is shown that under the proposed CFTDO the disturbance can be estimated precisely in finite time. Finally, based on the proposed nominal FTC law and the estimation of the disturbance, a CFTC is constructed. Rigorous theoretical analysis shows that the proposed CFTC will render the closed-loop system finite-time stable even in the presence of nonvanishing disturbance. With the proposed composite control approach, the disturbance rejection ability of the system is significantly improved without sacrificing the nominal performance recovery property.

Figure 1 

The block diagram of the proposed composite control scheme.

The remainder of the paper is organized as follows. In the next section, the problem description is given. Section 3 presents the main result of this paper including the design of nominal FTC law, CFTO, and the CFTC for the NDAS. In Section 4, the effectiveness of the proposed control algorithm is testified by employing a simulation example. Some concluding remarks are included in Section 5. Appendices A and B collect the preliminaries and the proofs of several key propositions, respectively.

2. Problem Description

Consider the following NDASs:where is a vector of differential variables, is a vector of algebraic variables, is the control input, is the external disturbance, respectively; and , , , are continuous nonlinear functions, and nonlinear functions . Assume that the origin is an isolated equilibrium point: that is, , .

For NDASs (1a) and (1b), it is supposed that the disturbance is generated by the following exogenous system:where , the matrices , , and , and and are known constants while the constant is not assumed to be known, which means that may be a type of nonvanishing disturbance.

Remark 1. In many cases, the disturbance is considered to be generated by a continuous ecosystem [18, 19, 25–27]. It can be verified that, with different parameters , , and , (2) can be used to describe a wide class of disturbances, such as constant disturbance [22], ramp disturbance [20], harmonic disturbance [18], and polynomial disturbance [21]. It is well known that the existence of disturbance will bring bad effects to practical engineering system. Therefore, it is no doubt that if the disturbances can be estimated precisely in finite time, then use its estimation to compensate it by using proper feedback control. The obtained composite feedback control will enhance the disturbance rejection ability as well as increase control precision of the considered control system.

The control objective is to design a composite controller for NDASs (1a) and (1b) such that the closed-loop system is finite-time stable even in the presence of disturbance.

To solve the finite-time stabilization problem of NDASs (1a) and (1b), the following two assumptions are needed.

Assumption 2. There are two constants and such that withwhere is a known function.

Remark 3. In the literature, most of the results for NDASs are obtained based on the assumption that the nonlinear functions need to meet smooth conditions [2, 3, 7–10, 15–17, 22, 25, 26] or Lipschitz conditions [27, 43]. However, it is observed that, from Assumption 2, the nonlinear terms in system (1a) may violate these two conditions, which means that (1a) and (1b) may be a non-Lipschitz continuous system [44, 45]. Obviously, system (1a) and (1b) under Assumption 2 can be used to describe a more general class of NDASs.

Assumption 4. There exist a positive constant and a function such that

For the simplicity, we assume that and with and being even integers and and being odd integers. Under this assumption, and will always be odd in both denominator and numerator.

Remark 5. For Assumption 4, the following two points need to be explained.
(i) The condition in Assumption 4 allows us to infer the NDAS behavior to some extent from results on normal systems [2]. In fact, if we define , and , then it follows from Assumption 4 that the Jacobian of with respect to has full rank on ; that is, NDASs (1a) and (1b) are index one, which can guarantee that the NDASs (1a) and (1b) are impulse free and have at least one solution for any consistent initial conditions satisfying .
(ii) Based on Assumption 4, we haveIt follows from (6) that . According to (5), it can be shown thatThis implies that the following inequality holds:with . This means that the algebraic variable could be bounded by homogeneous-like polynomial.
With the help of Assumption 4, we are able to handle a wide class of NDASs. It is obvious that when NDASs (1a) and (1b) are of index one, by implicit function theorem, there exists a function so that . However, there are many NDASs whose algebraic constraints could represent severe nonlinearities. In this condition, the algebraic variables might not be solved explicitly from the nonlinear algebraic constraints, but they could be bounded by homogeneous-like polynomials. For example, consider the following NDAS without disturbance:It can be easily proved that . But it is difficult to solve explicitly from the nonlinear algebraic constrains . In fact, according to the nonlinear algebraic , we haveIt is can be easily deduced from (10) that with , which is in the form of (5).

3. Composite Controller Design and Stability Analysis

In this section, we will focus on solving the finite-time stabilization problem of NDASs (1a) and (1b) with the disturbance generated by the exogenous system (2). The detailed design and analysis procedure is divided into three parts, and we will present it step by step.

3.1. Part I: Nominal FTC Law Design for NDASs (1a) and (1b)

In this part, we will propose the nominal FTC law design method for NDASs (1a) and (1b) without considering external disturbance. Based on this nominal FTC law, in what follows, a composite controller will be constructed to enhance the disturbance rejection ability and the accuracy of the closed-loop system.

Theorem 6. Consider NDASs (1a) and (1b) without external disturbance; if Assumptions 2 and 4 hold, then there exists a FTC law rendering system (1a) and (1b) finite-time stable.

Proof. The proof of this theorem will be carried out in an inductive argument manner which will enable us to construct a Lyapunov function and a virtual control law at each step.
Initial Step. For system (1a) and (1b), choose Lyapunov function . The time derivative of along the trajectory of (1a) and (1b) isBy Assumption 4, we have . It follows from Assumption 2 that with .
Hence, Clearly, the virtual control law defined by , where is a smooth, nonnegative function, leads toInductive Step. Suppose at step that there exist a Lyapunov function , which is positive definite and homogeneous with respect to the dilation , and a set of virtual control laws , defined bywith smooth functions , such thatWe claim that (16) still holds at step . To prove this claim, we consider the Lyapunov functionwith . By using a similar method in [45], it can be proved that the Lyapunov function (17) is a positive definite function.
Taking the derivative of the Lyapunov function along system (1a) and (1b) yieldswith a virtual control law to be determined later.
To proceed further, we need to estimate each term of the right hand side of (18). For the second term in (18), based on the fact and Lemmas A.6 and A.7, it can be shown that there exists a constant such thatTo estimate the third term and the fourth term of the right hand side of inequality (18), the following propositions are introduced, the proofs of which are included in Appendix B.
Proposition 7. There exists a function such that Proposition 8. There exists a smooth function such thatSubstituting the estimates (19), (B.3), and (21) into (18) yieldsClearly, if the virtual control law is chosen asthen we haveThis completes the inductive proof.
By the inductive argument, it is obvious that (16) still holds as . That is, at the last step, we are able to design a Lyapunov function , and a virtual control law such thatBy Definition A.3 and Lemma A.4, it can be shown that the homogeneous degree of and are and with respect to the delation , respectively. By using Lemma A.4 again, there exists a positive constant such that .
Obviously, if we choosethen by using Lemma A.6, we haveNote that ; thus, . By Lemma A.2, the states of subsystem (1a) will converge to the origin in finite time; that is, there exists a time constant such that .
Based on this and Assumption 4, let ; it follows from that as . And then based on the fact , , as , and , we have as . Proceeding in the same line, it can be shown that step by step.
Therefore, it can be concluded that the closed-loop system (1a) and (1b) and (26) are finite-time stable.

Remark 9. It is generally known that the selection of Lyapunov function plays a central role in the control design procedure. For NDAS in an alternative expressionwhere , is smooth enough and , and is a singular matrix with . According to [10, 44], if NDAS (28) is index one, then there exist two nonsingular matrices such that . That is, if we let , and , then system (28) is equivalent to the system described by , with and . However, due to the inherent mixed differential-algebraic structure for DASs, the selection of Lyapunov function and the calculation of the derivative of the Lyapunov function along the trajectory of the systems are more difficult than those of the normal systems [22]. It is obvious that the finite-time stabilization problem of NDAS (1a) and (1b) is not a trivial issue. To study the finite-time stabilization problem of system (1a) and (1b) without disturbance, our motivation is twofold.
(i) From the energy perspective, the algebraic constraints can be naturally regarded as the generalized internal energy balance, so the algebraic constraints do not affect energy balance between the system and external world [24]. And in [10], it was pointed out that for the index one descriptor system (28) only the part where contributes to the energy function.
(ii) To stabilize a linear singular system, it is sufficient to finish this task by applying slow feedback [4].
Based on these two points and the merits of the adding a power integrator technique, we have proved that it is feasible to design Lyapunov function and FTC control law for NDAS (1a) and (1b) by only using the differential variables.