Abstract

We investigate finite-time stability of a class of nonlinear large-scale systems with interval time-varying delays in interconnection. Time-delay functions are continuous but not necessarily differentiable. Based on Lyapunov stability theory and new integral bounding technique, finite-time stability of large-scale systems with interval time-varying delays in interconnection is derived. The finite-time stability criteria are delays-dependent and are given in terms of linear matrix inequalities which can be solved by various available algorithms. Numerical examples are given to illustrate effectiveness of the proposed method.

1. Introduction

It is well known that several real-world processes often depend on time-delay; namely, the present state depends on the past states. Consequently, time-delay systems have been investigated extensively in the past decades. Time-delay is often the main source of instability and poor performance of the systems (see [1–5]). Therefore, it is important to study time-delay systems, especially those with time-varying delays.

There are two types of stability of time-varying delays systems, namely, delay-dependent and delay-independent ones. The delay-dependent conditions are usually less conservative than delay-independent ones, especially when the time-delays are relatively small. One of the main purposes of delay-dependent stability criteria is to estimate the maximum possible allowable delay bounds.

For stability analysis of time-delay systems, a common approach used is by choosing an appropriate Lyapunov-Krasovskii functional and then properly estimating upper bounds of its derivative along trajectories of solutions of the system (see [1, 6]). In order to estimate such upper bounds of derivative of Lyapunov-Krasovskii functional, various mathematical tools have been used such as the Jensen inequality [3, 4, 7], lower bound lemma for reciprocal convexity [8–11], delay partitioning method [11], and free-weighting matrix variables method [6, 12, 13]. Recently, a new integral inequality which improves Jensen inequality, namely, Wirtinger-based integral inequality, has been proposed in [14]. In [15], a novel integral inequality has been proposed which has been shown to be less conservative than Jensen inequality. In [16, 17], some new bounding techniques have been developed and enhanced stability criteria for time-delay systems have been derived using these bounding techniques which are shown to be less conservative than some existing results which used Wirtinger-based or Jensen inequalities. In [18], by using Wirtinger-based integral inequality combined with the reciprocally convex approach, some less conservative stability criteria for time-delay systems are derived.

Large-scale interconnected systems have been the subject of considerable research (see [19–25]), which can be characterized by a large number of variables representing the systems, a strong interaction between subsystem variables, and a complex interaction between subsystems. The large-scale interconnected system can be found in many practical control problems such as transportation systems, electrical power systems, communication systems, and economic systems. The operation of large-scale interconnected systems requires the capability of monitoring and stabilizing in the face of uncertainties, disturbances, failures, and attacks through the utilization of internal system states. However, even with the assumption that all the state variables are available for feedback control, the task of effective controlling of a large-scale interconnected system using a global (centralized) state feedback controller is still not easy as there is a necessary requirement for information transfer between the subsystems [22].

Generally, studies of dynamical systems are involved with stability analysis which is defined over an infinite-time interval. Nevertheless, in many real-world applications, the main aim is concerned with the behavior of the system over a fixed finite-time interval, for instance, the problem of sending a rocket from the neighborhood of point to the neighborhood of point over a fixed time interval [26]. In this example, the concept of finite-time stability (FTS) is proposed. The problem of FTS has been revisited using linear matrix inequality (LMI) technique which allows us to find feasible condition guaranteeing FTS (see [26–29]). Some interesting results on stability and stabilization in the context of time-delay systems have been obtained by using the Lyapunov-Krasovskii functional technique (see [7, 11, 30]). Most existing work assumed that the time-delays are either constant or differentiable. In [20, 24], delay-dependent sufficient conditions for stability of large-scale system with time-varying delay were studied. However, the approach used there cannot be applied to systems with interval nondifferentiable time-varying delays. Moreover, to the best of our knowledge, there are few results for FTS of large-scale interconnected systems, especially systems with interval nondifferential time-varying delay.

Motivated by the above discussions, we shall derive new FTS criteria for large-scale systems with interval time-varying delays in interconnection. The main contributions of our studies are as follows. (i) The time-delay functions are only required to be continuous but not necessarily differentiable. (ii) By employing an improved integral inequality in [18], we derive new and less conservative FTS for large-scale interconnected systems with time-varying delays in terms of LMIs.

The rest of this paper is organized as follows. Section 2 presents notations, definitions, and auxiliary lemmas required for the proof of the main results. In Section 3, the FTS criteria for large-scale interconnected system with time-varying delays are obtained. Illustrative numerical examples are presented in Section 4. Section 5 gives the conclusion of the paper.

2. Problem Formulation and Preliminaries

Under the practical constraint of decentralized information coupled with the facts that the measurement of all the states and the real-time knowledge of the interval time-varying delays are not available, we consider the following nonlinear large-scale interconnected system:where , is the state vector, are initial conditions with the norm defined by and are time-delay functions which are continuous and satisfy for all and all . The state matrices and are of appropriate dimensions. The nonlinear perturbations are continuous, satisfying the following conditions.

There exist such thatFor , where and , we define the norm of as follows:The segment of the trajectory of denoted by is defined by with the norm defined by .

Definition 1 (see [29]). For given positive numbers and a symmetric positive definite matrix , the nonlinear large-scale system (1) is finite-time stable (FTS) with respect to if the following condition holds:

Proposition 2 (see [22] Schur complement lemma). Given matrices , where and , if and only if .

Proposition 3 (see [22] Jensen-type integral inequality). For any constant matrix and scalar such that the following integrals are well defined,

Proposition 4 (see [22] Cauchy matrix inequality). For any and positive definite matrix , we have

Lemma 5 (see [18]). For a given matrix , and any appropriate dimension matrix which satisfies . The following inequality holds for all continuously differentiable function where

3. Finite-Time Stability of Nonlinear Large-Scale Systems

In this section, we derive FTS criteria for large-scale interconnected system with time-varying delays. For the sake of simplicity, the following notations will be used:

For , and , we let The other matrices and which do not appear above would be defined to be zero matrices with appropriate dimensions.

Theorem 6. For given positive numbers and a symmetric positive definite matrix , if there exist symmetric positive definite matrices and matrices of appropriate dimensions such that the conditionshold, then system (1) is FTS with respect to .

Proof. We choose the following Lyapunov-Krasovskii functional:where We first show thatFromwe havewhere . Thus, (16) holds. Similarly, we obtain the following estimation:Taking the derivative of with respect to along the trajectory of solution of the system (1), we obtainFrom Proposition 4, we have It follows from (4) and Proposition 4 thatFrom (22), we haveFrom Proposition 3 and Newton-Leibniz formula, we obtainfor . It follows thatFrom Lemma 5, we haveThus, from (26), we obtain Hence, we obtain the estimation of as From (1) and Proposition 4, we getAdding inequality (29) into the left-hand side of (28) and from the fact thatwe have From assumption (12), it follows from Proposition 2 that , .
Therefore, we have Multiply both sides of (32) by ; we obtain Integrating both sides of (33) from to , we have Hence, from (16) and (19), it follows that From (13), we haveTherefore, system (1) is FTS with respect to .