Abstract
Interval time-varying delay is common in control process, e.g., automatic robot control system, and its stability analysis is of great significance to ensure the reliable control of industrial processes. In order to improve the conservation of the existing robust stability analysis method, this paper considers a class of linear systems with norm-bounded uncertainty and interval time-varying delay as the research object. Less conservative robust stability criterion is put forward based on augmented Lyapunov-Krasovskii (L-K) functional method and reciprocally convex combination. Firstly, the delay interval is partitioned into multiple equidistant subintervals, and a new Lyapunov-Krasovskii functional comprising quadruple-integral term is introduced for each subinterval. Secondly, a novel delay-dependent stability criterion in terms of linear matrix inequalities (LMIs) is given by less conservative Wirtinger-based integral inequality approach. Three numerical comparative examples are given to verify the superiority of the proposed approach in reducing the conservation of conclusion. For the first example about closed-loop control systems with interval time-varying delays, the proposed robust stability criterion could get MADB (Maximum Allowable Delay Bound) about 0.3 more than the best results in the previous literature; and, for two other uncertain systems with interval time-varying delays, the MADB results obtained by the proposed method are better than those in the previous literature by about 0.045 and 0.054, respectively. All the example results obtained in this paper clearly show that our approach is better than other existing methods.
Highlights
Many dynamic model systems in the real world contain very significant time delays in the transmission of data and materials, in automatic robot control system, the acquisition and transmission of sensor signals, and the calculation of controller and the drive of brake may lead to time delay
HM, and μ, λ1,λ2 (λ1 > λ2), it is asymptotically stable for the nominal system (8), if there exist positive definite symmetric matrices Pi(i 1, 2, 3, 4, 5), Q1, Q2, Q3, U1, U2, Xj, and Rj(j 1, 2, 3, 4), such that the following linear matrix inequalities (LMIs) hold: Φ Φ i,j10×10 < 0, (35)
We study the robust stability of a class of uncertain systems with interval time-varying delays
Summary
Many dynamic model systems in the real world contain very significant time delays in the transmission of data and materials, in automatic robot control system, the acquisition and transmission of sensor signals, and the calculation of controller and the drive of brake may lead to time delay. E lower bound of its time delay is not necessarily zero, and the time delay is within a changing interval. It is common in practical application of engineering, especially in chemical reactors, internal combustion engines, and network control [1, 2]. Aiming to analyze the stability of time-delay system, the most common method is to construct an appropriate LK functional (Lyapunov–Krasovskii functional, LKF) in time domain and combine it with linear matrix inequalities (LMIs). Zhang et al and Shen et al [6, 7] obtain a conservative less stable stability criterion for linear systems with time-varying delays by constructing LKF with
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