STABILIZATION OF DISCRETE-TIME SYSTEMS WITH STATE-DELAYS AND SATURATING CONTROL INPUTS

IF 0.2 Q4 COMPUTER SCIENCE, HARDWARE & ARCHITECTURE

Radio Electronics Computer Science Control Pub Date : 2023-07-02 DOI:10.15588/1607-3274-2023-2-15

Y. Dorofieiev, L. M. Lyubchyk, O. S. Melnikov

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引用次数: 0

Abstract

Context. The presence of time delays occurs in many complex dynamical systems, particularly in the areas of modern communication and information technologies, such as the problem of stabilizing networked control systems and high-speed communication networks. In many cases, time-delays lead to a decrease in the efficiency of such systems and even to the loss of stability. In the last decade, many interesting solutions using the Lyapunov-Krasovskii functional have been proposed for stability analysis and synthesis of a stabilizing regulator for discrete-time dynamic systems with unknown but bounded state-delays. The presence of nonlinear constraints on the amplitude of controls such as saturation further complicates this problem and requires the development of new approaches and methods. Objective. The purpose of this study is to develop a procedure for calculating the control gain matrix of state feedback that ensures the asymptotic stability of the analyzed system, as well as a procedure for calculating the maximum permissible value of the state-delay under which the stability of the closed-loop system can be ensured for a given set of admissible initial conditions. Method. The paper uses the method of descriptor transformation of the model of a closed-loop system and extends the invariant ellipsoids method to systems with unknown but bounded state-delays. The application of the Lyapunov-Krasovskii functional and the technique of linear matrix inequalities made it possible to reduce the problem of calculating the control gain matrix to the problem of semi-definite programming, which can be solved numerically. An iterative algorithm for solving the bilinear matrix inequality is proposed for calculating the maximum permissible value of the time-delay. Results. The results of numerical modeling confirm the effectiveness of the proposed approach in the problems of stabilizing discrete-time systems under the conditions of state-delays and nonlinear constraints on controls, which allows to recommend the proposed method for practical use for the problem of stability analysis and synthesis of stabilizing regulator, as well as for calculating the maximum permissible value of time-delay. Conclusions. An approach is proposed that allows extending the invariant ellipsoids method to discrete-time dynamic systems with unknown but bounded state-delays for solving the problem of system stabilization using static state feedback based on the application of the Lyapunov-Krasovskii functional. The results of numerical modeling confirm the effectiveness of the proposed approach in the presence of the saturation type nonlinear constraints on the control signals.

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具有状态延迟和饱和控制输入的离散系统的镇定

上下文。时间延迟的存在发生在许多复杂的动力系统中，特别是在现代通信和信息技术领域，例如稳定网络化控制系统和高速通信网络的问题。在许多情况下，时滞会导致这类系统的效率下降，甚至失去稳定性。在过去的十年中，利用Lyapunov-Krasovskii泛函提出了许多有趣的解，用于具有未知但有界状态延迟的离散动态系统的稳定性分析和稳定调节器的合成。控制幅度的非线性约束(如饱和)的存在使这一问题进一步复杂化，需要开发新的方法和方法。目标。本研究的目的是建立一个保证被分析系统渐近稳定的状态反馈控制增益矩阵的计算过程，以及一个在给定一组可容许初始条件下保证闭环系统稳定的状态延迟的最大允许值的计算过程。方法。本文利用闭环系统模型的广义变换方法，将不变椭球体方法推广到状态时滞未知但有界的系统。利用Lyapunov-Krasovskii泛函和线性矩阵不等式技术，可以将控制增益矩阵的计算问题简化为可数值求解的半定规划问题。提出了一种求解双线性矩阵不等式的迭代算法来计算最大容许时延。结果。数值模拟的结果证实了所提方法在状态延迟和非线性控制约束条件下稳定离散系统问题中的有效性，这使得所提方法可以实际应用于稳定调节器的稳定性分析和综合问题，以及计算最大允许时滞值。结论。基于Lyapunov-Krasovskii泛函的应用，提出了一种将不变椭球体方法推广到具有未知但有界的状态延迟的离散动态系统的静态反馈镇定问题。数值模拟结果证实了该方法在控制信号存在饱和型非线性约束时的有效性。

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来源期刊

Radio Electronics Computer Science Control COMPUTER SCIENCE, HARDWARE & ARCHITECTURE-

自引率

20.00%

发文量

审稿时长

12 weeks