利用广义工作函数设计频域优化控制系统

Q4 Engineering
V. I. Lovchakov
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引用次数: 0

摘要

本文根据广义工作函数(FGW)A. A. Krasovsky,研究了一维线性静止对象最优控制器(ADOC)的分析设计问题。与二次性能函数相比,FGW 的使用大大简化了最优控制器的计算--其系数矩阵的计算主要包括求解线性矩阵 Lyapunov 方程,与非线性矩阵 Riccati 方程相比,从根本上减少了计算量。此外,使用 FGW 还能为所设计的系统提供最佳的振幅和相位稳定裕度。这项工作致力于开发一种解决 ADOC 问题的方法 A. A. Krasovsky 在其著作《A.A. Krasovsky 在频率(复数)域中的 ADOC 问题的求解方法,该方法将确定 n 阶对象的最优控制器的传递函数系数简化为解相应的 n 个线性代数方程组。在这方面,克拉索夫斯基(A. A. Krasovsky)提出的 ADOC 问题求解方法与标准方法相比,计算量要小得多,标准方法是用所需的 n * n 矩阵求解 Lyapunov 方程。所提出的最优控制系统合成方法具有分析性质,是解决反问题 ADOC A. A. Krasovsky 的基础,该问题包括确定 FGW 权重系数的值,该值提供了合成控制系统的给定主要质量指标。利用其关系,已开发出一种相对简单的方法,可根据所设计动态系统的给定误差系数值计算 FGW 系数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Design of Optimal Control Systems in the Frequency Domain by the Functional of the Generalized Work
   The paper considers the problem of analytical design of optimal controllers (ADOC) for one-dimensional linear stationary objects according to the functional of generalized work (FGW) A. A. Krasovsky. The use of FGW in comparison with the quadratic performance functional greatly simplifies the calculation of the optimal controller — the calculation of its matrix of coefficients mainly consists in solving the linear matrix Lyapunov equation, which, in contrast to the nonlinear matrix Riccati equation, fundamentally reduces the amount of calculations. In addition, the use of FGW provides the best stability margins of the designed system in terms of amplitude and phase. This work is devoted to the development of a method for solving the ADOC problem A. A. Krasovsky in the frequency (complex) domain, which reduces the determination of the transfer function coefficients of the optimal controller for an object of order n to the solution of the corresponding system of n linear algebraic equations. In this regard, the proposed method for solving the ADOC problem by A. A. Krasovsky differs by a much smaller amount of calculations in comparison with the standard method, in which the Lyapunov equation is solved with the desired matrix of dimensions n * n. The proposed method for the synthesis of optimal control systems, which has an analytical nature, became the basis for solving the inverse problem ADOC A. A. Krasovsky, which consists in determining the values of the weight coefficients of the FGW, which provide the given primary quality indicators of the synthesized control system. Using its relations, a relatively simple method for calculating the FGW coefficients based on the given values of the error coefficients for the designed dynamic system has been developed.
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来源期刊
Mekhatronika, Avtomatizatsiya, Upravlenie
Mekhatronika, Avtomatizatsiya, Upravlenie Engineering-Electrical and Electronic Engineering
CiteScore
0.90
自引率
0.00%
发文量
68
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