Synthesis of Adaptive Observer of State Variables for a Linear Stationary Object in the Presence of Measurement Noise

Q4 Engineering
A. Bobtsov, V. S. Vorobyev, N. Nikolaev, A. Pyrkin, R. Ortega
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引用次数: 1

Abstract

The paper is devoted to the problem of state variables observers synthesis for linear stationary system operating under condition of noise or disturbances in the measurement channel. The paper considers a completely observable linear stationary system with known parameters. It is assumed that the state variables are not measured, and the measured output variable contains a small amplitude (in general, modulo less than one) additive noise or disturbance. It is also assumed that there is no a priori information about the disturbance or noise in the measurement channel (for example, frequency spectrum, covariance, etc.). It is well known that many observer synthesis methods have been obtained for this type of systems, including the Kalman filter, which has proven itself in practice. Under the condition of complete observability and the presence of some a priori information about a random process (which is typical for the case when a disturbance in the measurement channel can be represented as white noise), approaches based on Kalman filtering demonstrate the highest quality estimates of state variables convergence to true values. Without disputing the numerous results obtained using the application of the Kalman filter, an alternative idea of the state variables observer constructing is considered in this paper. The alternative of the new approach is primarily due to the fact that there is no need to use the usual approaches based on the Luenberger observer. The paper proposes an approach based on the estimation of unknown parameters (in this case, an unknown vector of initial conditions of the plant state variables) of a linear regression model. Within the framework of the proposed method, after a simple transformation, a transition is made from a dynamic system to a linear regression model with unknown constant parameters containing noise or disturbing effects. After that, a new nonlinear parametrization of the original regression model and an algorithm for identifying unknown constant parameters using the procedure of dynamic expansion of the regressor and mixing are proposed which ensure reduction the influence of noise. The article presents the results of computer simulations verifying the stated theoretical results.
存在测量噪声的线性静止目标状态变量自适应观测器的合成
研究了测量信道中存在噪声或干扰的线性平稳系统状态变量观测器的合成问题。研究一类参数已知的完全可观测线性平稳系统。假设状态变量没有被测量,并且被测量的输出变量包含一个小幅度(通常,模小于1)的加性噪声或干扰。同时假定测量通道中没有关于干扰或噪声的先验信息(如频谱、协方差等)。众所周知,针对这类系统已经获得了许多观测器综合方法,其中包括卡尔曼滤波,并在实践中得到了证明。在完全可观察性和随机过程存在一些先验信息的情况下(这是测量通道中的干扰可以表示为白噪声的典型情况),基于卡尔曼滤波的方法证明了状态变量收敛到真值的最高质量估计。在不质疑应用卡尔曼滤波器得到的众多结果的基础上,本文考虑了构造状态变量观测器的另一种思想。新方法的替代方案主要是由于不需要使用基于Luenberger观察者的通常方法。本文提出了一种基于线性回归模型的未知参数估计的方法(在这种情况下,是植物状态变量初始条件的未知向量)。在提出的方法框架内,经过简单的转换,从一个动态系统过渡到一个包含噪声或干扰效应的未知常数参数的线性回归模型。在此基础上,提出了一种新的非线性参数化回归模型和一种利用回归量的动态展开和混合过程识别未知常数参数的算法,以保证降低噪声的影响。本文给出了计算机仿真结果,验证了所述理论结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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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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