New Identification Method for Nonlinear Time-Varying System Based on Subsystem

被引：0

作者：

Chen T. ^{[1
]}

He H. ^{[1
]}

He C. ^{[2
]}

Chen G. ^{[1
]}

机构：

[1] State Key Laboratory of Mechanics and Control of Mechanical Structures, Nanjing University of Aeronautics and Astronautics, Nanjing

[2] Key Laboratory of Unmanned Aerial Vehicle Technology, Nanjing University of Aeronautics and Astronautics, Nanjing

来源：

Zhendong Ceshi Yu Zhenduan/Journal of Vibration, Measurement and Diagnosis | 2020年 / 40卷 / 05期

关键词：

Error reduction ratio (ERR) calculation; Nonlinear time-varying system; Orthogonal-triangular decomposition; Parameter identification; Subsystem;

D O I：

10.16450/j.cnki.issn.1004-6801.2020.05.006

中图分类号：

学科分类号：

摘要：

In this paper, a new identification method for nonlinear time-varying system based on subsystem is proposed. This new method can be used to locate and estimate the nonlinear characteristics of the multi-degree-of-freedom (MDOF) dynamic system without a priori knowledge regarding the system. A MDOF system can be partitioned into a number of different subsystems with a continuous-time model provided by the new method. All the information about the masses and linear or nonlinear connections in the subsystems can be determined with an orthogonality algorithm and an error reduction ratio (ERR) calculation. In this identification process, the time expressions of the time-varying parameters are also given. This new method is demonstrated by a 3 DOF lumped mass system and a mechanical arm structure. This new proposed identification method has a wide application prospect in practical engineering for its simplicity and efficiency. © 2020, Editorial Department of JVMD. All right reserved.

引用

页码：865 / 872

页数：7

共 13 条

[1] LIU K., Identification of linear time-varying systems, Journal of Sound & Vibration, 206, 4, pp. 487-505, (1997)
[2] ZOU Jingxiang, YU Kaiping, YANG Bingyuan, Methods of time-varying structural parameter identification, Advances in Mechanics, 30, 3, pp. 370-377, (2000)
[3] PANG Shiwei, YU Kaiping, ZOU Jingxiang, A projection approximation recursive subspace method for identification of modal parameters of time-varying structures, Engineering Mechanics, 5, pp. 125-129, (2005)
[4] NORDSJO A E, ZETTERBERG L H., A recursive prediction error algorithm for identification of certain time-varying nonlinear systems, 1999 IEEE International Conference on Acoustics, Speech and Signal Processing-Proceedings, pp. 1305-1308, (1999)
[5] NORDSJO A E, ZETTERBERG L H., Identification of certain time-varying nonlinear Wiener and Hammerstein systems, IEEE Transactions on Signal Processing, 49, 3, pp. 577-592, (2001)
[6] ZOU Gaofeng, WANG Zheng'ou, Identification of nonlinear time varying systems based on recurrent neural networks, Control and Decision, 17, 5, pp. 517-521, (2002)
[7] GREEN M, ZOUBIR A M., Selection of a time-varying quadratic Volterra model using a wavelet packet basis expansion, IEEE Transactions on Signal Processing, 52, 10, pp. 2721-2728, (2004)
[8] LUO Xiao, CHEN Yao, SUN Youxian, Time-varying nonlinear system identification based on wavelet packet, Applied Mathematics a Journal of Chinese Universities (Ser. A), 19, 1, pp. 51-56, (2004)
[9] YU K P, PANG S W, ZHAO J., Advances in method of time-varying linear/nonlinear structural system identification and parameter estimate, Chinese Science Bulletin, 54, 20, pp. 3147-3156, (2009)
[10] AHMED-ALI T, KENNE G, FRANCOISE L L., Identification of nonlinear systems with time-varying parameters using a sliding-neural network observer, Neurocomputing, 72, 7, pp. 1611-1620, (2009)

← 1 2 →