Exact linearization based multiple-subspace iterative resolution to affine nonlinear control system

被引:0
|
作者
Xu Zi-xiang [1 ]
Zhou De-yun
Deng Zi-chen
机构
[1] Northwestern Polytech Univ, Sch Elect & Informat, Xian 710072, Peoples R China
[2] Northwestern Polytech Univ, Dept Mech Engn, Xian 710072, Peoples R China
来源
APPLIED MATHEMATICS AND MECHANICS-ENGLISH EDITION | 2006年 / 27卷 / 12期
关键词
affine nonlinear system; precise linearization; multiple-substructure; optimal control;
D O I
10.1007/s10483-006-1209-z
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
To the optimal control problem of affine nonlinear system, based on differential geometry theory, feedback precise linearization was used. Then starting from the simulative relationship between computational structural mechanics and optimal control, multiple-substructure method was inducted to solve the optimal control problem which was linearized. And finally the solution to the original nonlinear system was found. Compared with the classical linearizational method of Taylor expansion, this one diminishes the abuse of error expansion with the enlargement of used region.
引用
收藏
页码:1665 / 1671
页数:7
相关论文
共 50 条
  • [21] A condition for dynamic feedback linearization of control-affine nonlinear systems
    Guay, M
    McLellan, PJ
    Bacon, DW
    INTERNATIONAL JOURNAL OF CONTROL, 1997, 68 (01) : 87 - 106
  • [22] Nonlinear control of one-machine power system by exact linearization using optimal parameters
    Kawomoto, S
    Fujii, M
    IEEE/PES TRANSMISSION AND DISTRIBUTION CONFERENCE AND EXHIBITION 2002: ASIA PACIFIC, VOLS 1-3, CONFERENCE PROCEEDINGS: NEW WAVE OF T&D TECHNOLOGY FROM ASIA PACIFIC, 2002, : 201 - 205
  • [23] Batch process monitoring based on just-in-time learning and multiple-subspace principal component analysis
    Lv, Zhaomin
    Yan, Xuefeng
    Jiang, Qingchao
    CHEMOMETRICS AND INTELLIGENT LABORATORY SYSTEMS, 2014, 137 : 128 - 139
  • [24] Iterative Learning Control Design Based on Feedback Linearization and Nonlinear Repetitive Process Stability Theory
    Pakshin, Pavel
    Emelianova, Julia
    Emelianov, Mikhail
    Galkowski, Krzysztof
    Rogers, Eric
    2016 IEEE 55TH CONFERENCE ON DECISION AND CONTROL (CDC), 2016, : 5478 - 5483
  • [25] Iterative Learning Control for Discrete-Time Affine Nonlinear System with Iteration Varying Lengths
    Zhang, Wei
    Shen, Dong
    2015 34TH CHINESE CONTROL CONFERENCE (CCC), 2015, : 3062 - 3067
  • [26] Control Design of Nonlinear Spacecraft System Based on Feedback Linearization Approach
    Chen, Chung-Cheng
    Chen, Yen-Ting
    IEEE ACCESS, 2020, 8 : 116626 - 116641
  • [27] Nonlinear module control of maglev levitation system based on Feedback linearization
    Li, Jinhui
    Li, Jie
    MECHANICAL ENGINEERING, MATERIALS SCIENCE AND CIVIL ENGINEERING, 2013, 274 : 550 - 554
  • [28] Optimal Dynamic Control for CSTR Nonlinear System based on Feedback Linearization
    Gao, De-Xin
    Liu, Huan
    2015 27TH CHINESE CONTROL AND DECISION CONFERENCE (CCDC), 2015, : 1298 - 1302
  • [29] NONLINEAR CONTROL OF A BIOREACTOR MODEL USING EXACT AND I/O LINEARIZATION
    PROLL, T
    KARIM, NM
    INTERNATIONAL JOURNAL OF CONTROL, 1994, 60 (04) : 499 - 519
  • [30] An iterative Legendre pseudospectral method for suboptimal control of nonlinear control affine systems
    Shirazian, Mohammad
    MATHEMATICAL COMMUNICATIONS, 2023, 28 (01) : 153 - 169
12345