On the stability of constrained mechanical systems

被引:0
|
作者
Di Franco, Pierluigi [1 ]
Scarciotti, Giordano [1 ]
Astolfi, Alessandro [1 ,2 ]
机构
[1] Imperial Coll London, Dept Elect & Elect Engn, London SW7 2AZ, England
[2] Univ Roma Tor Vergata, DICII, Via Politecn 1, I-00133 Rome, Italy
来源
2017 IEEE 56TH ANNUAL CONFERENCE ON DECISION AND CONTROL (CDC) | 2017年
关键词
DIFFERENTIAL-ALGEBRAIC EQUATIONS; FEEDBACK STABILIZATION; REGULARIZATION; MANIPULATORS;
D O I
暂无
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
The problem of the stability analysis for constrained mechanical systems is addressed using tools from classical geometric control theory, such as the notion of zero dynamics. For the special case of linear constrained mechanical systems we show that stability is equivalent to a detectability property. The proposed techniques are illustrated by means of simple examples.
引用
收藏
页数:5
相关论文
共 50 条
  • [1] REDUCTION OF CONSTRAINED MECHANICAL SYSTEMS AND STABILITY OF RELATIVE EQUILIBRIA
    MARLE, CM
    COMMUNICATIONS IN MATHEMATICAL PHYSICS, 1995, 174 (02) : 295 - 318
  • [2] A stability analysis and control of a constrained mechanical system
    Jammazi, C.
    Abichou, A.
    2001, AMSE Press (38): : 3 - 4
  • [3] STABILITY ANALYSIS OF THE EQUILIBRIUM OF A CONSTRAINED MECHANICAL SYSTEM
    WANG, DW
    MCCLAMROCH, NH
    INTERNATIONAL JOURNAL OF CONTROL, 1994, 60 (05) : 733 - 746
  • [4] An Improved Formulation for Constrained Mechanical Systems
    Arabyan, Ara
    Wu, Fei
    MULTIBODY SYSTEM DYNAMICS, 1998, 2 (01) : 49 - 69
  • [5] An Improved Formulation for Constrained Mechanical Systems
    Ara Arabyan
    Fei Wu
    Multibody System Dynamics, 1998, 2 : 49 - 69
  • [6] Structural stability of constrained polynomial systems
    Llibre, J
    Sotomayor, J
    BULLETIN OF THE LONDON MATHEMATICAL SOCIETY, 1998, 30 : 589 - 595
  • [7] On numerical methods for constrained mechanical systems
    Le, NN
    Van Phong, D
    Sanh, D
    IUTAM SYMPOSIUM ON RECENT DEVELOPMENTS IN NON-LINEAR OSCILLATIONS OF MECHANICAL SYSTEMS, 2000, 77 : 207 - 216
  • [8] Stability analysis of constrained multibody systems
    Ider, S.K.
    Amirouche, F.M.L.
    Computational Mechanics, 1990, 6 (5-6) : 327 - 340
  • [9] Stability tests for constrained linear systems
    de Oliveira, MC
    Skelton, RE
    PERSPECTIVES IN ROBUST CONTROL, 2001, 268 : 241 - 257
  • [10] Learning Hamiltonians of constrained mechanical systems
    Celledoni, Elena
    Leone, Andrea
    Murari, Davide
    Owren, Brynjulf
    JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2023, 417
12345