Non-holonomic reduction of symmetries, constraints, and integrability

被引:2
|
作者
Sniatycki, J. [1 ]
Cushman, R. [1 ,2 ]
机构
[1] Univ Calgary, Dept Math & Stat, Calgary, AB T2N 1N4, Canada
[2] Univ Utrecht, Inst Math, NL-3508 TA Utrecht, Netherlands
来源
REGULAR & CHAOTIC DYNAMICS | 2007年 / 12卷 / 06期
关键词
almost Poisson algebra; differential space; distributional Hamiltonian system; singular reduction; symmetry;
D O I
10.1134/S1560354707060044
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The aim of this paper is to give a brief description of singular reduction of nonholonomically constrained Hamiltonian systems.
引用
收藏
页码:615 / 621
页数:7
相关论文
共 50 条
  • [31] The non-holonomic double pendulum: An example of non-linear non-holonomic system
    Sergio Benenti
    [J]. Regular and Chaotic Dynamics, 2011, 16 : 417 - 442
  • [32] The Non-holonomic Double Pendulum: an Example of Non-linear Non-holonomic System
    Benenti, Sergio
    [J]. REGULAR & CHAOTIC DYNAMICS, 2011, 16 (05): : 417 - 442
  • [33] On non-holonomic connexions
    Schouten, JA
    [J]. PROCEEDINGS OF THE KONINKLIJKE AKADEMIE VAN WETENSCHAPPEN TE AMSTERDAM, 1928, 31 (1/5): : 291 - 299
  • [34] Non-holonomic integrators
    Cortés, J
    Martínez, S
    [J]. NONLINEARITY, 2001, 14 (05) : 1365 - 1392
  • [35] Influence of the non-holonomic constraints on the manoeuvrability of the legged and wheeled vehicle ALDURO
    Germann, D
    Franitza, D
    Hiller, M
    [J]. CLIMBING AND WALKING ROBOTS, 2002, : 555 - 562
  • [36] OD/SINS adaptive integrated navigation method with non-holonomic constraints
    Liu, Wanke
    Nong, Qi
    Tao, Xianlu
    Zhu, Feng
    Hu, Jie
    [J]. Cehui Xuebao/Acta Geodaetica et Cartographica Sinica, 2022, 51 (01): : 9 - 17
  • [37] Realization of non-holonomic constraints and singular perturbation theory for plane dumbbells
    Koshkin, Sergiy
    Jovanovic, Vojin
    [J]. JOURNAL OF ENGINEERING MATHEMATICS, 2017, 106 (01) : 123 - 141
  • [38] Non-holonomic systems with symmetry allowing a conformally symplectic reduction
    Rios, PD
    Koiller, J
    [J]. NEW ADVANCES IN CELESTIAL MECHANICS AND HAMILTONIAN SYSTEMS, 2004, : 239 - 252
  • [39] Realization of non-holonomic constraints and singular perturbation theory for plane dumbbells
    Sergiy Koshkin
    Vojin Jovanovic
    [J]. Journal of Engineering Mathematics, 2017, 106 : 123 - 141
  • [40] A UNIFYING MECHANICAL EQUATION WITH APPLICATIONS TO NON-HOLONOMIC CONSTRAINTS AND DISSIPATIVE PHENOMENA
    Minguzzi, E.
    [J]. JOURNAL OF GEOMETRIC MECHANICS, 2015, 7 (04): : 473 - 482
12345