ANALOG OF NOETHER THEOREM FOR NON-NOETHER AND NONLOCAL SYMMETRIES

被引:10
|
作者
LUNEV, FA
机构
来源
THEORETICAL AND MATHEMATICAL PHYSICS | 1990年 / 84卷 / 02期
关键词
D O I
10.1007/BF01017679
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
It is shown that a conserved current can be associated with every pair of non-Noether symmetries in a Lagrangian field theory. This result is generalized to the non-Lagrangian case.
引用
收藏
页码:816 / 820
页数:5
相关论文
共 50 条
  • [21] Velocity-dependent symmetries and non-Noether conserved quantities of electromechanical systems
    FU JingLi1
    2 Faculty of Mechanical Engineering & Automation
    3 China Jingye Engineering Corporation Limited Shenzhen Branch
    4 Shanghai University
    5 Department of Physics
    Science China(Physics,Mechanics & Astronomy), 2011, (02) : 288 - 295
  • [22] Non-Noether symmetries and Lutzky conserved quantities for mechanico-electrical systems
    Fu, Jing-Li
    Chen, Li-Qun
    Jimenez, Salvador
    Tang, Yi-Fa
    PHYSICS LETTERS A, 2006, 358 (01) : 5 - 10
  • [23] Velocity-dependent symmetries and non-Noether conserved quantities of electromechanical systems
    JingLi Fu
    BenYong Chen
    Hao Fu
    GangLing Zhao
    RongWan Liu
    ZhiYan Zhu
    Science China Physics, Mechanics and Astronomy, 2011, 54 : 288 - 295
  • [24] Non-Noether symmetries and conserved quantities of the Lagrange mechano-electrical systems
    Fu, JL
    Chen, LQ
    Liu, RW
    CHINESE PHYSICS, 2004, 13 (11): : 1784 - 1789
  • [25] Velocity-dependent symmetries and non-Noether conserved quantities of electromechanical systems
    Fu JingLi
    Chen BenYong
    Fu Hao
    Zhao GangLing
    Liu RongWan
    Zhu ZhiYan
    SCIENCE CHINA-PHYSICS MECHANICS & ASTRONOMY, 2011, 54 (02): : 288 - 295
  • [26] MOTION EQUATIONS AND NON-NOETHER SYMMETRIES OF LAGRANGIAN SYSTEMS WITH CONFORMABLE FRACTIONAL DERIVATIVE
    Fu, Jing-Li
    Zhang, Lijun
    Khalique, Chaudry
    Guo, Ma-Li
    THERMAL SCIENCE, 2021, 25 (02): : 1365 - 1372
  • [27] Non-Noether symmetries and Lutzky conservative quantities of nonholonomic nonconservative dynamical systems
    Zheng, SW
    Tang, YF
    Fu, JL
    CHINESE PHYSICS, 2006, 15 (02): : 243 - 248
  • [28] Nonholonomic Noether theorem and reduction of symmetries
    Sniatycki, J
    REPORTS ON MATHEMATICAL PHYSICS, 1998, 42 (1-2) : 5 - 23
  • [29] Weak Noether Symmetry and non-Noether Conserved Quantities for General Holonomic Systems
    Xie Jia-Fang
    Mei Feng-Xiang
    Gang Tie-Qiang
    COMMUNICATIONS IN THEORETICAL PHYSICS, 2008, 50 (04) : 844 - 846
  • [30] Weak Noether Symmetry and non-Noether Conserved Quantities for General Holonomic Systems
    XIE Jia-Fang MEI Feng-Xiang GANG Tie-Qiang Department of Mechanics
    Communications in Theoretical Physics, 2008, 50 (10) : 844 - 846
12345