| [1] |
Sun Xian-Ting, Zhang Yao-Yu, Zhang Fang, Jia Li-Qun. Conformal invariance and Hojman conserved quantity of Lie symmetry for Appell equations in a holonomic system. Acta Physica Sinica,
2014, 63(14): 140201.
doi: 10.7498/aps.63.140201
|
| [2] |
Xu Rui-Li, Fang Jian-Hui, Zhang Bin. The Noether conserved quantity of Lie symmetry for discrete difference sequence Hamilton system with variable mass. Acta Physica Sinica,
2013, 62(15): 154501.
doi: 10.7498/aps.62.154501
|
| [3] |
Xie Yin-Li, Jia Li-Qun, Yang Xin-Fang. Lie symmetry and Hojman conserved quantity of Nielsen equation in a dynamical system of the relative motion. Acta Physica Sinica,
2011, 60(3): 030201.
doi: 10.7498/aps.60.030201
|
| [4] |
Zheng Shi-Wang, Xie Jia-Fang, Chen Xiang-Wei, Du Xue-Lian. Another kind of conserved quantity induced directly from Mei symmetry of Tzénoff equations for holonomic systems. Acta Physica Sinica,
2010, 59(8): 5209-5212.
doi: 10.7498/aps.59.5209
|
| [5] |
Dong Wen-Shan, Huang Bao-Xin. Lie symmetries and Noether conserved quantities of generalized nonholonomic mechanical systems. Acta Physica Sinica,
2010, 59(1): 1-6.
doi: 10.7498/aps.59.1
|
| [6] |
Jia Li-Qun, Cui Jin-Chao, Zhang Yao-Yu, Luo Shao-Kai. Lie symmetry and conserved quantity of Appell equation for a Chetaev’s type constrained mechanical system. Acta Physica Sinica,
2009, 58(1): 16-21.
doi: 10.7498/aps.58.16
|
| [7] |
Shi Shen-Yang, Huang Xiao-Hong, Zhang Xiao-Bo, Jin Li. The Lie symmetry and Noether conserved quantity of discrete difference variational Hamilton system. Acta Physica Sinica,
2009, 58(6): 3625-3631.
doi: 10.7498/aps.58.3625
|
| [8] |
Xia Li-Li, Li Yuan-Cheng, Wang Xian-Jun. Non-Noether conserved quantities for nonholonomic controllable mechanical systems with relativistic rotational variable mass. Acta Physica Sinica,
2009, 58(1): 28-33.
doi: 10.7498/aps.58.28
|
| [9] |
Xia Li-Li, Li Yuan-Cheng. Non-Noether conserved quantity for relativistic nonholonomic controllable mechanical system with variable mass. Acta Physica Sinica,
2008, 57(8): 4652-4656.
doi: 10.7498/aps.57.4652
|
| [10] |
Zheng Shi-Wang, Qiao Yong-Fen. Integrating factors and conservation theorems of Lagrange’s equations for generalized nonconservative systems in terms of quasi-coordinates. Acta Physica Sinica,
2006, 55(7): 3241-3245.
doi: 10.7498/aps.55.3241
|
| [11] |
Zhang Peng-Yu, Fang Jian-Hui. Lie symmetry and non-Noether conserved quantities of variable mass Birkhoffian system. Acta Physica Sinica,
2006, 55(8): 3813-3816.
doi: 10.7498/aps.55.3813
|
| [12] |
Gu Shu-Long, Zhang Hong-Bin. Mei symmetry, Noether symmetry and Lie symmetry of a Vacco system. Acta Physica Sinica,
2005, 54(9): 3983-3986.
doi: 10.7498/aps.54.3983
|
| [13] |
Xu Xue-Jun, Mei Feng-Xiang. Unified symmetry of the holonomic system in terms of quasi-coordinates. Acta Physica Sinica,
2005, 54(12): 5521-5524.
doi: 10.7498/aps.54.5521
|
| [14] |
Luo Shao-Kai, Guo Yong-Xin, Mei Feng-Xiang. Noether symmetry and Hojman conserved quantity for nonholonomic mechanical systems. Acta Physica Sinica,
2004, 53(5): 1270-1275.
doi: 10.7498/aps.53.1270
|
| [15] |
Luo Shao-Kai, Mei Feng-Xiang. A non-Noether conserved quantity, i.e. Hojman conserved quantity, for nonholonomic mechanical systems. Acta Physica Sinica,
2004, 53(3): 6-10.
doi: 10.7498/aps.53.6
|
| [16] |
Mei Feng-Xiang. Lie symmetry and the conserved quantity of a generalized Hamiltonian system. Acta Physica Sinica,
2003, 52(5): 1048-1050.
doi: 10.7498/aps.52.1048
|
| [17] |
Luo Shao-Kai. Mei symmetry, Noether symmetry and Lie symmetry of Hamiltonian system. Acta Physica Sinica,
2003, 52(12): 2941-2944.
doi: 10.7498/aps.52.2941
|
| [18] |
Li Yuan-Cheng, Zhang Yi, Liang Jing-Hui. . Acta Physica Sinica,
2002, 51(10): 2186-2190.
doi: 10.7498/aps.51.2186
|
| [19] |
Qiao Yong-Fen, Zhao Shu-Hong. . Acta Physica Sinica,
2001, 50(1): 1-7.
doi: 10.7498/aps.50.1
|
| [20] |
MEI FENG-XIANG. LIE SYMMETRIES AND CONSERVED QUANTITIES OF NONHOLONOMIC SYSTEMS WITH SERVOCONSTR AINTS. Acta Physica Sinica,
2000, 49(7): 1207-1210.
doi: 10.7498/aps.49.1207
|
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