Lie symmetries and non-Noether conserved quantities for Hamiltonian canonical equations |
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| Authors: | Fu Jing-Li Chen Li-Qun Xie Feng-Ping |
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| Affiliation: | Department of Applied Physics, Zhejiang University of Science, Hangzhou 310018, China; Shanghai University, Shanghai Institute of Applied Mathematics and Mechanics, Shanghai 200072, China; Shanghai University, Shanghai Institute of Applied Mathematics and Mechanics, Shanghai 200072, China |
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| Abstract: | This paper focuses on studying Lie symmetries and non-Noether conserved quantities of Hamiltonian dynamical systems in phase space. Based on the infinitesimal transformations with respect to the generalized coordinates and generalized momenta, we obtain the determining equations and structure equation of the Lie symmetry for Hamiltonian dynamical systems. This work extends the research of non-Noether conserved quantity for Hamilton canonical equations, and leads directly to a new type of non-Noether conserved quantities of the systems. Finally, an example is given to illustrate these results. |
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| Keywords: | Hamiltonian system Lie symmetry non-Noether conserved quantity Lie groups |
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