ON THE NOETHER SYMMETRY AND LIE SYMMETRY OF MECHANICAL SYSTEMS 被引量：2

ON THE NOETHER SYMMETRY AND LIE SYMMETRY OF MECHANICAL SYSTEMS

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摘要 The Noether symmetry is an invariance of Hamilton action under infinitesimal transformations of time and the coordinates.The Lie symmetry is an invariance of the differential equations of motion under the transformations.In this paper,the relation between these two symmetries is proved definitely and firstly for mechanical systems.The results indicate that all the Noether symmetries are Lie symmetries for Lagrangian systems meanwhile a Noether symmetry is a Lie symmetry for the general holonomic or nonholonomic systems provided that some conditions hold. The Noether symmetry is an invariance of Hamilton action under infinitesimal transformations of time and the coordinates.The Lie symmetry is an invariance of the differential equations of motion under the transformations.In this paper,the relation between these two symmetries is proved definitely and firstly for mechanical systems.The results indicate that all the Noether symmetries are Lie symmetries for Lagrangian systems meanwhile a Noether symmetry is a Lie symmetry for the general holonomic or nonholonomic systems provided that some conditions hold.

作者梅凤翔郑改华

机构地区 Department of Applied Mechanics

出处《Acta Mechanica Sinica》 SCIE EI CAS CSCD 2002年第4期414-419,共6页 力学学报（英文版）

基金 The project supported by the National Natural Science Foundation of China (19972010)

关键词 analytical mechanics Noether symmetry Lie symmetry analytical mechanics Noether symmetry Lie symmetry

分类号 O316 [理学—一般力学与力学基础]

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参考文献3

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