1. 广义算子下约束Hamilton系统的Noether定理.
- Author
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沈世磊 and 宋传静
- Subjects
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INFINITESIMAL transformations , *NOETHER'S theorem , *CONSERVED quantity , *HAMILTONIAN systems , *HAMILTON'S equations , *HAMILTON-Jacobi equations , *CONSERVATION laws (Mathematics) , *MULTIPLIERS (Mathematical analysis) - Abstract
Noether’s symmetry and conserved quantity of singular systems under generalized operators were studied. Firstly, the Lagrangian equation of singular systems under generalized operators was established, and the primary constraints on the system were derived. Then the Lagrangian multiplier was introduced to establish the constrained Hamilton equation and the compatibility condition under generalized operators. Secondly, based on the invariance of the Hamilton action under the infinitesimal transformation, Noether’s theorem for constrained Hamiltonian systems under generalized operators was established, and the symmetry and corresponding conserved quantity of the system were given. Under certain conditions, Noether’s conservation of constrained Hamiltonian systems under generalized operators can be reduced to Noether’s conservation of integer-order constrained Hamiltonian systems. Finally, an example illustrates the application of the results. [ABSTRACT FROM AUTHOR]
- Published
- 2022
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