Non-Noether symmetrical conserved quantity for nonholonomic Vacco dynamical systems with variable mass

doi:10.1088/1009-1963/13/11/003

Abstract

Abstract Using a form invariance under special infinitesimal transformations in which time is not variable, the non-Noether conserved quantity of the nonholonomic Vacco dynamical system with variable mass is studied. The differential equations of motion of the systems are established. The definition and criterion of the form invariance of the system under special infinitesimal transformations are studied. The necessary and sufficient condition under which the form invariance is a Lie symmetry is given. The Hojman theorem is established. Finally an example is given to illustrate the application of the result.

Keywords: variable mass nonholonomic constraint Vacco dynamical system non-Noether conserved quantity

Received: 16 October 2003
Revised: 07 April 2004
Accepted manuscript online:

PACS:	45.10.-b	(Computational methods in classical mechanics)
	45.20.Jj	(Lagrangian and Hamiltonian mechanics)
	02.30.Hq	(Ordinary differential equations)
	02.20.Sv	(Lie algebras of Lie groups)

Fund: Project supported by the Heilongjiang Natural Science Foundation, China (Grant No 9507).

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Qiao Yong-Fen (乔永芬), Li Ren-Jie (李仁杰), Zhao Shu-Hong (赵淑红) Non-Noether symmetrical conserved quantity for nonholonomic Vacco dynamical systems with variable mass 2004 Chinese Physics 13 1790

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Non-Noether symmetrical conserved quantity for nonholonomic Vacco dynamical systems with variable mass

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