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991.
A symmetry and a conserved quantity of the Birkhoff system are studied. The
symmetry is called the Birkhoff symmetry. Its definition and criterion are
given in this paper. A conserved quantity can be deduced by using the
symmetry. An example is given to illustrate the application of the result. 相似文献
992.
Lie symmetry and conserved quantity of a system of first-order differential equations 总被引:5,自引:0,他引:5 下载免费PDF全文
This paper focuses on studying the Lie symmetry and a conserved quantity of
a system of first-order differential equations. The determining equations of
the Lie symmetry for a system of first-order differential equations, from
which a kind of conserved quantity is deduced, are presented. And their
general conclusion is applied to a Hamilton system, a Birkhoff system and a
generalized Hamilton system. Two examples are given to illustrate
the application of the results. 相似文献
993.
This paper focuses on studying non-Noether conserved quantities of Lie
symmetry and of form invariance for a mechanical system in phase space
under the general infinitesimal transformation of groups. We obtain a new
non-Noether conserved quantity of Lie symmetry of the system, and Hojman and
Mei's results are of special cases of our conclusion. We find a
condition under which the form invariance of the system will lead to a Lie
symmetry, and, further, obtain a new non-Noether conserved quantity of form
invariance of the system. An example is given finally to illustrate these
results. 相似文献
994.
二阶非完整力学系统的Lie对称性与守恒量 总被引:4,自引:0,他引:4
研究二阶非完整力学系统的Lie对称与守恒量.首先利用系统运动微分方程在无限小变换下的不变性建立Lie对称的确定方程和限制方程,得到Lie对称的结构方程和守恒量;其次研究上述问题的逆问题;最后举例说明结果的应用. 相似文献
995.
996.
Lie symmetries and conserved quantities of Birkhoff systems with unilateral constraints 总被引:8,自引:0,他引:8 下载免费PDF全文
In this paper we study the Lie symmetries of Birkhoff systems with unilateral constraints.We give the conditions for,and the form of,conserved quantities due to the Lie symmetries of the systems.and we also study the inverse problem of the Lie symmetries of the systems.Finally,an example is given to illustrate the application of the results. 相似文献
997.
HOU Qi-Bao LI Yuan-Cheng XiA Li-Li WANG Jing 《理论物理通讯》2007,48(4):619-622
The unified symmetry of a nonholonomic system of non-Chetaev's type with variable mass in event space is studied. The differential equations of motion of the system are given. Then the definition and the criterion of the unified symmetry for the system are obtained. Finally, the Noether conserved quantity, the Hojman conserved quantity, and a new type of conserved quantity are deduced from the unified symmetry of the nonholonomic system of non-Chetaev's type with variable mass in event space at one time. An example is given to illustrate the application of the results. 相似文献
998.
Mei symmetry and generalized Hojman conserved quantity for variable mass systems with unilateral holonomic constraints 下载免费PDF全文
This paper studies Mei symmetry which leads to a generalized Hojman
conserved quantity for variable mass systems with unilateral
holonomic constraints. The differential equations of motion for the
systems are established, the definition and criterion of the Mei
symmetry for the systems are given. The necessary and sufficient
condition under which the Mei symmetry is a Lie symmetry for the
systems is obtained and a generalized Hojman conserved quantity
deduced from the Mei symmetry is got. An example is given to
illustrate the application of the results. 相似文献
999.
Based on the total time derivative along the trajectory of the
time, we study the unified symmetry of Vacco dynamical systems.
The definition and the criterion of the unified symmetry for the
system are given. Three kinds of conserved quantities, i.e. the
Noether conserved quantity, the generalized Hojman conserved
quantity and the Mei conserved quantity, are deduced from the
unified symmetry. An example is presented to illustrate the
results. 相似文献
1000.
Noether symmetry and non-Noether conserved quantity of the relativistic holonomic nonconservative systems in general Lie transformations 总被引:1,自引:0,他引:1 下载免费PDF全文
For a relativistic holonomic nonconservative system, by using the
Noether symmetry, a new non-Noether conserved quantity is given under
general infinitesimal transformations of groups. On the basis of the
theory of invariance of differential equations of motion under
general infinitesimal transformations, we construct the relativistic
Noether symmetry, Lie symmetry and the condition under which the
Noether symmetry is a Lie symmetry under general infinitesimal
transformations. By using the Noether symmetry, a new relativistic
non-Noether conserved quantity is given which only depends on the
variables $t$, $q_s $ and $\dot {q}_s $. An example is given to
illustrate the application of the results. 相似文献