Projectively Equivalent Riemannian Spaces as Quasi-bi-Hamiltonian Systems

被引:0
|
作者
M. Crampin
机构
[1] The Open University,Department of Applied Mathematics
来源
Acta Applicandae Mathematica | 2003年 / 77卷
关键词
projective equivalence; quasi-bi-Hamiltonian system; Hamilton–Jacobi separability;
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学科分类号
摘要
The class of Riemannian spaces admitting projectively, or geodesically, equivalent metrics is very closely related to a certain class of spaces for which the Hamilton–Jacobi equation for geodesics is separable. This fact is established, and its consequences explored, by showing that when a Riemannian space has a projectively equivalent metric its geodesic flow is a quasi-bi-Hamiltonian system. The existence of involutive first integrals of the geodesic flow, quadratic in the momenta, follows by a standard type of argument. When these integrals are independent they generate a Stäckel system.
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页码:237 / 248
页数:11
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