On rational integrals of geodesic flows

Kozlov Valery V.

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On rational integrals of geodesic flows

机译：关于测地流的有理积分

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This paper is concerned with the problem of first integrals of the equations of geodesics on two-dimensional surfaces that are rational in the velocities (or momenta). The existence of nontrivial rational integrals with given values of the degrees of the numerator and the denominator is proved using the Cauchy-Kovalevskaya theorem.

机译：本文涉及二维表面上测地线方程的第一积分的问题，该二维表面的速度（或动量）是有理数。利用柯西-科瓦列夫斯卡夫定理证明了具有分子和分母的度数给定值的非平凡有理积分的存在。

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来源
《Regular & chaotic dynamics》 |2014年第6期|共6页
作者
Kozlov Valery V.;
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原文格式 PDF
正文语种 eng
中图分类力学;
关键词
conformal coordinates; rational integral; irreducible integrals; Cauchy - Kovalevskaya theorem;

机译：共形坐标;有理积分;不可约积分;Cauchy-Kovalevskaya定理;
入库时间 2022-08-18 13:25:50

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3. On local description of two-dimensional geodesic flows with a polynomial first integral [J] . Pavlov Maxim V., Tsarev Sergey P. Journal of physics, A. Mathematical and theoretical . 2016,第17期

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On rational integrals of geodesic flows

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