Frechet流形上的芬兰测地线

arXiv: Differential Geometry Pub Date : 2020-07-27 DOI:10.31926/but.mif.2020.13.62.1.11

K. Eftekharinasab, V. Petrusenko

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引用次数: 0

摘要

建立了具有Riemann-Finsler结构的核有界Frechet流形框架，研究了某些无限维流形上的测地曲线，如封闭流形上的riemann度量流形。我们证明了在这些流形上测地线局部存在，并且在某种意义上是长度最小的。此外，我们证明了这些流形上的曲线是测地线当且仅当它满足欧拉-拉格朗日方程的集合。作为一个应用，我们毫不费力地证明了爱因斯坦流形上Ricci流的解不是测地线。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Finslerian geodesics on Frechet manifolds

We establish a framework, namely, nuclear bounded Frechet manifolds endowed with Riemann-Finsler structures to study geodesic curves on certain infinite dimensional manifolds such as the manifold of Riemannian metrics on a closed manifold. We prove on these manifolds geodesics exist locally and they are length minimizing in a sense. Moreover, we show that a curve on these manifolds is geodesic if and only if it satisfies a collection of Euler-Lagrange equations. As an application, without much difficulty, we prove that the solution to the Ricci flow on an Einstein manifold is not geodesic.

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arXiv: Differential Geometry

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