Finslerian geodesics on Frechet manifolds

Authors

  • K. Eftekharinasab Institute of Mathematics of National Academy of Sciences of Ukraine, Ukraine
  • V. Petrusenko National Aviation University, Ukraine

DOI:

https://doi.org/10.31926/but.mif.2020.13.62.1.11

Keywords:

Fréchet nuclear manifold, Finsler structure, Geodesic

Abstract

We establish a framework, namely, nuclear bounded Fréchet 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.

Author Biographies

K. Eftekharinasab, Institute of Mathematics of National Academy of Sciences of Ukraine, Ukraine

Topology lab.

V. Petrusenko, National Aviation University, Ukraine

The Higher Mathematics Department

Downloads

Published

2020-07-22

Issue

Vol. 13(62) No. 1 (2020)

Section

MATHEMATICS