English

On Einstein Kropina metrics

Differential Geometry 2012-07-10 v1

Abstract

In this paper, a characteristic condition of Einstein Kropina metrics is given. By the characteristic condition, we prove that a non-Riemannian Kropina metric F=α2βF=\frac{\alpha^2}{\beta} with constant Killing form β\beta on an n-dimensional manifold MM, n2n\geq 2, is an Einstein metric if and only if α\alpha is also an Einstein metric. By using the navigation data (h,W)(h,W), it is proved that an n-dimensional (n2n\geq2) Kropina metric F=α2βF=\frac{\alpha^2}{\beta} is Einstein if and only if the Riemannian metric hh is Einstein and WW is a unit Killing vector field with respect to hh. Moreover, we show that every Einstein Kropina metric must have vanishing S-curvature, and any conformal map between Einstein Kropina metrics must be homothetic.

Cite

@article{arxiv.1207.1944,
  title  = {On Einstein Kropina metrics},
  author = {Xiaoling Zhang and Yi-Bing Shen},
  journal= {arXiv preprint arXiv:1207.1944},
  year   = {2012}
}
R2 v1 2026-06-21T21:32:33.083Z