Chern connection of a pseudo-Finsler metric as a family of affine connections
Abstract: We consider the Chern connection of a (conic) pseudo-Finsler manifold $(M,L)$ as a linear connection $\nablaV$ on any open subset $\Omega\subset M$ associated to any vector field $V$ on $\Omega$ which is non-zero everywhere. This connection is torsion-free and almost metric compatible with respect to the fundamental tensor $g$. Then we show some properties of the curvature tensor $RV$ associated to $\nablaV$ and in particular we prove that the Jacobi operator of $RV$ along a geodesic coincides with the one given by the Chern curvature.
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