Geodesic Vector fields of invariant (α,β)-metrics on Homogeneous spaces

Abstract

In this paper we show that for an invariant (α,β)-metric F on a homogeneous Finsler manifold GH, induced by an invariant Riemannian metric a and an invariant vector field X, the vector X=X(H) is a geodesic vector of F if and only if it is a geodesic vector of a. Then we give some conditions such that under them, an arbitrary vector is a geodesic vector of F if and only if it is a geodesic vector of a. Finally we give an explicit formula for the flag curvature of bi-invariant (α,β)-metrics on connected Lie groups.