Conformal vector fields on compact connected homogeneous Finsler manifolds

Abstract

Let (M,F) be a compact connected homogeneous non-Riemannian Finsler manifold with M>1. We prove that any conformal vector field on (M,F) is a Killing vector field. Further more, we prove that F is a homogeneous Finsler metric on M if and only if is a positive constant function.