Clifford-Wolf translations of left invariant Randers metrics on compact Lie groups

Abstract

A Clifford-Wolf translation of a connected Finsler space is an isometry which moves each point the sam distance. A Finsler space (M, F) is called Clifford-Wolf homogeneous if for any two point x1, x2∈ M there is a Clifford-Wolf translation such that (x1)=x2. In this paper, we study Clifford-Wolf translations of left invariant Randers metrics on compact Lie groups. The mian result is that a left invariant Randers metric on a connected compact simple Lie group is Clifford-Wolf homogeneous if and only if the indicatrix of the metric is a round sphere with respect to a bi-invariant Riemannian metric. This presents a large number of examples of non-reversible Finsler metrics which are Clifford-Wolf homogeneous.