On the C-projective vector fields on Randers spaces

Abstract

A characterization of the C-projective vector fields on a Randers spaces is presented in terms of a recently introduced non-Riemannian quantity defined by Z. Shen and denoted by ; It is proved that the quantity is invariant for C-projective vector fields. Therefore, the dimension of the algebra of the C-projective vector fields on an n-dimensional Randers space is at most n(n+2). The generalized Funk metrics on the n-dimensional Euclidean unit ball Bn(1) are shown to be explicit examples of the Randers metrics with a C-projective algebra of maximum dimension n(n+2). Then, it is also proved that an n-dimensional Randers space has a C-projective algebra of maximum dimension n(n+2) if and only if it is locally Minkowskian or (up to re-scaling) locally isometric to the generalized Funk metric. A new projective invariant is also introduced.