A large family of projectively equivalent C0-Finsler manifolds

Abstract

Let M be a differentiable manifold and TM be its tangent bundle. A C0-Finsler structure on M is a continuous function F: TM → R such that its restriction to each tangent space is a norm. In this work we present a large family of projectively equivalent C0-Finsler manifolds ( M R2, F). Their structures F don't have partial derivatives and they aren't invariant by any transformation group of M. For every p,q ∈ ( M, F), we determine the unique minimizing path connecting p and q. They are line segments parallel to the vectors (3/2,1/2), (0,1) or (-3/2,1/2), or else a concatenation of two of these line segments. Moreover ( M, F) aren't Busemann G-spaces and they don't admit any bounded open F-strongly convex subsets. Other geodesic properties of ( M, F) are also studied.