Geodesic fields for Pontryagin type C0-Finsler manifolds

Abstract

Let M be a differentiable manifold, TxM be its tangent space at x∈ M and TM=\(x,y);x∈ M;y ∈ TxM\ be its tangent bundle. A C0-Finsler structure is a continuous function F:TM → [0,∞) such that F(x,·): TxM → [0,∞) is an asymmetric norm. In this work we introduce the Pontryagin type C0-Finsler structures, which are structures that satisfy the minimum requirements of Pontryagin's maximum principle for the problem of minimizing paths. We define the extended geodesic field E on the slit cotangent bundle T M 0 of (M,F), which is a generalization of the geodesic spray of Finsler geometry. We study the case where E is a locally Lipschitz vector field. We show some examples where the geodesics are more naturally represented by E than by a similar structure on TM. Finally we show that the maximum of independent Finsler structures is a Pontryagin type C0-Finsler structure where E is a locally Lipschitz vector field.