Mollifier smoothing of C0-Finsler structures

Abstract

A C0-Finsler structure is a continuous function F:TM → [0,∞) defined on the tangent bundle of a differentiable manifold M such that its restriction to each tangent space is an asymmetric norm. We use the convolution of F with the standard mollifier in order to construct a mollifier smoothing of F, which is a one parameter family of Finsler structures F (of class C∞ on TM 0) that converges uniformly to F on compact subsets of TM. We prove that when F is a Finsler structure, then the Chern connection, the Cartan connection, the Hashiguchi connection, the Berwald connection and the flag curvature of F converges uniformly on compact subsets to the corresponding objects of F. As an application of this mollifier smoothing, we study examples of two-dimensional piecewise smooth Riemannian manifolds with nonzero total curvature on a line segment. We also indicate how to extend this study to the correspondent piecewise smooth Finsler manifolds.