Affiliation:
1. Department of Mathematics Tokyo Institute of Technology Meguro Tokyo Japan
2. School of Science, Department of Mathematics Tokai University Hiratsuka Kanagawa Japan
Abstract
AbstractFor the distance function from any closed subset of any complete Finsler manifold, we prove that the singular set is equal to a countable union of delta‐convex hypersurfaces up to an exceptional set of codimension two. In addition, in dimension two, the whole singular set is equal to a countable union of delta‐convex Jordan arcs up to isolated points. These results are new even in the standard Euclidean space and shown to be optimal in view of regularity.
Funder
Japan Society for the Promotion of Science
Sumitomo Foundation