Self-Intersection of Optimal geodesics
Metric Geometry
2017-05-17 v3 Analysis of PDEs
Abstract
Let be a geodesic metric measure space. Consider a geodesic in the -Wasserstein space. Then as goes to the support of and the support of have to overlap, provided an upper bound on the densities holds. We give a more precise formulation of this self-intersection property. We consider for each the set of times for which a geodesic belongs to the support of and we prove that is a point of Lebesgue density 1 for this set, in the integral sense. Our result applies to spaces satisfying . The non branching property is not needed.
Cite
@article{arxiv.1211.6547,
title = {Self-Intersection of Optimal geodesics},
author = {Fabio Cavalletti and Martin Huesmann},
journal= {arXiv preprint arXiv:1211.6547},
year = {2017}
}