Existence of optimal maps in the reflector-type problems
摘要
In this paper, we consider probability measures and on a --dimensional sphere in and cost functions of the form that generalize those arising in geometric optics where We prove that if and vanish on --rectifiable sets, if and is monotone then there exists a unique optimal map that transports onto where optimality is measured against Furthermore, Our approach is based on direct variational arguments. In the special case when existence of optimal maps on the sphere was obtained earlier by Glimm-Oliker and independently by X.-J. Wang under more restrictive assumptions. In these studies, it was assumed that either and are absolutely continuous with respect to the --dimensional Haussdorff measure, or they have disjoint supports. Another aspect of interest in this work is that it is in contrast with a result by Gangbo-McCann who proved that when then existence of an optimal map fails when and are supported by Jordan surfaces.
引用
@article{arxiv.math/0702747,
title = {Existence of optimal maps in the reflector-type problems},
author = {Wilfrid Gangbo and Vladimir Oliker},
journal= {arXiv preprint arXiv:math/0702747},
year = {2007}
}