中文

Existence of optimal maps in the reflector-type problems

最优化与控制 2007-05-23 v1 偏微分方程分析

摘要

In this paper, we consider probability measures μ\mu and ν\nu on a dd--dimensional sphere in \Rd,d1,\Rd, d \geq 1, and cost functions of the form c(\x,\y)=l(\x\y22)c(\x,\y)=l(\frac{|\x-\y|^2}{2}) that generalize those arising in geometric optics where l(t)=logt.l(t)=-\log t. We prove that if μ\mu and ν\nu vanish on (d1)(d-1)--rectifiable sets, if l(t)>0,|l'(t)|>0, limt0+l(t)=+,\lim_{t\to 0^+}l(t)=+\infty, and g(t):=t(2t)(l(t))2g(t):=t(2-t)(l'(t))^2 is monotone then there exists a unique optimal map ToT_o that transports μ\mu onto ν,\nu, where optimality is measured against c.c. Furthermore, inf\xTo\x\x>0.\inf_{\x}|T_o\x-\x|>0. Our approach is based on direct variational arguments. In the special case when l(t)=logt,l(t)=-\log t, 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 μ\mu and ν\nu are absolutely continuous with respect to the dd--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 l(t)=tl(t)=t then existence of an optimal map fails when μ\mu and ν\nu are supported by Jordan surfaces.

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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}
}