Kantorovich Dual Problem (for general costs): Difference between revisions

From Optimal Transport Wiki
Jump to navigation Jump to search
Line 4: Line 4:


==Statement of Theorem==
==Statement of Theorem==
(Kantorovich Duality) Let X and Y be Polish spaces...


==Proof of Theorem==
==Proof of Theorem==

Revision as of 21:29, 16 May 2020

Introduction

The main advantage of Kantorovich Problem, in comparison to Monge problem, is in the convex constraint property. It is possible to formulate the dual problem.

Statement of Theorem

(Kantorovich Duality) Let X and Y be Polish spaces...

Proof of Theorem

References


[1]

[2]

</ references>