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* Kantorovich Dual Problem (for <math> c(x,y) = d(x,y)^2 </math> where <math> d </math> is a metric); Santambrogio (16-18)
* Kantorovich Dual Problem (for <math> c(x,y) = d(x,y)^2 </math> where <math> d </math> is a metric); Santambrogio (16-18)
* Optimal Transport and the Monge Ampère equation; Santambrogio (xvi, 54-57)
* Optimal Transport and the Monge Ampère equation; Santambrogio (xvi, 54-57)
* Optimal Transport in One Dimension; Villani (73-78); Santambrogio (59-67)


==Numerical Methods for Optimal Transport==
==Numerical Methods for Optimal Transport==

Revision as of 17:01, 20 April 2020

Below, you can find a list of new article ideas and suggested references. (Feel free to incorporate additional references! Please list all references you use at the bottom of your article.) If you choose to write about one of these ideas, remove it from the list below and create a new link on the main page.

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The Optimal Transport Problem

Unless otherwise specified, all topics are for general cost functions c(x,y).

  • Monge Problem; Villani (3-4, 6-9), Santambrogio (xiv-xvii,1-9)
  • Kantorovich Problem; Villani (1-3, 6-9), Santambrogio (xv-xvii,1-9)
  • Kantorovich Dual Problem (for general costs); Villani (17-21), Santambrogio (9-16)
  • Kantorovich Dual Problem (for where is a metric); Villani (34)
  • Kantorovich Dual Problem (for where is a metric); Santambrogio (16-18)
  • Optimal Transport and the Monge Ampère equation; Santambrogio (xvi, 54-57)
  • Optimal Transport in One Dimension; Villani (73-78); Santambrogio (59-67)

Numerical Methods for Optimal Transport

  • Discrete Optimal Transport; Villani (5), Santambrogio (235-237), Peyré Cuturi (7-12)
  • Auction Algorithm; Santambrogio (238-240); Peyré Cuturi (37-39, 52-56)
  • Entropic Regularization; Santambrogio (240-241); Peyré Cuturi (57-62)
  • Sinkhorn's Algorithm; Peyré Cuturi (62-73)
  • Semidiscrete Optimal Transport (for ); Santambrogio (242-248); Peyré Cuturi (85-89)

Applications of Optimal Transport

Mathematical Foundations: Functional Analysis

  • The dual of vs. ; Villani (39-43); Santambrogio (4); Rudin Real and Complex Analysis (127-132)
  • Convergence of Measures and Metrizability (click on link for references and explanation)

Mathematical Foundations: Optimization

  • Fenchel-Rockafellar and Linear Programming; Brezis (15-17); Rockafellar, Variational Analysis (505-507)