Abstract is missing.
- Introduction to optimal transport theoryFilippo Santambrogio. 3-21
- Models and applications of optimal transport in economics, traffic, and urban planningFilippo Santambrogio. 22-40
- Logarithmic Sobolev inequality for diffusion semigroupsIvan Gentil. 41-57
- Lecture notes on variational models for incompressible Euler equationsLuigi Ambrosio, Alessio Figalli. 58-71
- Ricci flow: the foundations via optimal transportationPeter Topping. 72-99
- Lecture notes on gradient flows and optimal transportSara Daneri, Giuseppe Savaré. 100-144
- Ricci curvature, entropy, and optimal transportShin-ichi Ohta. 145-202
- Computing a mass transport problem with a least-squares methodOlivier Besson, Martine Picq, Jérôme Poussin. 203-215
- On the duality theory for the Monge?Kantorovich transport problemMathias Beiglböck, Christian Léonard, Walter Schachermayer. 216-265
- 10 Optimal coupling for mean field limitsFrançois Bolley. 266-273
- Functional inequalities via Lyapunov conditionsPatrick Cattiaux, Arnaud Guillin. 274-287
- Size of the medial axis and stability of Federer?s curvature measuresQuentin Mérigot. 288