内容简介
When I was first approached for the 2005 edition of the Saint-Flour Probability Summer School, I was intrigued, flattered and scared. l Apart from the challenge posed by the teaching of a rather analytical
subject to a probabilistic audience, there was the danger of producing a remake of my recent book Topics in, Optimal Transportation.
内页插图
目录
Preface
Conventions
Introduction
1 Couplings and changes of variables
2 Three examples of coupling techniques
3 The founding fathers of optimal transport
Part Ⅰ Qualitative description of optimal transport
4 Basic properties
5 Cyclical monotonicity and Kantorovich duality
6 The Wasserstein distances
7 Displacement interpolation
8 The Monge-Mather shortening principle
9 Solution of the Monge problem I: Global approach
10 Solution of the Monge problem II: Local approach
11 The Jacobian equation
12 Smoothness
13 Qualitative picture
Part Ⅱ Optimal transport and Riemannian geometry
14 Ricci curvature
15 Otto calculus
16 Displacement convexity I
17 Displacement convexity II
18 Volume control
19 Density control and local regularity
20 Infinitesimal displacement convexity
21 Isoperimetric-type inequalities
22 Concentration inequalities
23 Gradient flows I
24 Gradient flows II: Qualitative properties
25 Gradient flows III: Functional inequalities
Part Ⅲ Synthetic treatment of Ricci curvature
26 Analytic and synthetic points of view
27 Convergence of metric-measure spaces
28 Stability of optimal transport
……
Conclusions and open problems
前言/序言
最优输运(第1分册) [Optimal Transport Old and New Part 1] 下载 mobi epub pdf txt 电子书 格式
最优输运(第1分册) [Optimal Transport Old and New Part 1] 下载 mobi pdf epub txt 电子书 格式 2024
最优输运(第1分册) [Optimal Transport Old and New Part 1] mobi epub pdf txt 电子书 格式下载 2024