Geodesics and generalized geodesics: Difference between revisions
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: '''Definition.''' In a length space, a curve <math> l:[0,1]\rightarrow X </math> is said to be constant speed geodesic between <math> \omega(0)</math> and <math> \omega(1)</math> in <math> X </math> if it satisfies | : '''Definition.''' In a length space, a curve <math> l:[0,1]\rightarrow X </math> is said to be constant speed geodesic between <math> \omega(0)</math> and <math> \omega(1)</math> in <math> X </math> if it satisfies | ||
<math> d(\omega(s),\omega(t))=|t-s|d(\omega(0),\omega(1)) </math> for all <math> t,s \in [0,1]</math> | |||
== Statement of Theorem== | == Statement of Theorem== |
Revision as of 12:30, 11 June 2020
Introduction
There are many ways that we can describe Wasserstein metric. One of them is to characterize absolutely continuos curves (AC)(p.188[1]) and provide a dynamic formulation of the special case Namely, it is possible to see as an infimum of the lengts of curves that satisfy Continuity equation
().
Geodesics
- Definition. A metric space is called a length space if it holds
- Definition. In a length space, a curve is said to be constant speed geodesic between and in if it satisfies
for all
Statement of Theorem
- Theorem.(Benamow-Brenier)[1] Let ,
Generalization
It is possible to generalize the previous theorem and theory to metrics. More about that could be seen in the book [2].
However, it is possible to generalize theorem for a different kind of geodesics [3].
References
- ↑ 1.0 1.1 F. Santambrogio, Optimal Transport for Applied Mathematicians, Chapter 1, pages 202-207
- ↑ [https://link.springer.com/book/10.1007/b137080 L.Ambrosio, N.Gilgi, G.Savaré, Gradient Flows in Metric Spaces and in the Space of Probability Measures, Chapter 7.2., pages 158-160]
- ↑ F. Santambrogio, Optimal Transport for Applied Mathematicians, Chapter 1, pages 275-276