Revision as of 11:42, 8 June 2020

$W_{2}(\mu ,\nu ):=\min _{\gamma \in \Gamma (\mu ,\nu )}\left(\int |x_{1}-x_{2}|^{2}\,d\gamma (x_{1},x_{2})\right)^{1/2}$

Statement of Theorem

Theorem.(Benamow-Brenier)^[1] Let

\mu ,\nu \in P_{2}(R^{d})

,

Failed to parse (syntax error): {\displaystyle w_{2}^{2}(\mu, \nu)=\inf_((\mu(t).\nu(t))}{\int_{0}^{1} |v(,t)|_{L^{2}(\mu(t))}^{2}dt, \quad \partial_{t}\mu+\nabla(v\mu)=0, \mu(0)=\mu, \mu(1)=\nu}) }

References

↑ F. Santambrogio, Optimal Transport for Applied Mathematicians, Chapter 1, pages 9-16

[Santambrogio-1] F. Santambrogio, Optimal Transport for Applied Mathematicians, Chapter 1, pages 9-16

[1]

@@ Line 6: / Line 6: @@
 : '''Theorem.'''(Benamow-Brenier)<ref name=Santambrogio /> Let <math> \mu, \nu \in P_{2}(R^{d}) </math>, <br>
-<math> w_{2}^{2}(\mu, \nu)=\inf_{(\mu(t).\nu(t))}{\int_{0}^{1} |v(,t)|_{L^{2}(\mu(t))}^{2}dt, \quad \partial_{t}\mu+\nabla(v\mu)=0, \mu(0)=\mu, \mu(1)=\nu} </math>
+<math> w_{2}^{2}(\mu, \nu)=\inf_((\mu(t).\nu(t))}{\int_{0}^{1} |v(,t)|_{L^{2}(\mu(t))}^{2}dt, \quad \partial_{t}\mu+\nabla(v\mu)=0, \mu(0)=\mu, \mu(1)=\nu}) </math>
 = References =

Geodesics and generalized geodesics: Difference between revisions

Revision as of 11:42, 8 June 2020

Statement of Theorem

References

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Geodesics and generalized geodesics: Difference between revisions

Revision as of 11:42, 8 June 2020

Statement of Theorem

References

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