Talk:Semidiscrete Optimal Transport: Difference between revisions

Revision as of 04:26, 11 June 2020

In your first equation, swap the roles of phi and psi, so you don't have to replace psi with phi later on.
Explain that nu is replaced with nu = sum of Diracs at locations y_j with weights b_j. Explain that phi_j = phi(y_j)

The weights b_j are given. The goal of the algorithm is to find which REGIONS V_\phi(j) in the support of the source measure \mu are sent to each y_j. These regions are determined by the function phi. You want to find a function phi so that b_j = \int_{V_\phi(j)} f(x) dx.

As above, the goal is to find phi. The weights are given.
Cite Merigot for the fact that the energy E(\phi) is concave.
You may consider either clarifying or removing the last sentence of this section.

@@ Line 1: / Line 1: @@
-test
+==Introduction==
+* Cite the source of your image on Voronoi cells.
+* ``and the other one is ABSOLUTELY continuous with respect to Lebesgue measure''
+==Formulation==
+* In your first equation, swap the roles of phi and psi, so you don't have to replace psi with phi later on.
+* Explain that nu is replaced with nu = sum of Diracs at locations y_j with weights b_j. Explain that phi_j = phi(y_j)
+==Voronoi cells to find weights==
+* The weights b_j are given. The goal of the algorithm is to find which REGIONS V_\phi(j) in the support of the source measure \mu are sent to each y_j. These regions are determined by the function phi. You want to find a function phi so that b_j = \int_{V_\phi(j)} f(x) dx.
+==Finding the weights==
+* As above, the goal is to find phi. The weights are given.
+* Cite Merigot for the fact that the energy E(\phi) is concave.
+* You may consider either clarifying or removing the last sentence of this section.
+==Algorithm discussion==
+* This is a very nice summary. Consider adding some references.