Optimal Transport in One Dimension: Difference between revisions
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== Distance Cost Example == | == Distance Cost Example == | ||
Consider the cost function <math> c(x,y) = |x-y|</math> along with <math> \mu = \frac{1}{2} \lambda_{[0,2]} </math> and <math> \nu = \frac{1}{2}\lambda_{[1,3]}</math> wherein <math> \sup spt(\mu) < \inf spt(\nu)</math> (where <math> \lambda </math> is the one-dimensional Lebesgue measure). Then, for any <math> (x,y) \in spt(\mu) \times spt(\nu) </math>, notice that <math> c(x,y) = y-x </math>, which then immediately puts us in the linear cost position so any transport map/plan is also optimal for such costs. | Consider the cost function <math> c(x,y) = |x-y|</math> along with <math> \mu = \frac{1}{2} \lambda_{[0,2]} </math> and <math> \nu = \frac{1}{2}\lambda_{[1,3]}</math> wherein <math> \sup spt(\mu) < \inf spt(\nu)</math> (where <math> \lambda </math> is the one-dimensional Lebesgue measure). Then, for any <math> (x,y) \in spt(\mu) \times spt(\nu) </math>, notice that <math> c(x,y) = y-x </math>, which then immediately puts us in the linear cost position, so any transport map/plan is also optimal for such costs. |
Revision as of 04:03, 12 February 2022
In this article, we explore the optimal transport problem on the real line along with some examples.
Linear Cost Example
For this example, consider the cost function along with a given linear map . Moreover, if let be any transport plan, then by direct computation we see that
which suggests that this result only depends on the marginals of (wherein and are compactly supported probability measures). In fact, in such cases, every transport plan/map is optimal.
Distance Cost Example
Consider the cost function along with and wherein (where is the one-dimensional Lebesgue measure). Then, for any , notice that , which then immediately puts us in the linear cost position, so any transport map/plan is also optimal for such costs.