Intrinsic Sparsity of Kantorovich Solutions
Abstract
Let X,Y be two finite sets of points having \#X = m and \#Y = n points with μ = (1/m) Σi=1m δxi and = (1/n) Σj=1n δyj being the associated uniform probability measures. A result of Birkhoff implies that if m = n, then the Kantorovich problem has a solution which also solves the Monge problem: optimal transport can be realized with a bijection π: X → Y. This is impossible when m ≠ n. We observe that when m ≠ n, there exists a solution of the Kantorovich problem such that the mass of each point in X is moved to at most n/(m,n) different points in Y and that, conversely, each point in Y receives mass from at most m/(m,n) points in X.
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