Brendan Pass
Published 2012-06-24Version 1
We formulate and study an optimal transportation problem with infinitely many marginals; this is a natural extension of the multi-marginal problem studied by Gangbo and Swiech (1998). We prove results on the existence, uniqueness and characterization of the optimizer, which are natural extensions of the results of Gangbo and Swiech. The proof relies on a relationship between this problem and the problem of finding barycenters in the Wasserstein space, a connection first observed for finitely many marginals by Agueh and Carlier (2011).
A parabolic flow toward solutions of the optimal transportation problem on domains with boundary
Regularity of optimal transportation between spaces with different dimensions
Optimal transportation between unequal dimensions
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