p-Wasserstein barycenters

Abstract

We study barycenters of N probability measures on Rd with respect to the p-Wasserstein metric (1<p<∞). We prove that -- p-Wasserstein barycenters of absolutely continuous measures are unique, and again absolutely continuous -- p-Wasserstein barycenters admit a multi-marginal formulation -- the optimal multi-marginal plan is unique and of Monge form if the marginals are absolutely continuous, and its support has an explicit parametrization as a graph over any marginal space. This extends the Agueh--Carlier theory of Wasserstein barycenters [SIAM J. Math. Anal. 43 (2011), no.2, 904--924] to exponents p≠ 2. A key ingredient is a quantitative injectivity estimate for the (highly non-injective) map from N-point configurations to their p-barycenter on the support of an optimal multi-marginal plan. We also discuss the statistical meaning of p-Wasserstein barycenters in one dimension.

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