Second order models for optimal transport and cubic splines on the Wasserstein space

Fran\c{c}ois-Xavier Vialard (MOKAPLAN); Jean-David Benamou (MOKAPLAN); Thomas Gallou\"et (MOKAPLAN)

arxiv: 1801.04144 · v2 · pith:J2772AKWnew · submitted 2018-01-12 · 🧮 math.OC

Second order models for optimal transport and cubic splines on the Wasserstein space

Jean-David Benamou (MOKAPLAN) , Thomas Gallou\"et (MOKAPLAN) , Fran\c{c}ois-Xavier Vialard (MOKAPLAN) This is my paper

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keywords spacecubicoptimaltransportwassersteininterpolationsplinesapproach

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On the space of probability densities, we extend the Wasserstein geodesics to the case of higher-order interpolation such as cubic spline interpolation. After presenting the natural extension of cubic splines to the Wasserstein space, we propose a simpler approach based on the relaxation of the variational problem on the path space. We explore two different numerical approaches, one based on multi-marginal optimal transport and entropic regularization and the other based on semi-discrete optimal transport.

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