New Paper - Homepage of Gabriel Peyré

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Together with Lenaic Chizat, François-Xavier Vialard and Bernhard Schmitzer, we released our paper “Scaling Algorithms for Unbalanced Transport Problems”. It is the third and last paper about generalized “unbalanced” optimal transport, which is a recently hot topic in the (small but rapidly growing!) world of optimal transport (OT) theorists and practitioners.

In the first paper “An Interpolating Distance between Optimal Transport and Fisher-Rao”, we proposed (simultaneously and independently with two other groups of researchers) a new geodesic distance between two arbitrary positive measures, generalizing OT to the unblanced cases (i.e. when the measures are not normalized to unit mass).
In the second paper “Unbalanced Optimal Transport: Geometry and Kantorovich Formulation”, we showed (simultaneously and independently with another group of researchers) that this distance is a special case of a generic class of “static” OT problems, which generalizes the linear programming formulation of OT.
In this last paper, “Scaling Algorithms for Unbalanced Transport Problems”, we show how to solve efficiently these problems, and many more (in particular also barycenters and gradient flows) using entropic regularization, a recent computational technic championed by Marco Cuturi. The resulting algorithm is a far reaching generalization of Sinkhorn iterative scaling method.