Learning to Count via Unbalanced Optimal Transport

Eulerian models and algorithms for unbalanced optimal transport

Learning to Recommend via Inverse Optimal Matching

We consider recommendation in the context of optimal matching, i.e., we need to pair or match a user with an item in an optimal way. The framework is particularly relevant when the supply of an individual item is limited and it can only satisfy a small number of users even though it may be preferred by many. We leverage the methodology of optimal transport of discrete distributions and formulat...

Geodesic Shape Retrieval via Optimal Mass Transport

This paper presents a new method for 2-D and 3-D shape retrieval based on geodesic signatures. These signatures are high dimensional statistical distributions computed by extracting several features from the set of geodesic distance maps to each point. The resulting high dimensional distributions are matched to perform retrieval using a fast approximate Wasserstein metric. This allows to propos...

Convex Clustering via Optimal Mass Transport

We consider approximating distributions within the framework of optimal mass transport and specialize to the problem of clustering data sets. Distances between distributions are measured in the Wasserstein metric. The main problem we consider is that of approximating sample distributions by ones with sparse support. This provides a new viewpoint to clustering. We propose different relaxations o...

Natural gradient via optimal transport I

We study a natural Wasserstein gradient flow on manifolds of probability distributions with discrete sample spaces. We derive the Riemannian structure for the probability simplex from the dynamical formulation of the Wasserstein distance on a weighted graph. We pull back the geometric structure to the parameter space of any given probability model, which allows us to define a natural gradient f...