Skip to yearly menu bar Skip to main content


Spotlight Poster

Energy-Guided Continuous Entropic Barycenter Estimation for General Costs

Alexander Kolesov · Petr Mokrov · Igor Udovichenko · Milena Gazdieva · Gudmund Pammer · Anastasis Kratsios · Evgeny Burnaev · Aleksandr Korotin

East Exhibit Hall A-C #2503
[ ]
Fri 13 Dec 11 a.m. PST — 2 p.m. PST

Abstract:

Optimal transport (OT) barycenters are a mathematically grounded way of averaging probability distributions while capturing their geometric properties. In short, the barycenter task is to take the average of a collection of probability distributions w.r.t. given OT discrepancies. We propose a novel algorithm for approximating the continuous Entropic OT (EOT) barycenter for arbitrary OT cost functions. Our approach is built upon the dual reformulation of the EOT problem based on weak OT, which has recently gained the attention of the ML community. Beyond its novelty, our method enjoys several advantageous properties: (i) we establish quality bounds for the recovered solution; (ii) this approach seamlessly interconnects with the Energy-Based Models (EBMs) learning procedure enabling the use of well-tuned algorithms for the problem of interest; (iii) it provides an intuitive optimization scheme avoiding min-max, reinforce and other intricate technical tricks. For validation, we consider several low-dimensional scenarios and image-space setups, including non-Euclidean cost functions. Furthermore, we investigate the practical task of learning the barycenter on an image manifold generated by a pretrained generative model, opening up new directions for real-world applications. Our code is available at https://github.com/justkolesov/EnergyGuidedBarycenters.

Live content is unavailable. Log in and register to view live content