2018
ICML
ICML 2018
Stochastic Wasserstein Barycenters
Abstract
We present a stochastic algorithm to compute the barycenter of a set of probability distributions under the Wasserstein metric from optimal transport. Unlike previous approaches, our method extends to continuous input distributions and allows the support of the barycenter to be adjusted in each iteration. We tackle the problem without regularization, allowing us to recover a sharp output whose support is contained within the support of the true barycenter. We give examples where our algorithm recovers a more meaningful barycenter than previous work. Our method is versatile and can be extended to applications such as generating super samples from a given distribution and recovering blue noise approximations.
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Interdisciplinary Bridge
— Machine Learning and Mathematics & Optimization
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Hot Topic Early Bird
— optimal transport
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Cross-Pollinator
— Artificial Intelligence, Computer Science, Computer Vision, Data Science & Analytics, Deep Learning, Interdisciplinary, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning, Speech & Audio
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Keyword Pioneer
— support adjustment
Authors
Topics
Machine Learning > Core Methods > Clustering
Mathematics & Optimization > Mathematics > Probability
Mathematics & Optimization > Optimization > Stochastic Methods
Machine Learning > Bayesian & Probabilistic > Probabilistic Modeling
Mathematics & Optimization > Optimization > Optimal Transport
Mathematics & Optimization > Probability > Stochastic Processes