Decentralize and Randomize: Faster Algorithm for Wasserstein Barycenters

June 11, 2018 Β· Declared Dead Β· πŸ› Neural Information Processing Systems

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Authors Pavel Dvurechensky, Darina Dvinskikh, Alexander Gasnikov, César A. Uribe, Angelia Nedić arXiv ID 1806.03915 Category math.OC: Optimization & Control Cross-listed cs.DC Citations 107 Venue Neural Information Processing Systems Last Checked 4 months ago
Abstract
We study the decentralized distributed computation of discrete approximations for the regularized Wasserstein barycenter of a finite set of continuous probability measures distributedly stored over a network. We assume there is a network of agents/machines/computers, and each agent holds a private continuous probability measure and seeks to compute the barycenter of all the measures in the network by getting samples from its local measure and exchanging information with its neighbors. Motivated by this problem, we develop, and analyze, a novel accelerated primal-dual stochastic gradient method for general stochastic convex optimization problems with linear equality constraints. Then, we apply this method to the decentralized distributed optimization setting to obtain a new algorithm for the distributed semi-discrete regularized Wasserstein barycenter problem. Moreover, we show explicit non-asymptotic complexity for the proposed algorithm.
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