加速Bregman原对偶方法在最优输运和Wasserstein重心问题中的应用

IF 1.9 Q1 MATHEMATICS, APPLIED SIAM journal on mathematics of data science Pub Date : 2022-03-02 DOI:10.1137/22m1481865
A. Chambolle, Juan Pablo Contreras
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引用次数: 13

摘要

本文讨论了混合原对偶(HPD)型算法在有熵正则化和无熵正则化的情况下近似求解离散最优传输(OT)和Wasserstein Barycenter(WB)问题的效率。我们的第一个贡献是分析表明,这些方法在理论和实践上都产生了最先进的收敛速度。接下来,我们将Malitsky和Pock在2018年提出的带有linesearch的HPD算法扩展到对偶空间具有Bregman散度,并且对偶函数相对强凸到Bregman核的设置。这种扩展产生了一种基于目标平滑的OT和WB问题的新方法,该方法也实现了最先进的收敛速度。最后,我们引入了一种新的基于比例熵函数的Bregman散度,该散度使算法在数值上稳定,并减少了平滑,从而导致OT和WB问题的稀疏解。我们用数值实验和比较来补充我们的发现。
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Accelerated Bregman Primal-Dual Methods Applied to Optimal Transport and Wasserstein Barycenter Problems
This paper discusses the efficiency of Hybrid Primal-Dual (HPD) type algorithms to approximate solve discrete Optimal Transport (OT) and Wasserstein Barycenter (WB) problems, with and without entropic regularization. Our first contribution is an analysis showing that these methods yield state-of-the-art convergence rates, both theoretically and practically. Next, we extend the HPD algorithm with linesearch proposed by Malitsky and Pock in 2018 to the setting where the dual space has a Bregman divergence, and the dual function is relatively strongly convex to the Bregman's kernel. This extension yields a new method for OT and WB problems based on smoothing of the objective that also achieves state-of-the-art convergence rates. Finally, we introduce a new Bregman divergence based on a scaled entropy function that makes the algorithm numerically stable and reduces the smoothing, leading to sparse solutions of OT and WB problems. We complement our findings with numerical experiments and comparisons.
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