| Issue |
ESAIM: M2AN
Volume 59, Number 3, May-June 2025
|
|
|---|---|---|
| Page(s) | 1239 - 1270 | |
| DOI | https://doi.org/10.1051/m2an/2025022 | |
| Published online | 14 May 2025 | |
Flow updates for domain decomposition of entropic optimal transport
Göttingen University, Institute for Computer Science, Goldschmidtstraße 7, 37077 Göttingen, Germany
* Corresponding author: schmitzer@cs.uni-goettingen.de
Received:
16
May
2024
Accepted:
25
March
2025
Domain decomposition has been shown to be a computationally efficient distributed method for solving large scale entropic optimal transport problems. However, a naive implementation of the algorithm can freeze in the limit of very fine partition cells (i.e. it asymptotically becomes stationary and does not find the global minimizer), since information can only travel slowly between cells. In practice this can be avoided by a coarse-to-fine multiscale scheme. In this article we introduce flow updates as an alternative approach. Flow updates can be interpreted as a variant of the celebrated algorithm by Angenent, Haker, and Tannenbaum, and can be combined canonically with domain decomposition. We prove convergence to the global minimizer and provide a formal discussion of its continuity limit. We give a numerical comparison with naive and multiscale domain decomposition, and show that the flow updates prevent freezing in the regime of very many cells. While the multiscale scheme is observed to be faster than the hybrid approach in general, the latter could be a viable alternative in cases where a good initial coupling is available. Our numerical experiments are based on a novel GPU implementation of domain decomposition that we describe in the appendix.
Mathematics Subject Classification: 49M27 / 49M29 / 65B99
Key words: Optimal transport / domain decomposition / min-cost flow
© The authors. Published by EDP Sciences, SMAI 2025
This is an Open Access article distributed under the terms of the Creative Commons Attribution License (https://creativecommons.org/licenses/by/4.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
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