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Hauptverfasser: Ikeda, Kotaro, Koyama, Masanori, Zhang, Jinzhe, Hayashi, Kohei, Fukumizu, Kenji
Format: Preprint
Veröffentlicht: 2025
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2504.03188
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author Ikeda, Kotaro
Koyama, Masanori
Zhang, Jinzhe
Hayashi, Kohei
Fukumizu, Kenji
author_facet Ikeda, Kotaro
Koyama, Masanori
Zhang, Jinzhe
Hayashi, Kohei
Fukumizu, Kenji
contents In this paper, we propose a flow-based method for learning all-to-all transfer maps among conditional distributions that approximates pairwise optimal transport. The proposed method addresses the challenge of handling the case of continuous conditions, which often involve a large set of conditions with sparse empirical observations per condition. We introduce a novel cost function that enables simultaneous learning of optimal transports for all pairs of conditional distributions. Our method is supported by a theoretical guarantee that, in the limit, it converges to the pairwise optimal transports among infinite pairs of conditional distributions. The learned transport maps are subsequently used to couple data points in conditional flow matching. We demonstrate the effectiveness of this method on synthetic and benchmark datasets, as well as on chemical datasets in which continuous physical properties are defined as conditions. The code for this project can be found at https://github.com/kotatumuri-room/A2A-FM
format Preprint
id arxiv_https___arxiv_org_abs_2504_03188
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Pairwise Optimal Transports for Training All-to-All Flow-Based Condition Transfer Model
Ikeda, Kotaro
Koyama, Masanori
Zhang, Jinzhe
Hayashi, Kohei
Fukumizu, Kenji
Machine Learning
In this paper, we propose a flow-based method for learning all-to-all transfer maps among conditional distributions that approximates pairwise optimal transport. The proposed method addresses the challenge of handling the case of continuous conditions, which often involve a large set of conditions with sparse empirical observations per condition. We introduce a novel cost function that enables simultaneous learning of optimal transports for all pairs of conditional distributions. Our method is supported by a theoretical guarantee that, in the limit, it converges to the pairwise optimal transports among infinite pairs of conditional distributions. The learned transport maps are subsequently used to couple data points in conditional flow matching. We demonstrate the effectiveness of this method on synthetic and benchmark datasets, as well as on chemical datasets in which continuous physical properties are defined as conditions. The code for this project can be found at https://github.com/kotatumuri-room/A2A-FM
title Pairwise Optimal Transports for Training All-to-All Flow-Based Condition Transfer Model
topic Machine Learning
url https://arxiv.org/abs/2504.03188