BM$^2$: Coupled Schrödinger Bridge Matching

arXiv - STAT - Machine Learning Pub Date : 2024-09-14 DOI:arxiv-2409.09376
Stefano Peluchetti
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引用次数: 0

Abstract

A Schr\"{o}dinger bridge establishes a dynamic transport map between two target distributions via a reference process, simultaneously solving an associated entropic optimal transport problem. We consider the setting where samples from the target distributions are available, and the reference diffusion process admits tractable dynamics. We thus introduce Coupled Bridge Matching (BM$^2$), a simple \emph{non-iterative} approach for learning Schr\"{o}dinger bridges with neural networks. A preliminary theoretical analysis of the convergence properties of BM$^2$ is carried out, supported by numerical experiments that demonstrate the effectiveness of our proposal.
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BM$^2$:耦合薛定谔桥匹配
薛定谔桥通过参考过程在两个目标分布之间建立动态传输映射,同时求解相关的熵优化传输问题。我们考虑的情况是,目标分布的样本是可用的,并且参考扩散过程具有可控的动态性。因此,我们引入了耦合桥匹配(Coupled BridgeMatching,BM$^2$),这是一种利用神经网络学习施罗丁格桥的简单迭代方法。我们对 BM$^2$ 的收敛特性进行了初步的理论分析,并通过数值实验证明了我们建议的有效性。
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arXiv - STAT - Machine Learning
arXiv - STAT - Machine Learning
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