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Autori principali: Jaffe, Adam Quinn, Raban, Daniel
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2509.21616
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author Jaffe, Adam Quinn
Raban, Daniel
author_facet Jaffe, Adam Quinn
Raban, Daniel
contents Many results in probability (most famously, Strassen's theorem on stochastic domination), characterize some relationship between probability distributions in terms of the existence of a particular structured coupling between them. Optimal transport, and in particular Kantorovich duality, provides a framework for formally unifying these results, but the standard duality theory requires topological conditions that are not satisfied in some settings. In this work, we investigate the extent to which Kantorovich duality still provides meaningful connections between distributional relations and their coupling counterparts, in the topologically irregular setting. Towards this end, we show that Strassen's theorem ``nearly holds'' for topologically irregular orders but that the full theorem admits counterexamples. The core of the proof is a novel technical result in optimal transport, which shows that the Kantorovich dual problem is well-behaved for optimal transport problems whose cost functions can be written as a non-increasing limit of lower semi-continuous functions.
format Preprint
id arxiv_https___arxiv_org_abs_2509_21616
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Coupling Theory, Optimal Transport, and Strassen's Theorem Beyond Regular Orders
Jaffe, Adam Quinn
Raban, Daniel
Probability
60A10, 28A35, 90C46
Many results in probability (most famously, Strassen's theorem on stochastic domination), characterize some relationship between probability distributions in terms of the existence of a particular structured coupling between them. Optimal transport, and in particular Kantorovich duality, provides a framework for formally unifying these results, but the standard duality theory requires topological conditions that are not satisfied in some settings. In this work, we investigate the extent to which Kantorovich duality still provides meaningful connections between distributional relations and their coupling counterparts, in the topologically irregular setting. Towards this end, we show that Strassen's theorem ``nearly holds'' for topologically irregular orders but that the full theorem admits counterexamples. The core of the proof is a novel technical result in optimal transport, which shows that the Kantorovich dual problem is well-behaved for optimal transport problems whose cost functions can be written as a non-increasing limit of lower semi-continuous functions.
title Coupling Theory, Optimal Transport, and Strassen's Theorem Beyond Regular Orders
topic Probability
60A10, 28A35, 90C46
url https://arxiv.org/abs/2509.21616