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Main Authors: Reber, Alexandre, Sabourin, Anne, Segers, Johan, de Valk, Cees
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.10491
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author Reber, Alexandre
Sabourin, Anne
Segers, Johan
de Valk, Cees
author_facet Reber, Alexandre
Sabourin, Anne
Segers, Johan
de Valk, Cees
contents We study cyclically monotone transport plans between measures in $\mathrm{M}_0(\mathbb{R}^d)$, the class of Borel measures on $\mathbb{R}^d \setminus \{0\}$ that are finite on sets bounded away from the origin but may have infinite total mass. We avoid moment assumptions and allow the transport cost to be infinite. This framework naturally arises for exponent measures in multivariate regular variation and includes other examples such as Lévy measures. We introduce the notion of a zero-coupling and establish existence of cyclically monotone zero-couplings for arbitrary pairs of measures in $\mathrm{M}_0(\mathbb{R}^d)$. Under a Hausdorff-dimension condition on the first measure and when at least one of the two measures has infinite mass, we prove uniqueness of the cyclically monotone zero-coupling, yielding an analogue of the Brenier--McCann theorem in this infinite-measure setting. We further derive a representation of such couplings through gradients of closed convex functions and identify conditions under which the zero-coupling is proper in the sense that the second measure is equal to the restriction to the punctured space of the push-forward of the first measure by a cyclically monotone transport map. Finally, we apply these results to regularly varying probability measures. We show that a cyclically monotone coupling between two such distributions admits a tail limit that coincides with the unique proper cyclically monotone zero-coupling between the corresponding exponent measures.
format Preprint
id arxiv_https___arxiv_org_abs_2605_10491
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Zero-couplings of infinite measures with cyclically monotone support and multivariate regular variation
Reber, Alexandre
Sabourin, Anne
Segers, Johan
de Valk, Cees
Probability
Statistics Theory
49Q22 (Primary), 62G32 (Secondary)
We study cyclically monotone transport plans between measures in $\mathrm{M}_0(\mathbb{R}^d)$, the class of Borel measures on $\mathbb{R}^d \setminus \{0\}$ that are finite on sets bounded away from the origin but may have infinite total mass. We avoid moment assumptions and allow the transport cost to be infinite. This framework naturally arises for exponent measures in multivariate regular variation and includes other examples such as Lévy measures. We introduce the notion of a zero-coupling and establish existence of cyclically monotone zero-couplings for arbitrary pairs of measures in $\mathrm{M}_0(\mathbb{R}^d)$. Under a Hausdorff-dimension condition on the first measure and when at least one of the two measures has infinite mass, we prove uniqueness of the cyclically monotone zero-coupling, yielding an analogue of the Brenier--McCann theorem in this infinite-measure setting. We further derive a representation of such couplings through gradients of closed convex functions and identify conditions under which the zero-coupling is proper in the sense that the second measure is equal to the restriction to the punctured space of the push-forward of the first measure by a cyclically monotone transport map. Finally, we apply these results to regularly varying probability measures. We show that a cyclically monotone coupling between two such distributions admits a tail limit that coincides with the unique proper cyclically monotone zero-coupling between the corresponding exponent measures.
title Zero-couplings of infinite measures with cyclically monotone support and multivariate regular variation
topic Probability
Statistics Theory
49Q22 (Primary), 62G32 (Secondary)
url https://arxiv.org/abs/2605.10491