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1. Verfasser: Boudabra, Maher
Format: Preprint
Veröffentlicht: 2026
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Online-Zugang:https://arxiv.org/abs/2605.25742
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author Boudabra, Maher
author_facet Boudabra, Maher
contents The present paper is devoted to a systematic study of the $p$-Brownian convergence introduced in \cite{boudabra2026stability} (in press) to study the stability of the planar Skorokhod embedding problem \cite{gross2019,Boudabra2020}. The first part is an illustration of some geometric aspects of the $p$-Brownian convergence. The second part turns this notion into a metric between domains. More precisely, we place it within the framework of optimal transport theory. Several results are obtained, namely asymptotic behavior in case of homothetic domains. Numerical illustrations are provided as well.
format Preprint
id arxiv_https___arxiv_org_abs_2605_25742
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Space-time transport of Brownian exit laws
Boudabra, Maher
Probability
60J65, 49Q22, 60G40, 30C35, 46E15
The present paper is devoted to a systematic study of the $p$-Brownian convergence introduced in \cite{boudabra2026stability} (in press) to study the stability of the planar Skorokhod embedding problem \cite{gross2019,Boudabra2020}. The first part is an illustration of some geometric aspects of the $p$-Brownian convergence. The second part turns this notion into a metric between domains. More precisely, we place it within the framework of optimal transport theory. Several results are obtained, namely asymptotic behavior in case of homothetic domains. Numerical illustrations are provided as well.
title Space-time transport of Brownian exit laws
topic Probability
60J65, 49Q22, 60G40, 30C35, 46E15
url https://arxiv.org/abs/2605.25742