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Main Authors: Ojeda, Gabriel Berzunza, Yen, Ju-Yi
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.08576
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author Ojeda, Gabriel Berzunza
Yen, Ju-Yi
author_facet Ojeda, Gabriel Berzunza
Yen, Ju-Yi
contents Path transformations are fundamental to the study of Brownian motion and related stochastic processes, offering elegant constructions of the Brownian bridge, meander, and excursion. Central to this theory is the well-established link between Brownian motion and the $3$-dimensional Bessel process ${\rm BES}(3)$. This paper is specifically motivated by Pitman and Yor (2003), who showed that a ${\rm BES}(3)$ process can be constructed by excising the excursions of a Brownian path below its past maximum that reach zero and concatenating the remaining excursions. Our main result shows that a similar excision procedure, when applied to a Brownian bridge, can be related to a $3$-dimensional Bessel bridge.
format Preprint
id arxiv_https___arxiv_org_abs_2603_08576
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle On the excision of Brownian bridge paths
Ojeda, Gabriel Berzunza
Yen, Ju-Yi
Probability
Path transformations are fundamental to the study of Brownian motion and related stochastic processes, offering elegant constructions of the Brownian bridge, meander, and excursion. Central to this theory is the well-established link between Brownian motion and the $3$-dimensional Bessel process ${\rm BES}(3)$. This paper is specifically motivated by Pitman and Yor (2003), who showed that a ${\rm BES}(3)$ process can be constructed by excising the excursions of a Brownian path below its past maximum that reach zero and concatenating the remaining excursions. Our main result shows that a similar excision procedure, when applied to a Brownian bridge, can be related to a $3$-dimensional Bessel bridge.
title On the excision of Brownian bridge paths
topic Probability
url https://arxiv.org/abs/2603.08576