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Main Authors: Pimentel, Leandro P. R., Viveros, Roberto
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.19008
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author Pimentel, Leandro P. R.
Viveros, Roberto
author_facet Pimentel, Leandro P. R.
Viveros, Roberto
contents In this article we prove a sprinkled decoupling inequality for the stationary Hammersley's interacting particle process. Inspired by the work of Baldasso and Texeira (2018), and Hilário, Kious and Texeira (2020), we apply this inequality to study two distinct problems on the top of this particle process. First, we analyze a detection problem, demonstrating that a fugitive can evade particles, provided that their jump range is sufficiently large. Second, we show that a random walk in a dynamic random environment exhibits ballistic behavior with respect to the characteristic speed of the particle system, under a weak assumption on the probability of being away of this critical speed.
format Preprint
id arxiv_https___arxiv_org_abs_2506_19008
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Sprinkled Decoupling for Hammersley's Process
Pimentel, Leandro P. R.
Viveros, Roberto
Probability
Mathematical Physics
In this article we prove a sprinkled decoupling inequality for the stationary Hammersley's interacting particle process. Inspired by the work of Baldasso and Texeira (2018), and Hilário, Kious and Texeira (2020), we apply this inequality to study two distinct problems on the top of this particle process. First, we analyze a detection problem, demonstrating that a fugitive can evade particles, provided that their jump range is sufficiently large. Second, we show that a random walk in a dynamic random environment exhibits ballistic behavior with respect to the characteristic speed of the particle system, under a weak assumption on the probability of being away of this critical speed.
title Sprinkled Decoupling for Hammersley's Process
topic Probability
Mathematical Physics
url https://arxiv.org/abs/2506.19008