Saved in:
Bibliographic Details
Main Author: Singh, R. K.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2405.00475
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866910623953059840
author Singh, R. K.
author_facet Singh, R. K.
contents In the barrier escape problem, a random searcher starting at the energy minima tries to escape the barrier under the effect of thermal fluctuations. If the random searcher is subject to successive restarts at the bottom of the well, then its escape over the barrier top is delayed compared to the time it would take in absence of restarts. When restarting at an intermediate location, the time required by the random searcher to go from the bottom of the well to the restart location should be considered. Taking into account this time overhead, we find that restarts delay escape, independent of the specific nature of the distribution of restart times, or the location of restart, or the specific details of the random searcher. For the special case of Poisson restarts, we study the escape problem for a Brownian particle with a position-dependent restart rate $r(x)θ(x^p_0-x)$, with $x^p_0$ being the location of restart. We find that position-dependent restarts delay the escape as compared to Kramers escape time. We also study ways of modifying time overheads which help expedite escape under restarts.
format Preprint
id arxiv_https___arxiv_org_abs_2405_00475
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Restarts delay escape over a potential barrier
Singh, R. K.
Statistical Mechanics
In the barrier escape problem, a random searcher starting at the energy minima tries to escape the barrier under the effect of thermal fluctuations. If the random searcher is subject to successive restarts at the bottom of the well, then its escape over the barrier top is delayed compared to the time it would take in absence of restarts. When restarting at an intermediate location, the time required by the random searcher to go from the bottom of the well to the restart location should be considered. Taking into account this time overhead, we find that restarts delay escape, independent of the specific nature of the distribution of restart times, or the location of restart, or the specific details of the random searcher. For the special case of Poisson restarts, we study the escape problem for a Brownian particle with a position-dependent restart rate $r(x)θ(x^p_0-x)$, with $x^p_0$ being the location of restart. We find that position-dependent restarts delay the escape as compared to Kramers escape time. We also study ways of modifying time overheads which help expedite escape under restarts.
title Restarts delay escape over a potential barrier
topic Statistical Mechanics
url https://arxiv.org/abs/2405.00475