Starving Random Walks
Abstract
In this chapter, we review recent results on the starving random walk (RW) problem, a minimal model for resource-limited exploration. Initially, each lattice site contains a single food unit, which is consumed upon visitation by the RW. The RW starves whenever it has not found any food unit within the previous steps. To address this problem, the key observable corresponds to the inter-visit time defined as the time elapsed between the finding of the and the food unit. By characterizing the maximum of the inter-visit times , we will see how to obtain the number of food units collected at starvation, as well as the lifetime of the starving RW.
Keywords
Cite
@article{arxiv.2406.14248,
title = {Starving Random Walks},
author = {Léo Régnier and Maxim Dolgushev and Olivier Bénichou},
journal= {arXiv preprint arXiv:2406.14248},
year = {2024}
}
Comments
21 pages, 5 figures. Contribution to the book "The Mathematics of Movement: an Interdisciplinary Approach to Mutual Challenges in Animal Ecology and Cell Biology" edited by Luca Giuggioli and Philip Maini