The contact process with dynamic edges on $\mathbb{Z}$
Abstract
We study the contact process running in the one-dimensional lattice undergoing dynamical percolation, where edges open at rate and close at rate . Our goal is to explore how the speed of the environment, , affects the behavior of the process. We show in particular that for small enough the process dies out, while for large the process behaves like a contact process on with rate , so it survives if is large. We also show that if and are small then the network becomes immune, in the sense that the process dies out for any infection rate , while if is sufficiently close to then for all survival is possible for large enough .
Cite
@article{arxiv.1905.02641,
title = {The contact process with dynamic edges on $\mathbb{Z}$},
author = {Amitai Linker and Daniel Remenik},
journal= {arXiv preprint arXiv:1905.02641},
year = {2020}
}
Comments
14 pages, 4 figures. New results were added about the extinction time of the process and about extensions to general vertex-transitive graphs. To appear in the Electronic Journal of Probability