Metastability for the contact process on the preferential attachment graph
Probability
2017-02-23 v3
Abstract
We consider the contact process on the preferential attachment graph. The work of Berger, Borgs, Chayes and Saberi [BBCS1] confirmed physicists predictions that the contact process starting from a typical vertex becomes endemic for an arbitrarily small infection rate with positive probability. More precisely, they showed that with probability , it survives for a time exponential in the largest degree. Here we obtain sharp bounds for the density of infected sites at a time close to exponential in the number of vertices (up to some logarithmic factor).
Cite
@article{arxiv.1502.05633,
title = {Metastability for the contact process on the preferential attachment graph},
author = {Van Hao Can},
journal= {arXiv preprint arXiv:1502.05633},
year = {2017}
}
Comments
45 pages; accepted for publication in Internet Mathematics