Litcius/Paper detail

The Contact Process on Random Graphsand Galton Watson Trees

Xiangying Huang, Rick Durrett

2020Latin American Journal of Probability and Mathematical Statistics24 citationsDOI

Abstract

The key to our investigation is an improved (and in a sense sharp) understanding of the survival time of the contact process on star graphs. Using these results, we show that for the contact process on Galton-Watson trees, when the offspring distribution (i) is subexponential the critical value for local survival $\lambda_2=0$ and (ii) when it is geometric($p$) we have $\lambda_2 \le C_p$, where the $C_p$ are much smaller than previous estimates. We also study the critical value $\lambda_c(n)$ for "prolonged persistence" on graphs with $n$ vertices generated by the configuration model. In the case of power law and stretched exponential distributions where it is known $\lambda_c(n) \to 0$ we give estimates on the rate of convergence. Physicists tell us that $\lambda_c(n) \sim 1/\Lambda(n)$ where $\Lambda(n)$ is the maximum eigenvalue of the adjacency matrix. Our results show that this is not correct.

Topics & Concepts

MathematicsRandom graphWatsonCombinatoricsComputer scienceArtificial intelligenceGraphStochastic processes and statistical mechanicsComplex Network Analysis TechniquesTheoretical and Computational Physics