The spread of fire on a random multigraph

TL;DR

This paper models the spread of fire on a random multigraph with variable degrees and edge lengths, analyzing the number of fires needed and burnt points, revealing asymptotic behaviors linked to Brownian motion.

Contribution

It introduces a probabilistic fire spread model on multigraphs with degree-dependent fire transmission, providing asymptotic distributions for key quantities as the graph size grows.

Findings

Quantifies the number of fires needed to burn the entire network.

Characterizes the distribution of burnt points from different directions.

Links the model's behavior to Brownian motion functionals.

Abstract

We study a model for the destruction of a random network by fire. Suppose that we are given a multigraph of minimum degree at least 2 having real-valued edge-lengths. We pick a uniform point from along the length and set it alight; the edges of the multigraph burn at speed 1. If the fire reaches a vertex of degree 2, the fire gets directly passed on to the neighbouring edge; a vertex of degree at least 3, however, passes the fire either to all of its neighbours or none, each with probability $1/2$. If the fire goes out before the whole network is burnt, we again set fire to a uniform point. We are interested in the number of fires which must be set in order to burn the whole network, and the number of points which are burnt from two different directions. We analyse these quantities for a random multigraph having $n$ vertices of degree 3 and $\alpha(n)$ vertices of degree 4, where $\alpha(n)/n \to 0$ as $n \to \infty$, with i.i.d. standard exponential edge-lengths. Depending on whether $\alpha(n) \gg \sqrt{n}$ or $\alpha(n)=O(\sqrt{n})$, we prove that as $n \to \infty$ these quantities converge jointly in distribution when suitably rescaled to either a pair of constants or to (complicated) functionals of Brownian motion. We use our analysis of this model to make progress towards a conjecture of Aronson, Frieze and Pittel concerning the number of vertices which remain unmatched when we use the Karp-Sipser algorithm to find a matching on the Erd\H{o}s-R\'enyi random graph.