English

Sparse graphs are not flammable

Combinatorics 2014-06-12 v2

Abstract

In this paper, we consider the following \emph{kk-many firefighter problem} on a finite graph G=(V,E)G=(V,E). Suppose that a fire breaks out at a given vertex vVv \in V. In each subsequent time unit, a firefighter protects kk vertices which are not yet on fire, and then the fire spreads to all unprotected neighbours of the vertices on fire. The objective of the firefighter is to save as many vertices as possible. The surviving rate ρ(G)\rho(G) of GG is defined as the expected percentage of vertices that can be saved when a fire breaks out at a random vertex of GG. Let τk=k+21k+2\tau_k = k+2-\frac {1}{k+2}. We show that for any ϵ>0\epsilon >0 and k2k \ge 2, each graph GG on nn vertices with at most (τkϵ)n(\tau_k-\epsilon)n edges is not flammable; that is, ρ(G)>2ϵ5τk>0\rho(G) > \frac {2\epsilon}{5\tau_k} > 0. Moreover, a construction of a family of flammable random graphs is proposed to show that the constant τk\tau_k cannot be improved.

Cite

@article{arxiv.1201.0723,
  title  = {Sparse graphs are not flammable},
  author = {Paweł Prałat},
  journal= {arXiv preprint arXiv:1201.0723},
  year   = {2014}
}
R2 v1 2026-06-21T19:59:44.428Z