Bounds on the Burning Number

Abstract

Motivated by a graph theoretic process intended to measure the speed of the spread of contagion in a graph, Bonato, Janssen, and Roshanbin [Burning a Graph as a Model of Social Contagion, Lecture Notes in Computer Science 8882 (2014) 13-22] define the burning number b(G) of a graph G as the smallest integer k for which there are vertices x1,…,xk such that for every vertex u of G, there is some i∈ \ 1,…,k\ with distG(u,xi)≤ k-i, and distG(xi,xj)≥ j-i for every i,j∈ \ 1,…,k\. For a connected graph G of order n, they prove that b(G)≤ 2n-1, and conjecture b(G)≤ n. We show that b(G)≤ 3219· n1-ε+2719ε and b(G)≤ 12n7+3≈ 1.309 n+3 for every connected graph G of order n and every 0<ε<1. For a tree T of order n with n2 vertices of degree 2, and n≥ 3 vertices of degree at least 3, we show b(T)≤ (n+n2)+14+12 and b(T)≤ n+n≥ 3. Furthermore, we characterize the binary trees of depth r that have burning number r+1.