Burning a Graph is Hard
arXiv:1511.06774
Abstract
Graph burning is a model for the spread of social contagion. The burning number is a graph parameter associated with graph burning that measures the speed of the spread of contagion in a graph; the lower the burning number, the faster the contagion spreads. We prove that the corresponding graph decision problem is \textbf{NP}-complete when restricted to acyclic graphs with maximum degree three, spider graphs and path-forests. We provide polynomial time algorithms for finding the burning number of spider graphs and path-forests if the number of arms and components, respectively, are fixed.
20 Pages, 4 figures, presented at GRASTA-MAC 2015 (October 19-23rd, 2015, Montréal, Canada)