Cops, robbers, and burning bridges

Abstract

We consider a variant of Cops and Robbers wherein each edge traversed by the robber is deleted from the graph. The focus is on determining the minimum number of cops needed to capture a robber on a graph G, called the bridge-burning cop number of G and denoted cb(G). We determine cb(G) exactly for several elementary classes of graphs and give a polynomial-time algorithm to compute cb(T) when T is a tree. We also study two-dimensional square grids and tori, as well as hypercubes, and we give bounds on the capture time of a graph (the minimum number of rounds needed for a single cop to capture a robber on G, provided that cb(G) = 1).