Capturing the Drunk Robber on a Graph

Abstract

We show that the expected time for a smart "cop" to catch a drunk "robber" on an n-vertex graph is at most n + o(n). More precisely, let G be a simple, connected, undirected graph with distinguished points u and v among its n vertices. A cop begins at u and a robber at v; they move alternately from vertex to adjacent vertex. The robber moves randomly, according to a simple random walk on G; the cop sees all and moves as she wishes, with the object of "capturing" the robber---that is, occupying the same vertex---in least expected time. We show that the cop succeeds in expected time no more than n + o(n). Since there are graphs in which capture time is at least n - o(n), this is roughly best possible. We note also that no function of the diameter can be a bound on capture time.