Random Walks and the Meeting Time for Trees

Abstract

Consider a random walk on a tree G=(V,E). For v,w ∈ V, let the hitting time H(v,w) denote the expected number of steps required for the random walk started at v to reach w, and let πv = deg(v)/2|E| denote the stationary distribution for the random walk. We characterize the extremal tree structures for the meeting time Tmeet(G) = w ∈ V Σv ∈ V πv H(v,w). For fixed order n and diameter d, the meeting time is maximized by the broom graph. The meeting time is minimized by the balanced double broom graph, or a slight variant, depending on the relative parities of n and d.