On average hitting time and Kemeny's constant for weighted trees

Abstract

For a connected graph G, the average hitting time α(G) and the Kemeny's constant (G) are two similar quantities, both measuring the time for the random walk on G to travel between two randomly chosen vertices. We prove that, among all weighted trees whose edge weights form a fixed multiset, α is maximized by a special type of ``polarized'' paths and is minimized by a unique weighted star graph. We also obtain a similar characterization of the -maximizing and -minimizing elements among such a collection of weighted trees. Our proofs are based on the forest formulas for α and .