On Kemeny's constant for trees with fixed order and diameter

Abstract

Kemeny's constant (G) of a connected graph G is a measure of the expected transit time for the random walk associated with G. In the current work, we consider the case when G is a tree, and, in this setting, we provide lower and upper bounds for (G) in terms of the order n and diameter δ of G by using two different techniques. The lower bound is given as Kemeny's constant of a particular caterpillar tree and, as a consequence, it is sharp. The upper bound is found via induction, by repeatedly removing pendent vertices from G. By considering a specific family of trees - the broom-stars - we show that the upper bound is asymptotically sharp.