Jeffrey J. Hunter
Published 2012-08-23Version 1
In a finite state irreducible Markov chain with stationary probabilities \pi_i and mean first passage times m_(ij) (mean recurrence time when i = j) it was first shown by Kemeny and Snell (1960) that \sum_j \pi_j m_(ij) is a constant K, not depending on i. This constant has since become known as Kemeny's constant. A variety of techniques for finding expressions and various bounds for K are derived. The main interpretation focuses on its role as the expected time to mixing in a Markov chain. Various applications are considered including perturbation results, mixing on directed graphs and its relation to the Kirchhoff index of regular graphs.
Comments: 13 pages
Journal: Communications in Statistics - Theory and Methods, 43:7, 1309-1321, 2014
A Note on the Bias and Kemeny's Constant in Markov Reward Processes with an Application to Markov Chain Perturbation
Kemeny's constant and the Lemoine point of a simplex
The Computation of Key Properties of Markov Chains via Perturbations
![QR code for arXiv:1208.4716 [math.PR]](http://oss.arxitics.com/images/favicon.svg)