Necessary and sufficient conditions for a nonnegative matrix to be strongly R-positive

Abstract

Using the Perron-Frobenius eigenfunction and eigenvalue, each finite irreducible nonnegative matrix A can be transformed into a probability kernel P. This was generalized by David Vere-Jones who gave necessary and sufficient conditions for a countably infinite irreducible nonnegative matrix A to be transformable into a recurrent probability kernel P, and showed uniqueness of P. Such A are called R-recurrent. Let us say that A is strongly R-positive if the return times of the Markov chain with kernel P have exponential moments of some positive order. Then it is known that strong R-positivity is equivalent to the property that lowering the value of finitely many entries of A lowers the spectral radius. This paper gives a short and largely self-contained proof of this fact.