The Dirichlet Markov Ensemble

Abstract

We equip the polytope of n× n Markov matrices with the normalized trace of the Lebesgue measure of Rn2. This probability space provides random Markov matrices, with i.i.d. rows following the Dirichlet distribution of mean (1/n,...,1/n). We show that if is such a random matrix, then the empirical distribution built from the singular values ofn tends as n∞ to a Wigner quarter--circle distribution. Some computer simulations reveal striking asymptotic spectral properties of such random matrices, still waiting for a rigorous mathematical analysis. In particular, we believe that with probability one, the empirical distribution of the complex spectrum of n tends as n∞ to the uniform distribution on the unit disc of the complex plane, and that moreover, the spectral gap of is of order 1-1/n when n is large.