Random reversible Markov matrices with tunable extremal eigenvalues

Abstract

Random sampling of large Markov matrices with a tunable spectral gap, a nonuniform stationary distribution, and a nondegenerate limiting empirical spectral distribution (ESD) is useful. Fix c>0 and p>0. Let An be the adjacency matrix of a random graph following G(n, p/n), known as the Erdos-R\'enyi distribution. Add c/n to each entry of An and then normalize its rows. It is shown that the resulting Markov matrix has the desired properties. Its ESD weakly converges in probability to a symmetric nondegenerate distribution, and its extremal eigenvalues, other than 1, fall in [-1/1+c/k,-b] [b,1/1+c/k] for any 0< b < 1/1+c, where k = p + 1. Thus, for p∈ (0,1), the spectral gap tends to 1-1/1+c.