Spectral norm bounds for block Markov chain random matrices

Abstract

This paper quantifies the asymptotic order of the largest singular value of a centered random matrix built from the path of a Block Markov Chain (BMC). In a BMC there are n labeled states, each state is associated to one of K clusters, and the probability of a jump depends only on the clusters of the origin and destination. Given a path X0, X1, …, XTn started from equilibrium, we construct a random matrix N that records the number of transitions between each pair of states. We prove that if ω(n) = Tn = o(n2), then \| N - E[N] \| = P(Tn/n). We also prove that if Tn = (n n), then \| N - E[N] \| = OP(Tn/n) as n ∞; and if Tn = ω(n), a sparser regime, then \| N - E[N] \| = OP(Tn/n). Here, N is a regularization that zeroes out entries corresponding to jumps to and from most-often visited states. Together this establishes that the order is P(Tn/n) for BMCs.