Additional material on bounds of 2-spectral gap for discrete Markov chains with band transition matrices

Abstract

We analyse the 2(π)-convergence rate of irreducible and aperiodic Markov chains with N-band transition probability matrix P and with invariant distribution π. This analysis is heavily based on: first the study of the essential spectral radius r\ess(P\|2(π)) of P\|2(π) derived from Hennion's quasi-compactness criteria; second the connection between the spectral gap property (SG\2) of P on 2(π) and the V-geometric ergodicity of P. Specifically, (SG\2) is shown to hold under the condition \[α\0 := Σ\m=-NN \i→ +∞ P(i,i+m)\, P*(i+m,i)\ \, 1. \] Moreover r\ess(P\|2(π)) ≤ α\0. Simple conditions on asymptotic properties of P and of its invariant probability distribution π to ensure that α\01 are given. In particular this allows us to obtain estimates of the 2(π)-geometric convergence rate of random walks with bounded increments. The specific case of reversible P is also addressed. Numerical bounds on the convergence rate can be provided via a truncation procedure. This is illustrated on the Metropolis-Hastings algorithm.