A computable bound of the essential spectral radius of finite range Metropolis--Hastings kernels

Abstract

Let π be a positive continuous target density on R. Let P be the Metropolis-Hastings operator on the Lebesgue space L2(π) corresponding to a proposal Markov kernel Q on R. When using the quasi-compactness method to estimate the spectral gap of P, a mandatory first step is to obtain an accurate bound of the essential spectral radius r\ess(P) of P. In this paper a computable bound of r\ess(P) is obtained under the following assumption on the proposal kernel: Q has a bounded continuous density q(x,y) on R2 satisfying the following finite range assumption : |u| s \, ⇒\, q(x,x+u) = 0 (for some s0). This result is illustrated with Random Walk Metropolis-Hastings kernels.