On hitting time, mixing time and geometric interpretations of Metropolis-Hastings reversiblizations

Abstract

Given a target distribution μ and a proposal chain with generator Q on a finite state space, in this paper we study two types of Metropolis-Hastings (MH) generator M1(Q,μ) and M2(Q,μ) in a continuous-time setting. While M1 is the classical MH generator, we define a new generator M2 that captures the opposite movement of M1 and provide a comprehensive suite of comparison results ranging from hitting time and mixing time to asymptotic variance, large deviations and capacity, which demonstrate that M2 enjoys superior mixing properties than M1. To see that M1 and M2 are natural transformations, we offer an interesting geometric interpretation of M1, M2 and their convex combinations as 1 minimizers between Q and the set of μ-reversible generators, extending the results by Billera and Diaconis (2001). We provide two examples as illustrations. In the first one we give explicit spectral analysis of M1 and M2 for Metropolised independent sampling, while in the second example we prove a Laplace transform order of the fastest strong stationary time between birth-death M1 and M2.