Universality of the Langevin diffusion as scaling limit of a family of Metropolis-Hastings processes I: fixed dimension

Abstract

Given a target distribution μ on a general state space X and a proposal Markov jump process with generator Q, the purpose of this paper is to investigate two universal properties enjoyed by two types of Metropolis-Hastings (MH) processes with generators M1(Q,μ) and M2(Q,μ) respectively. First, we motivate our study of M2 by offering a geometric interpretation of M1, M2 and their convex combinations as L1 minimizers between Q and the set of μ-reversible generators of Markov jump processes. Second, specializing into the case of X = Rd along with a Gaussian proposal with vanishing variance and Gibbs target distribution, we prove that, upon appropriate scaling in time, the family of Markov jump processes corresponding to M1, M2 or their convex combinations all converge weakly to an universal Langevin diffusion. While M1 and M2 are seemingly different stochastic dynamics, it is perhaps surprising that they share these two universal properties. These two results are known for M1 in Billera and Diaconis (2001) and Gelfand and Mitter (1991), and the counterpart results for M2 and their convex combinations are new.