Non-asymptotic Analysis of Poisson randomized midpoint Langevin Monte Carlo

Abstract

The task of sampling from a high-dimensional distribution π on d is a fundamental algorithmic problem with applications throughout statistics, engineering, and the sciences. Consider the Langevin diffusion on d align* Xt=-∇ U(Xt)dt+2dBt, align* under mild conditions, it admits π( x) (-U(x)) x as its unique stationary distribution. Recently, Kandasamy and Nagaraj (2024) introduced a stochastic algorithm called Poisson Randomized Midpoint Langevin Monte Carlo (PRLMC) to enhance the rate of convergence towards the target distribution π. In this paper, we first show that under mild conditions, the PRLMC, as a Markov chain, admits a unique stationary distribution πη (η is the step size) and obtain the convergence rate of PRLMC to πη in total variation distance. Then we establish a sharp error bound between πη and π under the 2-Wasserstein distance. Finally, we propose a decreasing-step size version of PRLMC and provide its convergence rate to π which is nearly optimal.

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