Convergence of Langevin MCMC in KL-divergence

Abstract

Langevin diffusion is a commonly used tool for sampling from a given distribution. In this work, we establish that when the target density p* is such that p* is L smooth and m strongly convex, discrete Langevin diffusion produces a distribution p with KL(p||p*)≤ ε in O(dε) steps, where d is the dimension of the sample space. We also study the convergence rate when the strong-convexity assumption is absent. By considering the Langevin diffusion as a gradient flow in the space of probability distributions, we obtain an elegant analysis that applies to the stronger property of convergence in KL-divergence and gives a conceptually simpler proof of the best-known convergence results in weaker metrics.