An Efficient Sampling Algorithm for Non-smooth Composite Potentials

Abstract

We consider the problem of sampling from a density of the form p(x) (-f(x)- g(x)), where f: Rd → R is a smooth and strongly convex function and g: Rd → R is a convex and Lipschitz function. We propose a new algorithm based on the Metropolis-Hastings framework, and prove that it mixes to within TV distance of the target density in at most O(d (d/)) iterations. This guarantee extends previous results on sampling from distributions with smooth log densities (g = 0) to the more general composite non-smooth case, with the same mixing time up to a multiple of the condition number. Our method is based on a novel proximal-based proposal distribution that can be efficiently computed for a large class of non-smooth functions g.