A proximal gradient algorithm for composite log-concave sampling

Abstract

We propose an algorithm to sample from composite log-concave distributions over Rd, i.e., densities of the form π e-f-g, assuming access to gradient evaluations of f and a restricted Gaussian oracle (RGO) for g. The latter requirement means that we can easily sample from the density RGOg,h,y(x) (-g(x) -12h||y-x||2), which is the sampling analogue of the proximal operator for g. If f + g is α-strongly convex and f is β-smooth, our sampler achieves error in total variation distance in O( d 4(1/)) iterations where := β/α, which matches prior state-of-the-art results for the case g=0. We further extend our results to cases where (1) π is non-log-concave but satisfies a Poincar\'e or log-Sobolev inequality, and (2) f is non-smooth but Lipschitz.