Convergence of kinetic Langevin samplers for non-convex potentials

Abstract

We study three kinetic Langevin samplers including the Euler discretization, the BU and the UBU splitting scheme. We provide contraction results in L1-Wasserstein distance for non-convex potentials. These results are based on a carefully tailored distance function and an appropriate coupling construction. Additionally, the error in the L1-Wasserstein distance between the true target measure and the invariant measure of the discretization scheme is bounded. To get an -accuracy in L1-Wasserstein distance, we show complexity guarantees of order O(d/) for the Euler scheme and O(d1/4/) for the UBU scheme under appropriate assumptions on the target measure. The results are applicable to interacting particle systems and provide bounds for sampling probability measures of mean-field type.

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