Randomized Runge-Kutta-Nystr\"om Methods for Unadjusted Hamiltonian and Kinetic Langevin Monte Carlo
Abstract
We introduce 5/2- and 7/2-order L2-accurate randomized Runge-Kutta-Nystr\"om methods, tailored for approximating Hamiltonian flows within non-reversible Markov chain Monte Carlo samplers, such as unadjusted Hamiltonian Monte Carlo and unadjusted kinetic Langevin Monte Carlo. We establish quantitative 5/2-order L2-accuracy upper bounds under gradient and Hessian Lipschitz assumptions on the potential energy function. The numerical experiments demonstrate the superior efficiency of the proposed unadjusted samplers on a variety of well-behaved, high-dimensional target distributions.
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