Operator splitting based diffusion samplers and improved convergence analysis

Abstract

In this paper, we develop a class of samplers for the diffusion model using the operator-splitting technique. The linear drift term and the nonlinear score-driven drift of the probability flow ordinary differential equation are split and applied by flow maps alternatively. Moreover, we conduct detailed analyses for the second-order sampler, establishing a non-asymptotic total variation distance error bound of order O(d/T2+dscore+dJac), where d is the data dimension; T is the number of sampling steps; score and Jac measure the discrepancy between the actual score function and learned score function. Our bound is sharper than existing works, yielding bounds of O(dp/T2) with some p>1 for specific second-order samplers. Numerical experiments on a two-dimensional synthetic dataset corroborate the established quadratic dependence on the step size 1/T in the error bound.