Forward-KL Convergence of Time-Inhomogeneous Langevin Diffusions

arXiv:2601.22349v1 Announce Type: new
Abstract: Many practical samplers rely on time-dependent drifts — often induced by annealing or tempering schedules — to improve exploration and stability. This motivates a unified non-asymptotic analysis of the corresponding Langevin diffusions and their discretizations. We provide a convergence analysis that includes non-asymptotic bounds for the continuous-time diffusion and its Euler–Maruyama discretization in the forward-Kullback–Leibler divergence under a single set of abstract conditions on the time-dependent drift. The results apply to many practically-relevant annealing schemes, including geometric tempering and annealed Langevin sampling. In addition, we provide numerical experiments comparing the annealing schemes covered by our theory in low- and high-dimensional settings.