English

Hessian-Free High-Resolution Nesterov Acceleration for Sampling

Machine Learning 2022-06-22 v4 Numerical Analysis Numerical Analysis Machine Learning

Abstract

Nesterov's Accelerated Gradient (NAG) for optimization has better performance than its continuous time limit (noiseless kinetic Langevin) when a finite step-size is employed \citep{shi2021understanding}. This work explores the sampling counterpart of this phenonemon and proposes a diffusion process, whose discretizations can yield accelerated gradient-based MCMC methods. More precisely, we reformulate the optimizer of NAG for strongly convex functions (NAG-SC) as a Hessian-Free High-Resolution ODE, change its high-resolution coefficient to a hyperparameter, inject appropriate noise, and discretize the resulting diffusion process. The acceleration effect of the new hyperparameter is quantified and it is not an artificial one created by time-rescaling. Instead, acceleration beyond underdamped Langevin in W2W_2 distance is quantitatively established for log-strongly-concave-and-smooth targets, at both the continuous dynamics level and the discrete algorithm level. Empirical experiments in both log-strongly-concave and multi-modal cases also numerically demonstrate this acceleration.

Cite

@article{arxiv.2006.09230,
  title  = {Hessian-Free High-Resolution Nesterov Acceleration for Sampling},
  author = {Ruilin Li and Hongyuan Zha and Molei Tao},
  journal= {arXiv preprint arXiv:2006.09230},
  year   = {2022}
}
R2 v1 2026-06-23T16:22:35.709Z