SPDE Methods for Nonparametric Bayesian Posterior Contraction and Laplace Approximation
Machine Learning
2026-03-25 v1 Machine Learning
Statistics Theory
Statistics Theory
Abstract
We derive posterior contraction rates (PCRs) and finite-sample Bernstein von Mises (BvM) results for non-parametric Bayesian models by extending the diffusion-based framework of Mou et al. (2024) to the infinite-dimensional setting. The posterior is represented as the invariant measure of a Langevin stochastic partial differential equation (SPDE) on a separable Hilbert space, which allows us to control posterior moments and obtain non-asymptotic concentration rates in Hilbert norms under various likelihood curvature and regularity conditions. We also establish a quantitative Laplace approximation for the posterior. The theory is illustrated in a nonparametric linear Gaussian inverse problem.
Cite
@article{arxiv.2603.22468,
title = {SPDE Methods for Nonparametric Bayesian Posterior Contraction and Laplace Approximation},
author = {Enric Alberola-Boloix and Ioar Casado-Telletxea},
journal= {arXiv preprint arXiv:2603.22468},
year = {2026}
}
Comments
32 pages, under review