A Malliavin-Gamma calculus approach to Score Based Diffusion Generative models for random fields
Abstract
We adopt a Gamma and Malliavin Calculi point of view in order to generalize Score-based diffusion Generative Models (SGMs) to an infinite-dimensional abstract Hilbertian setting. Particularly, we define the forward noising process using Dirichlet forms associated to the Cameron-Martin space of Gaussian measures and Wiener chaoses; whereas by relying on an abstract time-reversal formula, we show that the score function is a Malliavin derivative and it corresponds to a conditional expectation. This allows us to generalize SGMs to the infinite-dimensional setting. Moreover, we extend existing finite-dimensional entropic convergence bounds to this Hilbertian setting by highlighting the role played by the Cameron-Martin norm in the Fisher information of the data distribution. Lastly, we specify our discussion for spherical random fields, considering as source of noise a Whittle-Mat\'ern random spherical field.
Cite
@article{arxiv.2505.13189,
title = {A Malliavin-Gamma calculus approach to Score Based Diffusion Generative models for random fields},
author = {Giacomo Greco},
journal= {arXiv preprint arXiv:2505.13189},
year = {2025}
}
Comments
26 pages, amended typos and added a simulation of the forward noising process for the spherical fields example