English

Product of Gaussian Mixture Diffusion Models

Image and Video Processing 2024-01-11 v2

Abstract

In this work we tackle the problem of estimating the density fX f_X of a random variable X X by successive smoothing, such that the smoothed random variable Y Y fulfills the diffusion partial differential equation (tΔ1)fY(,t)=0 (\partial_t - \Delta_1)f_Y(\,\cdot\,, t) = 0 with initial condition fY(,0)=fX f_Y(\,\cdot\,, 0) = f_X . We propose a product-of-experts-type model utilizing Gaussian mixture experts and study configurations that admit an analytic expression for fY(,t) f_Y (\,\cdot\,, t) . In particular, with a focus on image processing, we derive conditions for models acting on filter-, wavelet-, and shearlet responses. Our construction naturally allows the model to be trained simultaneously over the entire diffusion horizon using empirical Bayes. We show numerical results for image denoising where our models are competitive while being tractable, interpretable, and having only a small number of learnable parameters. As a byproduct, our models can be used for reliable noise level estimation, allowing blind denoising of images corrupted by heteroscedastic noise.

Keywords

Cite

@article{arxiv.2310.12653,
  title  = {Product of Gaussian Mixture Diffusion Models},
  author = {Martin Zach and Erich Kobler and Antonin Chambolle and Thomas Pock},
  journal= {arXiv preprint arXiv:2310.12653},
  year   = {2024}
}
R2 v1 2026-06-28T12:55:28.647Z