An Optimal Control Perspective on Diffusion-Based Generative Modeling

Abstract

We establish a connection between stochastic optimal control and generative models based on stochastic differential equations (SDEs) such as recently developed diffusion probabilistic models. In particular, we derive a Hamilton-Jacobi-Bellman equation that governs the evolution of the log-densities of the underlying SDE marginals. This perspective allows to transfer methods from optimal control theory to generative modeling. First, we show that the evidence lower bound is a direct consequence of the well-known verification theorem from control theory. Further, we develop a novel diffusion-based method for sampling from unnormalized densities -- a problem frequently occurring in statistics and computational sciences.

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Cite

Text

Berner et al. "An Optimal Control Perspective on Diffusion-Based Generative Modeling." NeurIPS 2022 Workshops: SBM, 2022.

Markdown

[Berner et al. "An Optimal Control Perspective on Diffusion-Based Generative Modeling." NeurIPS 2022 Workshops: SBM, 2022.](https://mlanthology.org/neuripsw/2022/berner2022neuripsw-optimal/)

BibTeX

@inproceedings{berner2022neuripsw-optimal,
  title     = {{An Optimal Control Perspective on Diffusion-Based Generative Modeling}},
  author    = {Berner, Julius and Richter, Lorenz and Ullrich, Karen},
  booktitle = {NeurIPS 2022 Workshops: SBM},
  year      = {2022},
  url       = {https://mlanthology.org/neuripsw/2022/berner2022neuripsw-optimal/}
}