Generative Adversarial Networks: Dynamics

Matias G. Delgadino, Bruno B. Suassuna, Rene Cabrera

JMLR 2025 pp. 1-30

/jmlr/2025/delgadino2025jmlr-generative/

Abstract

We study quantitatively the overparametrization limit of the original Wasserstein-GAN algorithm. Effectively, we show that the algorithm is a stochastic discretization of a system of continuity equations for the parameter distributions of the generator and discriminator. We show that parameter clipping to satisfy the Lipschitz condition in the algorithm induces a discontinuous vector field in the mean field dynamics, which gives rise to blow-up in finite time of the mean field dynamics. We look into a specific toy example that shows that all solutions to the mean field equations converge in the long time limit to time periodic solutions, this helps explain the failure to converge of the algorithm.

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Cite

Text

Delgadino et al. "Generative Adversarial Networks: Dynamics." Journal of Machine Learning Research, 2025.

Markdown

[Delgadino et al. "Generative Adversarial Networks: Dynamics." Journal of Machine Learning Research, 2025.](https://mlanthology.org/jmlr/2025/delgadino2025jmlr-generative/)

BibTeX

@article{delgadino2025jmlr-generative,
  title     = {{Generative Adversarial Networks: Dynamics}},
  author    = {Delgadino, Matias G. and Suassuna, Bruno B. and Cabrera, Rene},
  journal   = {Journal of Machine Learning Research},
  year      = {2025},
  pages     = {1-30},
  volume    = {26},
  url       = {https://mlanthology.org/jmlr/2025/delgadino2025jmlr-generative/}
}