Towards Variational Flow Matching on General Geometries
Abstract
We introduce Riemannian Gaussian Variational Flow Matching (RG-VFM), an extension of Variational Flow Matching (VFM) that leverages Riemannian Gaussian distributions for generative modeling on structured manifolds. We derive a variational objective for probability flows on manifolds with closed-form geodesics, making RG-VFM comparable -- though fundamentally different to Riemannian Flow Matching (RFM) in this geometric setting. Experiments on a checkerboard dataset wrapped on the sphere demonstrate that RG-VFM captures geometric structure more effectively than Euclidean VFM and baseline methods, establishing it as a robust framework for manifold-aware generative modeling.
Cite
Text
Zaghen et al. "Towards Variational Flow Matching on General Geometries." ICLR 2025 Workshops: DeLTa, 2025.Markdown
[Zaghen et al. "Towards Variational Flow Matching on General Geometries." ICLR 2025 Workshops: DeLTa, 2025.](https://mlanthology.org/iclrw/2025/zaghen2025iclrw-variational/)BibTeX
@inproceedings{zaghen2025iclrw-variational,
title = {{Towards Variational Flow Matching on General Geometries}},
author = {Zaghen, Olga and Eijkelboom, Floor and Pouplin, Alison and Bekkers, Erik J},
booktitle = {ICLR 2025 Workshops: DeLTa},
year = {2025},
url = {https://mlanthology.org/iclrw/2025/zaghen2025iclrw-variational/}
}