On Explicit Curvature Regularization in Deep Generative Models
Abstract
We propose a family of curvature-based regularization terms for deep generative model learning. Explicit coordinate-invariant formulas for both intrinsic and extrinsic curvature measures are derived for the case of arbitrary data manifolds embedded in higher-dimensional Euclidean space. Because computing the curvature is a highly computation-intensive process involving the evaluation of second-order derivatives, efficient formulas are derived for approximately evaluating intrinsic and extrinsic curvatures. Comparative studies are conducted that compare the relative efficacy of intrinsic versus extrinsic curvature-based regularization measures, as well as performance comparisons against existing autoencoder training methods. Experiments involving noisy motion capture data confirm that curvature-based methods outperform existing autoencoder regularization methods, with intrinsic curvature measures slightly more effective than extrinsic curvature measures.
Cite
Text
Lee and Park. "On Explicit Curvature Regularization in Deep Generative Models." ICML 2023 Workshops: TAGML, 2023.Markdown
[Lee and Park. "On Explicit Curvature Regularization in Deep Generative Models." ICML 2023 Workshops: TAGML, 2023.](https://mlanthology.org/icmlw/2023/lee2023icmlw-explicit/)BibTeX
@inproceedings{lee2023icmlw-explicit,
title = {{On Explicit Curvature Regularization in Deep Generative Models}},
author = {Lee, Yonghyeon and Park, Frank C.},
booktitle = {ICML 2023 Workshops: TAGML},
year = {2023},
url = {https://mlanthology.org/icmlw/2023/lee2023icmlw-explicit/}
}