Metric Space Magnitude and Generalisation in Neural Networks
Abstract
Deep learning models have seen significant successes in numerous applications, but their inner workings remain elusive. The purpose of this work is to quantify the learning process of deep neural networks through the lens of a novel topological invariant called magnitude. Magnitude is an isometry invariant; its properties are an active area of research as it encodes many known invariants of a metric space. We use magnitude to study the internal representations of neural networks and propose a new method for determining their generalisation capabilities. Moreover, we theoretically connect magnitude dimension and the generalisation error, and demonstrate experimentally that the proposed framework can be a good indicator of the latter.
Cite
Text
Andreeva et al. "Metric Space Magnitude and Generalisation in Neural Networks." ICML 2023 Workshops: TAGML, 2023.Markdown
[Andreeva et al. "Metric Space Magnitude and Generalisation in Neural Networks." ICML 2023 Workshops: TAGML, 2023.](https://mlanthology.org/icmlw/2023/andreeva2023icmlw-metric/)BibTeX
@inproceedings{andreeva2023icmlw-metric,
title = {{Metric Space Magnitude and Generalisation in Neural Networks}},
author = {Andreeva, Rayna and Limbeck, Katharina and Rieck, Bastian and Sarkar, Rik},
booktitle = {ICML 2023 Workshops: TAGML},
year = {2023},
url = {https://mlanthology.org/icmlw/2023/andreeva2023icmlw-metric/}
}