Improving Generalization Bounds for VC Classes Using the Hypergeometric Tail Inversion
Machine Learning
2021-11-02 v1
Abstract
We significantly improve the generalization bounds for VC classes by using two main ideas. First, we consider the hypergeometric tail inversion to obtain a very tight non-uniform distribution-independent risk upper bound for VC classes. Second, we optimize the ghost sample trick to obtain a further non-negligible gain. These improvements are then used to derive a relative deviation bound, a multiclass margin bound, as well as a lower bound. Numerical comparisons show that the new bound is nearly never vacuous, and is tighter than other VC bounds for all reasonable data set sizes.
Keywords
Cite
@article{arxiv.2111.00062,
title = {Improving Generalization Bounds for VC Classes Using the Hypergeometric Tail Inversion},
author = {Jean-Samuel Leboeuf and Frédéric LeBlanc and Mario Marchand},
journal= {arXiv preprint arXiv:2111.00062},
year = {2021}
}
Comments
15 pages (body), 36 pages (appendices), 54 pages (total), 13 figures