On Margins and Generalisation for Voting Classifiers
Biggs, Felix, Zantedeschi, Valentina, Guedj, Benjamin
–arXiv.org Artificial Intelligence
We study the generalisation properties of majority voting on finite ensembles of classifiers, proving margin-based generalisation bounds via the PAC-Bayes theory. These provide state-of-the-art guarantees on a number of classification tasks. Our central results leverage the Dirichlet posteriors studied recently by Zantedeschi et al. [2021] for training voting classifiers; in contrast to that work our bounds apply to non-randomised votes via the use of margins. Our contributions add perspective to the debate on the "margins theory" proposed by Schapire et al. [1998] for the generalisation of ensemble classifiers.
arXiv.org Artificial Intelligence
Oct-20-2022
- Country:
- North America
- United States
- Maryland > Baltimore (0.04)
- Pennsylvania > Allegheny County
- Pittsburgh (0.04)
- Louisiana > Orleans Parish
- New Orleans (0.04)
- California
- San Francisco County > San Francisco (0.14)
- San Diego County > San Diego (0.04)
- Canada
- Quebec > Montreal (0.04)
- British Columbia (0.04)
- United States
- Europe
- Asia > Japan
- Honshū > Kansai > Kyoto Prefecture > Kyoto (0.04)
- North America
- Genre:
- Research Report (0.64)
- Industry:
- Government (0.46)