Abstract
Obtaining accurate bounds of the probability of overfitting is a fundamental question in statistical learning theory. In this paper we propose exact combinatorial bounds for the family of classifiers making a lattice. We use some lattice properties to derive the probability of overfitting for a set of classifiers represented by concepts. The extent of a concept, in turn, matches the set of objects correctly classified by the corresponding classifier. Conducted experiments illustrate that the proposed bounds are consistent with the Monte Carlo bounds.
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Acknowledgments
The authors thank Daniel Borchmann, Dmitry Ignatov and Konstantin Vorontsov for discussion and helpful comments. This paper was prepared within the framework of the Basic Research Program at the National Research University Higher School of Economics (HSE) and supported within the framework of a subsidy by the Russian Academic Excellence Project ‘5–100’.
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Makhalova, T., Kuznetsov, S.O. (2017). On Overfitting of Classifiers Making a Lattice. In: Bertet, K., Borchmann, D., Cellier, P., Ferré, S. (eds) Formal Concept Analysis. ICFCA 2017. Lecture Notes in Computer Science(), vol 10308. Springer, Cham. https://doi.org/10.1007/978-3-319-59271-8_12
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