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Neural network approximation and estimation of classifiers with classification boundary in a Barron class

Andrei Caragea, Philipp Petersen, Felix Voigtlaender

2023The Annals of Applied Probability19 citationsDOI

Abstract

We prove bounds for the approximation and estimation of certain binary classification functions using ReLU neural networks. Our estimation bounds provide a priori performance guarantees for empirical risk minimization using networks of a suitable size, depending on the number of training samples available. The obtained approximation and estimation rates are independent of the dimension of the input, showing that the curse of dimensionality can be overcome in this setting; in fact, the input dimension only enters in the form of a polynomial factor. Regarding the regularity of the target classification function, we assume the interfaces between the different classes to be locally of Barron-type. We complement our results by studying the relations between various Barron-type spaces that have been proposed in the literature. These spaces differ substantially more from each other than the current literature suggests.

Topics & Concepts

MathematicsCurse of dimensionalityEmpirical risk minimizationComplement (music)Dimension (graph theory)A priori and a posterioriArtificial neural networkClass (philosophy)Binary classificationBoundary (topology)Function approximationType (biology)PolynomialBinary numberFunction (biology)Artificial intelligenceApplied mathematicsMathematical optimizationSupport vector machineComputer scienceStatisticsPure mathematicsMathematical analysisGeneBiochemistryPhenotypeChemistryBiologyComplementationEvolutionary biologyEcologyEpistemologyArithmeticPhilosophyNeural Networks and ApplicationsAdvanced Neural Network ApplicationsDomain Adaptation and Few-Shot Learning
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