Tight bounds for maximum 1-margin classifiers

Abstract

Popular iterative algorithms such as boosting methods and coordinate descent on linear models converge to the maximum 1-margin classifier, a.k.a. sparse hard-margin SVM, in high dimensional regimes where the data is linearly separable. Previous works consistently show that many estimators relying on the 1-norm achieve improved statistical rates for hard sparse ground truths. We show that surprisingly, this adaptivity does not apply to the maximum 1-margin classifier for a standard discriminative setting. In particular, for the noiseless setting, we prove tight upper and lower bounds for the prediction error that match existing rates of order \|w*\|12/3n1/3 for general ground truths. To complete the picture, we show that when interpolating noisy observations, the error vanishes at a rate of order 1(d/n). We are therefore first to show benign overfitting for the maximum 1-margin classifier.

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