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arxiv: 2102.12919 · v2 · pith:NNZQRAIPnew · submitted 2021-02-25 · 🧮 math.ST · cs.LG· stat.ML· stat.TH

Distribution-Free Robust Linear Regression

classification 🧮 math.ST cs.LGstat.MLstat.TH
keywords linearregressiondistribution-freeoptimalachievingcovariatesdistributionsestimator
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We study random design linear regression with no assumptions on the distribution of the covariates and with a heavy-tailed response variable. In this distribution-free regression setting, we show that boundedness of the conditional second moment of the response given the covariates is a necessary and sufficient condition for achieving nontrivial guarantees. As a starting point, we prove an optimal version of the classical in-expectation bound for the truncated least squares estimator due to Gy\"{o}rfi, Kohler, Krzy\.{z}ak, and Walk. However, we show that this procedure fails with constant probability for some distributions despite its optimal in-expectation performance. Then, combining the ideas of truncated least squares, median-of-means procedures, and aggregation theory, we construct a non-linear estimator achieving excess risk of order $d/n$ with an optimal sub-exponential tail. While existing approaches to linear regression for heavy-tailed distributions focus on proper estimators that return linear functions, we highlight that the improperness of our procedure is necessary for attaining nontrivial guarantees in the distribution-free setting.

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