Error estimation and adaptive tuning for unregularized robust M-estimator
Abstract
We consider unregularized robust M-estimators for linear models under Gaussian design and heavy-tailed noise, in the proportional asymptotics regime where the sample size n and the number of features p are both increasing such that p/n γ∈ (0,1). An estimator of the out-of-sample error of a robust M-estimator is analyzed and proved to be consistent for a large family of loss functions that includes the Huber loss. As an application of this result, we propose an adaptive tuning procedure of the scale parameter λ>0 of a given loss function : choosing λ in a given interval I that minimizes the out-of-sample error estimate of the M-estimator constructed with loss λ(·) = λ2 (·/λ) leads to the optimal out-of-sample error over I. The proof relies on a smoothing argument: the unregularized M-estimation objective function is perturbed, or smoothed, with a Ridge penalty that vanishes as n+∞, and shows that the unregularized M-estimator of interest inherits properties of its smoothed version.
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