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Nonparametric Regression for Random Unbiased Perturbations

Statistics Theory 2025-11-27 v1 Statistics Theory

Abstract

We study nonparametric regression with covariates XX and outcome YY under random unbiased perturbations (RUPs) of the conditional distribution YXY|X, where the marginal distribution of covariates, PXP^X, remains fixed but the conditional law, PYXP^{Y|X}, varies randomly across datasets. Unlike adversarial distribution shift frameworks that yield conservative worst-case guarantees, RUPs induce dataset-level variance inflation rather than systematic bias. We provide examples of RUPs and show that this distributional uncertainty reduces the effective sample size to neff=n/(1+nτ)n_{\mathrm{eff}} = n/(1 + n \tau), where τ[0,1]\tau\in [0,1] quantifies the perturbation strength. For local polynomial estimators, we derive an extended bias-variance decomposition that includes a distributional variance term with the same bandwidth scaling as classical sampling variance. This leads to a modified bandwidth selection principle: when distributional uncertainty dominates sampling uncertainty (τ1/n\tau \gg 1/n), optimal bandwidths scale as τ1/(2β+1)\tau^{1/(2\beta+1)} rather than the usual n1/(2β+1)n^{-1/(2\beta+1)}, where β\beta indicates the smoothness of the function class considered. We also establish matching minimax lower bounds showing that there exists an RUP for which this effective sample size neffn_{\mathrm{eff}} is fundamental. Our results demonstrate that random dataset-level perturbations create a distinct mode of uncertainty that affects both practical tuning and fundamental statistical limits.

Keywords

Cite

@article{arxiv.2511.20905,
  title  = {Nonparametric Regression for Random Unbiased Perturbations},
  author = {Anna Lyubarskaja and Dominik Rothenhäusler},
  journal= {arXiv preprint arXiv:2511.20905},
  year   = {2025}
}

Comments

20 pages, 6 figures

R2 v1 2026-07-01T07:55:16.514Z