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arxiv: 2503.24321 · v1 · pith:GPD5X5MJ · submitted 2025-03-31 · cs.DS · cs.IT· cs.LG· math.IT· stat.ML

Sample-Optimal Private Regression in Polynomial Time

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classification cs.DS cs.ITcs.LGmath.ITstat.ML
keywords algorithmregressionalgorithmsdependenceefficientframeworkoptimalprivacy
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We consider the task of privately obtaining prediction error guarantees in ordinary least-squares regression problems with Gaussian covariates (with unknown covariance structure). We provide the first sample-optimal polynomial time algorithm for this task under both pure and approximate differential privacy. We show that any improvement to the sample complexity of our algorithm would violate either statistical-query or information-theoretic lower bounds. Additionally, our algorithm is robust to a small fraction of arbitrary outliers and achieves optimal error rates as a function of the fraction of outliers. In contrast, all prior efficient algorithms either incurred sample complexities with sub-optimal dimension dependence, scaling with the condition number of the covariates, or obtained a polynomially worse dependence on the privacy parameters. Our technical contributions are two-fold: first, we leverage resilience guarantees of Gaussians within the sum-of-squares framework. As a consequence, we obtain efficient sum-of-squares algorithms for regression with optimal robustness rates and sample complexity. Second, we generalize the recent robustness-to-privacy framework [HKMN23, (arXiv:2212.05015)] to account for the geometry induced by the covariance of the input samples. This framework crucially relies on the robust estimators to be sum-of-squares algorithms, and combining the two steps yields a sample-optimal private regression algorithm. We believe our techniques are of independent interest, and we demonstrate this by obtaining an efficient algorithm for covariance-aware mean estimation, with an optimal dependence on the privacy parameters.

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Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. On the Sample Complexity of Differentially Private Policy Optimization

    cs.LG 2025-10 unverdicted novelty 7.0

    Differential privacy in policy optimization adds sample complexity costs that often appear as lower-order terms rather than dominating the bounds.