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From Cross-Validation to SURE: Asymptotic Risk of Tuned Regularized Estimators

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Listed:
  • Karun Adusumilli
  • Maximilian Kasy
  • Ashia Wilson

Abstract

We derive the asymptotic risk function of regularized empirical risk minimization (ERM) estimators tuned by $n$-fold cross-validation (CV). The out-of-sample prediction loss of such estimators converges in distribution to the squared-error loss (risk function) of shrinkage estimators in the normal means model, tuned by Stein's unbiased risk estimate (SURE). This risk function provides a more fine-grained picture of predictive performance than uniform bounds on worst-case regret, which are common in learning theory: it quantifies how risk varies with the true parameter. As key intermediate steps, we show that (i) $n$-fold CV converges uniformly to SURE, and (ii) while SURE typically has multiple local minima, its global minimum is generically well separated. Well-separation ensures that uniform convergence of CV to SURE translates into convergence of the tuning parameter chosen by CV to that chosen by SURE.

Suggested Citation

  • Karun Adusumilli & Maximilian Kasy & Ashia Wilson, 2026. "From Cross-Validation to SURE: Asymptotic Risk of Tuned Regularized Estimators," Papers 2603.20388, arXiv.org.
    • Handle: RePEc:arx:papers:2603.20388
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    References listed on IDEAS

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    1. Bradley Efron, 2004. "The Estimation of Prediction Error: Covariance Penalties and Cross-Validation," Journal of the American Statistical Association, American Statistical Association, vol. 99, pages 619-632, January.
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    3. Hansen, Bruce E., 2016. "Efficient shrinkage in parametric models," Journal of Econometrics, Elsevier, vol. 190(1), pages 115-132.
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