Abstract
SUMMARY A striking feature of curve estimation is that the smoothing parameter ĥ 0, which minimizes the squared error of a kernel or smoothing spline estimator, is very difficult to estimate. This is manifest both in slow rates of convergence and in high variability of standard methods such as cross-validation. We quantify this difficulty by describing nonparametric information bounds and exhibit asymptotically efficient estimators of ĥ 0 that attain the bounds. The efficient estimators are substantially less variable than cross-validation (and other current procedures) and simulations suggest that they may offer improvements at moderate sample sizes, at least in terms of minimizing the squared error. The key is a stochastic decomposition of the empirical functional ĥ 0 in terms of a smooth quadratic functional of the unknown curve. Examples include the estimation of densities, regression functions and continuous signals in Gaussian white noise.
Keywords
EstimatorSmoothingSmoothing splineMathematicsKernel smootherNonparametric regressionMean squared errorApplied mathematicsMathematical optimizationRate of convergenceSpline (mechanical)Kernel (algebra)Nonparametric statisticsStatisticsComputer scienceKernel methodKey (lock)Artificial intelligence
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Publication Info
- Year
- 1992
- Type
- article
- Volume
- 54
- Issue
- 2
- Pages
- 475-509
- Citations
- 92
- Access
- Closed
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Cite This
Peter Hall,
Iain M. Johnstone
(1992).
Empirical Functionals and Efficient Smoothing Parameter Selection.
Journal of the Royal Statistical Society Series B (Statistical Methodology)
, 54
(2)
, 475-509.
https://doi.org/10.1111/j.2517-6161.1992.tb01892.x
Identifiers
- DOI
- 10.1111/j.2517-6161.1992.tb01892.x