English

Bagging cross-validated bandwidth selection in nonparametric regression estimation with applications to large-sized samples

Methodology 2021-05-11 v1 Statistics Theory Applications Computation Statistics Theory

Abstract

Cross-validation is a well-known and widely used bandwidth selection method in nonparametric regression estimation. However, this technique has two remarkable drawbacks: (i) the large variability of the selected bandwidths, and (ii) the inability to provide results in a reasonable time for very large sample sizes. To overcome these problems, bagging cross-validation bandwidths are analyzed in this paper. This approach consists in computing the cross-validation bandwidths for a finite number of subsamples and then rescaling the averaged smoothing parameters to the original sample size. Under a random-design regression model, asymptotic expressions up to a second-order for the bias and variance of the leave-one-out cross-validation bandwidth for the Nadaraya--Watson estimator are obtained. Subsequently, the asymptotic bias and variance and the limit distribution are derived for the bagged cross-validation selector. Suitable choices of the number of subsamples and the subsample size lead to an n1/2n^{-1/2} rate for the convergence in distribution of the bagging cross-validation selector, outperforming the rate n3/10n^{-3/10} of leave-one-out cross-validation. Several simulations and an illustration on a real dataset related to the COVID-19 pandemic show the behavior of our proposal and its better performance, in terms of statistical efficiency and computing time, when compared to leave-one-out cross-validation.

Keywords

Cite

@article{arxiv.2105.04134,
  title  = {Bagging cross-validated bandwidth selection in nonparametric regression estimation with applications to large-sized samples},
  author = {D. Barreiro-Ures and R. Cao and M. Francisco-Fernández},
  journal= {arXiv preprint arXiv:2105.04134},
  year   = {2021}
}
R2 v1 2026-06-24T01:55:52.546Z