Multiplicative bias corrected nonparametric smoothers

N. Hengartner; E. Matzner-Løber; L. Rouvière; T. Burr

doi:10.1007/978-3-319-96941-1_3

Multiplicative bias corrected nonparametric smoothers

N. Hengartner
, E. Matzner-Løber
, L. Rouvière
, T. Burr

École Polytechnique

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Abstract

This contribution presents a general multiplicative bias reduction strategy for nonparametric regression. The approach is most effective when applied to an oversmooth pilot estimator, for which the bias dominates the standard error. The practical usefulness of the method was demonstrated in Burr et al. (IEEE Trans Nucl Sci 57:2831–2840, 2010) in the context of estimating energy spectra. For such data sets, it was observed that the method could decrease significantly the bias with only negligible increase in variance. This chapter presents the theoretical analysis of that estimator. In particular, we study the asymptotic properties of the bias corrected local linear regression smoother, and prove that it has zero asymptotic bias and the same asymptotic variance as the local linear smoother with a suitably adjusted bandwidth. Simulations show that our asymptotic results are available for modest sample sizes.

Original language	English
Title of host publication	Nonparametric Statistics- 3rd ISNPS 2016
Editors	Patrice Bertail, Delphine Blanke, Pierre-André Cornillon, Eric Matzner-Løber
Publisher	Springer New York LLC
Pages	31-52
Number of pages	22
ISBN (Print)	9783319969404
DOIs	https://doi.org/10.1007/978-3-319-96941-1_3
Publication status	Published - 1 Jan 2018
Event	3rd Conference of the International Society for Nonparametric Statistics, ISNPS 2016 - Avignon, France Duration: 11 Jun 2016 → 16 Jun 2016

Publication series

Name	Springer Proceedings in Mathematics and Statistics
Volume	250
ISSN (Print)	2194-1009
ISSN (Electronic)	2194-1017

Conference

Conference	3rd Conference of the International Society for Nonparametric Statistics, ISNPS 2016
Country/Territory	France
City	Avignon
Period	11/06/16 → 16/06/16

Access to Document

10.1007/978-3-319-96941-1_3

Cite this

Hengartner, N., Matzner-Løber, E., Rouvière, L., & Burr, T. (2018). Multiplicative bias corrected nonparametric smoothers. In P. Bertail, D. Blanke, P.-A. Cornillon, & E. Matzner-Løber (Eds.), Nonparametric Statistics- 3rd ISNPS 2016 (pp. 31-52). (Springer Proceedings in Mathematics and Statistics; Vol. 250). Springer New York LLC. https://doi.org/10.1007/978-3-319-96941-1_3

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author = "N. Hengartner and E. Matzner-L{\o}ber and L. Rouvi{\`e}re and T. Burr",

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Hengartner, N, Matzner-Løber, E, Rouvière, L & Burr, T 2018, Multiplicative bias corrected nonparametric smoothers. in P Bertail, D Blanke, P-A Cornillon & E Matzner-Løber (eds), Nonparametric Statistics- 3rd ISNPS 2016. Springer Proceedings in Mathematics and Statistics, vol. 250, Springer New York LLC, pp. 31-52, 3rd Conference of the International Society for Nonparametric Statistics, ISNPS 2016, Avignon, France, 11/06/16. https://doi.org/10.1007/978-3-319-96941-1_3

Multiplicative bias corrected nonparametric smoothers. / Hengartner, N.; Matzner-Løber, E.; Rouvière, L. et al.
Nonparametric Statistics- 3rd ISNPS 2016. ed. / Patrice Bertail; Delphine Blanke; Pierre-André Cornillon; Eric Matzner-Løber. Springer New York LLC, 2018. p. 31-52 (Springer Proceedings in Mathematics and Statistics; Vol. 250).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

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N2 - This contribution presents a general multiplicative bias reduction strategy for nonparametric regression. The approach is most effective when applied to an oversmooth pilot estimator, for which the bias dominates the standard error. The practical usefulness of the method was demonstrated in Burr et al. (IEEE Trans Nucl Sci 57:2831–2840, 2010) in the context of estimating energy spectra. For such data sets, it was observed that the method could decrease significantly the bias with only negligible increase in variance. This chapter presents the theoretical analysis of that estimator. In particular, we study the asymptotic properties of the bias corrected local linear regression smoother, and prove that it has zero asymptotic bias and the same asymptotic variance as the local linear smoother with a suitably adjusted bandwidth. Simulations show that our asymptotic results are available for modest sample sizes.

AB - This contribution presents a general multiplicative bias reduction strategy for nonparametric regression. The approach is most effective when applied to an oversmooth pilot estimator, for which the bias dominates the standard error. The practical usefulness of the method was demonstrated in Burr et al. (IEEE Trans Nucl Sci 57:2831–2840, 2010) in the context of estimating energy spectra. For such data sets, it was observed that the method could decrease significantly the bias with only negligible increase in variance. This chapter presents the theoretical analysis of that estimator. In particular, we study the asymptotic properties of the bias corrected local linear regression smoother, and prove that it has zero asymptotic bias and the same asymptotic variance as the local linear smoother with a suitably adjusted bandwidth. Simulations show that our asymptotic results are available for modest sample sizes.

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T2 - 3rd Conference of the International Society for Nonparametric Statistics, ISNPS 2016

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Multiplicative bias corrected nonparametric smoothers

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