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Convolution type estimators for nonparametric regression

Author

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  • Mack, Y. P.
  • Müller, Hans-Georg

Abstract

Convolution type kernel estimators such as the Priestley-Chao estimator have been discussed by several authors in the fixed design regression model Yi = g(ti)+ [var epsilon]i, where [var epsilon]i are uncorrelated random errors, ti are fixed design points where measurements are made, and g is the function to be estimated from the noisy measurements Yi. Using properties of order statistics and concomitants, we derive the asymptotic mean squared error of these estimators in the random design case where given i.i.d. bivariate observations (Xi, Yi), i = 1,..., n, the aim is to estimate the regression function m(x) = E(Y/X =x). The comparison with the well-known quotient type Nadaraya-Watson kernel estimators shows that convolution type estimators have a bias behavior which corresponds to that in the fixed design case. This makes possible the straightforward extension to the estimation of derivatives.

Suggested Citation

  • Mack, Y. P. & Müller, Hans-Georg, 1988. "Convolution type estimators for nonparametric regression," Statistics & Probability Letters, Elsevier, vol. 7(3), pages 229-239, December.
    • Handle: RePEc:eee:stapro:v:7:y:1988:i:3:p:229-239
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    Citations

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    Cited by:

    1. Yongmiao Hong & Xia Wang & Wenjie Zhang & Shouyang Wang, 2017. "An efficient integrated nonparametric entropy estimator of serial dependence," Econometric Reviews, Taylor & Francis Journals, vol. 36(6-9), pages 728-780, October.
    2. Igor S. Borisov & Yuliana Yu. Linke & Pavel S. Ruzankin, 2021. "Universal weighted kernel-type estimators for some class of regression models," Metrika: International Journal for Theoretical and Applied Statistics, Springer, vol. 84(2), pages 141-166, February.
    3. Samuele Tosatto & Riad Akrour & Jan Peters, 2020. "An Upper Bound of the Bias of Nadaraya-Watson Kernel Regression under Lipschitz Assumptions," Stats, MDPI, vol. 4(1), pages 1-17, December.
    4. Arthur Lewbel & Susanne M. Schennach, 2003. "A Simple Ordered Data Estimator For Inverse Density Weighted Functions," Boston College Working Papers in Economics 557, Boston College Department of Economics, revised 01 May 2005.
    5. Müller, H. -G., 1997. "Density adjusted kernel smoothers for random design nonparametric regression," Statistics & Probability Letters, Elsevier, vol. 36(2), pages 161-172, December.
    6. Lewbel, Arthur & Schennach, Susanne M., 2007. "A simple ordered data estimator for inverse density weighted expectations," Journal of Econometrics, Elsevier, vol. 136(1), pages 189-211, January.

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