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Wavelet estimation for the nonparametric additive model in random design and long-memory dependent errors

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  • Rida Benhaddou
  • Qing Liu

Abstract

We investigate the nonparametric additive regression estimation in random design and long-memory errors and construct adaptive thresholding estimators based on wavelet series. The proposed approach achieves asymptotically near-optimal convergence rates when the unknown function and its univariate additive components belong to Besov space. We consider the problem under two noise structures; (1) homoskedastic Gaussian long memory errors and (2) heteroskedastic Gaussian long memory errors. In the homoskedastic long-memory error case, the estimator is completely adaptive with respect to the long-memory parameter. In the heteroskedastic long-memory case, the estimator may not be adaptive with respect to the long-memory parameter unless the heteroskedasticity is of polynomial form. In either case, the convergence rates depend on the long-memory parameter only when long-memory is strong enough, otherwise, the rates are identical to those under i.i.d. errors. In addition, convergence rates are free from the curse of dimensionality.

Suggested Citation

  • Rida Benhaddou & Qing Liu, 2024. "Wavelet estimation for the nonparametric additive model in random design and long-memory dependent errors," Journal of Nonparametric Statistics, Taylor & Francis Journals, vol. 36(4), pages 1088-1113, October.
    • Handle: RePEc:taf:gnstxx:v:36:y:2024:i:4:p:1088-1113
    DOI: 10.1080/10485252.2023.2296523
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