Adaptive and Optimal Point-Wise Estimations for Densities in GARCH-Type Model by Wavelets

Authors

Cong Wu College of Mathematics, Faculty of Science, Beijing University of Technology, Beijing, China
Jinru Wang College of Mathematics, Faculty of Science, Beijing University of Technology, Beijing, China
Xiaochen Zeng College of Mathematics, Faculty of Science, Beijing University of Technology, Beijing, China

DOI:

https://doi.org/10.4208/jcm.2007-m2020-0109

Keywords:

Wavelets, Point-wise risk, Thresholding, Data-driven, GARCH-type model.

Abstract

This paper considers adaptive point-wise estimations of density functions in GARCH-type model under the local Hölder condition by wavelet methods. A point-wise lower bound estimation of that model is first investigated; then we provide a linear wavelet estimate to obtain the optimal convergence rate, which means that the convergence rate coincides with the lower bound. The non-linear wavelet estimator is introduced for adaptivity, although it is nearly-optimal. However, the non-linear wavelet one depends on an upper bound of the smoothness index of unknown functions, we finally discuss a data driven version without any assumptions on the estimated functions.

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Published

2021-11-19

Issue

Vol. 40 No. 1 (2022)

Section

Articles