Abstract: For a wide class of nonparametric regression models with random design, we suggest consistent weighted least square estimators, asymptotic properties of which do not depend on correlation of the design points. In contrast to the predecessors’ results, the design is not required to be fixed or to consist of independent or weakly dependent random variables under the classical stationarity or ergodicity conditions; the only requirement being that the maximal spacing statistic of the design tends to zero almost surely (a.s.). Explicit upper bounds are obtained for the rate of uniform convergence in probability of these estimators to an unknown estimated random function which is assumed to lie in a Hölder space a.s. A Wiener process is considered as an example of such a random regression function. In the case of i.i.d. design points, we compare our estimators with the Nadaraya–Watson ones. © 2020, Springer-Verlag GmbH Germany, part of Springer Nature.

Cite: Borisov I.S. , Linke Y.Y. , Ruzankin P.S.
Universal weighted kernel-type estimators for some class of regression models
Metrika. 2021. V.84. N2. P.141-166. DOI: 10.1007/s00184-020-00768-0 WOS Scopus OpenAlex

Identifiers:

Web of science:	WOS:000517710800001
Scopus:	2-s2.0-85081536807
OpenAlex:	W3009357547

Citing:

DB	Citing
Scopus	11
OpenAlex	12
Web of science	8

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