Research PaperOpen Access

Reproducing property of bounded linear operators and kernel regularized least square regressions

Department of Economic Statistics, Zhejiang Yuexiu University, Shaoxing, Zhejiang 312000, P. R. China

Department of Applied Statistics, Shaoxing University, Shaoxing, Zhejiang 312000, P. R. China

https://doi.org/10.1142/S0219691324500139Cited by:1 (Source: Crossref)

Abstract

We consider bounded linear operators from the view of functional reproducing property. For some bounded linear operators associated with orthogonal polynomials we define an inner product space associated with a kernel constructed with orthogonal polynomials, show that it is a functional reproducing kernel Hilbert space (FRKHS) associated with these bounded linear operators and give decay rate for the best FRKHS approximation with a $K$ -functional associated with the FRKHS. On this basis, we provide a learning rate for kernel regularized regression whose hypothesis space is the defined FRKHS. As applications, we define some concrete FRKHSs associated with polynomial operators such as the Bernstein–Durrmeyer operators, the de la Vallée Poussin operators on both the unit sphere $S^{d - 1}$ and the unit ball $B^{d}$ . We show that these polynomial operators have reproducing property with respect to the corresponding concrete FRKHSs and show the learning rate for the kernel regularized regression. In short, we provide a way of constructing FRKHS operators with Fourier multipliers and show a learning framework from the view of operator approximation.

Keywords:

AMSC: 68Q32, 46E22, 41A25

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Vol. 22, No. 05

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History

Received 29 November 2023

Revised 26 February 2024

Accepted 28 February 2024

Published: 22 April 2024

Information

This is an Open Access article published by World Scientific Publishing Company. It is distributed under the terms of the Creative Commons Attribution-NonCommercial 4.0 (CC BY-NC) License which permits use, distribution and reproduction in any medium, provided that the original work is properly cited and is used for non-commercial purposes.

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Reproducing property of bounded linear operators and kernel regularized least square regressions

Abstract

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