Density of polyanalytic polynomials in complex and quaternionic polyanalytic weighted Bergman spaces

Sorin G. Gal; Irene Sabadini

doi:10.36045/j.bbms.220502

Abstract

We introduce the concepts of complex polyanalytic weighted Bergman spaces and of quaternionic polyanalytic weighted Bergman spaces of first and second kind. In these spaces we then prove qualitative and quantitative results in approximation by polyanalytic polynomials. The quantitative approximation results are given in terms of higher order $L^{p}$-moduli of smoothness and in terms of the best approximation quantity.

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Sorin G. Gal. Irene Sabadini. "Density of polyanalytic polynomials in complex and quaternionic polyanalytic weighted Bergman spaces." Bull. Belg. Math. Soc. Simon Stevin 29 (4) 533 - 553, december 2022. https://doi.org/10.36045/j.bbms.220502

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Published: december 2022

First available in Project Euclid: 24 March 2023

Digital Object Identifier: 10.36045/j.bbms.220502

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Primary: 30E10 , 30G35‎ , 30H20 , 41A25

Keywords: $L^{p}$-moduli of smoothness , Best approximation , convolution with trigonometric kernels , Polyanalytic complex Bergman space , polyanalytic complex functions , polyanalytic complex polynomials , polyanalytic quaternionic Bergman space of the first kind , polyanalytic quaternionic Bergman space of the second kind , quantitative estimates , slice quaternionic polyanalytic polynomials , slice regular functions

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