Approximation of classes of Poisson integrals by Fejer means

Q3 Mathematics Matematychni Studii Pub Date : 2023-05-16 DOI:10.30970/ms.59.2.201-204
O. Rovenska
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Abstract

The paper is devoted to the investigation of problem of approximation of continuous periodic functions by trigonometric polynomials, which are generated by linear methods of summation of Fourier series. The simplest example of a linear approximation of periodic functions is the approximation of functions by partial sums of their Fourier series. However, the sequences of partial Fourier sums are not uniformly convergent over the class of continuous periodic functions. Therefore, many studies devoted to the research of the approximative properties of approximation methods, which are generated by transformations of the partial sums of Fourier series and allow us to construct sequences of trigonometrical polynomials that would be uniformly convergent for the whole class of continuous functions. Particularly, Fejer sums have been widely studied recently. One of the important problems in this area is the study of asymptotic behavior of the sharp upper bounds over a given class of functions of deviations of the trigonometric polynomials. In the paper, we study upper asymptotic estimates for deviations between a function and the Fejer means for the Fourier series of the function. The asymptotic behavior is considered for the functions represented by the Poisson integrals of periodic functions of a real variable. The mentioned classes consist of analytic functions of a real variable. These functions can be regularly extended into the corresponding strip of the complex plane.An asymptotic equality for the upper bounds of Fejer means deviations on classes of Poisson integrals was obtained.
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一类Poisson积分的Fejer平均逼近
本文研究了用傅立叶级数线性求和法得到的三角多项式逼近连续周期函数的问题。周期函数线性逼近的最简单的例子是函数的傅里叶级数的部分和逼近。然而,部分傅里叶和序列在连续周期函数上不是一致收敛的。因此,许多研究致力于研究近似方法的近似性质,这些近似方法是由傅里叶级数的部分和变换产生的,并允许我们构造对整个连续函数类一致收敛的三角多项式序列。特别是Fejer和,近年来得到了广泛的研究。该领域的一个重要问题是研究一类给定三角多项式偏差函数的锐上界的渐近性。本文研究了函数的傅里叶级数与Fejer均值之间偏差的上渐近估计。研究了实变量周期函数的泊松积分所表示的函数的渐近性。上述类由实变量的解析函数组成。这些函数可以正则地扩展到复平面的相应条形上。得到了一类泊松积分Fejer均值偏差上界的渐近等式。
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来源期刊
Matematychni Studii
Matematychni Studii Mathematics-Mathematics (all)
CiteScore
1.00
自引率
0.00%
发文量
38
期刊介绍: Journal is devoted to research in all fields of mathematics.
期刊最新文献
On the h-measure of an exceptional set in Fenton-type theorem for Taylor-Dirichlet series Almost periodic distributions and crystalline measures Reflectionless Schrodinger operators and Marchenko parametrization Existence of basic solutions of first order linear homogeneous set-valued differential equations Real univariate polynomials with given signs of coefficients and simple real roots
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