An exact constant on the estimation of the approximation of classes of periodic functions of two variables by Ceśaro means

Q3 Mathematics Matematychni Studii Pub Date : 2022-03-31 DOI:10.30970/ms.57.1.3-9
O. Rovenska
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Abstract

In the present work, we study problem related to the approximation of continuous $2\pi$-periodic functions by linear means of their Fourier series. The simplest example of a linear approximation of periodic function is the approximation of this function by partial sums of the Fourier series. However, as well known, the sequence of partial Fourier sums is not uniformly convergent over the class of continuous $2\pi$-periodic functions. Therefore, a significant number of papers is devoted to the research of the approximative properties of different approximation methods, which are generated by some transformations of the partial sums of the Fourier series. The methods allow us to construct sequence of trigonometrical polynomials that would be uniformly convergent for all functions $f \in C$. Particularly, Ceśaro means and Fejer sums have been widely studied in past decades.One of the important problems in this field is the study of the exact constant in an inequality for upper bounds of linear means deviations of the Fourier sums on fixed classes of periodic functions. Methods of investigation of integral representations for trigonometric polynomial deviations are generated by linear methods of summation of the Fourier series. They were developed in papers of Nikolsky, Stechkin, Nagy and others. The paper presents known results related to the approximation of classes of continuous functions by linear means of the Fourier sums and new facts obtained for some particular cases.In the paper, it is studied the approximation by the Ceśaro means of Fourier sums in Lipschitz class. In certain cases, the exact inequalities are found for upper bounds of deviations in the uniform metric of the second order rectangular Ceśaro means on the Lipschitz class of periodic functions in two variables.
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用Ceśaro方法估计两个变量的周期函数类的近似的一个精确常数
本文研究了用傅里叶级数线性逼近连续$2\pi$周期函数的问题。周期函数线性逼近的最简单例子是用傅里叶级数的部分和逼近这个函数。然而,众所周知,部分傅立叶和序列在连续$2\ $周期函数上不是一致收敛的。因此,大量的论文致力于研究不同近似方法的近似性质,这些近似方法是由傅里叶级数的部分和的某些变换产生的。该方法允许我们构造三角多项式序列,该序列对C$中的所有函数$f \一致收敛。特别是Ceśaro均值和Fejer和在过去几十年中得到了广泛的研究。这一领域的一个重要问题是研究固定类周期函数的傅里叶和的线性平均偏差上界不等式中的精确常数。研究三角多项式偏差的积分表示的方法是由傅里叶级数的线性求和方法产生的。它们是在Nikolsky, Stechkin, Nagy和其他人的论文中发展起来的。本文给出了用傅里叶和线性逼近连续函数类的已知结果,以及在某些特殊情况下得到的新事实。本文研究了Lipschitz类中傅里叶和的Ceśaro逼近方法。在某些情况下,我们找到了二阶矩形统一度规的偏差上界的精确不等式Ceśaro在两个变量的Lipschitz周期函数类上的均值。
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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
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