On approximation of functions from the class $L^{\psi}_{\beta, 1}$ by the Abel-Poisson integrals in the integral metric

IF 1 Q1 MATHEMATICS Carpathian Mathematical Publications Pub Date : 2022-06-30 DOI:10.15330/cmp.14.1.223-229
T. V. Zhyhallo, Yu. I. Kharkevych
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引用次数: 23

Abstract

In the paper, we investigate an asymptotic behavior of the sharp upper bounds in the integral metric of deviations of the Abel-Poisson integrals from functions from the class $L^{\psi}_{\beta, 1}$. The Abel-Poisson integrals are solutions of the partial differential equations of elliptic type with corresponding boundary conditions, and they play an important role in applied problems. The approximative properties of the Abel-Poisson integrals on different classes of differentiable functions were studied in a number of papers. Nevertheless, a problem on the respective approximation on the classes $L^{\psi}_{\beta,1}$ in the metric of the space $L$ remained unsolved. We managed to obtain the estimates for the values of approximation of $(\psi, \beta)$-differentiable functions from the unit ball of the space $L$ by the Abel-Poisson integrals. In some cases, we also write down asymptotic equalities for these quantities, that is we solve the Kolmogorov-Nikol'skii problem for the the Abel-Poisson integrals on the classes $L^{\psi}_{\beta,1}$ in the integral metric.
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用积分度规中的Abel-Poisson积分逼近$L^{\psi}_{\beta, 1}$类函数
本文研究了一类$L^{\psi}_{\beta, 1}$函数的Abel-Poisson积分的偏差的积分度规的尖锐上界的渐近性。Abel-Poisson积分是具有相应边界条件的椭圆型偏微分方程的解,在应用问题中起着重要的作用。许多论文研究了不同类型的可微函数上的Abel-Poisson积分的近似性质。然而,在空间$L$的度规中,关于类$L^{\psi}_{\beta,1}$各自的近似问题仍然没有解决。利用Abel-Poisson积分,我们成功地从空间$L$的单位球上得到了$(\psi, \beta)$ -可微函数的逼近值的估计。在某些情况下,我们也写出了这些量的渐近等式,即我们解决了积分度规中$L^{\psi}_{\beta,1}$类上的Abel-Poisson积分的Kolmogorov-Nikol'skii问题。
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来源期刊
CiteScore
1.90
自引率
12.50%
发文量
31
审稿时长
25 weeks
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