Linear approximation methods and the best approximations of the Poisson integrals of functions from the classes H_{ω_p} in the metrics of the spaces L_p

Authors

  • A. S. Serdyuk
  • I. V. Sokolenko

Abstract

We obtain upper estimates for the least upper bounds of approximations of the classes of Poisson integrals of functions from H_{ω_p} for 1 ≤ p < ∞ by a certain linear method U_n^{*} in the metric of the space L_p. It is shown that the obtained estimates are asymptotically exact for р = 1: In addition, we determine the asymptotic equalities for the best approximations of the classes of Poisson integrals of functions from H_{ω_1} in the metric of the space L_1 and show that, for these classes, the method U_n^{*} is the best polynomial approximation method in a sense of strong asymptotic behavior.

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Published

25.07.2010

Issue

Vol. 62 No. 7 (2010)

Section

Research articles

How to Cite

Serdyuk, A. S., and I. V. Sokolenko. “Linear Approximation Methods and the Best Approximations of the Poisson Integrals of Functions from the Classes H_{ω_p} in the Metrics of the Spaces L_p”. Ukrains’kyi Matematychnyi Zhurnal, vol. 62, no. 7, July 2010, pp. 979–996, https://umj.imath.kiev.ua/index.php/umj/article/view/2930.