Best Polynomial Approximations in $L_2$ and Widths of Some Classes of Functions

С. Б. Вакарчук; А. Н. Щитов

Best Polynomial Approximations in $L_2$ and Widths of Some Classes of Functions

Authors

S. B. Vakarchuk Днепропетр. ун-т им. А. Нобеля
A. N. Shchitov

Abstract

We obtain the exact values of extremal characteristics of a special form that connect the best polynomial approximations of functions

$f(x) ∈ L_2^r(r ∈ ℤ_{+})$ and expressions containing moduli of continuity of the

$k$ th order

$ω_k(f^{(r)}, t)$ . Using these exact values, we generalize the Taikov result for inequalities that connect the best polynomial approximations and moduli of continuity of functions from

$L_2$ . For the classes

$F (k, r, Ψ*)$ defined by

$ω_k(f^{(r)}, t)$ and the majorant

$Ψ(t)=t^{4k/π^2}$ , we determine the exact values of different widths in the space

$L_2$ .

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Published

25.11.2004

Issue

Vol. 56 No. 11 (2004)

Section

Research articles

How to Cite

Vakarchuk, S. B., and A. N. Shchitov. “Best Polynomial Approximations in

$L_2$ and Widths of Some Classes of Functions”. Ukrains’kyi Matematychnyi Zhurnal, vol. 56, no. 11, Nov. 2004, pp. 1458-66, https://umj.imath.kiev.ua/index.php/umj/article/view/3858.

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Best Polynomial Approximations in $L_2$ and Widths of Some Classes of Functions

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Best Polynomial Approximations in L2L_2 and Widths of Some Classes of Functions

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Best Polynomial Approximations in $L_2$ and Widths of Some Classes of Functions