Kolmogorov and linear widths of classes of s-monotone integrable functions

В. Н. Коновалов

Kolmogorov and linear widths of classes of s-monotone integrable functions

Authors

V. N. Konovalov

Abstract

Let

$s \in \mathbb{N}$ and let

$\Delta^s_+$ be the set of functions

$x \mapsto \mathbb{R}$ on a finite interval

$I$ such that the divided differences

$[x; t_0, ... , t_s ]$ of order

$s$ of these functions are nonnegative for all collections of

$s + 1$ distinct points

$t_0,..., t_s \in I$ . For the classes

$\Delta^s_+ B_p := \Delta^s_+ \bigcap B_p$ , where

$B_p$ is the unit ball in

$L_p$ , we obtain orders of the Kolmogorov and linear widths in the spaces

$L_q$ for

$1 \leq q < p \leq \infty$ .

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Published

25.12.2005

Issue

Vol. 57 No. 12 (2005)

Section

Research articles

How to Cite

Konovalov, V. N. “Kolmogorov and Linear Widths of Classes of S-Monotone Integrable Functions”. Ukrains’kyi Matematychnyi Zhurnal, vol. 57, no. 12, Dec. 2005, pp. 1633–1652, https://umj.imath.kiev.ua/index.php/umj/article/view/3715.

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Kolmogorov and linear widths of classes of s-monotone integrable functions

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