Sharp upper bounds of norms of functions and their derivatives on classes of functions with given comparison function

В. А. Кофанов

Sharp upper bounds of norms of functions and their derivatives on classes of functions with given comparison function

Authors

V. A. Kofanov

Abstract

For arbitrary

$[\alpha, \beta] \subset \textbf{R}$ and

$p > 0$ , we solve the extremal problem

$\int_{\alpha}^{\beta}|x^{(k)}(t)|^q dt \rightarrow \sup, \quad q \geq p, \quad k = 0, \quad \text{or} \quad q \geq 1, \quad k \geq 1,$ on the set of functions

$S^k_{\varphi}$ such that

$\varphi ^{(i)}$ is the comparison function for

$x^{(i)},\; i = 0, 1, . . . , k$ , and (in the case

$k = 0$ )

$L(x)_p \leq L(\varphi)_p$ , where

$L(x)_p := \sup \left\{\left(\int^b_a|x(t)|^p dt \right)^{1/p}\; :\; a, b \in \textbf{R},\; |x(t)| > 0,\; t \in (a, b) \right\}$ In particular, we solve this extremal problem for Sobolev classes and for bounded sets of the spaces of trigonometric polynomials and splines.

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Published

25.07.2011

Issue

Vol. 63 No. 7 (2011)

Section

Research articles

How to Cite

Kofanov, V. A. “Sharp Upper Bounds of Norms of Functions and Their Derivatives on Classes of Functions With Given Comparison Function”. Ukrains’kyi Matematychnyi Zhurnal, vol. 63, no. 7, July 2011, pp. 969-84, https://umj.imath.kiev.ua/index.php/umj/article/view/2778.

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Sharp upper bounds of norms of functions and their derivatives on classes of functions with given comparison function

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