On sharp Kolmogorov-type inequalities taking into account the number of sign changes of derivatives

В. А. Кофанов; В. Е. Миропольский

On sharp Kolmogorov-type inequalities taking into account the number of sign changes of derivatives

Authors

V. A. Kofanov
V. E. Miropol'skii

Abstract

New sharp inequalities of the Kolmogorov type are established, in particular, the following sharp inequality for

$2 \pi$ -periodic functions

$x \in L^r_{\infty}(T):$

$||x^{(k)}||_l \leq \left(\frac{\nu(x')}{2} \right)^{\left(1 - \frac1p \right)\alpha} \frac{||\varphi_{r-k}||_l}{||\varphi_r||^{\alpha}_p} ||x||^{\alpha}_p \left|\left|x^{(r)}\right|\right|^{1-\alpha}_{\infty},$

$k,\;r \in \mathbb{N},\quad k < r, \quad r \geq 3,\quad p \in [1, \infty],\quad \alpha = (r-k) / (r - 1 + 1/p), \quad \varphi_r$ is the perfect Euler spline of order

$r,\quad \nu(x')$ is the number of sign changes of the derivative

$x'$ on a period.

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Published

25.12.2008

Issue

Vol. 60 No. 12 (2008)

Section

Research articles

How to Cite

Kofanov, V. A., and V. E. Miropol'skii. “On Sharp Kolmogorov-Type Inequalities Taking into Account the Number of Sign Changes of Derivatives”. Ukrains’kyi Matematychnyi Zhurnal, vol. 60, no. 12, Dec. 2008, pp. 1642–1649, https://umj.imath.kiev.ua/index.php/umj/article/view/3278.

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On sharp Kolmogorov-type inequalities taking into account the number of sign changes of derivatives

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