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Markov’s weak inequality for algebraic polynomials on a closed interval
N. S. Payuchenkoab a Institute of Mathematics and Mechanics, Ural Branch of the Russian Academy of Sciences, Ekaterinburg
b Ural Federal University named after the First President of Russia B. N. Yeltsin, Ekaterinburg
Abstract:
For a real algebraic polynomial $P_n$ of degree $n$, we consider the ratio $M_n(P_n)$ of the measure of the set of points from $[-1,1]$ where the absolute value of the derivative exceeds $n^2$ to the measure of the set of points where the absolute value of the polynomial exceeds 1. We study the supremum $M_n=\sup M_n(P_n)$ over the set of polynomials $P_n$ whose uniform norm on $[- 1,1]$ is greater than 1. It is known that $M_n$ is the supremum of the exact constants in Markov's inequality in the class of integral functionals generated by a nondecreasing nonnegative function. In this paper we prove the estimates $1+3/(n^{2}-1)\le M_n \le 6n+1$ for $n\ge2$.
Keywords:
Markov's inequality, algebraic polynomials, Lebesgue measure, weak-type inequalities.
Received: 02.04.2019
Citation:
N. S. Payuchenko, “Markov’s weak inequality for algebraic polynomials on a closed interval”, Trudy Inst. Mat. i Mekh. UrO RAN, 25, no. 2, 2019, 160–166
Linking options:
https://www.mathnet.ru/eng/timm1632 https://www.mathnet.ru/eng/timm/v25/i2/p160
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Abstract page: | 194 | Full-text PDF : | 61 | References: | 34 | First page: | 7 |
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