T. S. Mardvilko, “Sharp $L_p$-inequalities for derivatives of Blaschke products on the straight line”, PFMT, 2019, no. 4(41), 55

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Problemy Fiziki, Matematiki i Tekhniki (Problems of Physics, Mathematics and Technics), 2019, Issue 4(41), Pages 55–58 (Mi pfmt678)

MATHEMATICS

Sharp

$L_p$ -inequalities for derivatives of Blaschke products on the straight line

T. S. Mardvilko

Belarusian State University, Minsk

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Abstract: Extremal problems for the derivatives of Blaschke products in the Lebesgue space on a straight line are solved. The supremum and infimum of the seminorms

$||\!\bullet\!||_{L_p(\mathbb{R})}$ ,

$0<p<\infty$ ,

$p\ne 1/s$ from the derivatives of Blaschke products are obtained. Upper and lower inequalities for the higher derivatives of Blaschke products in the Lebesgue space

$L_{1/s}(\mathbb{R})$ were obtained by the author earlier.

Keywords: rational functions, Blaschke products, Bernstein type inequality.

Funding agency	Grant number
National Academy of Sciences of Belarus, Ministry of Education of the Republic of Belarus

Received: 04.09.2019

Document Type: Article

UDC: 517.51+517.53

Language: Russian

Citation: T. S. Mardvilko, “Sharp

$L_p$ -inequalities for derivatives of Blaschke products on the straight line”, PFMT, 2019, no. 4(41), 55–58

Citation in format AMSBIB

\Bibitem{Mar19}

\by T.~S.~Mardvilko

\paper Sharp $L_p$-inequalities for derivatives of Blaschke products on the straight line

\jour PFMT

\yr 2019

\issue 4(41)

\pages 55--58

\mathnet{http://mi.mathnet.ru/pfmt678}

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Citing articles in Google Scholar: Russian citations, English citations
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References:	28

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