APPROXIMATION OF DIFFERENTIATION OPERATORS BY BOUNDED LINEAR OPERATORS IN LEBESGUE SPACES ON THE AXIS AND RELATED PROBLEMS IN THE SPACES OF (p,q) -MULTIPLIERS AND THEIR PREDUAL SPACES
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Информация об архиве | Просмотр оригинала| Поле | Значение | |
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APPROXIMATION OF DIFFERENTIATION OPERATORS BY BOUNDED LINEAR OPERATORS IN LEBESGUE SPACES ON THE AXIS AND RELATED PROBLEMS IN THE SPACES OF (p,q) -MULTIPLIERS AND THEIR PREDUAL SPACES
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| Автор |
Arestov, Vitalii V.
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| Тематика |
DIFFERENTIATION OPERATOR
STECHKIN'S PROBLEM KOLMOGOROV INEQUALITY (P,Q) –MULTIPLIER PREDUAL SPACE FOR THE SPACE OF (P,Q) -MULTIPLIERS |
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| Описание |
We consider a variant En,k(N;r,r;p,p) of the four-parameter Stechkin problem En,k(N;r,s;p,q) on the best approximation of differentiation operators of order k on the class of n times differentiable functions (0
This work was supported by the Russian Science Foundation, project no. 22-21-00526, https://rscf.ru/project/22-21-00526/ |
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| Дата |
2024-02-14T05:20:43Z
2024-02-14T05:20:43Z 2023 |
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| Тип |
Article
Journal article (info:eu-repo/semantics/article) Published version (info:eu-repo/semantics/publishedVersion) |
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| Идентификатор |
Arestov Vitalii V. APPROXIMATION OF DIFFERENTIATION OPERATORS BY BOUNDED LINEAR OPERATORS IN LEBESGUE SPACES ON THE AXIS AND RELATED PROBLEMS IN THE SPACES OF (p,q) -MULTIPLIERS AND THEIR PREDUAL SPACES / Vitalii V. Arestov. — Text : electronic // Ural Mathematical Journal. — 2023. — Volume 9. — № 2. — P. 4-27.
2414-3952 https://umjuran.ru/index.php/umj/article/view/701 http://elar.urfu.ru/handle/10995/129429 59690638 10.15826/umj.2023.2.001 |
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| Язык |
en
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| Связанные ресурсы |
Ural Mathematical Journal. 2023. Volume 9. № 2
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| Права |
Creative Commons Attribution License
https://creativecommons.org/licenses/by/4.0/ |
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| Формат |
application/pdf
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