Approximation Properties of Systems of Periodic Wavelets on the Cantor Group

E. A. Lebedeva

Результат исследований: Научные публикации в периодических изданияхстатья

Выдержка

We construct systems of periodic dyadic wavelets and study approximation properties of such systems by using the notion of a multiresolution analysis. We prove a Jackson type inequality for the spaces constituting the multiresolution analysis and obtain a periodic analogue of the Strang–Fix condition.

Язык оригиналаанглийский
Страницы (с-по)642-648
ЖурналJournal of Mathematical Sciences (United States)
Том244
Номер выпуска4
Ранняя дата в режиме онлайн18 дек 2019
DOI
СостояниеОпубликовано - янв 2020

Отпечаток

Multiresolution analysis
Multiresolution Analysis
Cantor
Approximation Property
Wavelets
Analogue

Предметные области Scopus

  • Математика (все)
  • Прикладная математика
  • Анализ

Цитировать

Lebedeva, E. A. / Approximation Properties of Systems of Periodic Wavelets on the Cantor Group. В: Journal of Mathematical Sciences (United States). 2020 ; Том 244, № 4. стр. 642-648.
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Lebedeva, EA 2020, 'Approximation Properties of Systems of Periodic Wavelets on the Cantor Group', Journal of Mathematical Sciences (United States), том. 244, № 4, стр. 642-648. https://doi.org/10.1007/s10958-019-04638-7

Approximation Properties of Systems of Periodic Wavelets on the Cantor Group. / Lebedeva, E. A.

В: Journal of Mathematical Sciences (United States), Том 244, № 4, 01.2020, стр. 642-648.

Результат исследований: Научные публикации в периодических изданияхстатья

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Lebedeva EA. Approximation Properties of Systems of Periodic Wavelets on the Cantor Group. Journal of Mathematical Sciences (United States). 2020 Янв.;244(4):642-648. https://doi.org/10.1007/s10958-019-04638-7

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