Interpolating-orthogonal wavelet systems / Chernykh N. I.,Subbotin Yu. N. // PROCEEDINGS OF THE STEKLOV INSTITUTE OF MATHEMATICS. - 2009. - V. 264, l. . - P. 107-115.

ISSN/EISSN:
0081-5438 / нет данных
Type:
Article
Abstract:
Based upon Meyer wavelets, new systems of periodic wavelets and wavelets on the whole axis are constructed; these systems are orthogonal and interpolating simultaneously. Estimates of the errors of approximation of different classes of smooth functions by these wavelets are obtained.
Author keywords:
orthogonal bases of wavelets; interpolation systems; multiresolution analysis
DOI:
10.1134/S0081543809050083
Web of Science ID:
ISI:000265511100008
Соавторы в МНС:
Другие поля
Поле Значение
Month JUL
Publisher MAIK NAUKA/INTERPERIODICA/SPRINGER
Address 233 SPRING ST, NEW YORK, NY 10013-1578 USA
Language English
Research-Areas Mathematics
Web-of-Science-Categories Mathematics, Applied; Mathematics
Author-Email Nikolai.Chernykh@imm.uran.ru yunsub@imm.uran.ru
ResearcherID-Numbers Subbotin, Yurii Nikolaevich/C-4273-2017
Funding-Acknowledgement Russian Foundation for Basic Research {[}08-01-00213, 08-01-00320]; Russian Federation {[}NSh-1071.2008.1]
Funding-Text This work was supported by the Russian Foundation for Basic Research (project nos. 08-01-00213 and 08-01-00320) and by the Program for State Support of Leading Scientific Schools of the Russian Federation (project no. NSh-1071.2008.1).
Number-of-Cited-References 15
Usage-Count-Since-2013 2
Journal-ISO Proc. Steklov Inst. Math.
Doc-Delivery-Number 437TZ