Email this article Rademacher Chaoses in Problems of Constructing Spline Affine Systems
- Authors: Lukomskii S.F.1, Terekhin P.A.1, Chumachenko S.A.1
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Affiliations:
- Chernyshevskii Saratov National Research State University
- Issue: Vol 103, No 5-6 (2018)
- Pages: 919-928
- Section: Article
- URL: https://journals.rcsi.science/0001-4346/article/view/150975
- DOI: https://doi.org/10.1134/S0001434618050280
- ID: 150975
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Abstract
The paper considers systems of dilations and translations of spline functions ψm each of which is obtained by successive integration and antiperiodization of the previous one and the initial function is the Haar function χ. It is proved that, first, each such function ψm is the sum of finitely many series in Rademacher chaoses of odd order and, second, for eachm, the system of dilations and translations of the function ψm constitutes a Riesz basis; moreover, lower and upper Riesz bounds for these systems can be chosen universal, i.e., independent of m.
About the authors
S. F. Lukomskii
Chernyshevskii Saratov National Research State University
Author for correspondence.
Email: lukomskiisf@info.sgu.ru
Russian Federation, Saratov
P. A. Terekhin
Chernyshevskii Saratov National Research State University
Email: lukomskiisf@info.sgu.ru
Russian Federation, Saratov
S. A. Chumachenko
Chernyshevskii Saratov National Research State University
Email: lukomskiisf@info.sgu.ru
Russian Federation, Saratov
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