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Proceedings of the Yerevan State University, series Physical and Mathematical Sciences, 2015, Issue 2, Pages 26–29
(Mi uzeru21)
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Mathematics
On divergence of Fourier–Walsh series of continuous function
S. A. Sargsyan
Yerevan State University
Abstract:
We prove that for any perfect set $P$ of positive measure, for which $0$ is a density point, one can construct a function $f(x)$ continuous on $[0,1)$ such that each measurable and bounded function, which coincides with $f(x)$ on the set $P$ has diverging Fourier–Walsh series at $0$.
Keywords:
Fourier–Walsh series, continuous function, divergence.
Received: 13.04.2015
Accepted: 04.05.2015
Citation:
S. A. Sargsyan, “On divergence of Fourier–Walsh series of continuous function”, Proceedings of the YSU, Physical and Mathematical Sciences, 2015, no. 2, 26–29
Linking options:
https://www.mathnet.ru/eng/uzeru21 https://www.mathnet.ru/eng/uzeru/y2015/i2/p26
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| Abstract page: | 75 | | Full-text PDF : | 25 | | References: | 53 |
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