S. V. Konyagin, I. D. Shkredov, “A quantitative version of the Beurling-Helson theorem”, Funktsional. Anal. i Prilozhen., 49:2 (2015), 39–53; Funct. Anal. Appl., 49:2 (2015), 110

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Funktsional'nyi Analiz i ego Prilozheniya, 2015, Volume 49, Issue 2, Pages 39–53
DOI: https://doi.org/10.4213/faa3185 (Mi faa3185)

This article is cited in 7 scientific papers (total in 7 papers)

A quantitative version of the Beurling-Helson theorem

S. V. Konyagin^ab, I. D. Shkredov^ca

^a Steklov Mathematical Institute of Russian Academy of Sciences
^b Lomonosov Moscow State University, Faculty of Mechanics and Mathematics
^c Institute for Information Transmission Problems of the Russian Academy of Sciences (Kharkevich Institute), Moscow

Full-text PDF (206 kB) Citations (7)

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DOI: https://doi.org/10.4213/faa3185

Abstract: It is proved that any continuous function

$\varphi$ on the unit circle such that the sequence

$\{e^{in\varphi}\}_{n\in\mathbb{Z}}$ has small Wiener norm

$\|e^{in\varphi}\| = o(\log^{1/22}|n|(\log \log |n|)^{-3/11})$ ,

$|n| \to \infty$ , is linear. Moreover, lower bounds for the Wiener norms of the characteristic functions of subsets of

$\mathbb{Z}_p$ in the case of prime

$p$ are obtained.

Keywords: Wiener norm, Beurling-Helson theorem, dissociated sets.

Funding agency	Grant number
Russian Foundation for Basic Research	14-01-00332 12-01-33080-мол_а_вед
Ministry of Education and Science of the Russian Federation	НШ-3082.2014.1
The first author acknowledges the support of RFBR grant no. 14-01-00332 and of the program "Leading Scientific Schools," grant no. 3082.2014.1. The second author acknowledges the support of RFBR grant no. 12-01-33080-mol_a_ved.

Received: 14.01.2014

English version:
Functional Analysis and Its Applications, 2015, Volume 49, Issue 2, Pages 110–121
DOI: https://doi.org/10.1007/s10688-015-0093-0

Bibliographic databases:

Document Type: Article

UDC: 517.518.45

Language: Russian

Citation: S. V. Konyagin, I. D. Shkredov, “A quantitative version of the Beurling-Helson theorem”, Funktsional. Anal. i Prilozhen., 49:2 (2015), 39–53; Funct. Anal. Appl., 49:2 (2015), 110–121

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This publication is cited in the following 7 articles:

Noga Alon, Matija Bucić, Lisa Sauermann, Dmitrii Zakharov, Or Zamir, “Essentially tight bounds for rainbow cycles in proper edge‐colourings”, Proceedings of London Math Soc, 130:4 (2025)
I.D. Shkredov, “Additive dimension and the growth of sets”, Discrete Mathematics, 347:9 (2024), 114077
M. R. Gabdullin, “Lower Bounds for the Wiener Norm in $\mathbb Z_p^d$ ”, Math. Notes, 107:4 (2020), 574–588
T. Sanders, “Bounds in cohen's idempotent theorem”, J. Fourier Anal. Appl., 26:2 (2020), 25
V. Lebedev, A. Olevskii, “Homeomorphic changes of variable and Fourier multipliers”, J. Math. Anal. Appl., 481:2 (2020), 123502
I. D. Shkredov, Trigonometric Sums and Their Applications, 2020, 261
V. Lebedev, “Quantitative aspects of the Beurling-Helson theorem: phase functions of a special form”, Studia Math., 247:3 (2019), 273–283

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

Functional Analysis and Its Applications

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