A. N. Bakhvalov, “Examples of Divergent Fourier Series for Classes of Functions of Bounded $\Lambda$-Variation”, Mat. Zametki, 86:5 (2009), 664–672; Math. Notes, 86:5 (2009), 629

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Matematicheskie Zametki, 2009, Volume 86, Issue 5, Pages 664–672
DOI: https://doi.org/10.4213/mzm6631 (Mi mzm6631)

Examples of Divergent Fourier Series for Classes of Functions of Bounded $\Lambda$-Variation

A. N. Bakhvalov

M. V. Lomonosov Moscow State University, Faculty of Mechanics and Mathematics

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DOI: https://doi.org/10.4213/mzm6631

Abstract: The author has shown earlier that the requirement that a continuous function belong to the class $HBV([-\pi,\pi]^m)$ for $m\ge 3$ is not sufficient for the convergence of its Fourier series over rectangles. The author gave examples of functions of three and more variables from the Waterman class which are harmonic in the first variable and significantly narrower in the other variables and whose Fourier series are divergent at some point even on cubes. In the present paper, this assertion is strengthened. The main result is that such an example can be constructed even when the class with respect to the first variable is somewhat narrowed. Also the one-dimensional result due to Waterman is refined.

Keywords: divergent Fourier series, function of bounded $\Lambda$-variation, convergence of Fourier series over rectangles and cubes, Waterman class of functions, harmonic variation.

Received: 10.12.2008

English version:
Mathematical Notes, 2009, Volume 86, Issue 5, Pages 629–636
DOI: https://doi.org/10.1134/S0001434609110042

Bibliographic databases:

UDC: 517.518

Language: Russian

Citation: A. N. Bakhvalov, “Examples of Divergent Fourier Series for Classes of Functions of Bounded $\Lambda$-Variation”, Mat. Zametki, 86:5 (2009), 664–672; Math. Notes, 86:5 (2009), 629–636

Citation in format AMSBIB

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https://www.mathnet.ru/eng/mzm/v86/i5/p664

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

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Abstract page:	790
Full-text PDF :	204
References:	89
First page:	10

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