Convergence of General Fourier Series of Differentiable Functions

Convergence of General Fourier Series of Differentiable Functions

Convergence of classical Fourier series (trigonometric, Haar, Walsh, systems) of differentiable functions are trivial problems and they are well known. But general Fourier series, as it is known, even for the function does not converge. In such a case, if we want differentiable functions with respec...

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Veröffentlicht in:Journal of contemporary mathematical analysis 2023-12, Vol.58 (6), p.431-443
1. Verfasser: Tsagareishvili, V.
Format: Artikel
Sprache:eng
Schlagworte:
Convergence
Fourier series
Mathematics
Mathematics and Statistics
Real and Complex Analysis
Subsystems
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Beschreibung
Zusammenfassung:Convergence of classical Fourier series (trigonometric, Haar, Walsh, systems) of differentiable functions are trivial problems and they are well known. But general Fourier series, as it is known, even for the function does not converge. In such a case, if we want differentiable functions with respect to the general orthonormal system (ONS) to have convergent Fourier series, we must find the special conditions on the functions of system . This problem is studied in the present paper. It is established that the resulting conditions are best possible. Subsystems of general orthonormal systems are considered.
ISSN:1068-3623
1934-9416
DOI:10.3103/S1068362323060067