Про нерівність Лебега на класах $\bar{\psi}$-диференційовних функцій

M. V. Gayevs’kyĭ; P. V. Zadereĭ

On Lebesgue continuity on classes of $\bar{\psi}$-differentiable functions

Authors

M. V. Gayevs’kyĭ Institute of Mathematics of NAS of Ukraine
P. V. Zadereĭ Institute of Mathematics of NAS of Ukraine

Abstract

In this paper estimates deviations of Fourier sums on the spaces $C^{\bar{\psi}}$ expressed in terms of the best approximation of $\bar{\psi}$-derivatives of functions in the understanding A.~I.~Stepanets are found. The sequence $\bar{\psi}=(\psi_1,\psi_2)$ the conditions of Boas-Telyakovskij are satisfy

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Published

2013-07-15

How to Cite

Gayevs’kyĭ, M. V., & Zadereĭ, P. V. (2013). On Lebesgue continuity on classes of $\bar{\psi}$-differentiable functions. Transactions of Institute of Mathematics, the NAS of Ukraine, 10(1), 59–68. Retrieved from https://trim.imath.kiev.ua/index.php/trim/article/view/139