On weighted integrability of the sum of series with monotone coefficients with respect to multiplicative systems

Authors

  • M.Zh. Turgumbaev
  • Z.R. Suleimenova
  • D.I. Tungushbaeva

DOI:

https://doi.org/10.31489/2023m2/160-168

Keywords:

multiplicative systems, decomposition, weighted integrability, sum of series, generator sequence, monotone coefficients, Hardy-Littlewood theorem, Lebesgue space

Abstract

In this paper, we consider the questions about the weighted integrability of the sum of series with respect to multiplicative systems with monotone coefficients. Conditions are obtained for weight functions that ensure that the sum of such series belongs to the weighted Lebesgue space. The main theorems are proved without the condition that the generator sequence is bounded; in particular, it can be unbounded. In the case of boundedness of the generator sequence, the proved theorems imply an analogue of the well-known Hardy-Littlewood theorem on trigonometric series with monotone coefficients.

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Published

2023-06-30

Issue

Section

MATHEMATICS