The problem of trigonometric Fourier series multipliers of classes in λp;q spaces

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In this article, we consider weighted spaces of numerical sequences Ap,q, which are defined as sets of sequences a = {ak }fc=1, for which the norm /TO \ q IHUp,, := ( 1 ak |q k P "M < “ is finite. In the case of non-increasing sequences, the norm of the space Ap,q coincides with the norm of the classical Lorentz space lp,q. Necessary and sufficient conditions are obtained for embeddings of the space Ap,q into the space Api ,qi. The interpolation properties of these spaces with respect to the real interpolation method are studied. It is shown that the scale of spaces Ap,q is closed in the relative real interpolation method, as well as in relative to the complex interpolation method. A description of the dual space to the weighted space Ap,q is obtained. Specifically, it is shown that the space is reflective, where p', q' are conjugate to the parameters p and q. The paper also studies the properties of the convolution operator in these spaces. The main result of this work is an O'Neil type inequality. The resulting inequality generalizes the classical Young-O'Neil inequality. The research methods are based on the interpolation theorems proved in this paper for the spaces Ap,q.

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Bakhyt A. The problem of trigonometric Fourier series multipliers of classes in λp;q spaces/A. Bakhyt, N.T. Tleukhanova//Қарағанды университетінің хабаршысы. Математика сериясы. = Вестник Карагандинского университета. Серия Математика. = Bulletin of the Karaganda university. Mathemаtics Series. -2020. №4. Р.17-25.

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