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JOURNALS // Matematicheskie Zametki // Archive

Mat. Zametki, 2023 Volume 114, Issue 4, Pages 553–572 (Mi mzm13953)

Papers published in the English version of the journal

Characterization of $B_{p(\cdot)}$ Weight and Some Maximal Characterizations of Anisotropic Weighted Hardy–Lorentz Spaces with Variable Exponent

H. Lia, X. Yub

a Zhejiang International Studies University
b Shangrao Normal University

Abstract: In the present paper the variable exponent anisotropic weighted Hardy-Lorentz spaces is introduced. We prove a characterization of a modular inequality of the classical Hardy operator on the decreasing cone of the variable exponent Lebesgue spaces which leads to a criterion of the boundedness for the Hardy–Littlewood operator on the variable exponent weighted Lorentz spaces. Furthermore, we get some characterizations of the variable exponent anisotropic weighted Hardy-Lorentz spaces by maximal operators. Also the completeness of these spaces are investigated. Specifying the weights and exponents we recover the existing results as well as we obtain new results in the new and old settings.

Keywords: Hardy operator, maximal operator, weighted Hardy–Lorentz space, weighted Lorentz space.

MSC: 46E30, 46B42

Received: 16.03.2023
Revised: 06.06.2023

Language: English


 English version:
Mathematical Notes, 2023, 114:4, 553–572

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© Steklov Math. Inst. of RAS, 2024