Off-diagonal matrix extrapolation for Muckenhoupt bases

David Cruz-Uribe OFS; Fatih Şirin

doi:10.54330/afm.176290

Off-diagonal matrix extrapolation for Muckenhoupt bases

Författare

David Cruz-Uribe OFS University of Alabama, Department of Mathematics
Fatih Şirin Haliç University, Department of Mathematics

DOI:

https://doi.org/10.54330/afm.176290

Nyckelord:

Convex-set valued functions, maximal operators, off-diagonal inequalities, Muckenhoupt weights, matrix weights, Rubio de Francia extrapolation

Abstract

In this paper we extend the theory of Rubio de Francia extrapolation for matrix weights, recently introduced by Bownik and the first author (2022), to off-diagonal extrapolation. We also show that the theory of matrix weighted extrapolation can be extended to matrix \(A_p\) classes defined with respect to a general basis, provided that a version of the Christ–Goldberg maximal operator is assumed to be bounded. Finally, we extend a recent result by Vuorinen (2024) and show that all of the multiparameter bases have this property.

Nedladdningar

PDF (Engelska)

Publicerad

2025-10-14

Nummer

Vol 50 Nr 2 (2025)

Sektion

Articles

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Referera så här

Cruz-Uribe OFS, D., & Şirin, F. (2025). Off-diagonal matrix extrapolation for Muckenhoupt bases. Annales Fennici Mathematici, 50(2), 577–609. https://doi.org/10.54330/afm.176290

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