Sparse Non-Smooth Atomic Decomposition of Quasi-Banach Lattices

Naoya Hatano; Ryota Kawasumi; Yoshihiro Sawano

doi:10.1007/s00041-022-09956-0

Sparse Non-Smooth Atomic Decomposition of Quasi-Banach Lattices

Naoya Hatano, Ryota Kawasumi, Yoshihiro Sawano

Research output: Contribution to journal › Article › peer-review

Abstract

A theory of non-smooth atomic decomposition is obtained for a large class of quasi-Banach lattices, including Morrey spaces, Lorentz spaces, mixed Lebesgue spaces as well as some related function spaces. As an application, an inequality comparing the fractional maximal operator and the fractional integral operator is considered. Some examples show that the restriction posed on quasi-Banach lattices are indispensable. This paper, which is a follow-up of the third author’s paper in 2020, simplifies the proof of some existing results.

Original language	English
Article number	61
Journal	Journal of Fourier Analysis and Applications
Volume	28
Issue number	4
DOIs	https://doi.org/10.1007/s00041-022-09956-0
Publication status	Published - Aug 2022

Keywords

Decomposition
Fractional integral operators
Quasi-Banach lattices

ASJC Scopus subject areas

Analysis
Mathematics(all)
Applied Mathematics

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10.1007/s00041-022-09956-0

Cite this

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abstract = "A theory of non-smooth atomic decomposition is obtained for a large class of quasi-Banach lattices, including Morrey spaces, Lorentz spaces, mixed Lebesgue spaces as well as some related function spaces. As an application, an inequality comparing the fractional maximal operator and the fractional integral operator is considered. Some examples show that the restriction posed on quasi-Banach lattices are indispensable. This paper, which is a follow-up of the third author{\textquoteright}s paper in 2020, simplifies the proof of some existing results.",

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AB - A theory of non-smooth atomic decomposition is obtained for a large class of quasi-Banach lattices, including Morrey spaces, Lorentz spaces, mixed Lebesgue spaces as well as some related function spaces. As an application, an inequality comparing the fractional maximal operator and the fractional integral operator is considered. Some examples show that the restriction posed on quasi-Banach lattices are indispensable. This paper, which is a follow-up of the third author’s paper in 2020, simplifies the proof of some existing results.

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Sparse Non-Smooth Atomic Decomposition of Quasi-Banach Lattices

Abstract

Keywords

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