最大算子和奇异积分的加权弱型不等式

David Cruz-Uribe, Brandon Sweeting
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引用次数: 0

摘要

我们证明了最大算子、奇异积分、分数最大算子和分数积分算子的定量、一重、弱式估计。我们考虑了一种弱型不等式,该不等式最早由 Muckenhoupt 和 Wheeden 研究(Indiana Univ.J.26(5):801-816,1977)以及后来的 Cruz-Uribe 等人(Int. Math. Res. Not.)我们利用稀疏支配技术,在标量和矩阵加权设置中获得了这些算子的定量估计。我们的结果扩展了克鲁兹-乌里韦等人 (Rev. Mat. Iberoam.Iberoam.37(4):1513-1538,2021)在 \(p=1\) 时对于奇异积分和最大算子得到的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Weighted weak-type inequalities for maximal operators and singular integrals

We prove quantitative, one-weight, weak-type estimates for maximal operators, singular integrals, fractional maximal operators and fractional integral operators. We consider a kind of weak-type inequality that was first studied by Muckenhoupt and Wheeden (Indiana Univ. Math. J. 26(5):801–816, 1977) and later in Cruz-Uribe et al. (Int. Math. Res. Not. 30:1849–1871, 2005). We obtain quantitative estimates for these operators in both the scalar and matrix weighted setting using sparse domination techniques. Our results extend those obtained by Cruz-Uribe et al. (Rev. Mat. Iberoam. 37(4):1513–1538, 2021) for singular integrals and maximal operators when \(p=1\).

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