Weak and Strong Type A 1 - A ∞ Estimates for Sparsely Dominated Operators.

IF 1.5 2区数学 Q1 MATHEMATICS Journal of Geometric Analysis Pub Date : 2019-01-01 Epub Date: 2018-02-06 DOI:10.1007/s12220-018-9989-2

Dorothee Frey, Zoe Nieraeth

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引用次数: 18

Abstract

We consider operators T satisfying a sparse domination property $\begin{matrix} | ⟨ T f, g ⟩ | \leq c \sum_{Q \in S} {⟨ f ⟩}_{p_{0}, Q} {⟨ g ⟩}_{q_{0}^{'}, Q} | Q | \end{matrix}$ with averaging exponents $1 \leq p_{0} < q_{0} \leq \infty$ . We prove weighted strong type boundedness for $p_{0} < p < q_{0}$ and use new techniques to prove weighted weak type $(p_{0}, p_{0})$ boundedness with quantitative mixed $A_{1}$ - $A_{\infty}$ estimates, generalizing results of Lerner, Ombrosi, and Pérez and Hytönen and Pérez. Even in the case $p_{0} = 1$ we improve upon their results as we do not make use of a Hörmander condition of the operator T. Moreover, we also establish a dual weak type $(q_{0}^{'}, q_{0}^{'})$ estimate. In a last part, we give a result on the optimality of the weighted strong type bounds including those previously obtained by Bernicot, Frey, and Petermichl.

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稀疏支配算子的弱和强A 1 - A∞估计。

我们考虑算子T满足一个稀疏支配性质|⟨T f, g⟩|≤c∑Q∈S⟨f⟩p 0, Q⟨g⟩Q 0 '， Q | Q |平均指数1≤p 0 Q 0≤∞。我们证明了p 0 p q 0的加权强型有界性，并利用新技术用定量混合a1 - A∞估计证明了加权弱型(p 0, p 0)有界性，推广了Lerner, Ombrosi, and p兼并和Hytönen and p兼并的结果。即使在p 0 = 1的情况下，我们也改进了他们的结果，因为我们没有利用算子t的Hörmander条件。此外，我们还建立了一个对偶弱类型(q0 '， q0 ')估计。在最后一部分中，我们给出了加权强类型界的最优性的结果，包括以前由Bernicot, Frey和Petermichl得到的结果。

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来源期刊

Journal of Geometric Analysis 数学-数学

CiteScore

2.00

自引率

9.10%

发文量

290

审稿时长

3 months

期刊介绍： JGA publishes both research and high-level expository papers in geometric analysis and its applications. There are no restrictions on page length.

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