Limiting Weak-Type Behavior of the Centered Hardy–Littlewood Maximal Function of General Measures on the Positive Real Line

IF 0.7 4区 数学 Q2 MATHEMATICS Complex Analysis and Operator Theory Pub Date : 2024-05-03 DOI:10.1007/s11785-024-01533-1
Wu-yi Pan, Sheng-jian Li
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Abstract

Given a positive Borel measure \(\mu \) on the one-dimensional Euclidean space \(\textbf{R}\), consider the centered Hardy–Littlewood maximal function \(M_\mu \) acting on a finite positive Borel measure \(\nu \) by

$$\begin{aligned} M_{\mu }\nu (x):=\sup _{r>r_0(x)}\frac{\nu (B(x,r))}{\mu (B(x,r))},\quad \hbox { }\ x\in \textbf{R}, \end{aligned}$$

where \(r_0(x) = \inf \{r> 0: \mu (B(x,r)) > 0\}\) and B(xr) denotes the closed ball with centre x and radius \(r > 0\). In this note, we restrict our attention to Radon measures \(\mu \) on the positive real line \([0,+\infty )\). We provide a complete characterization of measures having weak-type asymptotic properties for the centered maximal function. Although we don’t know whether this fact can be extended to measures on the entire real line \(\textbf{R}\), we examine some criteria for the existence of the weak-type asymptotic properties for \(M_\mu \) on \(\textbf{R}\). We also discuss further properties, and compute the value of the relevant asymptotic quantity for several examples of measures.

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正实线上一般度量的居中哈代-利特尔伍德最大函数的极限弱类型行为
给定一维欧几里得空间 \(textbf{R}\)上的正伯乐度量 \(\mu\),考虑作用于有限正伯乐度量 \(\nu\)的居中哈代-利特尔伍德最大函数 \(M_\mu\),其值为 $$\begin{aligned}M_{\mu }\nu (x):=\sup _{r>r_0(x)}\frac{nu (B(x,r))}{\mu (B(x,r))},\quad \hbox { }\xin \textbf{R}, \end{aligned}$$其中 \(r_0(x) = \inf \{r> 0:\),B(x, r) 表示以 x 为中心、以 \(r > 0\) 为半径的闭合球。在本文中,我们将注意力限制在正实线\([0,+\infty )\)上的拉顿度量(Radon measures \(\mu \))。我们提供了对居中最大函数具有弱型渐近性质的度量的完整描述。尽管我们不知道这一事实是否可以扩展到整个实线 \(\textbf{R}\)上的度量,但我们研究了一些关于 \(M_\mu \) 在 \(\textbf{R}\)上的弱型渐近性质存在的标准。我们还讨论了进一步的性质,并计算了几个度量实例的相关渐近量的值。
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来源期刊
CiteScore
1.20
自引率
12.50%
发文量
107
审稿时长
3 months
期刊介绍: Complex Analysis and Operator Theory (CAOT) is devoted to the publication of current research developments in the closely related fields of complex analysis and operator theory as well as in applications to system theory, harmonic analysis, probability, statistics, learning theory, mathematical physics and other related fields. Articles using the theory of reproducing kernel spaces are in particular welcomed.
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