Hardy空间 $H^1(\mathbb{B}_{n})$ 上的 Toeplitz 型算子

数学物理学报 ›› 2025, Vol. 45 ›› Issue (4): 1161-1170.

Hardy空间 $H^1(\mathbb{B}_{n})$ 上的 Toeplitz 型算子

温新奇^1,^*(),袁程²()

¹太原学院数学系太原 030032
²广东工业大学数学与统计学院广州 510520

收稿日期:2025-02-14 修回日期:2025-04-14 出版日期:2025-08-26 发布日期:2025-08-01
通讯作者: *E-mail: wenxq0605@163.com
作者简介:E-mail: yuancheng1984@163.com
基金资助:
太原学院院级青年科研项目(24TYQN20)

A Toeplitz-Type Operator on Hardy Space $H^1(\mathbb{B}_{n})$

Wen Xinqi^1,^*(),Yuan Cheng²()

¹Department of Mathematics, Taiyuan University, Taiyuan 030032
²School of Mathematics and Statistics, Guangdong University of Technology, Guangzhou 510520

Received:2025-02-14 Revised:2025-04-14 Online:2025-08-26 Published:2025-08-01
Supported by:
Taiyuan University Youth Research Project(24TYQN20)

摘要/Abstract

摘要：

该文主要研究了$n$ 维复单位球 $\mathbb{B}_{n}$ 中 Hardy 空间 $H^1(\mathbb{B}_{n})$ 上的 Toeplitz 型算子 $Q_\mu$ 的有界性, 证明了如下结论: 设 $\mu$ 是 $\mathbb{B}_{n}$ 上的正 Borel 测度, $0, 则有以下结论成立

1. 若$\mu$是一个$(1,1)$-型对数Carleson测度, 则$Q_\mu: H^1(\mathbb{B}_{n})\to H^1(\mathbb{B}_{n})$ 是一个有界线性算子;

2. 若$Q_\mu: H^1(\mathbb{B}_{n})\to H^1(\mathbb{B}_{n})$是一个有界线性算子, 则$\mu$是$\mathbb{B}_{n}$上的一个Carleson测度;

3. $Q_\mu: H^p(\mathbb{B}_{n})\to H^q(\mathbb{B}_{n})$是有界线性算子当且仅当$\mu$是一个$(1+\frac1p-\frac1q)$-Carleson测度.

关键词: Hardy 空间, Toeplitz 型算子, Carleson 测度

Abstract:

This paper investigates the boundedness of a Toeplitz operator $Q_\mu$ acting on the Hardy space $H^1(\mathbb{B}_{n})$. Let $\mu$ be a positive Borel measure on $\mathbb{B}_{n}$ and $0. The main results are following

1. If $\mu$ is a $(1,1)$-logarithmic Carleson measure, then $Q_\mu: H^1(\mathbb{B}_{n})\to H^1(\mathbb{B}_{n})$ is bounded;

2. If $Q_\mu: H^1(\mathbb{B}_{n})\to H^1(\mathbb{B}_{n})$ is bounded, then $\mu$ is a Carleson measure;

3. $Q_\mu: H^p(\mathbb{B}_{n})\to H^q(\mathbb{B}_{n})$ is bounded if and only if $\mu$ is a $(1+\frac1p-\frac1q)$-Carleson measure.

Key words: Hardy spaces, Toeplitz-type operators, Carleson measures

中图分类号:

O174.56

温新奇, 袁程. Hardy空间 $H^1(\mathbb{B}_{n})$ 上的 Toeplitz 型算子[J]. 数学物理学报, 2025, 45(4): 1161-1170.

Wen Xinqi, Yuan Cheng. A Toeplitz-Type Operator on Hardy Space $H^1(\mathbb{B}_{n})$[J]. Acta mathematica scientia,Series A, 2025, 45(4): 1161-1170.

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