A Derivative-Hilbert operator acting on Hardy spaces

IF 1.2 4区 数学 Q1 MATHEMATICS
Shanli Ye, Guanghao Feng
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引用次数: 0

Abstract

Let μ be a positive Borel measure on the interval [0, 1). The Hankel matrix \({{\cal H}_\mu} = {({\mu _{n,k}})_{n,k \ge 0}}\) with entries μn,k = μn+k, where μn = [0,1)tndμ(t), induces formally the operator as

${\cal D}{{\cal H}_\mu}(f)(z) = \sum\limits_{n = 0}^\infty {\left({\sum\limits_{k = 0}^\infty {{\mu _{n,k}}{a_k}}} \right)(n + 1){z^n},z \in \mathbb{D}} $

where \(f(z) = \sum\limits_{n = 0}^\infty {{a_n}{z^n}} \) is an analytic function in \(\mathbb{D}\). We characterize the positive Borel measures on [0,1) such that \({\cal D}{{\cal H}_\mu}(f)(z) = \int_{[0,1)} {{{f(t)} \over {{{(1 - tz)}^2}}}{\rm{d}}\mu (t)} \) for all f in the Hardy spaces Hp(0 < p < ∞), and among these we describe those for which \({\cal D}{{\cal H}_\mu}\) is a bounded (resp., compact) operator from Hp (0 < p < ∞) into Hq (q > p and q ≥ 1). We also study the analogous problem in the Hardy spaces Hp(1 ≤ p ≤ 2).

作用于Hardy空间的导数Hilbert算子
设μ是区间[0,1)上的正Borel测度。Hankel矩阵\ ty{\mu_{n,k}}{a_k}}}}右)(n+1){z^n},z\in\mathbb{D}}$其中\(f(z)=\sum\limits_{n=0}^\infty{a_n}{z^n}})是\(\mathbb{D}\)中的一个分析函数。我们刻画了[0,1)上的正Borel测度,使得对于Hardy空间Hp(0<;p<;∞)中的所有f,\({\cal D}{\ccal H}_\mu}lt;p<;∞)转换为Hq(q>;p且q≥1)我们还研究了Hardy空间Hp(1≤p≤2)中的类似问题。
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来源期刊
CiteScore
2.00
自引率
10.00%
发文量
2614
审稿时长
6 months
期刊介绍: Acta Mathematica Scientia was founded by Prof. Li Guoping (Lee Kwok Ping) in April 1981. The aim of Acta Mathematica Scientia is to present to the specialized readers important new achievements in the areas of mathematical sciences. The journal considers for publication of original research papers in all areas related to the frontier branches of mathematics with other science and technology.
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