莫比乌斯不变贝索夫空间的积分算子和卡列松量

Pub Date : 2024-05-28 DOI:10.1007/s10476-024-00029-6

W. Yang, C. Yuan

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引用次数: 0

摘要

我们研究了一个积分算子 \(T_{t,\lambda}\)，它在\(\mathbb{C}^{n}\)的单位球上保留了莫比乌斯不变贝索夫空间 \(B_p\)的卡列松度量。引入了与\(B_p\)的卡莱森度量相关的全形函数空间\(W_\beta^p\)。作为算子 \(T_{t,\lambda}\)的应用，我们估计了布洛赫型函数到空间 \(W_\beta^p\)的距离，这扩展了琼斯公式。此外，我们还描述了 \(B_p\) 上的有界小汉克尔算子和 \(W_\beta^p\) 的原子分解。

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Integral operators and Carleson measures for Möbius invariant Besov spaces

We investigate an integral operator \(T_{t,\lambda}\) which preserves the Carleson measure for the Möbius invariant Besov space \(B_p\) on the unit ball of \(\mathbb{C}^{n}\). A holomorphic function space \(W_\beta^p\), associated with the Carleson measure for \(B_p\), is introduced. As applications for the operator \(T_{t,\lambda}\), we estimate the distance from Bloch-type functions to the space \(W_\beta^p\), which extends Jones' formula. Moreover, the bounded small Hankel operators on \(B_p\) and the atomic decomposition of \(W_\beta^p\) are characterized.

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