Norm of the Hilbert matrix on Bergman and Hardy spaces and a theorem of Nehari type

Dostanic M; Jevtic M; Vukotic D

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Norm of the Hilbert matrix on Bergman and Hardy spaces and a theorem of Nehari type

机译：Bergman和Hardy空间上Hilbert矩阵的范数和Nehari型定理

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The Hilbert matrix induces a bounded operator on most Hardy and Bergman spaces, as was shown by Diamantopoulos and Siskakis. We generalize this for any Hankel operator on Hardy spaces by using a result of Hollenbeck and Verbitsky on the Riesz projection and also compute the exact value of the norm of the Hilbert matrix. Using a new technique, we determine the norm of the Hilbert matrix on a wide range of Bergman spaces. (c) 2008 Elsevier Inc. All rights reserved.

机译：如Diamantopoulos和Siskakis所示，希尔伯特矩阵在大多数Hardy和Bergman空间上诱导出有界算子。我们通过在Riesz投影上使用Hollenbeck和Verbitsky的结果，对Hardy空间上的任何Hankel算子进行推广，并计算Hilbert矩阵范数的精确值。使用一种新技术，我们可以确定各种伯格曼空间上希尔伯特矩阵的范数。（c）2008 Elsevier Inc.保留所有权利。

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《Journal of Functional Analysis》 |2008年第11期|共16页
作者
Dostanic M; Jevtic M; Vukotic D;
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正文语种 eng
中图分类数学;
关键词
Hilbert matrix; operator norm; Hardy spaces; Bergman spaces; Hankel operator; Nehari theorem;

机译：Hilbert矩阵;算子范数;Hardy空间;Bergman空间;Hankel算子;Nehari定理;

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Norm of the Hilbert matrix on Bergman and Hardy spaces and a theorem of Nehari type

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