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Addendum to the Paper “A note on Weighted bergman Spaces and the cesaro operator”

Published online by Cambridge University Press:  11 January 2016

Der-Chen Chang  and
Stevo Stević
Der-Chen Chang
Affiliation:
Department of Mathematics Georgetown UniversityWashington D.C., 20057USAchang@georgetown.edu
Stevo Stević
Affiliation:
Mathematical Institute of Serbian Academy of Science Knez Mihailova35/I 11000Beograd Serbiasstevic@ptt.yu; sstevo@matf.bg.ac.yu
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Abstract

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Let H(Dn) be the space of holomorphic functions on the unit polydisk Dn, and let , where p, q> 0, α = (α1,…,αn) with αj > -1, j =1,..., n, be the class of all measurable functions f defined on Dn such that

where Mp(f,r) denote the p-integral means of the function f. Denote the weighted Bergman space on . We provide a characterization for a function f being in . Using the characterization we prove the following result: Let p> 1, then the Cesàro operator is bounded on the space .

Keywords

47B3846E15
Type
Research Article
Information
Nagoya Mathematical Journal , Volume 180 , 2005 , pp. 77 - 90
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 2005

References

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