Authors: Stević, Stevo 
Affiliations: Mathematical Institute of the Serbian Academy of Sciences and Arts 
Title: Weighted integrals of holomorphic functions on the polydisc II
Journal: Zeitschrift fur Analysis und ihre Anwendung
Volume: 23
Issue: 4
First page: 775
Last page: 782
Issue Date: 1-Jan-2004
Rank: M23
ISSN: 0232-2064
DOI: 10.4171/ZAA/1222
Abstract: 
Let ℒαp(Un) denote the class of all measurable functions defined on the unit polydisc Un = {z ε Cn |zi| < 1, i = 1, ..., n} such that ∥f∥ℒαp(Un) = ∫U n |f(z)|p π|zj|2) αjdm(zj) < ∞, where αj > - 1, j = 1,..., n, and dm(zj) is the normalized area measure on the unit disk U, H(Un) the class of all holomorphic functions on Un, and let Aαp(Un) = ℒαp(Un) ∩ H(Un) (the weighted Bergman space). In this paper we prove that for p ε (0, ∞), f ε Aαp(Un) if and only if the functions π(1 - |zj|2) ∂|S|f/π jεS ∂zj (χS (1) z1, χS(2)z2,..., χS(n) zn) belong to the space ℒαp(Un) for every S ⊆ {1, 2,..., n}, where χS(·) is the characteristic function of S, |S| is the cardinal number of S, and πjεS ∂z ji = ∂zji...∂zj|S|, where j k ε S, k = 1,..., |S|. This result extends Theorem 22 of Kehe Zhu in Trans. Amer. Math. Soc. 309 (1988) (1), 253-268, when p ε (0, 1). Also in the case p ε [1, ∞), we present a new proof.
Keywords: Holomorphic function | Polydisc | Weighted Bergman space
Publisher: European Mathematical Society

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