Hyperbolic mean growth of bounded holomorphic functions in the ball期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

Hyperbolic mean growth of bounded holomorphic functions in the ball

Authors:	E. G. Kwon

Affiliation:	Department of Mathematics Education, Andong National University, Andong 760-749, S. Korea

Abstract:	We consider the hyperbolic Hardy class $varrho H^{p}(B)$ , . It consists of holomorphic in the unit complex ball for which and $begin{displaymath}sup _{0<r<1} , int _{partial B} left { varrho (phi (rzeta ), 0)right }^{p} , dsigma (zeta ) ~<~ infty ,end{displaymath}$ where denotes the hyperbolic distance of the unit disc. The hyperbolic version of the Littlewood-Paley type -function and the area function are defined in terms of the invariant gradient of , and membership of $varrho H^{p}(B)$ is expressed by the $L^{p}$ property of the functions. As an application, we can characterize the boundedness and the compactness of the composition operator $mathcal{C}_{phi }$ , defined by $mathcal{C}_{phi }f = fcirc phi$ , from the Bloch space into the Hardy space $H^{p}(B)$ .

Keywords:	$H^{p}$ space Bloch space hyperbolic Hardy class composition operator Littlewood-Paley $g$-function invariant gradient

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