Rhaly operators acting on Hardy, Bergman, and Dirichlet spaces
Abstract
In this article we address the question of characterizing the sequences of complex numbers (η )=\ ηn\n=0∞ whose associated Rhaly operator R(η ) is bounded or compact on the Hardy spaces Hp (1 p<∞ ), on the Bergman spaces Apα , and on the Dirichlet spaces Dpα (1 p<∞ , α >-1). We give a number of conditions which are either necessary or sufficient for the boundedness (compactness) of R(η ) on these spaces. These conditions have to do with the membership in certain mean Lipschitz spaces of analytic functions of the function F(η ) defined by F(η )(z)=Σn=0∞ η nzn (z∈ D). We prove that if 2 p<∞ and ηn= (1n ), then R(η ) is bounded on Hp. However, there exists a sequence (η ) with ηn= (1n ) such that the operator R(η ) is not bounded on Hp for 1 p<2. We deal also with the derivative-Hardy spaces. For p>0 the derivative-Hardy space Sp consists of those functions f, analytic in the unit disc D, such that f ∈ Hp. We prove that if 1 p<∞ and 1<q<∞ then R(η ) is a bounded operator from Sp into Sq if and only if it is compact and this happens if and only if F(η )∈ Sq.
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