A Bloch type space associated with λ-analytic functions

Abstract

For λ0, the so-called λ-analytic functions are defined in terms of the (complex) Dunkl operators Dz and Dz. In the paper we introduce a Bloch type space on the disk D associated with λ-analytic functions, called the λ-Bloch space and denoted by Bλ( D). Various properties of the λ-Bloch space Bλ( D) are proved. We give a characterization of functions in Bλ( D) by means of the higher-order operators (Dz z)n for n2. A general integral operator is proved to be bounded from L∞( D) onto Bλ( D), and as an application, the dual relation of Bλ( D) and the λ-Bergman space (p=1) is verified.

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