Some aspects of the Bergman and Hardy spaces associated with a class of generalized analytic functions

Abstract

For λ0, a C2 function f defined on the unit disk D is said to be λ-analytic if Dzf=0, where Dz is the (complex) Dunkl operator given by Dzf=∂zf-λ(f(z)-f(z))/(z-z). The aim of the paper is to study several problems on the associated Bergman spaces Apλ( D) and Hardy spaces Hλp( D) for p2λ/(2λ+1), such as boundedness of the Bergman projection, growth of functions, density, completeness, and the dual spaces of Apλ( D) and Hλp( D), and characterization and interpolation of Apλ( D).

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