Operators of Hilbert type acting on some spaces of analytic functions

Abstract

Let H(D) be the space of all analytic functions in the unit disc D. For g∈ H(D), the generalized Hilbert operator Hg is defined by Hg(f)(z)=∫01f(t)g'(tz)dt, \ \ z∈ D, f∈ H(D). In this paper, we study the operator Hg acting on some spaces of analytic functions in D. Specifically, we give a complete characterization of those g∈ H(D) for which the operator Hg is bounded (resp. compact) from the Dirichlet space D2α to D2β for all possible indicators α,β ∈ R. We also study the action of the operator Hg on the space of bounded analytic functions H∞, which generalizes the known results for the classical Hilbert operator H acting on H∞. In particular, we consider the boundedness of the operator Hg with a symbol of non-negative Taylor coefficients, acting on logarithmic Bloch spaces and on Korenblum spaces. This work generalizes the corresponding results for the classical Hilbert operator.