Volterra-type operators mapping weighted Dirichlet space into H∞
Abstract
The problem of describing the analytic functions g on the unit disc such that the integral operator Tg(f)(z)=∫0zf(ζ)g'(ζ)\,dζ is bounded (or compact) from a Banach space (or complete metric space) X of analytic functions to the Hardy space H∞ is a tough problem and remains unsettled in many cases. For analytic functions g with non-negative Maclaurin coefficients, we describe the boundedness and compactness of Tg acting from a weighted Dirichlet space Dpω, induced by an upper doubling weight ω, to H∞. We also characterize, in terms of neat conditions on ω, the upper doubling weights for which Tg: Dpω H∞ is bounded (or compact) only if g is constant.
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