Hilbert-type operator induced by radial weight

Abstract

We consider the Hilbert-type operator defined by Hω(f)(z)=∫01 f(t)(1z∫0z Bωt(u)\,du)\,ω(t)dt, where \Bωζ\ζ∈D are the reproducing kernels of the Bergman space A2ω induced by a radial weight ω in the unit disc D. We prove that Hω is bounded from H∞ to the Bloch space if and only if ω belongs to the class D, which consists of radial weights ω satisfying the doubling condition 0 r<1 ∫r1 ω(s)\,ds∫1+r21ω(s)\,ds<∞. Further, we describe the weights ω∈ D such that Hω is bounded on the Hardy space H1, and we show that for any ω∈ D and p∈ (1,∞), Hω:\,Lp[0,1) Hp is bounded if and only if the Muckenhoupt type condition equation* 0<r<1(1+∫0r 1ω(t)p dt)1p (∫r1 ω(t)p'\,dt)1p' <∞, equation* holds. Moreover, we address the analogous question about the action of Hω on weighted Bergman spaces Ap.