Generalized Hilbert operator acting on Bergman spaces

Abstract

Let μ be a positive Borel measure on [0,1). If f ∈ H(D) and α>-1, the generalized integral type Hilbert operator defined as follows: Iμα+1(f)(z)=∫10 f(t)(1-tz)α+1dμ(t), \ \ \ z∈ D . The operator Iμ1 has been extensively studied recently. In this paper, we characterize the measures μ for which Iμα+1 is a bounded (resp., compact) operator acting between the Bloch space B and Bergman space Ap, or from Ap(0<p<∞) into Aq(q≥ 1). We also study the analogous problem in Bergman spaces Ap(1 ≤ p≤ 2). Finally, we determine the Hilbert-Schmidt class on A2 for all α>-1.