Generalized Hilbert operator acting on Bergman spaces

Abstract: Let $\mu$ be a positive Borel measure on $[0,1)$. If $f \in H(\mathbb{D})$ and $\alpha>-1$, the generalized integral type Hilbert operator defined as follows: $$\mathcal{I}{\mu{\alpha+1}}(f)(z)=\int^1_{0} \frac{f(t)}{(1-tz)^{\alpha+1}}d\mu(t), \ \ \ z\in \mathbb{D} .$$ The operator $\mathcal{I}{\mu{1}}$ has been extensively studied recently. In this paper, we characterize the measures $\mu$ for which $\mathcal{I}{\mu{\alpha+1}}$ is a bounded (resp., compact) operator acting between the Bloch space $\mathcal {B}$ and Bergman space $ A^{p}$, or from $A^{p}(0<p<\infty)$ into $ A^{q}(q\geq 1)$. We also study the analogous problem in Bergman spaces $A^{p}(1 \leq p\leq 2)$. Finally, we determine the Hilbert-Schmidt class on $A^{2}$ for all $\alpha>-1$.