Hankel-Type Operator Acting on Hardy Spaces and Weighted Bergman Spaces

Inspired by Xiao’s work about the Hankel measures for the weighted Bergman spaces, in this paper, if \(\beta >0\) and the measure \(\mu \) is a complex Borel measure on the unit disk \({\mathbb {D}}\), we define the Hankel type operator \(K_{\mu ,\beta }\) by

$$\begin{aligned} K_{\mu ,\beta }:~f\longmapsto \int _{{\mathbb {D}}}(1-wz)^{-(\beta )}f(w)d\mu (w). \end{aligned}$$

The operator itself has been widely studied when \(\mu \) is a positive Borel measure supported on the interval [0, 1). We study the boundedness of \(K_{\mu ,1}\) acting on Hardy spaces and the boundedness of \(K_{\mu ,\alpha }\), \(\alpha >1\) acting on weighted Bergman spaces. Then we raise and answer some questions about the boundedness of those operators. Also, we find some special measures \(\mu 's\) such that s-Hankel measure is equal to s-Carleson measure.