%0 Journal Article
%T Hankel operators on Bergman spaces induced by regular weights
%J Journal of the Iranian Mathematical Society
%I Iranian Mathematical Society
%Z 2717-1612
%A Wang, E.
%A Xu, J.
%D 2021
%\ 12/01/2021
%V 2
%N 2
%P 123-138
%! Hankel operators on Bergman spaces induced by regular weights
%K Bergman spaces
%K regular weights
%K Hankel operator
%K boundedness
%R 10.30504/jims.2022.342003.1067
%X In this paper, given two regular weights $\omega, \Omega$, we characterize these symbols $f\in L^1_\Omega$ for which the induced Hankel operators $H_f^\Omega$ are bounded (or compact) from weighted Bergman space $A_\omega^p$ to Lebesgue space $L^q_\Omega$ for all $1