Iranian Mathematical SocietyJournal of the Iranian Mathematical Society2717-16122220211201Hankel operators on Bergman spaces induced by regular weights12313815546010.30504/jims.2022.342003.1067ENE.WangSchool of Mathematics and Statistics, Lingnan Normal University, P.O. Box 524048, Zhanjiang, China.J.XuSchool of Mathematics and Statistics, Lingnan Normal University, P.O. Box 524048, Zhanjiang, China.Journal Article20220613In 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 $1<p, q<\infty$. Moreover, we answer a question posed by X. Lv and K. Zhu [Integr. Equ. Oper. Theory, 91(2019), 91:5] in the case $n=1$.https://jims.ims.ir/article_155460_3a5cc785226fddf774630b3f896b36c7.pdf