HANKEL OPERATORS ON BERGMAN SPACES INDUCED BY REGULAR WEIGHTS

In this paper, given two regular weights !;Ω, we characterize these symbols f 2 L1 Ω for which the induced Hankel operators HΩ f are bounded (or compact) from weighted Bergman space Ap ! to Lebesgue space Lq Ω for all 1 < p; q < 1. 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.