Boundedness of Multiparameter Forelli-Rudin Type Operators on Product Lp Spaces over Tubular Domains

Abstract

In this paper, we introduce and study two classes of multiparameter Forelli-Rudin type operators from Lp(TB× TB, dVα1× dVα2) to Lq(TB× TB, dVβ1× dVβ2), especially on their boundedness, where Lp(TB× TB, dVα1× dVα2) and Lq(TB× TB, dVβ1× dVβ2) are both weighted Lebesgue spaces over the Cartesian product of two tubular domains TB× TB, with mixed-norm and appropriate weights. We completely characterize the boundedness of these two operators when 1 p q<∞. Moreover, we provide the necessary and sufficient condition of the case that q=(∞,∞). As an application, we obtain the boundedness of three common classes of integral operators, including the weighted multiparameter Bergman-type projection and the weighted multiparameter Berezin-type transform.