On the compactness of Bergman-type integral operators

Abstract

Bergman-type integral operators are classical operators in complex analysis and operator theory. Recently, the first author and his collaborator DiW completely characterized the Lp-Lq boundedness of Bergman-type integral operators Kα,Kα+ and the Lp-Lq compactness of Kα on the unit ball. In this paper, we will use a substantially new method to completely characterize the Lp-Lq compactness of Kα+, but also prove that the Lp-Lq compactness of operators Kα,Kα+ is in fact equivalent. Moreover, we completely characterize Schatten class and Macaev class Bergman-type integral operator Kα on L2 space and Bergman space via inequalities related to the dimension of the unit ball, and we also give an intrinsic characterization by introducing the concept of Hausdorff dimension of compact operators. The Dixmier trace of Kα are also calculated in this paper.