On the Bloch and Qp--Carleson measure problems

Abstract

In this paper, we study the Bloch and Qp--Carleson measure problems on the unit disc D. In the Bloch case, for a positive Borel measure μ on D, we give a complete characterization of the boundedness and compactness of the embedding id: B L2(μ) in terms of the Bloch capacity B R(μ) associated with an admissible dyadic resolution R of D. The proof is based on the Bergman projection representation of Bloch functions, conditional expectations on admissible dyadic resolutions, and a finite-dimensional semidefinite programming argument. We also adapt this dyadic framework to the more general Qp--Carleson measure problem and obtain a corresponding complete boundedness and compactness characterization for id: Qp L2(μ), 0<p1. This work further develops the dyadic approach introduced in our recent work on composition operators on Qp spaces, but in a different setting where the embedding involves recovering function values from derivative information.