A Toeplitz type operator on Hardy spaces in the unit ball

Abstract

We study a Toeplitz type operator Qμ between the holomorphic Hardy spaces Hp and Hq of the unit ball. Here the generating symbol μ is assumed to a positive Borel measure. This kind of operator is related to many classical mappings acting on Hardy spaces, such as composition operators, the Volterra type integration operators and Carleson embeddings. We completely characterize the boundedness and compactness of Qμ:Hp Hq for the full range 1<p,q<∞; and also describe the membership in the Schatten classes of H2. In the last section of the paper, we demonstrate the usefulness of Qμ through applications.