Carleson type measures for Fock--Sobolev spaces

Abstract

We describe the (p,q) Fock--Carleson measures for weighted Fock--Sobolev spaces in terms of the objects (s,t)-Berezin transforms, averaging functions, and averaging sequences on the complex space Cn. The main results show that while these objects may have growth not faster than polynomials to induce the (p,q) measures for q≥ p, they should be of Lp/(p-q) integrable against a weight of polynomial growth for q<p. As an application, we characterize the bounded and compact weighted composition operators on the Fock--Sobolev spaces in terms of certain Berezin type integral transforms on Cn. We also obtained estimation results for the norms and essential norms of the operators in terms of the integral transforms. The results obtained unify and extend a number of other results in the area.