Berezin transform and Toeplitz operators on weighted Bergman spaces induced by regular weights

Abstract

Given a regular weight ω and a positive Borel measure μ on the unit disc D, the Toeplitz operator associated with μ is Tμ(f)(z)=∫D f(ζ)Bzω(ζ)\,dμ(ζ), where Bωz are the reproducing kernels of the weighted Bergman space A2ω. We describe bounded and compact Toeplitz operators Tμ:Apω Aqω, 1<q,p<∞, in terms of Carleson measures and the Berezin transform Tμ(z)=μ(Bωz), Bωz A2ω\|Bzω\|2A2ω. We also characterize Schatten class Toeplitz operators in terms of the Berezin transform and apply this result to study Schatten class composition operators.