On the Commutativity of the Berezin Transform

Abstract

We consider the commutativity problem for the Berezin transform on weighted Fock spaces. Given a real number m>0, for every α >0 we denote by Bα the Berezin transform associated to the measure μmα with density proportional to e-α |z|m with respect to Lebesgue measure on the complex plane and normalized so that μφα( C)=1. We show that the commutativity relation BαBβf=BβBαf holds for all f∈ L∞( C) and α,β> 0 if and only if m=2.

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