On the Berger-Coburn phenomenon

Abstract

In their previous work, the authors proved the Berger-Coburn phenomenon for compact and Schatten Sp class Hankel operators Hf on generalized Fock spaces when 1<p<∞, that is, for a bounded symbol f, if Hf is a compact or Schatten class operator, then so is H f. More recently J.~Xia has provided a simple example that shows that there is no Berger-Coburn phenomenon for trace class Hankel operators on the classical Fock space F2. Using Xia's example, we show that there is no Berger-Coburn phenomena for Schatten Sp class Hankel operators on generalized Fock spaces F2 for any 0<p 1. Our approach is based on the characterization of Schatten class Hankel operators while Xia's approach is elementary and heavily uses the explicit basis vectors of F2, which cannot be found for the weighted Fock spaces that we consider. We also formulate four open problems.