Compactness via the Berezin transform of radial operators on the generalized Fock spaces (Q470277)

The~generalized Fock spaces in the title are spaces of entire functions on \(\mathbb C^n\) which are square-integrable with respect to a weight of the form \(\phi(|z|^2)\), where \(\phi\) is a function on \([0,+\infty)\) satisfying appropriate technical hypotheses. The~main results consist of a number of theorems describing when a radial operator on such a space is compact if and only if its Berezin transform vanishes at infinity; here an operator is said to be radial if it commutes with the action of the unitary group on~\(\mathbb C^n\). In~this~way, the~author generalizes various results known for the classical Fock space (corresponding to \(\phi(t)=e^{-t}\)), as~well as for weighted Bergman spaces in miscellaneous settings.