Generalized Ces\`aro operators: geometry of spectra and quasi-nilpotency

Abstract

For the class of Hardy spaces and standard weighted Bergman spaces of the unit disk we prove that the spectrum of a generalized Ces\`aro operator Tg is unchanged if the symbol g is perturbed to g+h by an analytic function h inducing a quasi-nilpotent operator Th, i.e. spectrum of Th equals \0\. We also show that any Tg operator which can be approximated in the operator norm by an operator Th with bounded symbol h is quasi-nilpotent. In the converse direction, we establish an equivalent condition for the function g ∈ BMOA to be in the BMOA-norm closure of H∞. This condition turns out to be equivalent to quasi-nilpotency of the operator Tg on the Hardy spaces. This raises the question whether similar statement is true in the context of Bergman spaces and the Bloch space. Furthermore, we provide some general geometric properties of the spectrum of Tg operators.