Hypercyclicity of Toeplitz operators with smooth symbols
Abstract
This paper is devoted to the study of the dynamics of Toeplitz operators TF with smooth symbols F on the Hardy spaces of the unit disk Hp, p>1. Building on a model theory for Toeplitz operators on H2 developed by Yakubovich in the 90's, we carry out an in-depth study of hypercyclicity properties of such operators. Under some rather general smoothness assumptions on the symbol, we provide some necessary/sufficient/necessary and sufficient conditions for TF to be hypercyclic on Hp. In particular, we extend previous results on the subject by Baranov-Lishanskii and Abakumov-Baranov-Charpentier-Lishanskii. We also study some other dynamical properties for this class of operators.
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