Optimal rates of decay in the Katznelson-Tzafriri theorem for operators on Hilbert spaces

The Katznelson-Tzafriri theorem is a central result in the asymptotic theory of discrete operator semigroups. It states that for a power-bounded operator T on a Banach space we have ||Tn(I−T)‖→0 if and only if σ(T)∩T⊆{1}. The main result of the present paper gives a sharp estimate for the rate at wh...

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Bibliographic Details
Published in:Journal of functional analysis 2020-12, Vol.279 (12), p.108799, Article 108799
Main Authors: Ng, Abraham C.S., Seifert, David
Format: Article
Language:English
Subjects:
Katznelson-Tzafriri theorem
Rates of decay
Resolvent estimates
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Summary:The Katznelson-Tzafriri theorem is a central result in the asymptotic theory of discrete operator semigroups. It states that for a power-bounded operator T on a Banach space we have ||Tn(I−T)‖→0 if and only if σ(T)∩T⊆{1}. The main result of the present paper gives a sharp estimate for the rate at which this decay occurs for operators on Hilbert space, assuming the growth of the resolvent norms ‖R(eiθ,T)‖ as |θ|→0 satisfies a mild regularity condition. This significantly extends an earlier result by the second author, which covered the important case of polynomial resolvent growth. We further show that, under a natural additional assumption, our condition on the resolvent growth is not only sufficient but also necessary for the conclusion of our main result to hold. By considering a suitable class of Toeplitz operators we show that our theory has natural applications even beyond the setting of normal operators, for which we in addition obtain a more general result.
ISSN:0022-1236
1096-0783
DOI:10.1016/j.jfa.2020.108799