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The asymptotic behaviour of bounded semigroups in a Banach algebra

Published online by Cambridge University Press:  24 October 2008

Hari Bercovici
Hari Bercovici
Affiliation:
Department of Mathematics, Indiana University, Bloomington, IN 47405, U.S.A.
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Extract

Let T be an operator on a complex Banach space such that sup {‖Tn‖: n ≥ 0} < ∞; such operators are said to be power-bounded. For such an operator one defines the peripheral spectrum to be the set

where σ(T) denotes the spectrum of T, and T is the unit circle in ℂ. Esterle proved in [3] that limnn→∞TnTn+1‖ = 0 provided that ‖T‖ ≤ 1 and σ{T} = {1}. Later Katznelson and Tzafriri [6] proved the same result for power-bounded operators such that σΓ(T) = {1}, and in fact they proved a more general result. More precisely, let be an absolutely convergent Taylor series, i.e. , and assume that f is of spectral synthesis for σΓ(T) (in particular fΓ(T) ≡ 0). Then limn→∞f(T) Tn‖ = 0. Katznelson and Tzafriri prove an analogous result, in which T is replaced by a commuting k-tuple (T1, T2, …, Tk) of contractions. In this case they consider functions of the form f(T1, T2, …, Tk), where f is either an absolutely convergent Taylor series if k is odd, or an element of a smaller algebra if k is even. The result of Katznelson and Tzafriri was further extended in the case of a single contraction T by Esterle, Strouse and Zouakia[4], who consider functions f(T) where f is allowed to be in a more general function algebra. For instance, if T acts on a Hilbert space, they allow f to be an element of the disk algebra.

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 108 , Issue 2 , September 1990 , pp. 365 - 370
Copyright
Copyright © Cambridge Philosophical Society 1990

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References

REFERENCES

[1]Bercovici, H.. Commuting power-bounded operators. (Preprint.)Google Scholar
[2]Day, M.. Means for bounded functions and ergodicity of the bounded representations of semigroups. Trans. Amur. Math. Soc. 69 (1950), 276291.CrossRefGoogle Scholar
[3]Esterle, J.. Quasimultipliers, representations of H , and the closed ideal problem for commutative Banach algebras. In Radical Banach Algebras and Automatic Continuity. Lecture Notes in Math. vol. 975 (Springer-Verlag, 1983), pp. 66162.CrossRefGoogle Scholar
[4]Esterle, J., Strouse, E. and Zouakia, F.. Theorems of Katznelson-Tzafriri type for contractions. (Preprint.)Google Scholar
[5]Hewitt, E. and Ross, K.. Abstract Harmonic Analysis, vol. 1 (Springer-Verlag, 1963).Google Scholar
[6]Katznelson, Y. and Tzafriri, L.. On power bounded operators. J. Funct. Anal. 68 (1986), 313328.CrossRefGoogle Scholar
[7]Kérchy, L.. Isometric asymptotes of power-bounded operators. (Preprint.)Google Scholar
[8]Rudin, W.. Fourier Analysis on Groups (Interscience, 1962).Google Scholar
[9]Rudin, W.. Functional Analysis (McGraw-Hill, 1973).Google Scholar
[10]-Nagy, B. Sz.. On uniformly bounded linear transformations in Hilbert space. Ada Sci. Math. (Szeged) 11 (1947), 152157.Google Scholar
[11]-Nagy, B. Sz. and Foias, C.. Harmonic Analysis of Operators on Hilbert Space (North-Holland, 1970).Google Scholar