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Escaping a Neighborhood Along a Prescribed Sequence in Lie Groups and Banach Algebras

Published online by Cambridge University Press:  02 October 2019

Catalin Badea
Affiliation:
CNRS, Univ. Lille, UMR 8524 - Laboratoire Paul Painlevé, France Email: [email protected]@univ-lille.frURL: http://math.univ-lille1.fr/∼badea/http://math.univ-lille1.fr/∼grivaux/
Vincent Devinck
Affiliation:
Univ. d’Artois, Laboratoire de Mathématiques de Lens, FR2037 CNRS, France Email: [email protected]
Sophie Grivaux
Affiliation:
CNRS, Univ. Lille, UMR 8524 - Laboratoire Paul Painlevé, France Email: [email protected]@univ-lille.frURL: http://math.univ-lille1.fr/∼badea/http://math.univ-lille1.fr/∼grivaux/

Abstract

It is shown that Jamison sequences, introduced in 2007 by Badea and Grivaux, arise naturally in the study of topological groups with no small subgroups, of Banach or normed algebra elements whose powers are close to identity along subsequences, and in characterizations of (self-adjoint) positive operators by the accretiveness of some of their powers. The common core of these results is a description of those sequences for which non-identity elements in Lie groups or normed algebras escape an arbitrary small neighborhood of the identity in a number of steps belonging to the given sequence. Several spectral characterizations of Jamison sequences are given, and other related results are proved.

Type
Article
Copyright
© Canadian Mathematical Society 2019

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Footnotes

This work was supported in part by the project FRONT of the French National Research Agency (grant ANR-17-CE40-0021) and by the Labex CEMPI (ANR-11-LABX-0007-01).

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