Authors: Félix MartínezGiménez Piotr Oprocha Alfredo Peris
Publish Date: 2012/11/03
Volume: 274, Issue: 1-2, Pages: 603-612
Abstract
In this article we answer in the negative the question of whether hypercyclicity is sufficient for distributional chaos for a continuous linear operator we even prove that the mixing property does not suffice Moreover we show that an extremal situation is possible There are hypercyclic and nonhypercyclic operators such that the whole space consists except zero of distributionally irregular vectorsThe research of first and third author was supported by MEC and FEDER project MTM201014909 and by GV Project PROMETEO/2008/101 The research of second author was supported by the Marie Curie European Reintegration Grant of the European Commission under grant agreement no PERG08GA2010272297 The financial support of these institutions is hereby gratefully acknowledged We also want to thank X Barrachina for pointing out to us a gap in the proof of a previous version of Theorem 31
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