Non-sequential weak supercyclicity and hypercyclicity
Abstract
A bounded linear operator acting on a Banach space is called weakly hypercyclic if there exists such that the orbit is weakly dense in and is called weakly supercyclic if there is for which the projective orbit is weakly dense in . If weak density is replaced by weak sequential density, then is said to be weakly sequentially hypercyclic or supercyclic respectively. It is shown that on a separable Hilbert space there are weakly supercyclic operators which are not weakly sequentially supercyclic. This is achieved by constructing a Borel probability measure on the unit circle for which the Fourier coefficients vanish at infinity and the multiplication operator acting on is weakly supercyclic. It is not weakly sequentially supercyclic, since the projective orbit under of each element in is weakly sequentially closed. This answers a question posed by Bayart and Matheron. It is proved that the bilateral shift on , , is weakly supercyclic if and only if and that any weakly supercyclic weighted bilateral shift on for is norm supercyclic. It is also shown that any weakly hypercyclic weighted bilateral shift on for is norm hypercyclic, which answers a question of Chan and Sanders.
Cite
@article{arxiv.1209.1462,
title = {Non-sequential weak supercyclicity and hypercyclicity},
author = {Stanislav Shkarin},
journal= {arXiv preprint arXiv:1209.1462},
year = {2012}
}