English

Non-sequential weak supercyclicity and hypercyclicity

Functional Analysis 2012-09-10 v1 Dynamical Systems

Abstract

A bounded linear operator TT acting on a Banach space \B\B is called weakly hypercyclic if there exists x\Bx\in \B such that the orbit Tnx:n=0,1,...{T^n x: n=0,1,...} is weakly dense in \B\B and TT is called weakly supercyclic if there is x\Bx\in \B for which the projective orbit λTnx:λ\C,n=0,1,...{\lambda T^n x: \lambda \in \C, n=0,1,...} is weakly dense in \B\B. If weak density is replaced by weak sequential density, then TT 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 μ\mu on the unit circle for which the Fourier coefficients vanish at infinity and the multiplication operator Mf(z)=zf(z)Mf(z)=zf(z) acting on L2(μ)L_2(\mu) is weakly supercyclic. It is not weakly sequentially supercyclic, since the projective orbit under MM of each element in L2(μ)L_2(\mu) is weakly sequentially closed. This answers a question posed by Bayart and Matheron. It is proved that the bilateral shift on p(Z)\ell_p(\Z), 1p<1\leq p <\infty, is weakly supercyclic if and only if 2<p<2<p<\infty and that any weakly supercyclic weighted bilateral shift on p(Z)\ell_p(\Z) for 1p21\leq p\leq 2 is norm supercyclic. It is also shown that any weakly hypercyclic weighted bilateral shift on p(Z)\ell_p(\Z) for 1p<21\leq p<2 is norm hypercyclic, which answers a question of Chan and Sanders.

Keywords

Cite

@article{arxiv.1209.1462,
  title  = {Non-sequential weak supercyclicity and hypercyclicity},
  author = {Stanislav Shkarin},
  journal= {arXiv preprint arXiv:1209.1462},
  year   = {2012}
}
R2 v1 2026-06-21T22:01:20.656Z