English

On convex-cyclic operators

Functional Analysis 2014-10-20 v1

Abstract

We give a Hahn-Banach Characterization for convex-cyclicity. We also obtain an example of a bounded linear operator SS on a Banach space with σp(S)=\sigma_{p}(S^*)=\emptyset such that SS is convex-cyclic, but SS is not weakly hypercyclic and S2S^2 is not convex-cyclic. This solved two questions of Rezaei in \cite{Rezaei} when σp(S)=\sigma_p(S^*)=\varnothing. %Recently, Le\'on-Saavedra and Romero de la Rosa \cite{LeRo} provide an example of a convex-cyclic operator SS such that the power SnS^n fails to be convex-cyclic with σp(S)\sigma _p(S^*)\neq \varnothing. In fact they solved tree questions posed by Rezaei in \cite{Rezaei}. Moreover, we prove that mm-isometries are not convex-cyclic and that ε\varepsilon-hypercyclic operators are convex-cyclic. We also characterize the diagonalizable normal operators that are convex-cyclic and give a condition on the eigenvalues of an arbitrary operator for it to be convex-cyclic. We show that certain adjoint multiplication operators are convex-cyclic and show that some are convex-cyclic but no convex polynomial of the operator is hypercyclic. Also some adjoint multiplication operators are convex-cyclic but not 1-weakly hypercyclic.

Keywords

Cite

@article{arxiv.1410.4664,
  title  = {On convex-cyclic operators},
  author = {T. Bermúdez and A. Bonilla and N. Feldman},
  journal= {arXiv preprint arXiv:1410.4664},
  year   = {2014}
}

Comments

19 pages

R2 v1 2026-06-22T06:26:59.883Z