English

Two Families of Hypercyclic Non-Convolution Operators

Functional Analysis 2021-04-21 v2

Abstract

Let H(C)H(\mathbb{C}) be the set of all entire functions endowed with the topology of uniform convergence on compact sets. Let λ,bC\lambda,b\in\mathbb{C}, let Cλ,b:H(C)H(C)C_{\lambda,b}:H(\mathbb{C})\to H(\mathbb{C}) be the composition operator Cλ,bf(z)=f(λz+b)C_{\lambda,b} f(z)=f(\lambda z+b), and let DD be the derivative operator. We extend results on the hypercyclicity of the non-convolution operators Tλ,b=Cλ,bDT_{\lambda,b}=C_{\lambda,b} \circ D by showing that whenever λ1|\lambda|\geq 1, the collection of operators \begin{align*} \{\psi(T_{\lambda,b}): \psi(z)\in H(\mathbb{C}), \psi(0)=0 \text{ and } \psi(T_{\lambda,b}) \text{ is continuous}\} \end{align*} forms an algebra under the usual addition and multiplication of operators which consists entirely of hypercyclic operators (i.e., each operator has a dense orbit). We also show that the collection of operators \begin{align*} \{C_{\lambda,b}\circ\varphi(D): \varphi(z) \text{ is an entire function of exponential type with } \varphi(0)=0\} \end{align*} consists entirely of hypercyclic operators.

Keywords

Cite

@article{arxiv.2011.14208,
  title  = {Two Families of Hypercyclic Non-Convolution Operators},
  author = {Alex Myers and Muhammadyusuf Odinaev and David Walmsley},
  journal= {arXiv preprint arXiv:2011.14208},
  year   = {2021}
}
R2 v1 2026-06-23T20:34:21.623Z