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Topologically conjugate classification of diagonal operators

Dynamical Systems 2025-05-02 v1 Functional Analysis General Topology

Abstract

Let p\ell^{p}, 1p<1\leq p<\infty, be the Banach space of absolutely pp-th power summable sequences and let πn\pi_{n} be the natural projection to the nn-th coordinate for nNn\in\mathbb{N}. Let W={wn}n=1\mathfrak{W}=\{w_{n}\}_{n=1}^{\infty} be a bounded sequence of complex numbers. Define the operator DW:ppD_{\mathfrak{W}}: \ell^{p}\rightarrow\ell^{p} by, for any x=(x1,x2,)px=(x_{1},x_{2},\ldots)\in \ell^p, πnDW(x)=wnxn\pi_{n}\circ D_{\mathfrak{W}}(x)=w_{n}x_{n} for all n1n\geq1. We call DWD_{\mathfrak{W}} a diagonal operator on p\ell^{p}. In this article, we study the topological conjugate classification of the diagonal operators on p\ell^{p}. More precisely, we obtained the following results. DWD_{\mathfrak{W}} and DWD_{\vert\mathfrak{W}\vert} are topologically conjugate, where W={wn}n=1\vert\mathfrak{W}\vert=\{\vert w_{n}\vert\}_{n=1}^{\infty}. If infnwn>1\inf_{n}\vert w_n\vert>1, then DWD_{\mathfrak{W}} is topologically conjugate to 2I2\mathbf{I}, where I\mathbf{I} means the identity operator. Similarly, if infnwn>0\inf_{n}\vert w_n\vert>0 and supnwn<1\sup_{n}\vert w_n\vert<1, then DWD_{\mathfrak{W}} is topologically conjugate to 12I\frac{1}{2}\mathbf{I}. In addition, if infnwn=1\inf_{n}\vert w_n\vert=1 and infntn>1\inf_{n}\vert t_n\vert>1, then DWD_{\mathfrak{W}} and DTD_{\mathfrak{T}} are not topologically conjugate.

Keywords

Cite

@article{arxiv.2505.00577,
  title  = {Topologically conjugate classification of diagonal operators},
  author = {Yue Xin and Bingzhe Hou},
  journal= {arXiv preprint arXiv:2505.00577},
  year   = {2025}
}

Comments

16 pages

R2 v1 2026-06-28T23:18:05.377Z