Topologically conjugate classification of diagonal operators
Dynamical Systems
2025-05-02 v1 Functional Analysis
General Topology
Abstract
Let , , be the Banach space of absolutely -th power summable sequences and let be the natural projection to the -th coordinate for . Let be a bounded sequence of complex numbers. Define the operator by, for any , for all . We call a diagonal operator on . In this article, we study the topological conjugate classification of the diagonal operators on . More precisely, we obtained the following results. and are topologically conjugate, where . If , then is topologically conjugate to , where means the identity operator. Similarly, if and , then is topologically conjugate to . In addition, if and , then and are not topologically conjugate.
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