Mathematics > Functional Analysis
[Submitted on 21 Apr 2018]
Title:Is there any nontrivial compact generalized shift operator on Hilbert spaces?
View PDFAbstract:In the following text for cardinal number $\tau>0$, and self--map $\varphi:\tau\to\tau$ we show the generalized shift operator $\sigma_\varphi(\ell^2(\tau))\subseteq\ell^2(\tau)$ (where $\sigma_\varphi((x_\alpha)_{\alpha<\tau})=(x_{\varphi(\alpha)})_{\alpha<\tau}$ for $(x_\alpha)_{\alpha<\tau}\in{\mathbb C}^\tau$) if and only if $\varphi:\tau\to\tau$ is bounded and in this case $\sigma_\varphi\restriction_{\ell^2(\tau)}:\ell^2(\tau)\to\ell^2(\tau)$ is continuous, consequently $\sigma_\varphi\restriction_{\ell^2(\tau)}:\ell^2(\tau)\to\ell^2(\tau)$ is a compact operator if and only if $\tau$ is finite.
Submission history
From: Fatemah Ayatollah Zadeh Shirazi [view email][v1] Sat, 21 Apr 2018 09:02:40 UTC (6 KB)
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