Email this article Orthogonality in nonseparable rearrangement-invariant spaces
- Authors: Astashkin S.V.1, Semenov E.M.2
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Affiliations:
- Samara National Research University
- Voronezh State University
- Issue: Vol 212, No 11 (2021)
- Pages: 55-72
- Section: Articles
- URL: https://journal-vniispk.ru/0368-8666/article/view/133473
- DOI: https://doi.org/10.4213/sm9543
- ID: 133473
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Abstract
Let $E$ be a nonseparable rearrangement-invariant space and let $E_0$ be the closure of the space of bounded functions in $E$. Elements of $E$ orthogonal to $E_0$, that is, elements $x\in E$, $x\ne 0$, such that $\|x\|_{E} \le\|x+y\|_{E}$ for each $y\in E_0$, are investigated. The set of orthogonal elements $\mathcal{O}(E)$ is characterized in the case when $E$ is a Marcinkiewicz or an Orlicz space. If an Orlicz space $L_M$ is considered with the Luxemburg norm, then the set $L_M\setminus (L_M)_0$ is the algebraic sum of $\mathcal{O}(L_M)$ and $(L_M)_0$. Each nonseparable rearrangement-invariant space $E$ such that $\mathcal{O}(E)\ne\varnothing$ is shown to contain an asymptotically isometric copy of the space $l_\infty$. Bibliography: 17 titles.
About the authors
Sergei Vladimirovich Astashkin
Samara National Research University
Email: astash@ssau.ru
Doctor of physico-mathematical sciences, Professor
Evgenii Mikhailovich Semenov
Voronezh State University
Email: nadezhka_ssm@geophys.vsu.ru
Doctor of physico-mathematical sciences, Professor
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