Order version of the Riesz Theorem
DOI :
https://doi.org/10.5269/bspm.81141Résumé
\begin{abstract}
This paper offers an order-theoretic generalization of the classical Riesz theorem within the setting of Riesz spaces, employing the notion of order
compactness as a key conceptual tool ( see $ \left[2 \right]$ ). The main result showing that a Riesz space endowed with a strictly positive linear functional $\varphi$ must be finitedimensional if its unit sphere is $\sigma$-order compact. Moreover, if $\varphi$ is order continuous and a box $[-a,a]$ ($ 0 < a$ ) is $\sigma-$order compact then $E$ is finitedimensional.
\end{abstract}
Références
[1] C. D. Aliprantis and K. C. Border, \textit{Infinite Dimensional Analysis}. Third Edition. Springer-Verlag Berlin Heidelberg 1999, 2006 Printed in Germany.
[2] M. Laayouni, \textit{ Order compactness in Riesz spaces}, Advances in Pure Mathematics, 2025, 15(4), p.291-302.
[3] A. L. Peressini. \textit{Ordered topological vector spaces}. 1967. New York London: Harper Row.
[2] M. Laayouni, \textit{ Order compactness in Riesz spaces}, Advances in Pure Mathematics, 2025, 15(4), p.291-302.
[3] A. L. Peressini. \textit{Ordered topological vector spaces}. 1967. New York London: Harper Row.
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Publié
2026-02-20
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Conf. Issue: Mathematics and applications
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