About: Regularly ordered

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In mathematics, specifically in order theory and functional analysis, an ordered vector space is said to be regularly ordered and its order is called regular if is Archimedean ordered and the order dual of distinguishes points in . Being a regularly ordered vector space is an important property in the theory of topological vector lattices.

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  • In mathematics, specifically in order theory and functional analysis, an ordered vector space is said to be regularly ordered and its order is called regular if is Archimedean ordered and the order dual of distinguishes points in . Being a regularly ordered vector space is an important property in the theory of topological vector lattices. (en)
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  • In mathematics, specifically in order theory and functional analysis, an ordered vector space is said to be regularly ordered and its order is called regular if is Archimedean ordered and the order dual of distinguishes points in . Being a regularly ordered vector space is an important property in the theory of topological vector lattices. (en)
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  • Regularly ordered (en)
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