Riesz spaces for which every ideal is a
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C.B Huijsmans
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Article
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1976
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Elsevier Science
β 317 KB
It was proved by the present author (see [2], theorem 3) that a Riesz space L is hyper-archimedean (i.e., L/A is Archimedean for every ideal A in L) if and only if the distributive lattice &p (L) of all principal ideals in L, partially ordered by inclusion, is a Boolean ring (and hence a Boolean alg