Order continuous linear forms

Burkhard Kühn

doi:10.1215/ijm/1256046489

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Home > Journals > Illinois J. Math. > Volume 27 > Issue 2 > Article

Summer 1983 Order continuous linear forms

Burkhard Kühn

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Burkhard Kühn¹
¹Universität Dortmund, Dortmund, West Germany

Illinois J. Math. 27(2): 173-177 (Summer 1983). DOI: 10.1215/ijm/1256046489

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Abstract

Characterizations of (sequentially) order continuous linear forms on vector lattices are given in terms of their behaviour relative to families of orthogonal elements. As a consequence, the non existence of real measurable cardinals can be characterized by the property that the sequentially order continuous and the order continuous linear forms on order complete vector lattices coincide. This gives rise to a counter example to a conjecture of [1].