M-slenderness |
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| Authors: | Oren Kolman Burkhard Wald |
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| Affiliation: | 1.Department of Pure Mathematics and Mathematical Statistics,Centre for Mathematical Sciences,Cambridge,England, UK;2.Universit?t Duisburg-Essen,Essen,Germany |
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| Abstract: | Analogues of Nunke’s theorem are proved which characterize variants of slenderness. For a bounded monotone subgroup M of ? ω , a torsion-free reduced abelian group G is M-slender if, and only if, there is no monomorphism from M into G. It is consistent relative to ordinary set theory (ZFC) that if M ≠ ? ω is an unbounded monotone subgroup of ? ω , then a torsion-free reduced abelian group G is M-slender if, and only if, there is no monomorphism from M into G. |
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