Between Whitehead groups and uniformization
Abstract
For a given stationary set S of countable ordinals we prove (in ZFC) that the assertion "every S-ladder system has 0-uniformization" is equivalent to "every strongly 1-free abelian group of cardinality 1 with non-freeness invariant ⊂eq S is 1-coseparable, i.e. Ext(G, i=0∞ Z)=0 (in particular Whitehead, i.e.\ Ext(G, Z)=0)". This solves problems B3 and B4 from Eklof and Mekler's monograph.
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