Failure of singular compactness for Hom
Abstract
Assuming G\"odel's axiom of constructibility V=L, we construct a -free abelian group G of singular cardinality for some suitable cardinal which is regular and uncountable, equipped with the property that for every nontrivial subgroup G' ⊂eq G of smaller cardinality, Hom(G',Z) ≠ 0, while Hom(G,Z) = 0. This provides a consistent counterexample to the singular compactness of nontrivial duality with respect to the functor Hom(-,Z).
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