Characterizations of Cancellable Groups
An abelian group $A$ is said to be cancellable if whenever $A \oplus G$ is isomorphic to $A \oplus H$, $G$ is isomorphic to $H$. We show that the index set of cancellable rank 1 torsion-free abelian groups is $\Pi^0_4$ $m$-complete, showing that the classification by Fuchs and Loonstra cannot be sim...
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Zusammenfassung: | An abelian group $A$ is said to be cancellable if whenever $A \oplus G$ is
isomorphic to $A \oplus H$, $G$ is isomorphic to $H$. We show that the index
set of cancellable rank 1 torsion-free abelian groups is $\Pi^0_4$
$m$-complete, showing that the classification by Fuchs and Loonstra cannot be
simplified. For arbitrary non-finitely generated groups, we show that the
cancellation property is $\Pi^1_1$ $m$-hard; we know of no upper bound, but we
conjecture that it is $\Pi^1_2$ $m$-complete. |
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DOI: | 10.48550/arxiv.1809.07191 |