Borel Complexity of the Isomorphism Relation of Archimedean Orders in Finitely Generated Groups
Abstract
In 2020, Calderoni, Marker, Motto Ros and Shani asked what the Borel complexity of the isomorphism relation of Archimedean orders on Qn is. We answer this question by proving that the isomorphism relation of Archimedean orders on Zn is not hyperfinite when n ≥ 3 and not treeable when n ≥ 4. As a corollary, we get that the isomorphism relation of Archimedean orders on Qn is not hyperfinite when n ≥ 3 and not treeable when n ≥ 4.
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