Non-abelian tensor product and circular orderability of groups
Abstract
For a group G we consider its tensor square G G and exterior square G G. We prove that for a circularly orderable group G, under some assumptions on H1(G) and H2(G), its exterior square and tensor square are left-orderable. This yields an obstruction for a circularly orderable group G to have torsion. We apply these results to study circular orderability of tabulated virtual knot groups.
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