Conjugation groups and structure groups of quandles
Abstract
Quandles are certain algebraic structures showing up in different mathematical contexts. A group G with the conjugation operation forms a quandle, Conj(G). In the opposite direction, one can construct a group As(Q) starting from any quandle Q. These groups are useful in practice, but hard to compute. We explore the group As(Conj(G)) for so-called C-groups G. These are groups admitting a presentation with only conjugation and power relations. Symmetric groups Sn are typical examples. We show that for C-groups, As(Conj(G)) injects into G × Zm, where m is the number of conjugacy classes of G. From this we deduce information about the torsion, center, and derived group of As(Conj(G)). As an application, we compute the second quandle homology group of Conj(Sn) for all n, and unveil rich torsion therein.
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