On a reformulation of the commutator subgroup
Abstract
For semigroup S, a commutative congruence σorient on S and a subsemigroup Orientable(S) of S were introduced in "Two cancellative commutative congruences and group diagrams", Semigroup Forum (2011) 82: 338-353. Here we demonstrate that when the semigroup is in fact a group G, then Orientable(G) is the commutator subgroup [G,G] and G / σorient is the abelian quotient group G / [G,G].
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