Boundedly finite conjugacy classes of tensors
Abstract
Let n be a positive integer and let G be a group. We denote by (G) a certain extension of the non-abelian tensor square G G by G × G. Set T(G) = \g h g,h ∈ G\. We prove that if the size of the conjugacy class |x(G) | ≤ n for every x ∈ T(G), then the second derived subgroup (G)'' is finite with n-bounded order. Moreover, we obtain a sufficient condition for a group to be a BFC-group.
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