On finite groups in which the twisted conjugacy classes of the unit element are subgroups

Abstract

We consider groups G such that the set [G,]=\g-1g|g∈ G\ is a subgroup for every automorphism of G, and we prove that there exists such a group G that is finite and nilpotent of class n for every n∈ N. Then there exists an infinite nonnilpotent group with the above property and the conjecture 18.14 of [5] is false.

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