Mohammad Zarrin
Published 2015-07-14Version 1
For any group G, let C(G) denote the intersection of the normal- izers of centralizers of all elements of G. Set C0 = 1. De?ne Ci+1(G)=Ci(G) = C(G=Ci(G)) for i ? 0. By C1(G) denote the terminal term of the ascending series. In this paper, we show that a ?nitely generated group G is nilpotent if and only if G = Cn(G) for some positive integer n.
On the intersection of fixed subgroups of $F_n\times F_m$
Centralizers of Subsystems of Fusion Systems
On solubility of groups with finitely many centralizers
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