Centralizers of Camina p-groups of nilpotence class 3
Abstract
Let G be a Camina p-group of nilpotence class 3. We prove that if G' < CG (G'), then |Z(G)| |G':G3|1/2. We also prove that if G/G3 has only one or two abelian subgroups of order |G:G'|, then G' < CG (G'). If G/G3 has pa + 1 abelian subgroups of order |G:G'|, then either G' < CG (G') or |Z(G)| p2a.
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