Characterizations of some groups in terms of centralizers

Abstract

A group G is said to be n-centralizer if its number of element centralizers (G)=n, an F-group if every non-central element centralizer contains no other element centralizer and a CA-group if all non-central element centralizers are abelian. For any non-abelian n-centralizer group G, we prove that GZ(G) ≤ (n-2)2, if n ≤ 12 and GZ(G) ≤ 2(n-4)log2(n-4) otherwise, which improves an earlier result. We prove that if G is an arbitrary non-abelian n-centralizer F-group, then gcd(n-2, GZ(G)) ≠ 1. For a finite F-group G, we show that (G) ≥ G 2 iff G A4 , an extraspecial 2-group or a Frobenius group with abelian kernel and complement of order 2. Among other results, for a finite group G with non-trivial center, it is proved that (G) = G 2 iff G is an extraspecial 2-group. We give a family of F-groups which are not CA-groups and extend an earlier result.