Counting centralizers and z-classes of some F-groups

Abstract

A finite group G is called an F-group if for every x, y ∈ G Z(G), C(x) ≤ C(y) implies that C(x) = C(y). On the otherhand, two elements of a group are said to be z-equivalent or in the same z-class if their centralizers are conjugate in the group. In this paper, for a finite group, we give necessary and sufficient conditions for the number of centralizers/ z-classes to be equal to the index of its center. We also give a necessary and sufficient condition for the number of z-classes of a finite F-group to attain its maximal number (which extends an earlier result). Among other results, we have computed the number of element centralizers and z-classes of some finite groups and extend some previous results.