Hamiltonian Groups with Perfect Order Classes

Abstract

A finite group is said to have "perfect order classes" if the number of elements of any given order is either zero or a divisor of the order of the group. The purpose of this note is to describe explicitly the finite Hamiltonian groups with perfect order classes. We show that a finite Hamiltonian group has perfect order classes if, and only if, it is isomorphic to the direct product of the quaternion group of order 8, a non-trivial cyclic 3-group and a group of order at most 2. Theorem. A finite Hamiltonian group has perfect order classes if, and only if, it is isomorphic either to Q× C3k or to Q× C2× C3k, for some positive integer k.