Pos Groups Revisited

Abstract

A finite group G is said to be a POS-group if for each x in G the cardinality of the set \y ∈ G | o(y) =o(x)\ is a divisor of the order of G. In this paper we study some of the properties of arbitrary POS-groups, and construct a couple of new families of nonabelian POS-groups. We also prove that the alternating group An, n 3, is not a POS-group.