On Oriented Diameter of Power Graphs

Abstract

In this paper, we study the oriented diameter of power graphs of groups. We show that a 2-edge connected power graph of a finite group has oriented diameter at most 4. We prove that the power graph of the cyclic group of order n has oriented diameter 2 for all n≠ 1,2,4,6. For non-cyclic finite nilpotent groups, we show that the oriented diameter of corresponding power graphs is at least 3. Moreover, we provide necessary and sufficient conditions for the oriented diameter of 2-edge connected power graphs of finite non-cyclic nilpotent groups to be either 3 or 4. This, in turn, gives an algorithm for computing the oriented diameter of the power graph of a given nilpotent group that runs in time polynomial in the size of the group.