The Power Graph of a Torsion-Free Group Determines the Directed Power Graph

Abstract

The directed power graph G( G) of a group G is the simple digraph with vertex set G such that x→ y if y is a power of x. The power graph of G, denoted with G( G), is the underlying simple graph. In this paper, for groups G and H, the following is proved. If G has no quasicyclic subgroup Cp∞ which has trivial intersection with every cyclic subgroup K of G such that K≤ Cp∞, then G( G) G( H) implies G( G) G( H). Consequently, any two torsion-free groups having isomorphic power graphs have isomorphic directed power graphs.