# The power graph of a torsion-free group

**Authors:** Peter J. Cameron, Horacio Guerra, \v{S}imon Jurina

arXiv: 1705.01586 · 2019-05-31

## TL;DR

This paper investigates the relationship between power graphs and directed power graphs of torsion-free groups, establishing conditions under which the power graph uniquely determines the directed power graph, with specific results for groups like nd and nd.

## Contribution

It proves that for certain torsion-free groups, the power graph determines the directed power graph up to isomorphism, extending understanding beyond finite groups.

## Key findings

- For torsion-free nilpotent groups of class , power graph determines directed power graph.
- In nd and nd, isomorphisms of power graphs preserve orientation.
- For nd, orientations are either all preserved or all reversed.

## Abstract

The \emph{power graph} $P(G)$ of a group $G$ is the graph whose vertex set is $G$, with $x$ and $y$ joined if one is a power of the other; the \emph{directed power graph} $\vec{P}(G)$ has the same vertex set, with an arc from $x$ to $y$ if $y$ is a power of $x$. It is known that, for finite groups, the power graph determines the directed power graph up to isomorphism. However, it is not true that any isomorphism between power graphs induces an isomorphism between directed power graphs. Moreover, for infinite groups the power graph may fail to determine the directed power graph.   In this paper, we consider power graphs of torsion-free groups. Our main results are that, for torsion-free nilpotent groups of class at most $2$, and for groups in which every non-identity element lies in a unique maximal cyclic subgroup, the power graph determines the directed power graph up to isomorphism. For specific groups such as $\mathbb{Z}$ and $\mathbb{Q}$, we obtain more precise results. Any isomorphism $P(\mathbb{Z})\to P(G)$ preserves orientation, so induces an isomorphism between directed power graphs; in the case of $\mathbb{Q}$, the orientations are either all preserved or all reversed.   We also obtain results about groups in which every element is contained in a unique maximal cyclic subgroup (this class includes the free and free abelian groups), and about subgroups of the additive group of $\mathbb{Q}$ and about $\mathbb{Q}^n$.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/1705.01586/full.md

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Source: https://tomesphere.com/paper/1705.01586