English

The N-prime graph and the Subgroup Isomorphism Problem

Group Theory 2025-11-14 v2

Abstract

We introduce a directed graph related to a group GG, which we call the N-prime graph ΓN(G)\Gamma_{\rm{N}}(G) of GG and which is a refinement of the classical Gruenberg-Kegel graph. The vertices of ΓN(G)\Gamma_{\rm{N}}(G) are the primes pp such that GG has an element of order pp, and, for distinct vertices pp and qq, the arc qpq\rightarrow p is in the graph if and only if GG has a subgroup of order pp whose normalizer in GG has an element of order qq. Generalizing some known results about the Gruenberg-Kegel graph, we prove that the group V(ZG)V(\mathbb{Z} G) of the units with augmentation 11 in the integral group ring ZG\mathbb{Z} G has the same N-prime graph as GG if GG is a finite solvable group, and we reduce to almost simple groups the problem of whether ΓN(V(ZG))=ΓN(G)\Gamma_{\rm{N}}(V(\mathbb{Z} G))=\Gamma_{\rm{N}}(G) holds for any finite group GG. We also prove that ΓN(V(ZG))=ΓN(G)\Gamma_{\rm{N}}(V(\mathbb{Z} G))=\Gamma_{\rm{N}}(G) if GG is almost simple with socle either an alternating group, or PSL(rf){\rm{PSL}}(r^f) with rr prime and f2f\le 2. Finally, for GG solvable we obtain some stronger results which give a contribution to the Subgroup Isomorphism Problem. More precisely, we prove that if V(ZG)V(\mathbb{Z} G) contains a Frobenius subgroup TT with kernel of prime order and complement of prime power order, then GG contains a subgroup isomorphic to TT.

Keywords

Cite

@article{arxiv.2511.01809,
  title  = {The N-prime graph and the Subgroup Isomorphism Problem},
  author = {Emanuele Pacifici and Angel del Rio and Marco Vergani},
  journal= {arXiv preprint arXiv:2511.01809},
  year   = {2025}
}
R2 v1 2026-07-01T07:19:45.958Z