Criterion of unrecognizability of a finite group by its Gruenberg-Kegel graph

Abstract

The Gruenberg-Kegel graph (G) associated with a finite group G has as vertices the prime divisors of |G|, with an edge from p to q if and only if G contains an element of order pq. This graph has been the subject of much recent interest; one of our goals here is to give a survey of some of this material, relating to groups with the same Gruenberg-Kegel graph. However, our main aim is to prove several new results. Among them are the following. - There are infinitely many finite groups with the same Gruenberg-Kegel graph as the Gruenberg-Kegel of a finite group G if and only if there is a finite group H with non-trivial solvable radical such that (G)=(H). - There is a function F on the natural numbers with the property that if a finite n-vertex graph whose vertices are labelled by pairwise distinct primes is the Gruenberg-Kegel graph of more than F(n) finite groups, then it is the Gruenberg-Kegel graph of infinitely many finite groups. (The function we give satisfies F(n)=O(n7), but this is probably not best possible.) - If a finite graph whose vertices are labelled by pairwise distinct primes is the Gruenberg-Kegel graph of only finitely many finite groups, then all such groups are almost simple; moreover, has at least three pairwise non-adjacent vertices, and 2 is non-adjacent to at least one odd vertex. - Groups whose power graphs, or commuting graphs, are isomorphic have the same Gruenberg-Kegel graph. - The groups 2G2(27) and E8(2) are uniquely determined by the isomorphism types of their Gruenberg-Kegel graphs. In addition, we consider groups whose Gruenberg-Kegel graph has no edges. These are the groups in which every element has prime power order, and have been studied under the name EPPO groups; completing this line of research, we give a complete list of such groups.