On combinatorial properties of Gruenberg--Kegel graphs of finite groups

Abstract

If G is a finite group, then the spectrum ω(G) is the set of all element orders of G. The prime spectrum π(G) is the set of all primes belonging to ω(G). A simple graph (G) whose vertex set is π(G) and in which two distinct vertices r and s are adjacent if and only if rs ∈ ω(G) is called the Gruenberg-Kegel graph or the prime graph of G. In this paper, we prove that if G is a group of even order, then the set of vertices which are non-adjacent to 2 in (G) form a union of cliques. Moreover, we decide when a strongly regular graph is isomorphic to the Gruenberg-Kegel graph of a finite group. Besides this, we prove that a complete bipartite graph with each part of size at least 3 can not be isomorphic to the Gruenberg-Kegel graph of a finite group.