A New Characterization of Sporadic Groups

Abstract

Let G be a finite group, n a positive integer. π(n) denotes the set of all prime divisors of n and π(G)=π(|G|). The prime graph (G) of G, defined by Grenberg and Kegel, is a graph whose vertex set is π(G), two vertices p,\ q in π(G) joined by an edge if and only if G contains an element of order pq. In this article, a new characterization of sporadic simple groups is obtained, that is, if G is a finite group and S a sporadic simple group. Then G S if and only if |G|=|S| and (G) is disconnected. This characterization unifies the several characterizations that can conclude the group has non-connected prime graphs, hence several known characterizations of sporadic simple groups become the corollaries of this new characterization.