M, B and Co1 are recognisable by their prime graphs

Abstract

The prime graph, or Gruenberg--Kegel graph, of a finite group G is the graph (G) whose vertices are the prime divisors of |G|, and whose edges are the pairs \p,q\ for which G contains an element of order pq. A finite group G is recognisable by its prime graph if every finite group H with (H)=(G) is isomorphic to G. By a result of Cameron and Maslova, every such group must be almost simple, so one natural case to investigate is that in which G is one of the 26 sporadic simple groups. Existing work of various authors answers the question of recognisability by prime graph for all but three of these groups, namely the Monster, M, the Baby Monster, B, and the first Conway group, Co1. We prove that these three groups are recognisable by their prime graphs.