Automorphism orbits and element orders in finite groups: almost-solubility and the Monster

Abstract

For a finite group G, we denote by ω(G) the number of Aut(G)-orbits on G, and by o(G) the number of distinct element orders in G. In this paper, we are primarily concerned with the two quantities d(G):=ω(G)-o(G) and q(G):=ω(G)/o(G), each of which may be viewed as a measure for how far G is from being an AT-group in the sense of Zhang (that is, a group with ω(G)=o(G)). We show that the index |G:Rad(G)| of the soluble radical Rad(G) of G can be bounded from above both by a function in d(G) and by a function in q(G) and o(Rad(G)). We also obtain a curious quantitative characterisation of the Fischer-Griess Monster group M.