Characteristic classes of involutions in nonsolvable groups

Abstract

Let G,D0,D1 be finite groups such that D0 D1 are groups of automorphisms of G that contain the inner automorphisms of G. Assume that D1/D0 has a normal 2-complement and that D1 acts fixed-point-freely on the set of D0-conjugacy classes of involutions of G (i.e., CD1(a)D0<D1 for every involution a∈ G). We prove that G is solvable. We also construct a nonsolvable finite group that possesses no characteristic conjugacy class of nontrivial cyclic subgroups. This shows that an assumption on the structure of D1/D0 above must be made in order to guarantee the solvability of G and also yields a negative answer to Problem 3.51 in the Kourovka Notebook, posed by A. I. Saksonov in 1969.