Subnormalizers and solvability in finite groups

Abstract

For a finite group G, we study the probability sp(G) that, given two elements x,y ∈ G, the cyclic subgroup x is subnormal in the subgroup x, y . This can be seen as an intermediate invariant between the probability that two elements generate a nilpotent subgroup and the probability that two elements generate a solvable subgroup. We prove that sp(G) ≤ 1/6 for every nonsolvable group G.