Variations on average character degrees and solvability

Abstract

Let G be a finite group, F be one of the fields Q,R or C, and N be a non-trivial normal subgroup of G. Let acdF*(G) and acdF,even(G|N) be the average degree of all non-linear F-valued irreducible characters of G and of even degree F-valued irreducible characters of G whose kernels do not contain N, respectively. We assume the average of an empty set is 0 for more convenience. In this paper we prove that if acd*Q(G)< 9/2 or 0< acdQ,even(G|N)<4, then G is solvable. Moreover, setting F ∈ \R,C\, we obtain the solvability of G by assuming acdF*(G)<29/8 or 0< acdF,even(G|N)<7/2, and we conclude the solvability of N when 0< acdF,even(G|N)<18/5. Replacing N by G in acdF,even(G|N) gives us an extended form of a result by Moreto and Nguyen. Examples are given to show that all the bounds are sharp.