On prime divisors of character degrees and codegrees

Abstract

Let G be a finite group, and let Irr(G) denote the set of irreducible complex characters of G. For ε∈ \ \, we define cdε(G)=\ χε(1) χ∈ Irr(G) \, where χ+(1)=χ(1) denotes the degree of χ, χ-(1)=|G:(χ)|/χ(1) denotes the codegree of χ. Further, let ωε(G)=\ π(n) n∈ cdε(G) \, where π(n) stands for the set of prime divisors of n. We established that if |ωε(G)|≤ 3, then G is solvable. Additionally, a generalization of this result is obtained in the case when ε=+.