Non-solvable groups whose non-linear character degrees have the same number of different prime divisors

Abstract

By a result of Noritzsch, a finite solvable group whose non-linear character degrees have the same set of prime divisors is meta-abelian. In this note we investigate finite non-solvable groups whose non-linear character degrees have the same number of different prime divisors, and show that up to an abelian direct factor, such groups are exactly L2(4), L2(8), A7, S7, the central product of a cyclic 3-group with 3.A7, or the semi-direct product of A7 by a cyclic 2-group a such that a non-trivially acts on A7 by conjugation. As consequence, we show that only the primes 2,3,5,7 may occur as prime divisors of their irreducible character degrees, and that Huppert's -σ conjecture holds for them.