On degrees of minimal invariant characters

Abstract

It is well known that finite groups with exactly two character degrees have an abelian derived subgroup and, consequently, are solvable. Let G be a finite group and N a normal subgroup of G. In this paper, we prove that normal subgroups possessing exactly two degrees of minimal G-invariant characters are solvable. Furthermore, it is shown that if these degrees are \1, f\ for some integer f, then either f is a prime power or the commutator subgroup [N,G] is abelian. Whether [N, G] is abelian when f is a prime power remains an open problem. Specifically, we prove that this holds when f=p.