Groups with a Fixed Character Degree
Abstract
Let G be a finite group, and let d be the degree of an irreducible character of G such that |G|=d(d+e) for some e>1. Consider the case when G is solvable, d is square-free, and (d,d+e)=1. We wish to explore an equivalent condition on G when d∈cd(G). We show that if d∈cd(G) then there is a sequence of congruences relating the prime power factors of d+e to the product of prime factors of d such that the product of the moduli in this sequence of congruences is d. Moreover, the argument will hold in both directions.
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