Primitive characters of odd order groups
Abstract
Let G be a finite group of odd order. We show that if is an irreducible primitive character of G then for all primes p dividing the order of G there is a conjugacy class such that the p-part of (1) divides the size of that conjugacy class. We also show that for some classes of groups the entire degree of an irreducible primitive character divides the size of a conjugacy class.
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