p-Regular conjugacy classes and p-rational irreducible characters
Abstract
Let G be a finite group of order divisible by a prime p. The number of p-regular and p'-regular conjugacy classes of G is at least 2p-1. Also, the number of p-rational and p'-rational irreducible characters of G is at least 2p-1. Along the way we prove a uniform lower bound for the number of p-regular classes in a finite simple group of Lie type in terms of its rank and size of the underlying field.
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