Multiplying a conjugacy class by its inverse in a finite group
Abstract
Suppose that G is a finite group and K a non-trivial conjugacy class of G such that KK-1=1 D D-1 with D a conjugacy class of G. We prove that G is not a non-abelian simple group. We also give arithmetical conditions on the class sizes determining the structure of K and D. Furthermore, if D=K is a non-real class, then K is p-elementary abelian for some odd prime p.
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