Homogeneous products of conjugacy classes
Abstract
Let G be a finite group and a∈ G. Let aG=\g-1ag g∈ G\ be the conjugacy class of a in G. Assume that aG and bG are conjugacy classes of G with the property that CG(a)= CG(b). Then aG bG is a conjugacy class if and only if [a,G]=[b,G]=[ab,G] and [ab,G] is a normal subgroup of G.
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