Conjugacy class sizes in arithmetic progression

Abstract

Let cs(G) denote the set of conjugacy class sizes of a group G, and let cs*(G)= cs(G)\1\ be the sizes of non-central classes. We prove three results. We classify all finite groups G with cs(G)=\a, a+d, … ,a+rd\ an arithmetic progression with r≥slant 2. (We show that cs(G)=\1,2,3\.) Our most substantial result classifies all G with cs*(G)=\2,4,6\. Finally, we classify all groups G whose largest two non-central conjugacy class sizes are coprime. (Here it is not obvious but it is true that cs*(G) has two elements, and so is an arithmetic progression.)