Restrictions on sets of conjugacy class sizes in arithmetic progressions

Abstract

We continue the investigation, that began in [3] and [4], into finite groups whose set of nontrivial conjugacy class sizes form an arithmetic progression. Let G be a finite group and denote the set of conjugacy class sizes of G by cs(G). Finite groups satisfying cs(G) = \1,2,4,6\ and \1,2,4,6,8\ are classified in [4] and [3], respectively, we demonstrate these examples are rather special by proving the following. There exists a finite group G such that cs(G) = \1, 2α, 2α+1, 2α3 \ if and only if α =1. Furthermore, there exists a finite group G such that cs(G) = \1, 2α, 2α +1, 2α3, 2α +2\ and α is odd if and only if α=1.