On the conjugacy class exponent of the finite simple groups

Abstract

The generalized order eG(g) of an element g of a group G is the smallest positive integer k such that there exist x1,…,xk ∈ G such that gx1 … gxk=1, where gx=x-1gx. Let e(G) = \eG(g)\ |\ g ∈ G\. We provide upper bounds for e(G) for every finite simple group G. In particular, we show that e(G)≤ 8 unless G∈\PSLn(q), PSUn(q), E6(q),2E6(q)\. For the latter groups e(G)≤ n,3n+3,36,36, respectively. In addition, we bound from above the generalized order of semisimple and unipotent elements of finite simple groups of Lie type.