A generalization of the diameter bound of Liebeck and Shalev for finite simple groups

Abstract

Let G be a non-abelian finite simple group. A famous result of Liebeck and Shalev is that there is an absolute constant c such that whenever S is a non-trivial normal subset in G then Sk = G for any integer k at least c · (|G|/|S|). This result is generalized by showing that there exists an absolute constant c such that whenever S1, … , Sk are normal subsets in G with Πi=1k |Si| ≥ |G|c then S1 ·s Sk = G.