Completing the proof of the Liebeck--Nikolov--Shalev conjecture

Abstract

Liebeck, Nikolov, and Shalev conjectured the existence of an absolute constant C>0, such that for every subset A of a finite simple group G with |A| 2, there exists C|G|/|A| conjugates of A whose product is G. This paper is a companion to GLPS, and together they prove the conjecture. To prove the conjecture, we establish the following skew-product theorem. We show that there exists c > 0 such that for all ε > 0 and subsets A, B ⊂eq G of finite simple groups of Lie type, if |B| < |G|1 - ε , then |Aσ B| > |B||A|c ε for some σ ∈ G . This result, along with its more involved analogue for alternating groups, constitutes the main contribution of this paper. Our proof leverages deep results from character theory alongside the probabilistic method.