Writing finite simple groups of Lie type as products of subset conjugates

Abstract

The Liebeck-Nikolov-Shalev conjecture [LNS12] asserts that, for any finite simple non-abelian group G and any set A⊂eq G with |A|≥ 2, G is the product of at most N|G||A| conjugates of A, for some absolute constant N. For G of Lie type, we prove that for any >0 there is some N for which G is the product of at most N(|G||A|)1+ conjugates of either A or A-1. For symmetric sets, this improves on results of Liebeck, Nikolov, and Shalev [LNS12] and Gill, Pyber, Short, and Szab\'o [GPSS13]. During the preparation of this paper, the proof of the Liebeck-Nikolov-Shalev conjecture was completed by Lifshitz [Lif24]. Both papers use [GLPS24] as a starting point. Lifshitz's argument uses heavy machinery from representation theory to complete the conjecture, whereas this paper achieves a more modest result by rather elementary combinatorial arguments.