Growth in linear groups

Abstract

We prove a conjecture of Helfgott on the structure of sets of bounded tripling in bounded rank, which states the following. Let A be a finite symmetric subset of GLn(F) for any field F such that |A3| ≤ K|A|. Then there are subgroups H A such that A is covered by KOn(1) cosets of , /H is nilpotent of step at most n-1, and H is contained in AOn(1). This theorem includes the Product Theorem for finite simple groups of bounded rank as a special case. As an application of our methods we also show that the diameter of sufficiently quasirandom finite linear groups is poly-logarithmic.