Inverse theorems for sets and measures of polynomial growth

Abstract

We give a structural description of the finite subsets A of an arbitrary group G which obey the polynomial growth condition |An| ≤ nd |A| for some bounded d and sufficiently large n, showing that such sets are controlled by (a bounded number of translates of) a coset nilprogression in a certain precise sense. This description recovers some previous results of Breuillard-Green-Tao and Breuillard-Tointon concerning sets of polynomial growth; we are also able to describe the subsequent growth of |Am| fairly explicitly for m ≥ n, at least when A is a symmetric neighbourhood of the identity. We also obtain an analogous description of symmetric probability measures μ whose n-fold convolutions μ*n obey the condition \| μ*n \|2-2 ≤ nd \|μ \|2-2. In the abelian case, this description recovers the inverse Littlewood-Offord theorem of Nguyen-Vu, and gives a variant of a recent nonabelian inverse Littlewood-Offord theorem of Tiep-Vu. Our main tool to establish these results is the inverse theorem of Breuillard, Green, and the author that describes the structure of approximate groups.