Sums of algebraic dilates

Abstract

We show that if λ1,…,λk are algebraic numbers, then |A+λ1· A+…+λk· A|≥ H(λ1,…,λk)|A|-o(|A|) for all finite subsets A of C, where H(λ1,…,λk) is an explicit constant that is best possible. The proof combines several ingredients, including a lower bound estimate on the measure of sums of linear transformations of compact sets in Rd, a variant of Freiman's theorem tuned specifically to sums of dilates and the analysis of what we call lattice density, which succinctly captures how a subset of Zd is arranged relative to a given flag of lattices. As an application, we revisit the study of sums of linear transformations of finite sets, in particular proving an asymptotically best possible lower bound for sums of two linear transformations.