Sets in Zk with doubling 2k+δ are near convex progressions

Abstract

For δ>0 sufficiently small and A⊂ Zk with |A+A| (2k+δ)|A|, we show either A is covered by mk(δ) parallel hyperplanes, or satisfies |co(A) A| ckδ |A|, where co(A) is the smallest convex progression (convex set intersected with a sublattice) containing A. This generalizes the Freiman-Bilu 2k theorem, Freiman's 3|A|-4 theorem, and recent sharp stability results of the present authors for sumsets in Rk conjectured by Figalli and Jerison.