Remarks on the inverse Littlewood conjecture

Abstract

The Littlewood conjecture, proven by Konyagin and McGehee-Pigno-Smith in the 1980s, states that if A⊂ Z is a finite set of integers with A=N then \| 1A\|1≥ c N for some absolute constant c > 0. We explore what structure A must have if \| 1A\|1≤ K N for some constant K. Under such an assumption we prove, for instance, that A contains a subset A'⊂eq A with A ≥ N0.99 such that A'+A' KO(1) A'. As a consequence, for any k≥ 3, if N is sufficiently large depending on k and K, then A must contain an arithmetic progression of length k. A byproduct of our analysis is a (slightly) improved bound for the constant c.