Popular Differences and the Croot--Lev Half-Threshold Problem

Abstract

Let A be a finite non-empty subset of an abelian group G, and let rA(d)=|\(a,a')∈ A2:a-a'=d\|. Croot and Lev asked whether the pointwise half-threshold condition rA(d) |A|/2 for every d∈ A-A forces A-A to be either a subgroup or a union of three cosets. We resolve this open problem in its sharp general form by identifying the essential obstruction: the statement is false in arbitrary abelian groups, but becomes true after excluding non-zero two-torsion. More precisely, if G is two-torsion-free and the half-threshold condition holds, then either A-A is a finite subgroup of G, or there are a finite subgroup H G and elements x,g∈ G such that \[ A=(x+H)(x+g+H). \] The two-torsion-free hypothesis is essential: for every r1 we construct A⊂eq22r+1 with A-A=22r+1\t\ such that every non-zero represented difference has exactly |A|/2 representations, giving genuine counterexamples to the Croot--Lev conclusion. The proof of the positive result combines a Kneser quotient reduction with Lev's formulation of Kemperman's critical-pair theory.