Sets with Few Subset Sums

Abstract

It is a classical fact that every n-element set of positive reals has at least n+12+1 distinct subset sums, with equality exactly for homogeneous arithmetic progressions (when n≥ 4). We establish stability versions of this inverse theorem in two regimes. First, for any parameter M ≤ n-4, we precisely characterize the n-element sets of positive reals with at most n+12+1+M subset sums. Second, for any constant C, we provide a characterization, sharp up to constants, of the n-element sets of positive reals with at most Cn2 distinct subset sums. Along the way, we constrain (for any fixed d ≥ 2) the structure of n-element subsets of Rd with o(nd+1) subset sums.