Distribution of Missing Sums in Sumsets

TL;DR

This paper studies the distribution of the size of sumsets for random subsets of integers, providing bounds, revealing bimodality, and connecting the problem to graph theory for analysis.

Contribution

It extends previous work by establishing bounds on the distribution of missing sums, demonstrating bimodality, and deriving an explicit variance formula involving Fibonacci numbers.

Findings

Distribution of missing sums is at least bimodal.

Explicit variance of sumset size is approximately 35.97.

Probabilities of missing consecutive sums are tightly bounded.

Abstract

For any finite set of integers X, define its sumset X+X to be {x+y: x, y in X}. In a recent paper, Martin and O'Bryant investigated the distribution of |A+A| given the uniform distribution on subsets A of {0, 1, ..., n-1}. They also conjectured the existence of a limiting distribution for |A+A| and showed that the expectation of |A+A| is 2n - 11 + O((3/4)^{n/2}). Zhao proved that the limits m(k) := lim_{n --> oo} Prob(2n-1-|A+A|=k) exist, and that sum_{k >= 0} m(k)=1. We continue this program and give exponentially decaying upper and lower bounds on m(k), and sharp bounds on m(k) for small k. Surprisingly, the distribution is at least bimodal; sumsets have an unexpected bias against missing exactly 7 sums. The proof of the latter is by reduction to questions on the distribution of related random variables, with large scale numerical computations a key ingredient in the analysis. We also derive an explicit formula for the variance of |A+A| in terms of Fibonacci numbers, finding Var(|A+A|) is approximately 35.9658. New difficulties arise in the form of weak dependence between events of the form {x in A+A}, {y in A+A}. We surmount these obstructions by translating the problem to graph theory. This approach also yields good bounds on the probability for A+A missing a consecutive block of length k.