Limiting Behavior in Missing Sums of Sumsets

Abstract

We study |A + A| as a random variable, where A ⊂eq \0, …, N\ is a random subset such that each 0 n N is included with probability 0 < p < 1, and where A + A is the set of sums a + b for a,b in A. Lazarev, Miller, and O'Bryant studied the distribution of 2N + 1 - |A + A|, the number of summands not represented in A + A when p = 1/2. A recent paper by Chu, King, Luntzlara, Martinez, Miller, Shao, Sun, and Xu generalizes this to all p∈ (0,1), calculating the first and second moments of the number of missing summands and establishing exponential upper and lower bounds on the probability of missing exactly n summands, mostly working in the limit of large N. We provide exponential bounds on the probability of missing at least n summands, find another expression for the second moment of the number of missing summands, extract its leading-order behavior in the limit of small p, and show that the variance grows asymptotically slower than the mean, proving that for small p, the number of missing summands is very likely to be near its expected value.