Distribution of missing differences in diffsets

Abstract

Lazarev, Miller and O'Bryant investigated the distribution of |S+S| for S chosen uniformly at random from \0, 1, …, n-1\, and proved the existence of a divot at missing 7 sums (the probability of missing exactly 7 sums is less than missing 6 or missing 8 sums). We study related questions for |S-S|, and shows some divots from one end of the probability distribution, P(|S-S|=k), as well as a peak at k=4 from the other end, P(2n-1-|S-S|=k). A corollary of our results is an asymptotic bound for the number of complete rulers of length n.