Sharp Threshold Asymptotics for the Emergence of Additive Bases

Abstract

A subset A of 0,1,...,n is said to be a 2-additive basis for 1,2,...,n if each j in 1,2,...,n can be written as j=x+y, x,y in A, x<=y. If we pick each integer in 0,1,...,n independently with probability p=pn tending to 0, thus getting a random set A, what is the probability that we have obtained a 2-additive basis? We address this question when the target sum-set is [(1-alpha)n,(1+alpha)n] (or equivalently [alpha n, (2-alpha) n]) for some 0<alpha<1. Under either model, the Stein-Chen method of Poisson approximation is used, in conjunction with Janson's inequalities, to tease out a very sharp threshold for the emergence of a 2-additive basis. Generalizations to k-additive bases are then given.