The sum-free process

Abstract

S ⊂eq Z2n is said to be sum-free if S has no solution to the equation a+b=c. The sum-free process on Z2n starts with S:=, and iteratively inserts elements of Z2n, where each inserted element is chosen uniformly at random from the set of all elements that could be inserted while maintaining that S is sum-free. We prove a lower bound (which holds with high probability) on the final size of S, which matches a more general result of Bennett and Bohman, and also matches the order of a sharp threshold result proved by Balogh, Morris and Samotij. We also show that the set S produced by the process has a particular non-pseudorandom property, which is in contrast with several known results about the random greedy independent set process on hypergraphs.