k-fold sums from a set with few products

Abstract

In the present paper we show that if A is a set of n real numbers, and the product set A.A has at most n(1+c) elements, then the k-fold sumset kA has at least n(log(k/2)/2 log 2 + 1/2 - fk(c)) elements, where fk(c) -> 0 as c -> 0. We believe that the methods in this paper might lead to a much stronger result; indeed, using a result of Trevor Wooley on Vinogradov's Mean Value Theorem and the Tarry-Escott Problem, we show that if |A.A| < n(1+c), then |k(A.A)| > n(Omega((k/log k)(1/3))), for c small enough in terms of k (we believe that a certain modification of this argument can perhaps produce similar conclusions for kA).