The sum-product problem for small sets

Abstract

For A⊂eq R, let A+A=\a+b: a,b∈ A\ and AA=\ab: a,b∈ A\. For k∈ N, let SP(k) denote the minimum value of \|A+A|, |AA|\ over all A⊂eq N with |A|=k. Here we establish SP(k)=3k-3 for 2≤ k ≤ 7, the k=7 case achieved for example by \1,2,3,4,6,8,12\, while SP(k)=3k-2 for k=8,9, the k=9 case achieved for example by \1,2,3,4,6,8,9,12,16\. For 4≤ k ≤ 7, we provide two proofs using different applications of Freiman's 3k-4 theorem; one of the proofs includes extensive case analysis on the product sets of k-element subsets of (2k-3)-term arithmetic progressions. For k=8,9, we apply Freiman's 3k-3 theorem for product sets, and investigate the sumset of the union of two geometric progressions with the same common ratio r>1, with separate treatments of the overlapping cases r≠ 2 and r≥ 2.