Sum-product estimates via directed expanders

Abstract

Let q be a finite field of order q and P be a polynomial in q[x1, x2]. For a set A ⊂ q, define P(A):=\P(x1, x2) | xi ∈ A \. Using certain constructions of expanders, we characterize all polynomials P for which the following holds 2mm If |A+A| is small, then |P(A)| is large. 2mm The case P=x1x2 corresponds to the well-known sum-product problem.