Arithmetic structures in smooth subsets of Fp

Abstract

Fix integers a1,...,ad satisfying a1 + ... + ad = 0. Suppose that f : ZN -> [0,1], where N is prime. We show that if f is ``smooth enough'' then we can bound from below the sum of f(x1)...f(xd) over all solutions (x1,...,xd) in ZN to a1 x1 + ... + ad xd == 0 (mod N). Note that d = 3 and a1 = a2 = 1 and a3 = -2 is the case where x1,x2,x3 are in arithmetic progression. By ``smooth enough'' we mean that the sum of squares of the lower order Fourier coefficients of f is ``small'', a property shared by many naturally-occurring functions, among them certain ones supported on sumsets and on certain types of pseudoprimes. The paper can be thought of as a generalization of another result of the author, which dealt with a Fpn analogue of the problem. It appears that the method in that paper, and to a more limited extent the present paper, uses ideas similar to those of B. Green's ``arithmetic regularity lemma'', as we explain in the paper.