Quadratic residues and difference sets

Abstract

It has been conjectured by Sarkozy that with finitely many exceptions, the set of quadratic residues modulo a prime p cannot be represented as a sumset \a+b a∈ A, b∈ B\ with non-singleton sets A,B⊂ Fp. The case A=B of this conjecture has been recently established by Shkredov. The analogous problem for differences remains open: is it true that for all sufficiently large primes p, the set of quadratic residues modulo p is not of the form \a'-a" a',a"∈ A,\,a' a"\ with A⊂ Fp? We attack here a presumably more tractable variant of this problem, which is to show that there is no A⊂ Fp such that every quadratic residue has a uniquerepresentation as a'-a" with a',a"∈ A, and no non-residue is represented in this form. We give a number of necessary conditions for the existence of such A, involving for the most part the behavior of primes dividing p-1. These conditions enable us to rule out all primes p in the range 13<p<1018 (the primes p=5 and p=13 being conjecturally the only exceptions).