Intersective sets over abelian groups

Abstract

Given a finite abelian group G and a subset J⊂ G with 0∈ J, let DG(J,N) be the maximum size of A⊂ GN such that the difference set A-A and JN have no non-trivial intersection. Recently, this extremal problem has been widely studied for different groups G and subsets J. In this paper, we generalize and improve the relevant results by Alon and by Hegedus by building a bridge between this problem and cyclotomic polynomials with the help of algebraic graph theory. In particular, we construct infinitely many non-trivial families of G and J for which the current known upper bounds on DG(J, N) can be improved exponentially.