Binary Quadratic Forms in Difference Sets

Abstract

We show that if h(x,y)=ax2+bxy+cy2∈ Z[x,y] satisfies (h)=b2-4ac≠ 0, then any subset of \1,2,…,N\ lacking nonzero differences in the image of h has size at most a constant depending on h times N(-c N), where c=c(h)>0. We achieve this goal by adapting an L2 density increment strategy previously used to establish analogous results for sums of one or more single-variable polynomials. Our exposition is thorough and self-contained, in order to serve as an accessible gateway for readers who are unfamiliar with previous implementations of these techniques.