Notes and computations on forbidden differences

Abstract

We explore from several perspectives the following question: given X⊂eq Z and N∈ N, what is the maximum size D(X,N) of A⊂eq \1,2,…,N\ before A is forced to contain two distinct elements that differ by an element of X? The set of forbidden differences, X, is called intersective if D(X,N)=o(N), with the most well-studied examples being X=S=\n2: n∈ N\ and X=P-1=\p-1: p prime\. In addition to some new results, including exact formulas and estimates for D(X,N) in some non-intersective cases like X=P and X=S+k, k∈ N, we also provide a comprehensive survey of known bounds and extensive computational data. In particular, we utilize an existing algorithm for finding maximum cliques in graphs to determine D(S,N) for N≤ 300 and D(P-1,N) for N≤ 500. None of these exact values appear previously in the literature.