A solution to a strengthened conjecture of Bukh, van Hintum and Keevash on additive bases

Abstract

Motivated by the change-of-domain problem for additive bases, Bukh, van Hintum and Keevash conjectured that if \(A,B⊂eq Qn\) and \(\ei+ej:1 i j n\⊂eq A+B,\) then \(|A|+|B| 2n\). They further proposed the strengthened conjecture: if \(|A|=n-t\), then \(|B| n+t+12.\) Bukh also explicitly asked whether the same bounds hold for \(A,B⊂eq Rn\) and an arbitrary basis \(S\) of \(Rn\), under the assumption \(S+S⊂eq A+B\). We prove the full strengthened statement over \(Rn\): if \(S+S⊂eq A+B\) and \(|A| n-t\) with \(0 t n-1\), then \(|B| n+t+12,\) which is sharp for every basis \(S\) and every \(0 t n-1.\) The proof is short, using edge contractions in a graph-theoretical framework and a new coloring lemma over \( F2n\).