An upper bound on tricolored ordered sum-free sets

Abstract

We present a strengthening of the lemma on the lower bound of the slice rank by Tao (2016) motivated by the Croot-Lev-Pach-Ellenberg-Gijswijt bound on cap sets (2017, 2017). The Croot-Lev-Pach-Ellenberg-Gijswijt method and the lemma of Tao are based on the fact that the rank of a diagonal matrix is equal to the number of non-zero diagonal entries. Our lemma is based on the rank of upper-triangular matrices. This stronger lemma allows us to prove the following extension of the Ellenberg-Gijswijt result (2017). A tricolored ordered sum-free set in Fpn is a collection \(ai,bi,ci):i=1,2,…,m\ of ordered triples in ( Fpn )3 such that ai+bi+ci=0 and if ai+bj+ck=0, then i j k. By using the new lemma, we present an upper bound on the size of a tricolored ordered sum-free set in Fpn.