A Removal Lemma for Systems of Linear Equations over Finite Fields

Abstract

We prove a removal lemma for systems of linear equations over finite fields: let X1,...,Xm be subsets of the finite field q and let A be a (k× m) matrix with coefficients in q and rank k; if the linear system Ax=b has o(qm-k) solutions with xi∈ Xi, then we can destroy all these solutions by deleting o(q) elements from each Xi. This extends a result of Green [Geometric and Functional Analysis 15(2) (2005), 340--376] for a single linear equation in abelian groups to systems of linear equations. In particular, we also obtain an analogous result for systems of equations over integers, a result conjectured by Green. Our proof uses the colored version of the hypergraph Removal Lemma.