Code-based [3,1]-avoiders in finite affine spaces AG(n,2)

Abstract

The author, together with Nagy, studied the following problem on unavoidable intersections of given size in binary affine spaces. Given an m-element set S⊂eq F2n, is there guaranteed to be a [k,t]-flat, that is, a k-dimensional affine subspace of F2n containing exactly t points of S? Such problems can be viewed as generalizations of the cap set problem over the binary field. They conjectured that for every fixed pair (k,t) with k 1 and 0 t 2k, the density of values m∈ \0,...,2n\ for which a [k,t]-flat is guaranteed tends to 1. In this paper, motivated by the study of the smallest open case (k,t)=(3,1), we present explicit constructions of sets in F2n avoiding [k,1]-flats for exponentially many sizes. These sets rely on carefully constructed binary linear codes, whose weight enumerators determine the size of the construction.