System of unbiased representatives for a collection of bicolorings

Abstract

Let B denote a set of bicolorings of [n], where each bicoloring is a mapping of the points in [n] to \-1,+1\. For each B ∈ B, let YB=(B(1),…,B(n)). For each A ⊂eq [n], let XA ∈ \0,1\n denote the incidence vector of A. A non-empty set A is said to be an `unbiased representative' for a bicoloring B ∈ B if XA,YB =0. Given a set B of bicolorings, we study the minimum cardinality of a family A consisting of subsets of [n] such that every bicoloring in B has an unbiased representative in A.