d-Galvin families

Abstract

The Galvin problem asks for the minimum size of a family F ⊂eq [n]n/2 with the property that, for any set A of size n 2, there is a set S ∈ F which is balanced on A, meaning that |S A| = |S A|. We consider a generalization of this question that comes from a possible approach in complexity theory. In the generalization the required property is, for any A, to be able to find d sets from a family F ⊂eq [n]n/d that form a partition of [n] and such that each part is balanced on A. We construct such families of size polynomial in the parameters n and d.