Fair representation by independent sets

Abstract

For a hypergraph H let β(H) denote the minimal number of edges from H covering V(H). An edge S of H is said to represent fairly (resp. almost fairly) a partition (V1,V2, …, Vm) of V(H) if |S Vi| |Vi|β(H) (resp. |S Vi| |Vi|β(H)-1) for all i m. In matroids any partition of V(H) can be represented fairly by some independent set. We look for classes of hypergraphs H in which any partition of V(H) can be represented almost fairly by some edge. We show that this is true when H is the set of independent sets in a path, and conjecture that it is true when H is the set of matchings in Kn,n. We prove that partitions of E(Kn,n) into three sets can be represented almost fairly. The methods of proofs are topological.