Fair representation in the intersection of two matroids

Abstract

For a simplicial complex C denote by β( C) the minimal number of edges from C needed to cover the ground set. If C is a matroid then for every partition A1, …, Am of the ground set there exists a set S ∈ C meeting each Ai in at least |Ai|β( C) elements. We conjecture that a slightly weaker result is true for the intersections of two matroids: if D= P Q, where P, Q are matroids on the same ground set V and β( P), β( P) k, then for every partition A1, …, Am of the ground set there exists a set S ∈ D meeting each Ai in at least (1k-1|V|)|Ai|-1 elements. We prove this for a partition into two sets.