Efficiently Coloring the Intersection of a General Matroid and Partition Matroids

Abstract

This paper shows a polynomial-time algorithm, that given a general matroid M1 = (X, I1) and k-1 partition matroids M2, …, Mk, produces a coloring of the intersection M = i=1k Mi using at most 1+Σi=1k ((Mi) -1) colors. This is the first polynomial-time O(1)-approximation algorithm for matroid intersection coloring where one of the matroids may be a general matroid. Leveraging the fact that all of the standard combinatorial matroids reduce to partition matroids at a loss of a factor of two in the chromatic number, this algorithm also yields a polynomial-time O(1)-approximation algorithm for matroid intersection coloring in the case where each of the matroids M2, …, Mk are one of the standard combinatorial types.