Coloring the intersection of two matroids

Abstract

A result [The intersection of a matroid and a simplicial complex, Trans. Amer. Math. Soc. 358] from 2006 of Aharoni and the first author of this paper states that for any two positive integers p,q, where p divides q, if a matroid M is p-colorable and a matroid N is q-colorable then M N is (p+q)-colorable. In this paper we show that the assumption that p divides q is in fact redundant, and we also prove that M N is even p+q list-colorable. The result uses topology and relies on a new parameter yielding a lower bound for the topological connectivity of the intersection of two matroids.

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