The excluded minors for three classes of 2-polymatroids having special types of natural matroids

Abstract

If C is a minor-closed class of matroids, the class C' of integer polymatroids whose natural matroids are in C is also minor closed, as is the class C'k of k-polymatroids in C'. We find the excluded minors for C'2 when C is (i) the class of binary matroids, (ii) the class of matroids with no M(K4)-minor, and, combining those, (iii) the class of matroids whose connected components are cycle matroids of series-parallel networks. In each case the class C has finitely many excluded minors, but that is true of C'2 only in case (ii). We also introduce the k-natural matroid, a variant of the natural matroid for a k-polymatroid, and use it to prove that these classes of 2-polymatroids are closed under 2-duality.