Extensions and Deletions of matroid classes closed under flats

Abstract

We call a class of matroids hereditary if it is closed under restriction to flats. For a hereditary class M, its extension class consists of all matroids in M together with their single-element extensions. The deletion class consists of all matroids in M along with their single-element deletions. We prove that if M has finitely many forbidden flats, then the forbidden flats for its extension class have bounded rank. For GF(q)-representable matroids where q is in \2,3\, we exploit correspondence with 2-colorings of projective geometries to establish the analogous result for the deletion class. We also note the consequences for hereditary classes of graphs, discussing the interplay of graphs and matroids.