On products of matroids

The "sticky conjecture" states that a geometric lattice is modular if and only if .azy two of its extensions can be "glued together". It is known to be true as far as rank 3 geometries are corrcerned. In this paper we show that it is sufficient to consider a very restricted class of rank 4 geometrie

The concept of valuated matroids was introduced by Dress and Wenzel as a quantitative extension of the base exchange axiom for matroids. This paper gives several sets of cryptomorphically equivalent axioms of valuated matroids in terms of R ∪ -∞ -valued vectors defined on the circuits of the underly

Robertson and Seymour have shown that there is no infinite set of graphs in which no member is a minor of another. By contrast, it is well known that the class of all matroids does contains such infinite antichains. However, for many classes of matroids, even the class of binary matroids, it is not