论文信息 - On nonbinary 3-connected matroids

On nonbinary 3-connected matroids

It is well known that a matroid is binary if and only if it has no minor isomorphic to U2,4, the 4-point line. Extending this result, Bixby proved that every element in a nonbinary connected matroid is in a U2,4minor. The result was further extended by Seymour who showed that every pair of elements in a nonbinary 3-connected matroid is in a U2,4-minor. This paper extends Seymour's theorem by proving that if {x, y, z} is contained in a nonbinary 3-connected matroid M, then either M has a U2,4-minor using {x, y, z}, or M has a minor isomorphic to the rank-3 whirl that uses {x, y, z} as its rim or its spokes.

J. Oxley

[1] W. T. Tutte. Connectivity in Matroids , 1966, Canadian Journal of Mathematics.

[2] Tom Brylawski,et al. A combinatorial model for series-parallel networks , 1971 .

[3] Robert E. Bixby,et al. ℓ-matrices and a Characterization of Binary Matroids , 1974, Discret. Math..

[4] Paul D. Seymour,et al. Decomposition of regular matroids , 1980, J. Comb. Theory, Ser. B.

[5] Paul D. Seymour,et al. On minors of non-binary matroids , 1981, Comb..

[6] William H. Cunningham. On matroid connectivity , 1981, J. Comb. Theory, Ser. B.

[7] R. Bixby. A simple theorem on 3-connectivity , 1982 .

[8] James G. Oxley,et al. On the intersections of circuits and cocircuits in matroids , 1984, Comb..

[9] Jeff Kahn,et al. A problem of P. Seymour on nonbinary matroids , 1985, Comb..

[10] Paul Seymour,et al. Triples in Matroid Circuits , 1986, Eur. J. Comb..