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On the chromatic number of binary matroids

Published online by Cambridge University Press:  26 February 2010

P. N. Walton
Affiliation:
Merton College Oxford.
D. J. A. Welsh
Affiliation:
Merton College Oxford.
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Extract

In this paper we obtain matroid extensions of two important results in graph theory, namely the 4-colour theorem of Appel and Haken [1] and the 8-flow theorem of Jaeger [4]. As a corollary we prove that any bridgeless graph with no subgraph contractible to K3,3 has a nowhere zero 4-flow. These results depend heavily on a remarkable theory of splitters developed recently by Seymour [8], [9].

MSC classification

Type
Research Article
Copyright
Copyright © University College London 1980

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References

1.Appel, K. and Haken, W.. “Every planar map is four-colourable”, Bull. Amer. Math. Soc., 82 (1976), 711712.CrossRefGoogle Scholar
2.Bondy, J. A. and Murty, U. S. R.. Graph Theory with Applications (Macmillan, 1976).CrossRefGoogle Scholar
3.Brylawski, T. H.. “Modular constructions for combinatorial geometries”, Trans. Amer. Math. Soc., 203 (1975), 144.CrossRefGoogle Scholar
4.Jaeger, F.. “On nowhere zero flows in multigraphs”, Proc. Fifth British Comb. Conf. ed. Nash-Williams, C. St. J. A. and Sheehan, J. (Utilitas, 1976), 373379.Google Scholar
5.Jaeger, F.. “Flows and generalised colouring theorems in graphs”, J. Comb. Theory B, (to appear).Google Scholar
6.Lindström, B.. “On the chromatic number of regular matroids”, J. Comb. Theory B, 24 (1978), 367369.CrossRefGoogle Scholar
7.Oxley, J. G.. “Colouring, packing and the critical problem”, Quart. J. Math. Oxford, (2), 29 (1978), 1122.CrossRefGoogle Scholar
8.Seymour, P. D.. “On Tutte's extension of the four colour problem” (preprint, 1979).Google Scholar
9.Seymour, P. D.. “Decomposition of regular matroids”, J. Comb. Theory (1979) (to appear).Google Scholar
10.Tutte, W. T.. “A contribution to the theory of chromatic polynomials”, Canad. J. Math., 6 (1954), 8091.CrossRefGoogle Scholar
11.Tutte, W. T.. “Lectures on matroids”, J. Res. Nat. Bur. Stand., 69B (1965), 118.Google Scholar
12.Wagner, K.. “Beweis einer Abschwàchung der Hadwiger-Vermutung”, Math. Ann., 153 (1964), 139141.CrossRefGoogle Scholar
13.Welsh, D. J. A.. Matroid Theory, London Math. Soc. Monograph No. 8 (Academic Press, 1976).Google Scholar
14.Welsh, D. J. A.. “Colouring problems and matroids”, Proceedings of Seventh British Combinatorial Conference (Cambridge University Press, 1979), 229257.Google Scholar