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oaidoi:10.1006/jctb.1993.1057

Five-Coloring Maps on Surfaces

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Publication date
30 September 1993
Publisher
Academic Press.
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    Abstract

    AbstractFor every surface S there exists a natural number n(S) such that every map drawn on S can be colored using live colors only provided every simple noncontractible closed curve on the surface contains at least n(S) border points of the map. This proves a conjecture of M. O. Albertson and W. R. Stromquist. There is no four-color theorem of this type

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