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Long alternating paths in bicolored point sets

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Publication date
14 November 2008
Publisher
'Elsevier BV'
Doi

    Abstract

    AbstractGiven n red and n blue points in convex position in the plane, we show that there exists a noncrossing alternating path of length n+cn/logn. We disprove a conjecture of Erdős by constructing an example without any such path of length greater than 4/3n+c′n

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