Bisections of Two Sets of Points in the Plane Lattice
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概要
- 論文の詳細を見る
Assume that 2m red points and 2n blue points are given on the lattice Z2 in the plane R2. We show that if they are in general position, that is, if at most one point lies on each vertical line and horizontal line, then there exists a rectangular cut that bisects both red points and blue points. Moreover, if they are not in general position, namely if some vertical and horizontal lines may contain more than one point, then there exists a semi-rectangular cut that bisects both red points and blue points. We also show that these results are best possible in some sense. Moreover, our proof gives O(N log N), N = 2m + 2n, time algorithm for finding the desired cut.
- (社)電子情報通信学会の論文
- 2009-02-01
著者
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Uno Miyuki
Department of Neurology, School of Medicine, Sao Paulo University
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Uno Miyuki
Department Of Computer And Information Sciences Ibaraki University
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KAWANO Tomoharu
Department of Computer and Information Sciences, Ibaraki University
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KANO Mikio
Department of Computer and Information Sciences, Ibaraki University
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Kano Mikio
Department Of Computer And Information Sciences Ibaraki University
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Kawano Tomoharu
Department Of Computer And Information Sciences Ibaraki University
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- Bisections of Two Sets of Points in the Plane Lattice