On Partitioning Colored Points

Published 15 Nov 2010 in math.CO | (1011.3451v1)

Abstract: P. Kirchberger proved that, for a finite subset $X$ of $\mathbb{R}^{d}$ such that each point in $X$ is painted with one of two colors, if every $d+2$ or fewer points in $X$ can be separated along the colors, then all the points in $X$ can be separated along the colors. In this paper, we show a more colorful theorem.

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Takahisa Toda

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