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On Order Types of Systems of Segments in the Plane

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Abstract

Let r(n) denote the largest integer such that every family \(\mathcal{C}\) of n pairwise disjoint segments in the plane in general position has r(n) members whose order type can be represented by points. Pach and Tóth gave a construction that shows r(n) < n log8/log9 (Pach and Tóth 2009). They also stated that one can apply the Erdős–Szekeres theorem for convex sets in Pach and Tóth (Discrete Comput Geom 19:437–445, 1998) to obtain r(n) > log16 n. In this note, we will show that r(n) > cn 1/4 for some absolute constant c.

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  1. Courant Institute, New York, NY, USA

    Andrew Suk

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  1. Andrew Suk
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Suk, A. On Order Types of Systems of Segments in the Plane. Order 27, 63–68 (2010). https://doi.org/10.1007/s11083-010-9138-4

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