On the Erdos-Szekeres n-interior-point problem
Data(s) |
2014
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Resumo |
The n-interior-point variant of the Erdos Szekeres problem is the following: for every n, n >= 1, does there exist a g(n) such that every point set in the plane with at least g(n) interior points has a convex polygon containing exactly n interior points. The existence of g(n) has been proved only for n <= 3. In this paper, we show that for any fixed r >= 2, and for every n >= 5, every point set having sufficiently large number of interior points and at most r convex layers contains a subset with exactly n interior points. We also consider a relaxation of the notion of convex polygons and show that for every n, n >= 1, any point set with at least n interior points has an almost convex polygon (a simple polygon with at most one concave vertex) that contains exactly n interior points. (C) 2013 Elsevier Ltd. All rights reserved. |
Formato |
application/pdf |
Identificador |
http://eprints.iisc.ernet.in/47605/1/eur_jou_com-35_86-94_2014.pdf Bharadwaj, Subramanya BV and Govindarajan, Sathish and Sharma, Karmveer (2014) On the Erdos-Szekeres n-interior-point problem. In: EUROPEAN JOURNAL OF COMBINATORICS, 35 (SI). pp. 86-94. |
Publicador |
ACADEMIC PRESS LTD- ELSEVIER SCIENCE LTD |
Relação |
http://dx.doi.org/10.1016/j.ejc.2013.06.028 http://eprints.iisc.ernet.in/47605/ |
Palavras-Chave | #Computer Science & Automation (Formerly, School of Automation) |
Tipo |
Journal Article PeerReviewed |