English

Collinearities in Kinetic Point Sets

Computational Geometry 2011-05-17 v1 Combinatorics

Abstract

Let PP be a set of nn points in the plane, each point moving along a given trajectory. A {\em kk-collinearity} is a pair (L,t)(L,t) of a line LL and a time tt such that LL contains at least kk points at time tt, the points along LL do not all coincide, and not all of them are collinear at all times. We show that, if the points move with constant velocity, then the number of 3-collinearities is at most 2(n3)2\binom{n}{3}, and this bound is tight. There are nn points having Ω(n3/k4+n2/k2)\Omega(n^3/k^4 + n^2/k^2) distinct kk-collinearities. Thus, the number of kk-collinearities among nn points, for constant kk, is O(n3)O(n^3), and this bound is asymptotically tight. In addition, there are nn points, moving in pairwise distinct directions with different speeds, such that no three points are ever collinear.

Cite

@article{arxiv.1105.3078,
  title  = {Collinearities in Kinetic Point Sets},
  author = {Ben D. Lund and George B. Purdy and Justin W. Smith and Csaba D. Tóth},
  journal= {arXiv preprint arXiv:1105.3078},
  year   = {2011}
}

Comments

Submitted to CCCG11

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