English

Random Polygon to Ellipse: A Generalization

Metric Geometry 2016-06-30 v1 Dynamical Systems

Abstract

This paper generalizes the result of Elmachtoub et al to any weighted barycenter, where a transformation is considered which takes an arbitrary point of division ξ(0,1)\xi \in (0,1) of the segments of a polygon with nn vertices. We then consider connecting these new points to form another polygon, and iterate this process. After considering properties of our generalized transformation matrix, a surprisingly elegant interplay of elementary complex analysis and linear algebra is used to find a closed form for our iterative process. We then specify the new limiting ellipse, E\mathcal{E}, which has oscillating semi-axes. Along the way we find that the case for ξ=1/2\xi = 1/2 enjoys some special optimality conditions, and periodicity of the ellipse E\mathcal{E} is analyzed as well. To conclude, an even more generalized case is considered: taking a different point of division for every segment of our polygon P(x(0),y(0))\mathcal{P} (\vec{x}^{(0)}, \vec{y}^{(0)}).

Keywords

Cite

@article{arxiv.1606.08888,
  title  = {Random Polygon to Ellipse: A Generalization},
  author = {Keller VandeBogert},
  journal= {arXiv preprint arXiv:1606.08888},
  year   = {2016}
}
R2 v1 2026-06-22T14:37:34.623Z