Random Polygon to Ellipse: A Generalization
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 of the segments of a polygon with 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, , which has oscillating semi-axes. Along the way we find that the case for enjoys some special optimality conditions, and periodicity of the ellipse 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 .
Cite
@article{arxiv.1606.08888,
title = {Random Polygon to Ellipse: A Generalization},
author = {Keller VandeBogert},
journal= {arXiv preprint arXiv:1606.08888},
year = {2016}
}