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Area Problems Involving Kasner Polygons

Metric Geometry 2009-10-05 v1 Combinatorics

Abstract

Sequences of polygons generated by performing iterative processes on an initial polygon have been studied extensively. One of the most popular sequences is the one sometimes referred to as {\it Kasner polygons}. Given a polygon KK, the first Kasner descendant KK' of KK is obtained by placing the vertices of KK' at the midpoints of the edges of KK. More generally, for any fixed mm in (0,1)(0,1) one may define a sequence of polygons {Kt}t0\{K^{t}\}_{t\ge 0} where each polygon KtK^{t} is obtained by dividing every edge of Kt1K^{t-1} into the ratio m:(1m)m:(1-m) in the counterclockwise (or clockwise) direction and taking these division points to be the vertices of KtK^{t}. We are interested in the following problem {\it Let mm be a fixed number in (0,1)(0,1) and let n3n\ge 3 be a fixed integer. Further, let KK be a convex nn-gon and denote by KK', the first mm-Kasner descendant of KK, that is, the vertices of KK' divide the edges of KK into the ratio m:(1m)m:(1-m). What can be said about the ratio between the area of KK' and the area of KK, when KK varies in the class of convex nn-gons?} We provide a complete answer to this question.

Cite

@article{arxiv.0910.0452,
  title  = {Area Problems Involving Kasner Polygons},
  author = {Dan Ismailescu and Minsuk Kim and Kyung Jae Lee and Seong Hoon Lee and Taehyeun Park},
  journal= {arXiv preprint arXiv:0910.0452},
  year   = {2009}
}

Comments

20 pages, 10 figures

R2 v1 2026-06-21T13:53:33.041Z