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On the Existence of $U$-Polygons of Class $c\geq 4$ in Planar Point Sets

arXiv:0811.3546 · doi:10.1016/j.disc.2009.02.035

Abstract

For a finite set $U$ of directions in the Euclidean plane, a convex non-degenerate polygon $P$ is called a $U$-polygon if every line parallel to a direction of $U$ that meets a vertex of $P$ also meets another vertex of $P$. We characterize the numbers of edges of $U$-polygons of class $c\geq4$ with all their vertices in certain subsets of the plane and derive explicit results in the case of cyclotomic model sets.

8 pages, 1 figure