A Note on Visible Islands

Pub Date : 2021-08-31 DOI:10.1556/012.2022.01524
Sophie Leuchtner, Carlos M. Nicolás, Andrew Suk
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Abstract

Given a finite point set P in the plane, a subset S⊆P is called an island in P if conv(S) ⋂ P = S. We say that S ⊂ P is a visible island if the points in S are pairwise visible and S is an island in P. The famous Big-line Big-clique Conjecture states that for any k ≥ 3 and l ≥ 4, there is an integer n = n(k, l), such that every finite set of at least n points in the plane contains l collinear points or k pairwise visible points. In this paper, we show that this conjecture is false for visible islands, by replacing each point in a Horton set by a triple of collinear points. Hence, there are arbitrarily large finite point sets in the plane with no 4 collinear members and no visible island of size 13.
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关于可见岛屿的笔记
给定一个有限点集P在平面上,一个子集S⊆P P称为一个岛如果conv (S)⋂P = S我们说S⊂P是一个可见的岛屿如果点S是成对可见P和S是一个岛著名的粗绳Big-clique猜想指出,对于任何k l≥≥3和4,有一个整数n = n (k, l),这样每一个有限集至少n个点在平面上包含l或k成对可见点共线点。在本文中,我们通过用共线点的三组替换霍顿集合中的每个点,证明了这个猜想对于可见岛屿是假的。因此,平面上存在任意大的有限点集,没有4个共线成员,也没有大小为13的可见岛。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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