Distinct Angles in General Position

Henry Fleischmann, S. Konyagin, Steven J. Miller, E. Palsson, Ethan Pesikoff, Charles Wolf
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引用次数: 4

Abstract

The Erd\H{o}s distinct distance problem is a ubiquitous problem in discrete geometry. Somewhat less well known is Erd\H{o}s' distinct angle problem, the problem of finding the minimum number of distinct angles between $n$ non-collinear points in the plane. Recent work has introduced bounds on a wide array of variants of this problem, inspired by similar variants in the distance setting. In this short note, we improve the best known upper bound for the minimum number of distinct angles formed by $n$ points in general position from $O(n^{\log_2(7)})$ to $O(n^2)$. Before this work, similar bounds relied on projections onto a generic plane from higher dimensional space. In this paper, we employ the geometric properties of a logarithmic spiral, sidestepping the need for a projection. We also apply this configuration to reduce the upper bound on the largest integer such that any set of $n$ points in general position has a subset of that size with all distinct angles. This bound is decreased from $O(n^{\log_2(7)/3})$ to $O(n^{1/2})$.
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一般位置上的不同角度
Erd\H{o}s明显距离问题是离散几何中普遍存在的问题。鲜为人知的是Erd\H{o}s的异角问题,求平面上n个非共线点之间的最小异角数的问题。最近的工作在这个问题的一系列变体上引入了边界,灵感来自于距离设置中的类似变体。在这篇简短的笔记中,我们将一般位置上由$n$点构成的不同角度的最小数目的已知上界从$O(n^{\log_2(7)})$改进为$O(n^2)$。在此之前,类似的边界依赖于高维空间在一般平面上的投影。在本文中,我们利用对数螺旋的几何性质,避免了对投影的需要。我们还应用这个构型来减小最大整数的上界,使得任意n个点的集合在一般位置上都有一个具有所有不同角度的相同大小的子集。这个约束是减少从O (n ^ {\ log_2(7) / 3}),美元O (n ^{5})美元。
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