We establish the following two main results on order types of points in general position in the plane (realizable simple planar order types, realizable uniform acyclic oriented matroids of rank $3$): (a) The number of extreme points in an $n$-point order type, chosen uniformly at random from all such order types, is on average $4+o(1)$. For labeled order types, this number has average $4- \frac{8}{n^2 - n +2}$ and variance at most $3$. (b) The (labeled) order types read off a set of $n$ points sampled independently from the uniform measure on a convex planar domain, smooth or polygonal, or from a Gaussian distribution are concentrated, i.e. such sampling typically encounters only a vanishingly small fraction of all order types of the given size. Result (a) generalizes to arbitrary dimension $d$ for labeled order types with the average number of extreme points $2d+o(1)$ and constant variance. We also discuss to what extent our methods generalize to the abstract setting of uniform acyclic oriented matroids. Moreover, our methods allow to show the following relative of the Erd\H{o}s-Szekeres theorem: for any fixed $k$, as $n \to \infty$, a proportion $1 - O(1/n)$ of the $n$-point simple order types contain a triangle enclosing a convex $k$-chain over an edge. For the unlabeled case in (a), we prove that for any antipodal, finite subset of the $2$-dimensional sphere, the group of orientation preserving bijections is cyclic, dihedral or one of $A_4$, $S_4$ or $A_5$ (and each case is possible). These are the finite subgroups of $SO(3)$ and our proof follows the lines of their characterization by Felix Klein.
翻译:我们为平面一般位置的定点类型(可实现简单的平面顺序类型,可实现统一的单向环向型机器人,价值为3美元): (a) 美元定点类型中的极端点数,均按所有此类定点类型随机选择,平均为4+o(1)美元。对于标签定点类型,这个数字平均为 4 -\ frac{8\\\ n2+2}美元,差额最多为 3美元。 (b) (标签) 定点) 排序类型从一组美元点(美元)中读取了一个美元点数(美元),从一个平面平面平面或多边线,或从一个高面排列的极端点类型(美元)中读取一个美元点数,也就是说,这种取样通常只遇到所有定点类型中稀释的小部分。 结果(a) 将标签定点类型中的美元一般为任意的维度值值值值值值值(美元),其中的极端点数为2d+o(美元)和不断的变数。 (我们还讨论我们遵循统一平面平面域域域域域的直观方法的范围(美元) 多少是2美元。