On a Problem of Danzer

Nabil H. Mustafa, Saurabh Ray
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引用次数: 3

Abstract

Let C be a bounded convex object in ℝd, and let P be a set of n points lying outside C. Further, let cp, cq be two integers with 1 ⩽ cq ⩽ cp ⩽ n - ⌊d/2⌋, such that every cp + ⌊d/2⌋ points of P contain a subset of size cq + ⌊d/2⌋ whose convex hull is disjoint from C. Then our main theorem states the existence of a partition of P into a small number of subsets, each of whose convex hulls are disjoint from C. Our proof is constructive and implies that such a partition can be computed in polynomial time. In particular, our general theorem implies polynomial bounds for Hadwiger--Debrunner (p, q) numbers for balls in ℝd. For example, it follows from our theorem that when p > q = (1+β)⋅d/2 for β > 0, then any set of balls satisfying the (p, q)-property can be hit by O((1+β)2d2p1+1/β logp) points. This is the first improvement over a nearly 60 year-old exponential bound of roughly O(2d). Our results also complement the results obtained in a recent work of Keller, Smorodinsky and Tardos where, apart from improvements to the bound on HD(p, q) for convex sets in ℝd for various ranges of p and q, a polynomial bound is obtained for regions with low union complexity in the plane.
论丹泽的一个问题
设C是一个有界的凸对象,P是一个位于C外的n个点的集合,进一步设cp, cq为两个1≤cq≤cp≤n -⌊d/2⌋的整数,使得P的每一个cp +⌊d/2⌋点都包含一个大小为cq +⌊d/2⌋的子集,其凸包与C不相交。我们的证明是建设性的,并表明这样的划分可以在多项式时间内计算出来。特别地,我们的一般定理暗示了多项式的界为hawiger -Debrunner (p, q)数的球在∈d中。例如,由我们的定理可知,当p > q = (1+β)·d/2时,当β > 0时,满足(p, q)-性质的任何一组球都可以被O((1+β)2d2p1+1/β logp)点击中。这是对近60年来大约为0 (2d)的指数界的第一次改进。我们的结果也补充了Keller, Smorodinsky和Tardos在最近的工作中得到的结果,其中除了改进了在p和q的不同范围内的凸集HD(p, q)上的界外,还得到了平面上具有低并集复杂度的区域的多项式界。
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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