On the VC-dimension of half-spaces with respect to convex sets

Discret. Math. Theor. Comput. Sci. Pub Date : 2019-07-02 DOI:10.46298/dmtcs.6631

Nicolas Grelier, S. Ilchi, Tillmann Miltzow, Shakhar Smorodinsky

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引用次数: 2

Abstract

A family S of convex sets in the plane defines a hypergraph H = (S, E) as follows. Every subfamily S' of S defines a hyperedge of H if and only if there exists a halfspace h that fully contains S' , and no other set of S is fully contained in h. In this case, we say that h realizes S'. We say a set S is shattered, if all its subsets are realized. The VC-dimension of a hypergraph H is the size of the largest shattered set. We show that the VC-dimension for pairwise disjoint convex sets in the plane is bounded by 3, and this is tight. In contrast, we show the VC-dimension of convex sets in the plane (not necessarily disjoint) is unbounded. We provide a quadratic lower bound in the number of pairs of intersecting sets in a shattered family of convex sets in the plane. We also show that the VC-dimension is unbounded for pairwise disjoint convex sets in R^d , for d > 2. We focus on, possibly intersecting, segments in the plane and determine that the VC-dimension is always at most 5. And this is tight, as we construct a set of five segments that can be shattered. We give two exemplary applications. One for a geometric set cover problem and one for a range-query data structure problem, to motivate our findings.

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关于凸集的半空间的vc维

平面上的凸集S族定义超图H = (S, E)如下。S的每一个子族S'都定义了H的超边，当且仅当存在一个完全包含S'的半空间H，且H中没有其他S的集合是完全包含的，此时我们说H实现了S'。我们说集合S是破碎的，如果它的所有子集都实现了。超图的vc维是最大破碎集的大小。我们证明了平面上成对不相交凸集的vc维以3为界，这是紧的。相反，我们证明了平面(不一定不相交)上凸集的vc维是无界的。给出了平面上破碎凸集族中相交集对数目的二次下界。我们还证明了R^d中对不相交凸集的vc维是无界的，当d > 2时。我们关注平面上可能相交的线段，并确定vc维总是不超过5。这是紧密的，因为我们构建了一组可以粉碎的五个部分。我们给出两个示例应用。一个用于几何集覆盖问题，一个用于范围查询数据结构问题，以激励我们的发现。

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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Discret. Math. Theor. Comput. Sci.

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