Flip Distance to some Plane Configurations

Scandinavian Workshop on Algorithm Theory Pub Date : 2019-05-02 DOI:10.4230/LIPIcs.SWAT.2018.11

Ahmad Biniaz, A. Maheshwari, M. Smid

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引用次数: 7

Abstract

We study an old geometric optimization problem in the plane. Given a perfect matching M on a set of n points in the plane, we can transform it to a non-crossing perfect matching by a finite sequence of flip operations. The flip operation removes two crossing edges from M and adds two non-crossing edges. Let f(M) and F(M) denote the minimum and maximum lengths of a flip sequence on M, respectively. It has been proved by Bonnet and Miltzow (2016) that f(M)=O(n^2) and by van Leeuwen and Schoone (1980) that F(M)=O(n^3). We prove that f(M)=O(n Delta) where Delta is the spread of the point set, which is defined as the ratio between the longest and the shortest pairwise distances. This improves the previous bound for point sets with sublinear spread. For a matching M on n points in convex position we prove that f(M)=n/2-1 and F(M)={{n/2} choose 2}; these bounds are tight. Any bound on F(*) carries over to the bichromatic setting, while this is not necessarily true for f(*). Let M' be a bichromatic matching. The best known upper bound for f(M') is the same as for F(M'), which is essentially O(n^3). We prove that f(M')<=slant n-2 for points in convex position, and f(M')= O(n^2) for semi-collinear points. The flip operation can also be defined on spanning trees. For a spanning tree T on a convex point set we show that f(T)=O(n log n).

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翻转距离到一些平面配置

研究了平面上一个古老的几何优化问题。给定平面上n个点的集合上的完美匹配M，我们可以通过有限的翻转操作序列将其转化为非交叉的完美匹配。翻转操作从M中移除两条交叉边，并添加两条非交叉边。设f(M)和f(M)分别表示M上一个翻转序列的最小和最大长度。Bonnet和Miltzow(2016)证明了f(M)=O(n^2)， van Leeuwen和Schoone(1980)证明了f(M)=O(n^ 3)。我们证明了f(M)=O(n)，其中Delta是点集的扩展，它被定义为最长和最短的对向距离之比。这改进了先前的具有亚线性扩展的点集的边界。对于凸位置n个点上的匹配M，证明了f(M)=n/2-1, f(M)= {{n/2}选择2};这些界限很紧。F(*)上的任何边界都会延续到双色设置，而F(*)不一定是这样。设M是一个双色匹配。f(M')的上界和f(M')的上界是一样的，本质上是O(n^3)证明了对于凸点f(M′)<=斜n-2，对于半共线点f(M′)= O(n^2)。翻转操作也可以在生成树上定义。对于凸点集上的生成树T，我们证明了f(T)=O(n log n)。

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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Scandinavian Workshop on Algorithm Theory

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