平面上的欧氏最大匹配--局部到全局

Ahmad Biniaz, Anil Maheshwari, Michiel Smid
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引用次数: 0

摘要

让 $M$ 是平面上一组点的完美匹配,其中每个边都是两点之间的线段。如果 $M$ 在所有点上都是长度最大的匹配,我们就说 $M$ 是全局最大匹配。如果对于 $M$ 的 $k$ 边的任何子集 $M'=\{a_1b_1,\dots,a_kb_k\}$ 认为 $M'$ 在点 $\{a_1,b_1,\dots,a_k,b_k\}$ 上是最大长度匹配,我们就说 $M$ 是 $k$ 局部最大匹配。我们证明局部最大匹配是全局最大匹配的良好近似。让 $\mu_k$ 成为欧几里得平面上所有有限点集的任意 $k$ 局部最大匹配长度与任意全局最大匹配长度的最小比值。已知对于任意 $k\geqslant 2$,$\mu_k\geqslant \frac{k-1}{k}$。我们为$k\in\{2,3\}$展示了以下改进的边界:$\sqrt{3/7}\leqslant\mu_2< 0.93$和$\sqrt{3}/2\leqslant\mu_3<0.98$。我们还证明了每一对交叉匹配都是唯一的,并且是全局最大的。为了证明 $\mu_2$ 的下界,我们展示了以下结果,这也是我们感兴趣的地方:如果我们用系数 $2/ (sqrt{3}$ 来增加成对相交磁盘的半径,那么得到的磁盘就有共同的交点。
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Euclidean Maximum Matchings in the Plane---Local to Global
Let $M$ be a perfect matching on a set of points in the plane where every edge is a line segment between two points. We say that $M$ is globally maximum if it is a maximum-length matching on all points. We say that $M$ is $k$-local maximum if for any subset $M'=\{a_1b_1,\dots,a_kb_k\}$ of $k$ edges of $M$ it holds that $M'$ is a maximum-length matching on points $\{a_1,b_1,\dots,a_k,b_k\}$. We show that local maximum matchings are good approximations of global ones. Let $\mu_k$ be the infimum ratio of the length of any $k$-local maximum matching to the length of any global maximum matching, over all finite point sets in the Euclidean plane. It is known that $\mu_k\geqslant \frac{k-1}{k}$ for any $k\geqslant 2$. We show the following improved bounds for $k\in\{2,3\}$: $\sqrt{3/7}\leqslant\mu_2< 0.93 $ and $\sqrt{3}/2\leqslant\mu_3< 0.98$. We also show that every pairwise crossing matching is unique and it is globally maximum. Towards our proof of the lower bound for $\mu_2$ we show the following result which is of independent interest: If we increase the radii of pairwise intersecting disks by factor $2/\sqrt{3}$, then the resulting disks have a common intersection.
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