(6+ε)-Approximation for Minimum Weight Dominating Set in Unit Disk Graphs

机译：（6 +ε） - 在单位磁盘图中占据最小权重的千克

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It was a long-standing open problem whether the minimum weight dominating set in unit disk graphs has a polynomial-time constant-approximation. In 2006, Ambuhl et al solved this problem by presenting a 72-approximation for the minimum weight dominating set and also a 89-approximation for the minimum weight connected dominating set in unit disk graphs. In this paper, we improve their results by giving a (6+ε)-approximation for the minimum weight dominating set and a (10+ε)-approximation for the minimum weight connected dominating set in unit disk graphs where s is any small positive number.

机译：它是一个长期的开放问题，无论单位盘图中的最小权重定位是否具有多项式时间常数近似。 2006年，Ambuhl等通过呈现72°近似为最小权重设定的72近似而解决了该问题，并且对于在单元盘图中的最小重量连接的最小权重的89°近似。在本文中，我们通过给出（6±ε）的最小重量主导集合和（10 +ε）的批量估计来改善它们的结果，用于在单元盘图中设置的最小重量连接的最小重量，其中S是任何小阳性的数字。

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《International Conference on Computing and Combinatorics》|2008年||共7页
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Xiaofeng Gao; Yaochun Huang; Zhao Zhang; Weili Wu;
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中图分类 TP3-53;
关键词
Unit Disk Graph; Approximation algorithm; Dominating Set;

机译：单位盘图;近似算法;主导集合;

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专利

1. New approximations for minimum-weighted dominating sets and minimum-weighted connected dominating sets on unit disk graphs [J] . Feng Zou, Yuexuan Wang, Xiao-Hua Xu, Theoretical computer science . 2011,第3期

机译：单位磁盘图上最小加权支配集和最小加权连通支配集的新近似值
2. A 5 + ε-approximation algorithm for minimum weighted dominating set in unit disk graph [J] . Decheng Dai, Changyuan Yu Theoretical computer science . 2009,第8a10期

机译：单位圆图中最小加权控制集的5 +ε近似算法
3. Efficient sub-5 approximations for minimum dominating sets in unit disk graphs [J] . Guilherme D. da Fonseca, Celina M. H. de Figueiredo, Vinicius G. Pereira de Sa, Theoretical computer science . 2014,第Null期

机译：单位磁盘图中最小控制集的有效sub-5近似值
4. (6+∈)-Approximation for Minimum Weight Dominating Set in Unit Disk Graphs [C] . Xiaofeng Gao, Yaochun Huang, Zhao Zhang, COCOON 2008;Annual International Conference on Computing and Combinatorics . 2008

机译：（6 +ε）-单位圆图中最小重量支配集的逼近
5. Trees with unique minimum locating-dominating sets [D] . Lane, Stephen M. 2006

机译：具有唯一的最小定位控制集的树
6. Minimum Connected Dominating Set Algorithms for Ad Hoc Sensor Networks [O] . Xuemei Sun, Yongxin Yang, Maode Ma 2019

机译：Ad Hoc传感器网络的最小连通支配集算法
7. New approximations for minimum-weighted dominating sets and minimum-weighted connected dominating sets on unit disk graphs [O] . Zou Feng, Wang Yuexuan, Xu Xiao-Hua, 2011

机译：单位磁盘图上最小加权支配集和最小加权连通支配集的新近似值

(6+ε)-Approximation for Minimum Weight Dominating Set in Unit Disk Graphs

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