On minimum m-connected k-dominating set problem in unit disc graphs |
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| Authors: | Weiping Shang Frances Yao Pengjun Wan Xiaodong Hu |
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| Affiliation: | (1) Institute of Applied Mathematics, Chinese Academy of Sciences, Beijing, China;(2) Department of Computer Science, City University of Hong Kong, Hong Kong, Hong Kong;(3) Department of Computer Science, Illinois Institute of Technology, Chicago, USA |
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| Abstract: | Minimum m-connected k-dominating set problem is as follows: Given a graph G=(V,E) and two natural numbers m and k, find a subset S⊆V of minimal size such that every vertex in V∖S is adjacent to at least k vertices in S and the induced graph of S is m-connected. In this paper we study this problem with unit disc graphs and small m, which is motivated by the design of fault-tolerant virtual backbone for wireless sensor networks. We propose two approximation algorithms with constant performance ratios for m≤2. We also discuss how to design approximation algorithms for the problem with arbitrarily large m. This work was supported in part by the Research Grants Council of Hong Kong under Grant No. CityU 1165/04E, the National Natural Science Foundation of China under Grant No. 70221001, 10531070 and 10771209. |
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| Keywords: | k-dominating set m-connectivity Unit disc graph Approximation algorithm Wireless sensor networks |
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