On connected domination in unit ball graphs

On connected domination in unit ball graphs

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Article ID: iaor20113741
Volume: 5
Issue: 2
Start Page Number: 195
End Page Number: 205
Publication Date: May 2011
Journal: Optimization Letters
Authors: , ,
Keywords: networks
Abstract:

Given a simple undirected graph, the minimum connected dominating set problem is to find a minimum cardinality subset of vertices D inducing a connected subgraph such that each vertex outside D has at least one neighbor in D. Approximations of minimum connected dominating sets are often used to represent a virtual routing backbone in wireless networks. This paper first proposes a constant‐ratio approximation algorithm for the minimum connected dominating set problem in unit ball graphs and then introduces and studies the edge‐weighted bottleneck connected dominating set problem, which seeks a minimum edge weight in the graph such that the corresponding bottleneck subgraph has a connected dominating set of size k. In wireless network applications this problem can be used to determine an optimal transmission range for a network with a predefined size of the virtual backbone. We show that the problem is hard to approximate within a factor better than 2 in graphs whose edge weights satisfy the triangle inequality and provide a 3‐approximation algorithm for such graphs. We also show that for fixed k the problem is polynomially solvable in unit disk and unit ball graphs.

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