Sciweavers

APPROX
2006
Springer

Constant-Factor Approximation for Minimum-Weight (Connected) Dominating Sets in Unit Disk Graphs

14 years 3 months ago
Constant-Factor Approximation for Minimum-Weight (Connected) Dominating Sets in Unit Disk Graphs
For a given graph with weighted vertices, the goal of the minimum-weight dominating set problem is to compute a vertex subset of smallest weight such that each vertex of the graph is contained in the subset or has a neighbor in the subset. A unit disk graph is a graph in which each vertex corresponds to a unit disk in the plane and two vertices are adjacent if and only if their disks have a non-empty intersection. We present the first constant-factor approximation algorithm for the minimum-weight dominating set problem in unit disk graphs, a problem motivated by applications in wireless ad-hoc networks. The algorithm is obtained in two steps: First, the problem is reduced to the problem of covering a set of points located in a small square using a minimumweight set of unit disks. Then, a constant-factor approximation algorithm for the latter problem is obtained using enumeration and dynamic programming techniques exploiting the geometry of unit disks. Furthermore, we show how to obtai...
Christoph Ambühl, Thomas Erlebach, Matú
Added 20 Aug 2010
Updated 20 Aug 2010
Type Conference
Year 2006
Where APPROX
Authors Christoph Ambühl, Thomas Erlebach, Matús Mihalák, Marc Nunkesser
Comments (0)