Hardness and Approximation Schemes for Discrete Packing and Domination
Abstract
We present polynomial-time approximation schemes based on local search technique for both geometric (discrete) independent set () and geometric (discrete) dominating set () problems, where the objects are arbitrary radii disks and arbitrary side length axis-parallel squares. Further, we show that the ~problem is -hard for various shapes in the plane. Finally, we prove that both ~and ~problems are -hard for unit disks intersecting a horizontal line and axis-parallel unit squares intersecting a straight line with slope -1.
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