Geometric red-blue set cover for unit squares and related problems.

We study a geometric version of the Red-Blue Set Cover problem originally proposed by Carr et al. (2000) [1]: given a red point set, a blue point set, and a set of objects, we want to choose a subset of objects to cover all the blue points, while minimizing the number of red points covered. We prove that the problem is NP-hard even when the objects are unit squares in 2D, and we give the first polynomial-time approximation scheme (PTAS) for this case. The technique we use simplifies and unifies previous PTASs for the weighted geometric set cover problem and the unique maximum coverage problem for 2D unit squares. [ABSTRACT FROM AUTHOR]