Red Blue Set Cover Problem on Axis-Parallel Hyperplanes and Other Objects

Abstract

Given a universe U=R B of a finite set of red elements R, and a finite set of blue elements B and a family F of subsets of U, the problem is to find a subset F' of F that covers all blue elements of B and minimum number of red elements from R. We prove that the problem is NP-hard even when R and B respectively are sets of red and blue points in I\!R2 and the sets in F are defined by axis-parallel lines i.e, every set is a maximal set of points with the same x or y coordinate. We then study the parameterized complexity of a generalization of this problem, where U is a set of points in I\!Rd and F is a collection of set of axis-parallel hyperplanes in I\!Rd, under different parameterizations. For every parameter, we show that the problem is fixed-parameter tractable and also show the existence of a polynomial kernel. We further consider the problem for some special types of rectangles in I\!R2.