Geometric set cover problem

The geometric set cover problem is the special case of the set cover problem in geometric settings. The input is a range space \Sigma = (X, \mathcal{R}) where X is a universe of points in \mathbb{R}^d and \mathcal{R} is a family of subsets of X called ranges, defined by the intersection of X and geometric shapes such as disks and axis-parallel rectangles. The goal is to select a minimum-size subset \mathcal{C} \subseteq \mathcal{R} of ranges such that every point in the universe X is covered by some range in \mathcal{C}.

Given the same range space \Sigma, a closely related problem is the geometric hitting set problem, where the goal is to select a minimum-size subset H \subseteq X of points such that every range of \mathcal{R} has nonempty intersection with H, i.e., is hit by H.

In the one-dimensional case, where X contains points on the real line and \mathcal{R} is defined by intervals, both the geometric set cover and hitting set problems can be solved in polynomial time using a simple greedy algorithm. However, in higher dimensions, they are known to be NP-complete even for simple shapes, i.e., when \mathcal{R} is induced by unit disks or unit squares.[1]The discrete unit disc cover problem is a geometric version of the general set cover problem which is NP-hard.[2]

Many approximation algorithms have been devised for these problems. Due to the geometric nature, the approximation ratios for these problems can be much better than the general set cover/hitting set problems. Moreover, these approximate solutions can even be computed in near-linear time.[3]

Approximation algorithms

The greedy algorithm for the general set cover problem gives O(\log n) approximation, where n = \max\{|X|, |\mathcal{R}|\}. This approximation is known to be tight up to constant factor.[4] However, in geometric settings, better approximations can be obtained. Using a multiplicative weight algorithm,[5] Brönnimann and Goodrich[6] showed that an O(\log \mathsf{OPT})-approximate set cover/hitting set for a range space \Sigma with constant VC-dimension can be computed in polynomial time, where \mathsf{OPT} \le n denotes the size of the optimal solution. The approximation ratio can be further improved to O(\log \log \mathsf{OPT}) or O(1) when \mathcal{R} is induced by axis-parallel rectangles or disks in \mathbb{R}^2, respectively.

Near-linear-time algorithms

Based on the iterative-reweighting technique of Clarkson[7] and Brönnimann and Goodrich,[6] Agarwal and Pan[3] gave algorithms that computes an approximate set cover/hitting set of a geometric range space in O(n~\mathrm{polylog}(n)) time. For example, their algorithms computes an O(\log \log \mathsf{OPT})-approximate hitting set in O(n \log^3n\log\log\log \mathsf{OPT}) time for range spaces induced by 2D axis-parallel rectangles; and it computes an O(1)-approximate set cover in O(n \log^4n) time for range spaces induced by 2D disks.

See also

References

  1. Fowler, R.J.; Paterson, M.S.; Tanimoto, S.L. (1981), "Optimal packing and covering in the plane are NP-complete", Inf. Process. Lett.
  2. https://cs.uwaterloo.ca/~alopez-o/files/OtDUDCP_2011.pdf On the Discrete Unit Disk Cover Problem
  3. 1 2 Agarwal, Pankaj K.; Pan, Jiangwei (2014). "Near-Linear Algorithms for Geometric Hitting Sets and Set Covers". Proceedings of the thirtieth annual symposium on Computational Geometry.
  4. Feige, Uriel (1998), "A threshold of ln n for approximating set cover", Journal of the ACM
  5. Arora, S.; Hazan, E.; Kale, S. (2012), "The Multiplicative Weights Update Method: a Meta-Algorithm and Applications", Theory of Computing
  6. 1 2 Brönnimann, H.; Goodrich, M. (1995), "Almost optimal set covers in finite VC-dimension", Discrete & Computational Geometry
  7. Clarkson, Kenneth L. (1993-08-11). Dehne, Frank; Sack, Jörg-Rüdiger; Santoro, Nicola; et al., eds. Algorithms for polytope covering and approximation. Lecture Notes in Computer Science. Springer Berlin Heidelberg. pp. 246–252. doi:10.1007/3-540-57155-8_252. ISBN 978-3-540-57155-1.
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