Approximating Dominating Set on Intersection Graphs of Rectangles and L-frames

We consider the Minimum Dominating Set (MDS) problem on the intersection graphs of geometric objects. Even for simple and widely-used geometric objects such as rectangles, no sub-logarithmic approximation is known for the problem and (perhaps surprisingly) the problem is NP-hard even when all the rectangles are "anchored" at a diagonal line with slope -1 (Pandit, CCCG 2017). In this paper, we first show that for any $\epsilon>0$, there exists a $(2+\epsilon)$-approximation algorithm for the MDS problem on "diagonal-anchored" rectangles, providing the first $O(1)$-approximation for the problem on a non-trivial subclass of rectangles. It is not hard to see that the MDS problem on "diagonal-anchored" rectangles is the same as the MDS problem on "diagonal-anchored" L-frames: the union of a vertical and a horizontal line segment that share an endpoint. As such, we also obtain a $(2+\epsilon)$-approximation for the problem with "diagonal-anchored" L-frames. On the other hand, we show that the problem is APX-hard in case the input L-frames intersect the diagonal, or the horizontal segments of the L-frames intersect a vertical line. However, as we show, the problem is linear-time solvable in case the L-frames intersect a vertical as well as a horizontal line. Finally, we consider the MDS problem in the so-called "edge intersection model" and obtain a number of results, answering two questions posed by Mehrabi (WAOA 2017).

[1]  Moshe Lewenstein,et al.  Optimization problems in multiple-interval graphs , 2007, SODA '07.

[2]  Martin Charles Golumbic,et al.  Edge intersection graphs of single bend paths on a grid , 2009 .

[3]  Rajiv Raman,et al.  Packing and Covering with Non-Piercing Regions , 2016, ESA.

[4]  Matt Gibson,et al.  Algorithms for Dominating Set in Disk Graphs: Breaking the logn Barrier - (Extended Abstract) , 2010, ESA.

[5]  Supantha Pandit,et al.  Dominating set of rectangles intersecting a straight line , 2021, Journal of Combinatorial Optimization.

[6]  Ravishankar Krishnaswamy,et al.  The Hardness of Approximation of Euclidean k-Means , 2015, SoCG.

[7]  Stefan Felsner,et al.  Approximating hitting sets of axis-parallel rectangles intersecting a monotone curve , 2013, Comput. Geom..

[8]  Kolja B. Knauer,et al.  Edge-intersection graphs of grid paths: The bend-number , 2010, Discret. Appl. Math..

[9]  Timothy M. Chan,et al.  Approximation Algorithms for Maximum Independent Set of Pseudo-Disks , 2009, Discrete & Computational Geometry.

[10]  Subhash Suri,et al.  Approximating Dominating Set on Intersection Graphs of L-frames , 2018, ArXiv.

[11]  Apurva Mudgal,et al.  Covering, Hitting, Piercing and Packing Rectangles Intersecting an Inclined Line , 2015, COCOA.

[12]  Mark de Berg,et al.  Optimal Binary Space Partitions for Segments in the Plane , 2012, Int. J. Comput. Geom. Appl..

[13]  S. Safra,et al.  On the hardness of approximating minimum vertex cover , 2005 .

[14]  José R. Correa,et al.  Independent and Hitting Sets of Rectangles Intersecting a Diagonal Line: Algorithms and Complexity , 2013, Discret. Comput. Geom..

[15]  David Steurer,et al.  Analytical approach to parallel repetition , 2013, STOC.

[16]  Fang-Rong Hsu,et al.  An Optimal Algorithm for Finding the Minimum Cardinality Dominating Set on Permutation Graphs , 1998, COCOON.

[17]  Sriram V. Pemmaraju,et al.  APX-hardness of domination problems in circle graphs , 2006, Inf. Process. Lett..

[18]  Saeed Mehrabi,et al.  Approximating Domination on Intersection Graphs of Paths on a Grid , 2017, WAOA.

[19]  Ran Raz,et al.  A sub-constant error-probability low-degree test, and a sub-constant error-probability PCP characterization of NP , 1997, STOC '97.

[20]  Stefan Felsner,et al.  Max point-tolerance graphs , 2015, Discret. Appl. Math..

[21]  Abhiruk Lahiri,et al.  Geometric Dominating Set and Set Cover via Local Search , 2016, Comput. Geom..

[22]  Joseph Douglas Horton,et al.  Minimum Edge Dominating Sets , 1993, SIAM J. Discret. Math..

[23]  Dániel Marx,et al.  Parameterized Complexity of Independence and Domination on Geometric Graphs , 2006, IWPEC.

[24]  Martin Charles Golumbic,et al.  Vertex Intersection Graphs of Paths on a Grid , 2012, J. Graph Algorithms Appl..

[25]  Nabil H. Mustafa,et al.  Improved Results on Geometric Hitting Set Problems , 2010, Discret. Comput. Geom..

[26]  Sriram V. Pemmaraju,et al.  A (2+epsilon)-Approximation Scheme for Minimum Domination on Circle Graphs , 2000, J. Algorithms.

[27]  Erik Jan van Leeuwen,et al.  Domination in Geometric Intersection Graphs , 2008, LATIN.

[28]  Dieter Kratsch,et al.  Domination on Cocomparability Graphs , 1993, SIAM J. Discret. Math..