Computing Maximum Independent Set on Outerstring Graphs and Their Relatives
Abstract
A graph with vertices is called an outerstring graph if it has an intersection representation of a set of curves inside a disk such that one endpoint of every curve is attached to the boundary of the disk. Given an outerstring graph representation, the Maximum Independent Set (MIS) problem of the underlying graph can be computed in time, where is the number of segments in the representation (Keil et al., Comput. Geom., 60:19--25, 2017). If the strings are of constant size (e.g., line segments, L-shapes, etc.), then the algorithm takes time. In this paper, we examine the fine-grained complexity of the MIS problem on some well-known outerstring representations. We show that solving the MIS problem on grounded segment and grounded square-L representations is at least as hard as solving MIS on circle graph representations. Note that no -time algorithm, , is known for the MIS problem on circle graphs. For the grounded string representations where the strings are -monotone simple polygonal paths of constant length with segments at integral coordinates, we solve MIS in time and show this to be the best possible under the strong exponential time hypothesis (SETH). For the intersection graph of L-shapes in the plane, we give a -approximation algorithm for MIS (where denotes the size of an optimal solution), improving the previously best-known -approximation algorithm of Biedl and Derka (WADS 2017).
Cite
@article{arxiv.1903.07024,
title = {Computing Maximum Independent Set on Outerstring Graphs and Their Relatives},
author = {Prosenjit Bose and Paz Carmi and J. Mark Keil and Anil Maheshwari and Saeed Mehrabi and Debajyoti Mondal and Michiel Smid},
journal= {arXiv preprint arXiv:1903.07024},
year = {2021}
}
Comments
A preliminary version of this paper appeared in the 16th International Symposium on Algorithms and Data Structures (WADS 2019)