Finding a Maximum Clique in a Grounded 1-Bend String Graph
Abstract
A grounded 1-bend string graph is an intersection graph of a set of polygonal lines, each with one bend, such that the lines lie above a common horizontal line and have exactly one endpoint on . We show that the problem of finding a maximum clique in a grounded 1-bend string graph is APX-hard, even for strictly -monotone strings. For general 1-bend strings, the problem remains APX-hard even if we restrict the position of the bends and end-points to lie on at most three parallel horizontal lines. We give fast algorithms to compute a maximum clique for different subclasses of grounded segment graphs, which are formed by restricting the strings to various forms of -shapes.
Cite
@article{arxiv.2107.05198,
title = {Finding a Maximum Clique in a Grounded 1-Bend String Graph},
author = {J. Mark Keil and Debajyoti Mondal and Ehsan Moradi and Yakov Nekrich},
journal= {arXiv preprint arXiv:2107.05198},
year = {2021}
}
Comments
A preliminary version of the paper was presented at the 32nd Canadian Conference on Computational Geometry (CCCG 2020)