Grid Obstacle Representation of Graphs
Computational Geometry
2020-09-29 v3
Abstract
The grid obstacle representation, or alternately, -obstacle representation of a graph is an injective function and a set of point obstacles on the grid points of (where no vertex of has been mapped) such that is an edge in if and only if there exists a Manhattan path between and in avoiding the obstacles of and points in . This work shows that planar graphs admit such a representation while there exist some non-planar graphs that do not admit such a representation. Moreover, we show that every graph admits a grid obstacle representation in . We also show NP-hardness result for the point set embeddability of an -obstacle representation.
Keywords
Cite
@article{arxiv.1708.01765,
title = {Grid Obstacle Representation of Graphs},
author = {Arijit Bishnu and Arijit Ghosh and Rogers Mathew and Gopinath Mishra and Subhabrata Paul},
journal= {arXiv preprint arXiv:1708.01765},
year = {2020}
}
Comments
14 figures and 18 pages