Drawing graphs using a small number of obstacles
Abstract
An obstacle representation of a graph is a set of points in the plane representing the vertices of , together with a set of polygonal obstacles such that two vertices of are connected by an edge in if and only if the line segment between the corresponding points avoids all the obstacles. The obstacle number of is the minimum number of obstacles in an obstacle representation of . We provide the first non-trivial general upper bound on the obstacle number of graphs by showing that every -vertex graph satisfies . This refutes a conjecture of Mukkamala, Pach, and P\'alv\"olgyi. For -vertex graphs with bounded chromatic number, we improve this bound to . Both bounds apply even when the obstacles are required to be convex. We also prove a lower bound on the number of -vertex graphs with obstacle number at most for and a lower bound for the complexity of a collection of faces in an arrangement of line segments with endpoints. The latter bound is tight up to a multiplicative constant.
Keywords
Cite
@article{arxiv.1610.04741,
title = {Drawing graphs using a small number of obstacles},
author = {Martin Balko and Josef Cibulka and Pavel Valtr},
journal= {arXiv preprint arXiv:1610.04741},
year = {2017}
}
Comments
18 pages, 13 figures, minor changes