Drawing Graphs as Spanners
Abstract
We study the problem of embedding graphs in the plane as good geometric spanners. That is, for a graph , the goal is to construct a straight-line drawing of in the plane such that, for any two vertices and of , the ratio between the minimum length of any path from to and the Euclidean distance between and is small. The maximum such ratio, over all pairs of vertices of , is the spanning ratio of . First, we show that deciding whether a graph admits a straight-line drawing with spanning ratio , a proper straight-line drawing with spanning ratio , and a planar straight-line drawing with spanning ratio are NP-complete, -complete, and linear-time solvable problems, respectively, where a drawing is proper if no two vertices overlap and no edge overlaps a vertex. Second, we show that moving from spanning ratio to spanning ratio allows us to draw every graph. Namely, we prove that, for every , every (planar) graph admits a proper (resp. planar) straight-line drawing with spanning ratio smaller than . Third, our drawings with spanning ratio smaller than have large edge-length ratio, that is, the ratio between the length of the longest edge and the length of the shortest edge is exponential. We show that this is sometimes unavoidable. More generally, we identify having bounded toughness as the criterion that distinguishes graphs that admit straight-line drawings with constant spanning ratio and polynomial edge-length ratio from graphs that require exponential edge-length ratio in any straight-line drawing with constant spanning ratio.
Cite
@article{arxiv.2002.05580,
title = {Drawing Graphs as Spanners},
author = {Oswin Aichholzer and Manuel Borrazzo and Prosenjit Bose and Jean Cardinal and Fabrizio Frati and Pat Morin and Birgit Vogtenhuber},
journal= {arXiv preprint arXiv:2002.05580},
year = {2020}
}