English

Angle-Monotone Graphs: Construction and Local Routing

Computational Geometry 2018-01-22 v1

Abstract

A geometric graph in the plane is angle-monotone of width γ\gamma if every pair of vertices is connected by an angle-monotone path of width γ\gamma, a path such that the angles of any two edges in the path differ by at most γ\gamma. Angle-monotone graphs have good spanning properties. We prove that every point set in the plane admits an angle-monotone graph of width 9090^\circ, hence with spanning ratio 2\sqrt 2, and a subquadratic number of edges. This answers an open question posed by Dehkordi, Frati and Gudmundsson. We show how to construct, for any point set of size nn and any angle α\alpha, 0<α<450 < \alpha < 45^\circ, an angle-monotone graph of width (90+α)(90^\circ+\alpha) with O(nα)O(\frac{n}{\alpha}) edges. Furthermore, we give a local routing algorithm to find angle-monotone paths of width (90+α)(90^\circ+\alpha) in these graphs. The routing ratio, which is the ratio of path length to Euclidean distance, is at most 1/cos(45+α2)1/\cos(45^\circ + \frac{\alpha}{2}), i.e., ranging from 21.414\sqrt 2 \approx 1.414 to 2.6132.613. For the special case α=30\alpha = 30^\circ, we obtain the Θ6\Theta_6-graph and our routing algorithm achieves the known routing ratio 2 while finding angle-monotone paths of width 120120^\circ.

Keywords

Cite

@article{arxiv.1801.06290,
  title  = {Angle-Monotone Graphs: Construction and Local Routing},
  author = {Anna Lubiw and Debajyoti Mondal},
  journal= {arXiv preprint arXiv:1801.06290},
  year   = {2018}
}
R2 v1 2026-06-22T23:49:29.965Z