English

Constrained Generalized Delaunay Graphs Are Plane Spanners

Computational Geometry 2018-07-03 v3

Abstract

We look at generalized Delaunay graphs in the constrained setting by introducing line segments which the edges of the graph are not allowed to cross. Given an arbitrary convex shape CC, a constrained Delaunay graph is constructed by adding an edge between two vertices pp and qq if and only if there exists a homothet of CC with pp and qq on its boundary that does not contain any other vertices visible to pp and qq. We show that, regardless of the convex shape CC used to construct the constrained Delaunay graph, there exists a constant tt (that depends on CC) such that it is a plane tt-spanner of the visibility graph. Furthermore, we reduce the upper bound on the spanning ratio for the special case where the empty convex shape is an arbitrary rectangle to 2(2l/s+1)\sqrt{2} \cdot \left( 2 l/s + 1 \right), where ll and ss are the length of the long and short side of the rectangle.

Keywords

Cite

@article{arxiv.1602.07365,
  title  = {Constrained Generalized Delaunay Graphs Are Plane Spanners},
  author = {Prosenjit Bose and Jean-Lou De Carufel and André van Renssen},
  journal= {arXiv preprint arXiv:1602.07365},
  year   = {2018}
}
R2 v1 2026-06-22T12:56:28.817Z