Exploring Increasing-Chord Paths and Trees
Abstract
A straight-line drawing of a graph is a drawing of in the Euclidean plane, where every vertex in is mapped to a distinct point, and every edge in is mapped to a straight line segment between their endpoints. A path in is called increasing-chord if for every four points (not necessarily vertices) on in this order, the Euclidean distance between is at most the Euclidean distance between . A spanning tree rooted at some vertex in is called increasing-chord if contains an increasing-chord path from to every vertex in . In this paper we prove that given a vertex in a straight-line drawing , it is NP-complete to determine whether contains an increasing-chord spanning tree rooted at . We conjecture that finding an increasing-chord path between a pair of vertices in , which is an intriguing open problem posed by Alamdari et al., is also NP-complete, and show a (non-polynomial) reduction from the 3-SAT problem.
Cite
@article{arxiv.1702.08380,
title = {Exploring Increasing-Chord Paths and Trees},
author = {Yeganeh Bahoo and Stephane Durocher and Sahar Mehrpour and Debajyoti Mondal},
journal= {arXiv preprint arXiv:1702.08380},
year = {2017}
}
Comments
A preliminary version appeared at the 29th Canadian Conference on Computational Geometry (CCCG 2017)