How to morph planar graph drawings
Computational Geometry
2016-06-02 v1
Abstract
Given an -vertex graph and two straight-line planar drawings of the graph that have the same faces and the same outer face, we show that there is a morph (i.e., a continuous transformation) between the two drawings that preserves straight-line planarity and consists of steps, which we prove is optimal in the worst case. Each step is a unidirectional linear morph, which means that every vertex moves at constant speed along a straight line, and the lines are parallel although the vertex speeds may differ. Thus we provide an efficient version of Cairns' 1944 proof of the existence of straight-line planarity-preserving morphs for triangulated graphs, which required an exponential number of steps.
Keywords
Cite
@article{arxiv.1606.00425,
title = {How to morph planar graph drawings},
author = {Soroush Alamdari and Patrizio Angelini and Fidel Barrera-Cruz and Timothy M. Chan and Giordano Da Lozzo and Giuseppe Di Battista and Fabrizio Frati and Penny Haxell and Anna Lubiw and Maurizio Patrignani and Vincenzo Roselli and Sahil Singla and Bryan T. Wilkinson},
journal= {arXiv preprint arXiv:1606.00425},
year = {2016}
}
Comments
31 pages, 18 figures