How to Morph Planar Graph Drawings

Soroush Alamdari; Patrizio Angelini; Fidel Barrera-Cruz; Timothy M. Chan; Giordano Da Lozzo; Giuseppe Di Battista; Fabrizio Frati; Penny Haxell; Anna Lubiw; Maurizio Patrignani; Vincenzo Roselli; Sahil Singla; Bryan T. Wilkinson

How to Morph Planar Graph Drawings

Soroush Alamdari, Patrizio Angelini, Fidel Barrera-Cruz, Timothy M. Chan, Giordano Da Lozzo, Giuseppe Di Battista, Fabrizio Frati, Penny Haxell, Anna Lubiw, Maurizio Patrignani, Vincenzo Roselli, Sahil Singla, Bryan T. Wilkinson

Published: 01 Jan 2017, Last Modified: 21 May 2024SIAM J. Comput. 2017EveryoneRevisionsBibTeXCC BY-SA 4.0

Abstract: Given an $n$-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 $O(n)$ 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.

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