Compatible Connectivity-Augmentation of Planar Disconnected Graphs
Abstract
Motivated by applications to graph morphing, we consider the following \emph{compatible connectivity-augmentation problem}: We are given a labelled -vertex planar graph, , that has connected components, and isomorphic planar straight-line drawings, , of . We wish to augment by adding vertices and edges to make it connected in such a way that these vertices and edges can be added to as points and straight-line segments, respectively, to obtain planar straight-line drawings isomorphic to the augmentation of . We show that adding edges and vertices to is always sufficient and sometimes necessary to achieve this goal. The upper bound holds for all and and is achievable by an algorithm whose running time is for and whose running time is for general values of . The lower bound holds for all and .
Cite
@article{arxiv.1408.2436,
title = {Compatible Connectivity-Augmentation of Planar Disconnected Graphs},
author = {Greg Aloupis and Luis Barba and Paz Carmi and Vida Dujmović and Fabrizio Frati and Pat Morin},
journal= {arXiv preprint arXiv:1408.2436},
year = {2014}
}
Comments
23 pages, 13 figures