English

Moving Vertices to Make Drawings Plane

Computational Geometry 2008-11-06 v3 Computational Complexity Discrete Mathematics

Abstract

A straight-line drawing δ\delta of a planar graph GG need not be plane, but can be made so by moving some of the vertices. Let shift(G,δ)(G,\delta) denote the minimum number of vertices that need to be moved to turn δ\delta into a plane drawing of GG. We show that shift(G,δ)(G,\delta) is NP-hard to compute and to approximate, and we give explicit bounds on shift(G,δ)(G,\delta) when GG is a tree or a general planar graph. Our hardness results extend to 1BendPointSetEmbeddability, a well-known graph-drawing problem.

Keywords

Cite

@article{arxiv.0706.1002,
  title  = {Moving Vertices to Make Drawings Plane},
  author = {Xavier Goaoc and Jan Kratochvil and Yoshio Okamoto and Chan-Su Shin and Alexander Wolff},
  journal= {arXiv preprint arXiv:0706.1002},
  year   = {2008}
}
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