Orthogonal drawings of series-parallel graphs with minimum bends

Xiao Zhou, Takao Nishizeki

Research output: Contribution to conferencePaper

Abstract

In an orthogonal drawing of a planar graph G, each vertex is drawn as a point, each edge is drawn as a sequence of alternate horizontal and vertical line segments, and any two edges do not cross except at their common end. A bend is a point where an edge changes its direction. A drawing of G is called an optimal orthogonal drawing if the number of bends is minimum among all orthogonal drawings of G. In this paper we give an algorithm to find an optimal orthogonal drawing of any given series-parallel graph of the maximum degree at most three. Our algorithm takes linear time, while the previously known best algorithm takes cubic time. Furthermore, our algorithm is much simpler than the previous one. We also obtain a best possible upper bound on the number of bends in an optimal drawing.

Original languageEnglish
Pages3-12
Number of pages10
Publication statusPublished - 2014 Jan 1
Event1st Workshop on Algorithms and Computation 2007, WALCOM 2007 - Dhaka, Bangladesh
Duration: 2007 Feb 12 → …

Other

Other1st Workshop on Algorithms and Computation 2007, WALCOM 2007
CountryBangladesh
CityDhaka
Period07/2/12 → …

Keywords

  • Bend
  • Orthogonal drawing
  • Planar graph
  • Series-parallel graph

ASJC Scopus subject areas

  • Computational Theory and Mathematics
  • Applied Mathematics
  • Computational Mathematics

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  • Cite this

    Zhou, X., & Nishizeki, T. (2014). Orthogonal drawings of series-parallel graphs with minimum bends. 3-12. Paper presented at 1st Workshop on Algorithms and Computation 2007, WALCOM 2007, Dhaka, Bangladesh.