Nakano, Shin-ichi and Yoshikawa, Makiko (2001) A Linear-Time Algorithm for Bend-Optimal Orthogonal Drawings of Biconnected Cubic Plane Graphs (Extended Abstract). [Conference Paper]
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Abstract
An orthogonal drawing of a plane graph G is a drawing of G with the given planar embedding in which each vertex is mapped to 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. Observe that only a planar graph with the maximum degree four or less has an orthogonal drawing. The best known algorithm to find an orthogonal drawing runs in time $O(n^{7/4}\sqrt {\log n})$ for any plane graph with n vertices. In this paper we give a linear-time algorithm to find an orthogonal drawing of a given biconnected cubic plane graph with the minimum number of bends.
| Item Type: | Conference Paper |
|---|---|
| Classifications: | G Algorithms and Complexity > G.999 Others G Algorithms and Complexity > G.210 Bends P Styles > P.600 Poly-line > P.600.700 Orthogonal |
| ID Code: | 408 |
| Deposited By: | Selbach, Anna |
| Deposited On: | 30 Nov 2004 |
| Last Modified: | 18 Sep 2008 13:08 |
| Alternative Locations: | http://www.springerlink.com/openurl.asp?genre=article&issn=0302-9743&volume=1984&spage=296 |
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